TSTP Solution File: SYO503^1 by cocATP---0.2.0
View Problem
- Process Solution
%------------------------------------------------------------------------------
% File : cocATP---0.2.0
% Problem : SYO503^1 : TPTP v7.5.0. Released v4.1.0.
% Transfm : none
% Format : tptp:raw
% Command : python CASC.py /export/starexec/sandbox2/benchmark/theBenchmark.p
% Computer : n009.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 00:51:58 EDT 2022
% Result : Timeout 291.30s 291.74s
% Output : None
% Verified :
% SZS Type : -
% Comments :
%------------------------------------------------------------------------------
%----No solution output by system
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.06/0.11 % Problem : SYO503^1 : TPTP v7.5.0. Released v4.1.0.
% 0.06/0.12 % Command : python CASC.py /export/starexec/sandbox2/benchmark/theBenchmark.p
% 0.12/0.33 % Computer : n009.cluster.edu
% 0.12/0.33 % Model : x86_64 x86_64
% 0.12/0.33 % CPUModel : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.12/0.33 % RAMPerCPU : 8042.1875MB
% 0.12/0.33 % OS : Linux 3.10.0-693.el7.x86_64
% 0.12/0.33 % CPULimit : 300
% 0.12/0.33 % DateTime : Sun Mar 13 13:01:52 EDT 2022
% 0.12/0.33 % CPUTime :
% 0.12/0.34 ModuleCmd_Load.c(213):ERROR:105: Unable to locate a modulefile for 'python/python27'
% 0.12/0.34 Python 2.7.5
% 8.71/8.92 Using paths ['/home/cristobal/cocATP/CASC/TPTP/', '/export/starexec/sandbox2/benchmark/', '/export/starexec/sandbox2/benchmark/']
% 8.71/8.92 FOF formula (<kernel.Constant object at 0xbb5a28>, <kernel.Sort object at 0x2b178145e5a8>) of role type named a
% 8.71/8.92 Using role type
% 8.71/8.92 Declaring a:Prop
% 8.71/8.92 FOF formula (<kernel.Constant object at 0xbb5830>, <kernel.Sort object at 0x2b178145e5a8>) of role type named b
% 8.71/8.92 Using role type
% 8.71/8.92 Declaring b:Prop
% 8.71/8.92 FOF formula (<kernel.Constant object at 0xbb5998>, <kernel.Sort object at 0x2b178145e5a8>) of role type named c
% 8.71/8.92 Using role type
% 8.71/8.92 Declaring c:Prop
% 8.71/8.92 FOF formula (<kernel.Constant object at 0xbb5320>, <kernel.DependentProduct object at 0x2b178147dcf8>) of role type named f
% 8.71/8.92 Using role type
% 8.71/8.92 Declaring f:(Prop->Prop)
% 8.71/8.92 FOF formula (<kernel.Constant object at 0xbb5a28>, <kernel.DependentProduct object at 0x2b178147dd88>) of role type named g
% 8.71/8.92 Using role type
% 8.71/8.92 Declaring g:(Prop->Prop)
% 8.71/8.92 FOF formula (<kernel.Constant object at 0xbb5098>, <kernel.DependentProduct object at 0x2b17814805a8>) of role type named p
% 8.71/8.92 Using role type
% 8.71/8.92 Declaring p:((Prop->Prop)->Prop)
% 8.71/8.92 FOF formula ((or ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) ((p f)->False))) (p g)) of role conjecture named claim
% 8.71/8.92 Conjecture to prove = ((or ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) ((p f)->False))) (p g)):Prop
% 8.71/8.92 We need to prove ['((or ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) ((p f)->False))) (p g))']
% 8.71/8.92 Parameter a:Prop.
% 8.71/8.92 Parameter b:Prop.
% 8.71/8.92 Parameter c:Prop.
% 8.71/8.92 Parameter f:(Prop->Prop).
% 8.71/8.92 Parameter g:(Prop->Prop).
% 8.71/8.92 Parameter p:((Prop->Prop)->Prop).
% 8.71/8.92 Trying to prove ((or ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) ((p f)->False))) (p g))
% 8.71/8.92 Found eq_ref00:=(eq_ref0 (p g)):(((eq Prop) (p g)) (p g))
% 8.71/8.92 Found (eq_ref0 (p g)) as proof of (((eq Prop) (p g)) b0)
% 8.71/8.92 Found ((eq_ref Prop) (p g)) as proof of (((eq Prop) (p g)) b0)
% 8.71/8.92 Found ((eq_ref Prop) (p g)) as proof of (((eq Prop) (p g)) b0)
% 8.71/8.92 Found ((eq_ref Prop) (p g)) as proof of (((eq Prop) (p g)) b0)
% 8.71/8.92 Found eq_ref00:=(eq_ref0 (p g)):(((eq Prop) (p g)) (p g))
% 8.71/8.92 Found (eq_ref0 (p g)) as proof of (((eq Prop) (p g)) b0)
% 8.71/8.92 Found ((eq_ref Prop) (p g)) as proof of (((eq Prop) (p g)) b0)
% 8.71/8.92 Found ((eq_ref Prop) (p g)) as proof of (((eq Prop) (p g)) b0)
% 8.71/8.92 Found ((eq_ref Prop) (p g)) as proof of (((eq Prop) (p g)) b0)
% 8.71/8.92 Found eq_ref00:=(eq_ref0 ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) ((p f)->False))):(((eq Prop) ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) ((p f)->False))) ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) ((p f)->False)))
% 8.71/8.92 Found (eq_ref0 ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) ((p f)->False))) as proof of (((eq Prop) ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) ((p f)->False))) b0)
% 8.71/8.92 Found ((eq_ref Prop) ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) ((p f)->False))) as proof of (((eq Prop) ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) ((p f)->False))) b0)
% 8.71/8.92 Found ((eq_ref Prop) ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) ((p f)->False))) as proof of (((eq Prop) ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) ((p f)->False))) b0)
% 8.71/8.92 Found ((eq_ref Prop) ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) ((p f)->False))) as proof of (((eq Prop) ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) ((p f)->False))) b0)
% 11.97/12.15 Found eq_ref00:=(eq_ref0 ((p f)->False)):(((eq Prop) ((p f)->False)) ((p f)->False))
% 11.97/12.15 Found (eq_ref0 ((p f)->False)) as proof of (((eq Prop) ((p f)->False)) b0)
% 11.97/12.15 Found ((eq_ref Prop) ((p f)->False)) as proof of (((eq Prop) ((p f)->False)) b0)
% 11.97/12.15 Found ((eq_ref Prop) ((p f)->False)) as proof of (((eq Prop) ((p f)->False)) b0)
% 11.97/12.15 Found ((eq_ref Prop) ((p f)->False)) as proof of (((eq Prop) ((p f)->False)) b0)
% 11.97/12.15 Found eq_ref00:=(eq_ref0 ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) (not (p f)))):(((eq Prop) ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) (not (p f)))) ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) (not (p f))))
% 11.97/12.15 Found (eq_ref0 ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) (not (p f)))) as proof of (((eq Prop) ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) (not (p f)))) b0)
% 11.97/12.15 Found ((eq_ref Prop) ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) (not (p f)))) as proof of (((eq Prop) ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) (not (p f)))) b0)
% 11.97/12.15 Found ((eq_ref Prop) ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) (not (p f)))) as proof of (((eq Prop) ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) (not (p f)))) b0)
% 11.97/12.15 Found ((eq_ref Prop) ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) (not (p f)))) as proof of (((eq Prop) ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) (not (p f)))) b0)
% 11.97/12.15 Found eq_ref00:=(eq_ref0 (not (p f))):(((eq Prop) (not (p f))) (not (p f)))
% 11.97/12.15 Found (eq_ref0 (not (p f))) as proof of (((eq Prop) (not (p f))) b0)
% 11.97/12.15 Found ((eq_ref Prop) (not (p f))) as proof of (((eq Prop) (not (p f))) b0)
% 11.97/12.15 Found ((eq_ref Prop) (not (p f))) as proof of (((eq Prop) (not (p f))) b0)
% 11.97/12.15 Found ((eq_ref Prop) (not (p f))) as proof of (((eq Prop) (not (p f))) b0)
% 11.97/12.15 Found eq_ref00:=(eq_ref0 ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))):(((eq Prop) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False)))
% 11.97/12.15 Found (eq_ref0 ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) as proof of (((eq Prop) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) b0)
% 11.97/12.15 Found ((eq_ref Prop) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) as proof of (((eq Prop) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) b0)
% 11.97/12.15 Found ((eq_ref Prop) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) as proof of (((eq Prop) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) b0)
% 11.97/12.15 Found ((eq_ref Prop) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) as proof of (((eq Prop) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) b0)
% 11.97/12.15 Found eq_ref00:=(eq_ref0 ((p f)->False)):(((eq Prop) ((p f)->False)) ((p f)->False))
% 11.97/12.15 Found (eq_ref0 ((p f)->False)) as proof of (((eq Prop) ((p f)->False)) b0)
% 11.97/12.15 Found ((eq_ref Prop) ((p f)->False)) as proof of (((eq Prop) ((p f)->False)) b0)
% 11.97/12.15 Found ((eq_ref Prop) ((p f)->False)) as proof of (((eq Prop) ((p f)->False)) b0)
% 11.97/12.15 Found ((eq_ref Prop) ((p f)->False)) as proof of (((eq Prop) ((p f)->False)) b0)
% 18.56/18.75 Found eq_ref00:=(eq_ref0 ((g b)->False)):(((eq Prop) ((g b)->False)) ((g b)->False))
% 18.56/18.75 Found (eq_ref0 ((g b)->False)) as proof of (((eq Prop) ((g b)->False)) b0)
% 18.56/18.75 Found ((eq_ref Prop) ((g b)->False)) as proof of (((eq Prop) ((g b)->False)) b0)
% 18.56/18.75 Found ((eq_ref Prop) ((g b)->False)) as proof of (((eq Prop) ((g b)->False)) b0)
% 18.56/18.75 Found ((eq_ref Prop) ((g b)->False)) as proof of (((eq Prop) ((g b)->False)) b0)
% 18.56/18.75 Found eq_ref00:=(eq_ref0 (not (p f))):(((eq Prop) (not (p f))) (not (p f)))
% 18.56/18.75 Found (eq_ref0 (not (p f))) as proof of (((eq Prop) (not (p f))) b0)
% 18.56/18.75 Found ((eq_ref Prop) (not (p f))) as proof of (((eq Prop) (not (p f))) b0)
% 18.56/18.75 Found ((eq_ref Prop) (not (p f))) as proof of (((eq Prop) (not (p f))) b0)
% 18.56/18.75 Found ((eq_ref Prop) (not (p f))) as proof of (((eq Prop) (not (p f))) b0)
% 18.56/18.75 Found eq_ref00:=(eq_ref0 ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))):(((eq Prop) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b))))
% 18.56/18.75 Found (eq_ref0 ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) as proof of (((eq Prop) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) b0)
% 18.56/18.75 Found ((eq_ref Prop) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) as proof of (((eq Prop) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) b0)
% 18.56/18.75 Found ((eq_ref Prop) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) as proof of (((eq Prop) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) b0)
% 18.56/18.75 Found ((eq_ref Prop) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) as proof of (((eq Prop) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) b0)
% 18.56/18.75 Found eq_ref00:=(eq_ref0 (not (g b))):(((eq Prop) (not (g b))) (not (g b)))
% 18.56/18.75 Found (eq_ref0 (not (g b))) as proof of (((eq Prop) (not (g b))) b0)
% 18.56/18.75 Found ((eq_ref Prop) (not (g b))) as proof of (((eq Prop) (not (g b))) b0)
% 18.56/18.75 Found ((eq_ref Prop) (not (g b))) as proof of (((eq Prop) (not (g b))) b0)
% 18.56/18.75 Found ((eq_ref Prop) (not (g b))) as proof of (((eq Prop) (not (g b))) b0)
% 18.56/18.75 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 18.56/18.75 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 18.56/18.75 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 18.56/18.75 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 18.56/18.75 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 18.56/18.75 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 18.56/18.75 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 18.56/18.75 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 18.56/18.75 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 18.56/18.75 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 18.56/18.75 Found eq_ref00:=(eq_ref0 ((g b)->False)):(((eq Prop) ((g b)->False)) ((g b)->False))
% 18.56/18.75 Found (eq_ref0 ((g b)->False)) as proof of (((eq Prop) ((g b)->False)) b0)
% 18.56/18.75 Found ((eq_ref Prop) ((g b)->False)) as proof of (((eq Prop) ((g b)->False)) b0)
% 18.56/18.75 Found ((eq_ref Prop) ((g b)->False)) as proof of (((eq Prop) ((g b)->False)) b0)
% 18.56/18.75 Found ((eq_ref Prop) ((g b)->False)) as proof of (((eq Prop) ((g b)->False)) b0)
% 18.56/18.75 Found eq_ref00:=(eq_ref0 ((g a)->False)):(((eq Prop) ((g a)->False)) ((g a)->False))
% 18.56/18.75 Found (eq_ref0 ((g a)->False)) as proof of (((eq Prop) ((g a)->False)) b0)
% 18.56/18.75 Found ((eq_ref Prop) ((g a)->False)) as proof of (((eq Prop) ((g a)->False)) b0)
% 18.56/18.75 Found ((eq_ref Prop) ((g a)->False)) as proof of (((eq Prop) ((g a)->False)) b0)
% 18.56/18.75 Found ((eq_ref Prop) ((g a)->False)) as proof of (((eq Prop) ((g a)->False)) b0)
% 18.56/18.75 Found eq_ref00:=(eq_ref0 ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))):(((eq Prop) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False)))
% 20.96/21.15 Found (eq_ref0 ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) as proof of (((eq Prop) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) b0)
% 20.96/21.15 Found ((eq_ref Prop) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) as proof of (((eq Prop) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) b0)
% 20.96/21.15 Found ((eq_ref Prop) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) as proof of (((eq Prop) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) b0)
% 20.96/21.15 Found ((eq_ref Prop) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) as proof of (((eq Prop) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) b0)
% 20.96/21.15 Found eq_ref00:=(eq_ref0 ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))):(((eq Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False)))
% 20.96/21.15 Found (eq_ref0 ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) as proof of (((eq Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) b0)
% 20.96/21.15 Found ((eq_ref Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) as proof of (((eq Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) b0)
% 20.96/21.15 Found ((eq_ref Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) as proof of (((eq Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) b0)
% 20.96/21.15 Found ((eq_ref Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) as proof of (((eq Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) b0)
% 20.96/21.15 Found eq_ref00:=(eq_ref0 ((g b)->False)):(((eq Prop) ((g b)->False)) ((g b)->False))
% 20.96/21.15 Found (eq_ref0 ((g b)->False)) as proof of (((eq Prop) ((g b)->False)) b0)
% 20.96/21.15 Found ((eq_ref Prop) ((g b)->False)) as proof of (((eq Prop) ((g b)->False)) b0)
% 20.96/21.15 Found ((eq_ref Prop) ((g b)->False)) as proof of (((eq Prop) ((g b)->False)) b0)
% 20.96/21.15 Found ((eq_ref Prop) ((g b)->False)) as proof of (((eq Prop) ((g b)->False)) b0)
% 20.96/21.15 Found eq_ref00:=(eq_ref0 a0):(((eq (Prop->Prop)) a0) a0)
% 20.96/21.15 Found (eq_ref0 a0) as proof of (((eq (Prop->Prop)) a0) g)
% 20.96/21.15 Found ((eq_ref (Prop->Prop)) a0) as proof of (((eq (Prop->Prop)) a0) g)
% 20.96/21.15 Found ((eq_ref (Prop->Prop)) a0) as proof of (((eq (Prop->Prop)) a0) g)
% 20.96/21.15 Found ((eq_ref (Prop->Prop)) a0) as proof of (((eq (Prop->Prop)) a0) g)
% 20.96/21.15 Found x2:(P a)
% 20.96/21.15 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 20.96/21.15 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 20.96/21.15 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 20.96/21.15 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 20.96/21.15 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 20.96/21.15 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 20.96/21.15 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 20.96/21.15 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 20.96/21.15 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 20.96/21.15 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 20.96/21.15 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 20.96/21.15 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 20.96/21.15 Found eq_ref00:=(eq_ref0 ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))):(((eq Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a))))
% 20.96/21.15 Found (eq_ref0 ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) as proof of (((eq Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) b0)
% 27.04/27.26 Found ((eq_ref Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) as proof of (((eq Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) b0)
% 27.04/27.26 Found ((eq_ref Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) as proof of (((eq Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) b0)
% 27.04/27.26 Found ((eq_ref Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) as proof of (((eq Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) b0)
% 27.04/27.26 Found eq_ref00:=(eq_ref0 (not (g b))):(((eq Prop) (not (g b))) (not (g b)))
% 27.04/27.26 Found (eq_ref0 (not (g b))) as proof of (((eq Prop) (not (g b))) b0)
% 27.04/27.26 Found ((eq_ref Prop) (not (g b))) as proof of (((eq Prop) (not (g b))) b0)
% 27.04/27.26 Found ((eq_ref Prop) (not (g b))) as proof of (((eq Prop) (not (g b))) b0)
% 27.04/27.26 Found ((eq_ref Prop) (not (g b))) as proof of (((eq Prop) (not (g b))) b0)
% 27.04/27.26 Found eq_ref00:=(eq_ref0 (not (g b))):(((eq Prop) (not (g b))) (not (g b)))
% 27.04/27.26 Found (eq_ref0 (not (g b))) as proof of (((eq Prop) (not (g b))) b0)
% 27.04/27.26 Found ((eq_ref Prop) (not (g b))) as proof of (((eq Prop) (not (g b))) b0)
% 27.04/27.26 Found ((eq_ref Prop) (not (g b))) as proof of (((eq Prop) (not (g b))) b0)
% 27.04/27.26 Found ((eq_ref Prop) (not (g b))) as proof of (((eq Prop) (not (g b))) b0)
% 27.04/27.26 Found eq_ref00:=(eq_ref0 (not (g a))):(((eq Prop) (not (g a))) (not (g a)))
% 27.04/27.26 Found (eq_ref0 (not (g a))) as proof of (((eq Prop) (not (g a))) b0)
% 27.04/27.26 Found ((eq_ref Prop) (not (g a))) as proof of (((eq Prop) (not (g a))) b0)
% 27.04/27.26 Found ((eq_ref Prop) (not (g a))) as proof of (((eq Prop) (not (g a))) b0)
% 27.04/27.26 Found ((eq_ref Prop) (not (g a))) as proof of (((eq Prop) (not (g a))) b0)
% 27.04/27.26 Found eq_ref00:=(eq_ref0 ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))):(((eq Prop) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b))))
% 27.04/27.26 Found (eq_ref0 ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) as proof of (((eq Prop) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) b0)
% 27.04/27.26 Found ((eq_ref Prop) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) as proof of (((eq Prop) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) b0)
% 27.04/27.26 Found ((eq_ref Prop) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) as proof of (((eq Prop) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) b0)
% 27.04/27.26 Found ((eq_ref Prop) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) as proof of (((eq Prop) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) b0)
% 27.04/27.26 Found x2:(P a)
% 27.04/27.26 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 27.04/27.26 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 27.04/27.26 Found eq_ref00:=(eq_ref0 ((g b)->False)):(((eq Prop) ((g b)->False)) ((g b)->False))
% 27.04/27.26 Found (eq_ref0 ((g b)->False)) as proof of (((eq Prop) ((g b)->False)) b0)
% 27.04/27.26 Found ((eq_ref Prop) ((g b)->False)) as proof of (((eq Prop) ((g b)->False)) b0)
% 27.04/27.26 Found ((eq_ref Prop) ((g b)->False)) as proof of (((eq Prop) ((g b)->False)) b0)
% 27.04/27.26 Found ((eq_ref Prop) ((g b)->False)) as proof of (((eq Prop) ((g b)->False)) b0)
% 27.04/27.26 Found eq_ref00:=(eq_ref0 ((g a)->False)):(((eq Prop) ((g a)->False)) ((g a)->False))
% 27.04/27.26 Found (eq_ref0 ((g a)->False)) as proof of (((eq Prop) ((g a)->False)) b0)
% 27.04/27.26 Found ((eq_ref Prop) ((g a)->False)) as proof of (((eq Prop) ((g a)->False)) b0)
% 27.04/27.26 Found ((eq_ref Prop) ((g a)->False)) as proof of (((eq Prop) ((g a)->False)) b0)
% 27.04/27.26 Found ((eq_ref Prop) ((g a)->False)) as proof of (((eq Prop) ((g a)->False)) b0)
% 27.04/27.26 Found eq_ref00:=(eq_ref0 ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))):(((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False)))
% 27.21/27.40 Found (eq_ref0 ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) b0)
% 27.21/27.40 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) b0)
% 27.21/27.40 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) b0)
% 27.21/27.40 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) b0)
% 27.21/27.40 Found eq_ref00:=(eq_ref0 ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))):(((eq Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False)))
% 27.21/27.40 Found (eq_ref0 ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) as proof of (((eq Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) b0)
% 27.21/27.40 Found ((eq_ref Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) as proof of (((eq Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) b0)
% 27.21/27.40 Found ((eq_ref Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) as proof of (((eq Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) b0)
% 27.21/27.40 Found ((eq_ref Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) as proof of (((eq Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) b0)
% 27.21/27.40 Found eq_ref00:=(eq_ref0 ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))):(((eq Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False)))
% 27.21/27.40 Found (eq_ref0 ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) as proof of (((eq Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) b0)
% 27.21/27.40 Found ((eq_ref Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) as proof of (((eq Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) b0)
% 27.21/27.40 Found ((eq_ref Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) as proof of (((eq Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) b0)
% 27.21/27.40 Found ((eq_ref Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) as proof of (((eq Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) b0)
% 27.21/27.40 Found eq_ref00:=(eq_ref0 ((f b)->False)):(((eq Prop) ((f b)->False)) ((f b)->False))
% 27.21/27.40 Found (eq_ref0 ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 27.21/27.40 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 27.21/27.40 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 27.21/27.40 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 27.21/27.40 Found eq_ref00:=(eq_ref0 ((g a)->False)):(((eq Prop) ((g a)->False)) ((g a)->False))
% 27.21/27.40 Found (eq_ref0 ((g a)->False)) as proof of (((eq Prop) ((g a)->False)) b0)
% 27.21/27.40 Found ((eq_ref Prop) ((g a)->False)) as proof of (((eq Prop) ((g a)->False)) b0)
% 27.21/27.40 Found ((eq_ref Prop) ((g a)->False)) as proof of (((eq Prop) ((g a)->False)) b0)
% 27.21/27.40 Found ((eq_ref Prop) ((g a)->False)) as proof of (((eq Prop) ((g a)->False)) b0)
% 27.21/27.40 Found eq_ref00:=(eq_ref0 ((g a)->False)):(((eq Prop) ((g a)->False)) ((g a)->False))
% 27.21/27.40 Found (eq_ref0 ((g a)->False)) as proof of (((eq Prop) ((g a)->False)) b0)
% 33.39/33.67 Found ((eq_ref Prop) ((g a)->False)) as proof of (((eq Prop) ((g a)->False)) b0)
% 33.39/33.67 Found ((eq_ref Prop) ((g a)->False)) as proof of (((eq Prop) ((g a)->False)) b0)
% 33.39/33.67 Found ((eq_ref Prop) ((g a)->False)) as proof of (((eq Prop) ((g a)->False)) b0)
% 33.39/33.67 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 33.39/33.67 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 33.39/33.67 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 33.39/33.67 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 33.39/33.67 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 33.39/33.67 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 33.39/33.67 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 33.39/33.67 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 33.39/33.67 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 33.39/33.67 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 33.39/33.67 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 33.39/33.67 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 33.39/33.67 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 33.39/33.67 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 33.39/33.67 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 33.39/33.67 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 33.39/33.67 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 33.39/33.67 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 33.39/33.67 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 33.39/33.67 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 33.39/33.67 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 33.39/33.67 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 33.39/33.67 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 33.39/33.67 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 33.39/33.67 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 33.39/33.67 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 33.39/33.67 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 33.39/33.67 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 33.39/33.67 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 33.39/33.67 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 33.39/33.67 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 33.39/33.67 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 33.39/33.67 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 33.39/33.67 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 33.39/33.67 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 33.39/33.67 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 33.39/33.67 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 33.39/33.67 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 33.39/33.67 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 33.39/33.67 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 33.39/33.67 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 33.39/33.67 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 33.39/33.67 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 33.39/33.67 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 33.39/33.67 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 33.39/33.67 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 33.39/33.67 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 33.39/33.67 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 33.39/33.67 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 33.39/33.67 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 33.39/33.67 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 33.39/33.67 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 33.39/33.67 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 33.39/33.67 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 33.39/33.67 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 33.39/33.67 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 33.39/33.67 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 33.39/33.67 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 33.39/33.67 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 33.39/33.67 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 33.39/33.67 Found eq_ref00:=(eq_ref0 (not (g a))):(((eq Prop) (not (g a))) (not (g a)))
% 33.39/33.67 Found (eq_ref0 (not (g a))) as proof of (((eq Prop) (not (g a))) b0)
% 33.39/33.67 Found ((eq_ref Prop) (not (g a))) as proof of (((eq Prop) (not (g a))) b0)
% 33.39/33.67 Found ((eq_ref Prop) (not (g a))) as proof of (((eq Prop) (not (g a))) b0)
% 33.39/33.67 Found ((eq_ref Prop) (not (g a))) as proof of (((eq Prop) (not (g a))) b0)
% 33.39/33.67 Found eq_ref00:=(eq_ref0 ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))):(((eq Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a))))
% 33.39/33.67 Found (eq_ref0 ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) as proof of (((eq Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) b0)
% 33.69/33.92 Found ((eq_ref Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) as proof of (((eq Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) b0)
% 33.69/33.92 Found ((eq_ref Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) as proof of (((eq Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) b0)
% 33.69/33.92 Found ((eq_ref Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) as proof of (((eq Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) b0)
% 33.69/33.92 Found eq_ref00:=(eq_ref0 (not (g a))):(((eq Prop) (not (g a))) (not (g a)))
% 33.69/33.92 Found (eq_ref0 (not (g a))) as proof of (((eq Prop) (not (g a))) b0)
% 33.69/33.92 Found ((eq_ref Prop) (not (g a))) as proof of (((eq Prop) (not (g a))) b0)
% 33.69/33.92 Found ((eq_ref Prop) (not (g a))) as proof of (((eq Prop) (not (g a))) b0)
% 33.69/33.92 Found ((eq_ref Prop) (not (g a))) as proof of (((eq Prop) (not (g a))) b0)
% 33.69/33.92 Found eq_ref00:=(eq_ref0 ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))):(((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b))))
% 33.69/33.92 Found (eq_ref0 ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) b0)
% 33.69/33.92 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) b0)
% 33.69/33.92 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) b0)
% 33.69/33.92 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) b0)
% 33.69/33.92 Found eq_ref00:=(eq_ref0 ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))):(((eq Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a))))
% 33.69/33.92 Found (eq_ref0 ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) as proof of (((eq Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) b0)
% 33.69/33.92 Found ((eq_ref Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) as proof of (((eq Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) b0)
% 33.69/33.92 Found ((eq_ref Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) as proof of (((eq Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) b0)
% 33.69/33.92 Found ((eq_ref Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) as proof of (((eq Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) b0)
% 33.69/33.92 Found eq_ref00:=(eq_ref0 (not (g b))):(((eq Prop) (not (g b))) (not (g b)))
% 33.69/33.92 Found (eq_ref0 (not (g b))) as proof of (((eq Prop) (not (g b))) b0)
% 33.69/33.92 Found ((eq_ref Prop) (not (g b))) as proof of (((eq Prop) (not (g b))) b0)
% 33.69/33.92 Found ((eq_ref Prop) (not (g b))) as proof of (((eq Prop) (not (g b))) b0)
% 33.69/33.92 Found ((eq_ref Prop) (not (g b))) as proof of (((eq Prop) (not (g b))) b0)
% 33.69/33.92 Found eq_ref00:=(eq_ref0 (not (f b))):(((eq Prop) (not (f b))) (not (f b)))
% 33.69/33.92 Found (eq_ref0 (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 33.69/33.92 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 33.69/33.92 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 33.69/33.92 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 33.69/33.92 Found eq_ref00:=(eq_ref0 (not (g a))):(((eq Prop) (not (g a))) (not (g a)))
% 33.69/33.92 Found (eq_ref0 (not (g a))) as proof of (((eq Prop) (not (g a))) b0)
% 33.69/33.92 Found ((eq_ref Prop) (not (g a))) as proof of (((eq Prop) (not (g a))) b0)
% 33.69/33.92 Found ((eq_ref Prop) (not (g a))) as proof of (((eq Prop) (not (g a))) b0)
% 36.05/36.26 Found ((eq_ref Prop) (not (g a))) as proof of (((eq Prop) (not (g a))) b0)
% 36.05/36.26 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 36.05/36.26 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 36.05/36.26 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 36.05/36.26 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 36.05/36.26 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 36.05/36.26 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 36.05/36.26 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 36.05/36.26 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 36.05/36.26 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 36.05/36.26 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 36.05/36.26 Found x2:(P a)
% 36.05/36.26 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 36.05/36.26 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 36.05/36.26 Found x2:(P a)
% 36.05/36.26 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 36.05/36.26 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 36.05/36.26 Found x2:(P a)
% 36.05/36.26 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 36.05/36.26 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 36.05/36.26 Found x2:(P a)
% 36.05/36.26 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 36.05/36.26 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 36.05/36.26 Found x2:(P a)
% 36.05/36.26 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 36.05/36.26 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 36.05/36.26 Found x2:(P a)
% 36.05/36.26 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 36.05/36.26 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 36.05/36.26 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 36.05/36.26 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 36.05/36.26 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 36.05/36.26 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 36.05/36.26 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 36.05/36.26 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 36.05/36.26 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 36.05/36.26 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 36.05/36.26 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 36.05/36.26 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 36.05/36.26 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 36.05/36.26 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 36.05/36.26 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 36.05/36.26 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 36.05/36.26 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 36.05/36.26 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 36.05/36.26 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 36.05/36.26 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 36.05/36.26 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 36.05/36.26 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 36.05/36.26 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 36.05/36.26 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 36.05/36.26 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 36.05/36.26 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 36.05/36.26 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 36.05/36.26 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 36.05/36.26 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 36.05/36.26 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 36.05/36.26 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 36.05/36.26 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 36.05/36.26 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 36.05/36.26 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 36.05/36.26 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 36.05/36.26 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 36.05/36.26 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 36.05/36.26 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 36.05/36.26 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 36.05/36.26 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 36.05/36.26 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 36.05/36.26 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 36.05/36.26 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 36.05/36.26 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 36.05/36.26 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 36.05/36.26 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 36.05/36.26 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 36.05/36.26 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 36.05/36.26 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 36.05/36.26 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 36.05/36.26 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 36.05/36.26 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 36.05/36.26 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 36.05/36.26 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 36.05/36.26 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 43.71/43.98 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 43.71/43.98 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 43.71/43.98 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 43.71/43.98 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 43.71/43.98 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 43.71/43.98 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 43.71/43.98 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 43.71/43.98 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 43.71/43.98 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 43.71/43.98 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 43.71/43.98 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 43.71/43.98 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 43.71/43.98 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 43.71/43.98 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 43.71/43.98 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 43.71/43.98 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 43.71/43.98 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 43.71/43.98 Found x2:(P a)
% 43.71/43.98 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 43.71/43.98 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 43.71/43.98 Found x2:(P a)
% 43.71/43.98 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 43.71/43.98 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 43.71/43.98 Found x2:(P a)
% 43.71/43.98 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 43.71/43.98 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 43.71/43.98 Found x2:(P a)
% 43.71/43.98 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 43.71/43.98 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 43.71/43.98 Found x2:(P a)
% 43.71/43.98 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 43.71/43.98 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 43.71/43.98 Found x2:(P a)
% 43.71/43.98 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 43.71/43.98 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 43.71/43.98 Found eq_ref00:=(eq_ref0 ((f b)->False)):(((eq Prop) ((f b)->False)) ((f b)->False))
% 43.71/43.98 Found (eq_ref0 ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 43.71/43.98 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 43.71/43.98 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 43.71/43.98 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 43.71/43.98 Found eq_ref00:=(eq_ref0 ((g a)->False)):(((eq Prop) ((g a)->False)) ((g a)->False))
% 43.71/43.98 Found (eq_ref0 ((g a)->False)) as proof of (((eq Prop) ((g a)->False)) b0)
% 43.71/43.98 Found ((eq_ref Prop) ((g a)->False)) as proof of (((eq Prop) ((g a)->False)) b0)
% 43.71/43.98 Found ((eq_ref Prop) ((g a)->False)) as proof of (((eq Prop) ((g a)->False)) b0)
% 43.71/43.98 Found ((eq_ref Prop) ((g a)->False)) as proof of (((eq Prop) ((g a)->False)) b0)
% 43.71/43.98 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 43.71/43.98 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 43.71/43.98 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 43.71/43.98 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 43.71/43.98 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 43.71/43.98 Found eq_ref00:=(eq_ref0 ((f b)->False)):(((eq Prop) ((f b)->False)) ((f b)->False))
% 43.71/43.98 Found (eq_ref0 ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 43.71/43.98 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 43.71/43.98 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 43.71/43.98 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 43.71/43.98 Found eq_ref00:=(eq_ref0 ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))):(((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False)))
% 43.71/43.98 Found (eq_ref0 ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) b0)
% 43.71/43.98 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) b0)
% 43.71/43.98 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) b0)
% 43.71/43.98 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) b0)
% 43.71/43.98 Found eq_ref00:=(eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))):(((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) ((or (((eq Prop) a) b)) ((f a)->False)))
% 43.88/44.15 Found (eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 43.88/44.15 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 43.88/44.15 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 43.88/44.15 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 43.88/44.15 Found eq_ref00:=(eq_ref0 ((g a)->False)):(((eq Prop) ((g a)->False)) ((g a)->False))
% 43.88/44.15 Found (eq_ref0 ((g a)->False)) as proof of (((eq Prop) ((g a)->False)) b0)
% 43.88/44.15 Found ((eq_ref Prop) ((g a)->False)) as proof of (((eq Prop) ((g a)->False)) b0)
% 43.88/44.15 Found ((eq_ref Prop) ((g a)->False)) as proof of (((eq Prop) ((g a)->False)) b0)
% 43.88/44.15 Found ((eq_ref Prop) ((g a)->False)) as proof of (((eq Prop) ((g a)->False)) b0)
% 43.88/44.15 Found eq_ref00:=(eq_ref0 ((f b)->False)):(((eq Prop) ((f b)->False)) ((f b)->False))
% 43.88/44.15 Found (eq_ref0 ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 43.88/44.15 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 43.88/44.15 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 43.88/44.15 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 43.88/44.15 Found eq_ref00:=(eq_ref0 ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))):(((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False)))
% 43.88/44.15 Found (eq_ref0 ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) b0)
% 43.88/44.15 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) b0)
% 43.88/44.15 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) b0)
% 43.88/44.15 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) b0)
% 43.88/44.15 Found eq_ref00:=(eq_ref0 ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))):(((eq Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False)))
% 43.88/44.15 Found (eq_ref0 ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) as proof of (((eq Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) b0)
% 43.88/44.15 Found ((eq_ref Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) as proof of (((eq Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) b0)
% 43.88/44.15 Found ((eq_ref Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) as proof of (((eq Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) b0)
% 43.88/44.15 Found ((eq_ref Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) as proof of (((eq Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) b0)
% 43.88/44.15 Found eq_ref00:=(eq_ref0 ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))):(((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False)))
% 43.88/44.15 Found (eq_ref0 ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) b0)
% 43.88/44.15 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) b0)
% 49.13/49.34 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) b0)
% 49.13/49.34 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) b0)
% 49.13/49.34 Found eq_ref00:=(eq_ref0 ((g a)->False)):(((eq Prop) ((g a)->False)) ((g a)->False))
% 49.13/49.34 Found (eq_ref0 ((g a)->False)) as proof of (((eq Prop) ((g a)->False)) b0)
% 49.13/49.34 Found ((eq_ref Prop) ((g a)->False)) as proof of (((eq Prop) ((g a)->False)) b0)
% 49.13/49.34 Found ((eq_ref Prop) ((g a)->False)) as proof of (((eq Prop) ((g a)->False)) b0)
% 49.13/49.34 Found ((eq_ref Prop) ((g a)->False)) as proof of (((eq Prop) ((g a)->False)) b0)
% 49.13/49.34 Found eq_ref00:=(eq_ref0 ((f b)->False)):(((eq Prop) ((f b)->False)) ((f b)->False))
% 49.13/49.34 Found (eq_ref0 ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 49.13/49.34 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 49.13/49.34 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 49.13/49.34 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 49.13/49.34 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 49.13/49.34 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 49.13/49.34 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 49.13/49.34 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 49.13/49.34 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 49.13/49.34 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 49.13/49.34 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 49.13/49.34 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 49.13/49.34 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 49.13/49.34 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 49.13/49.34 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 49.13/49.34 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 49.13/49.34 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 49.13/49.34 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 49.13/49.34 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 49.13/49.34 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 49.13/49.34 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 49.13/49.34 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 49.13/49.34 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 49.13/49.34 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 49.13/49.34 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 49.13/49.34 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 49.13/49.34 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 49.13/49.34 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 49.13/49.34 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 49.13/49.34 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 49.13/49.34 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 49.13/49.34 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 49.13/49.34 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 49.13/49.34 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 49.13/49.34 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 49.13/49.34 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 49.13/49.34 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 49.13/49.34 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 49.13/49.34 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 49.13/49.34 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 49.13/49.34 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 49.13/49.34 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 49.13/49.34 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 49.13/49.34 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 49.13/49.34 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 49.13/49.34 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 49.13/49.34 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 49.13/49.34 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 49.13/49.34 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 49.13/49.34 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 49.13/49.34 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 49.13/49.34 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 49.13/49.34 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 49.13/49.34 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 49.13/49.34 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 49.13/49.34 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 49.13/49.34 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 49.13/49.34 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 49.13/49.34 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 49.13/49.34 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 49.93/50.18 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 49.93/50.18 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 49.93/50.18 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 49.93/50.18 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 49.93/50.18 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 49.93/50.18 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 49.93/50.18 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 49.93/50.18 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 49.93/50.18 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 49.93/50.18 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 49.93/50.18 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 49.93/50.18 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 49.93/50.18 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 49.93/50.18 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 49.93/50.18 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 49.93/50.18 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 49.93/50.18 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 49.93/50.18 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 49.93/50.18 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 49.93/50.18 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 49.93/50.18 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 49.93/50.18 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 49.93/50.18 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 49.93/50.18 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 49.93/50.18 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 49.93/50.18 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 49.93/50.18 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 49.93/50.18 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 49.93/50.18 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 49.93/50.18 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 49.93/50.18 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 49.93/50.18 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 49.93/50.18 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 49.93/50.18 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 49.93/50.18 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 49.93/50.18 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 49.93/50.18 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 49.93/50.18 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 49.93/50.18 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 49.93/50.18 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 49.93/50.18 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 49.93/50.18 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 49.93/50.18 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 49.93/50.18 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 49.93/50.18 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 49.93/50.18 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 49.93/50.18 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 49.93/50.18 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 49.93/50.18 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 49.93/50.18 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 49.93/50.18 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 49.93/50.18 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 49.93/50.18 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 49.93/50.18 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 49.93/50.18 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 49.93/50.18 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 49.93/50.18 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 49.93/50.18 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 49.93/50.18 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 49.93/50.18 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 49.93/50.18 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 49.93/50.18 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 49.93/50.18 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 49.93/50.18 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 49.93/50.18 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 49.93/50.18 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 49.93/50.18 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 49.93/50.18 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 49.93/50.18 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 49.93/50.18 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 49.93/50.18 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 49.93/50.18 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 49.93/50.18 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 49.93/50.18 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 49.93/50.18 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 49.93/50.18 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 49.93/50.18 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 53.11/53.32 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 53.11/53.32 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 53.11/53.32 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 53.11/53.32 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 53.11/53.32 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 53.11/53.32 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 53.11/53.32 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 53.11/53.32 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 53.11/53.32 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 53.11/53.32 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 53.11/53.32 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 53.11/53.32 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 53.11/53.32 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 53.11/53.32 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 53.11/53.32 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 53.11/53.32 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 53.11/53.32 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 53.11/53.32 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 53.11/53.32 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 53.11/53.32 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 53.11/53.32 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 53.11/53.32 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 53.11/53.32 Found eq_ref00:=(eq_ref0 (not (f b))):(((eq Prop) (not (f b))) (not (f b)))
% 53.11/53.32 Found (eq_ref0 (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 53.11/53.32 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 53.11/53.32 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 53.11/53.32 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 53.11/53.32 Found eq_ref00:=(eq_ref0 (not (f b))):(((eq Prop) (not (f b))) (not (f b)))
% 53.11/53.32 Found (eq_ref0 (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 53.11/53.32 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 53.11/53.32 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 53.11/53.32 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 53.11/53.32 Found eq_ref00:=(eq_ref0 (not (f b))):(((eq Prop) (not (f b))) (not (f b)))
% 53.11/53.32 Found (eq_ref0 (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 53.11/53.32 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 53.11/53.32 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 53.11/53.32 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 53.11/53.32 Found eq_ref00:=(eq_ref0 ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))):(((eq Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a))))
% 53.11/53.32 Found (eq_ref0 ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) as proof of (((eq Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) b0)
% 53.11/53.32 Found ((eq_ref Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) as proof of (((eq Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) b0)
% 53.11/53.32 Found ((eq_ref Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) as proof of (((eq Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) b0)
% 53.11/53.32 Found ((eq_ref Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) as proof of (((eq Prop) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) b0)
% 53.11/53.32 Found eq_ref00:=(eq_ref0 (not (g a))):(((eq Prop) (not (g a))) (not (g a)))
% 53.11/53.32 Found (eq_ref0 (not (g a))) as proof of (((eq Prop) (not (g a))) b0)
% 53.11/53.32 Found ((eq_ref Prop) (not (g a))) as proof of (((eq Prop) (not (g a))) b0)
% 53.11/53.32 Found ((eq_ref Prop) (not (g a))) as proof of (((eq Prop) (not (g a))) b0)
% 53.11/53.32 Found ((eq_ref Prop) (not (g a))) as proof of (((eq Prop) (not (g a))) b0)
% 53.11/53.32 Found eq_ref00:=(eq_ref0 ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))):(((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b))))
% 53.31/53.55 Found (eq_ref0 ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) b0)
% 53.31/53.55 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) b0)
% 53.31/53.55 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) b0)
% 53.31/53.55 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) b0)
% 53.31/53.55 Found eq_ref00:=(eq_ref0 (not (f b))):(((eq Prop) (not (f b))) (not (f b)))
% 53.31/53.55 Found (eq_ref0 (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 53.31/53.55 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 53.31/53.55 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 53.31/53.55 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 53.31/53.55 Found eq_ref00:=(eq_ref0 (not (g a))):(((eq Prop) (not (g a))) (not (g a)))
% 53.31/53.55 Found (eq_ref0 (not (g a))) as proof of (((eq Prop) (not (g a))) b0)
% 53.31/53.55 Found ((eq_ref Prop) (not (g a))) as proof of (((eq Prop) (not (g a))) b0)
% 53.31/53.55 Found ((eq_ref Prop) (not (g a))) as proof of (((eq Prop) (not (g a))) b0)
% 53.31/53.55 Found ((eq_ref Prop) (not (g a))) as proof of (((eq Prop) (not (g a))) b0)
% 53.31/53.55 Found eq_ref00:=(eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))):(((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) ((or (((eq Prop) a) b)) ((f a)->False)))
% 53.31/53.55 Found (eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 53.31/53.55 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 53.31/53.55 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 53.31/53.55 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 53.31/53.55 Found eq_ref00:=(eq_ref0 ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))):(((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b))))
% 53.31/53.55 Found (eq_ref0 ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) b0)
% 53.31/53.55 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) b0)
% 53.31/53.55 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) b0)
% 53.31/53.55 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) b0)
% 53.31/53.55 Found eq_ref00:=(eq_ref0 (not (g a))):(((eq Prop) (not (g a))) (not (g a)))
% 53.31/53.55 Found (eq_ref0 (not (g a))) as proof of (((eq Prop) (not (g a))) b0)
% 53.31/53.55 Found ((eq_ref Prop) (not (g a))) as proof of (((eq Prop) (not (g a))) b0)
% 53.31/53.55 Found ((eq_ref Prop) (not (g a))) as proof of (((eq Prop) (not (g a))) b0)
% 53.31/53.55 Found ((eq_ref Prop) (not (g a))) as proof of (((eq Prop) (not (g a))) b0)
% 53.31/53.55 Found eq_ref00:=(eq_ref0 ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))):(((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b))))
% 53.31/53.55 Found (eq_ref0 ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) b0)
% 53.31/53.55 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) b0)
% 53.31/53.55 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) b0)
% 53.31/53.55 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) b0)
% 61.11/61.34 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 61.11/61.34 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 61.11/61.34 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 61.11/61.34 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 61.11/61.34 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 61.11/61.34 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 61.11/61.34 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 61.11/61.34 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 61.11/61.34 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 61.11/61.34 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 61.11/61.34 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 61.11/61.34 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 61.11/61.34 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 61.11/61.34 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 61.11/61.34 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 61.11/61.34 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 61.11/61.34 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 61.11/61.34 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 61.11/61.34 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 61.11/61.34 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 61.11/61.34 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 61.11/61.34 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 61.11/61.34 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 61.11/61.34 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 61.11/61.34 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 61.11/61.34 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 61.11/61.34 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 61.11/61.34 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 61.11/61.34 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 61.11/61.34 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 61.11/61.34 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 61.11/61.34 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 61.11/61.34 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 61.11/61.34 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 61.11/61.34 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 61.11/61.34 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 61.11/61.34 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 61.11/61.34 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 61.11/61.34 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 61.11/61.34 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 61.11/61.34 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 61.11/61.34 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 61.11/61.34 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 61.11/61.34 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 61.11/61.34 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 61.11/61.34 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 61.11/61.34 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 61.11/61.34 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 61.11/61.34 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 61.11/61.34 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 61.11/61.34 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 61.11/61.34 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 61.11/61.34 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 61.11/61.34 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 61.11/61.34 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 61.11/61.34 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 61.11/61.34 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 61.11/61.34 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 61.11/61.34 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 61.11/61.34 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 61.11/61.34 Found x2:(P a)
% 61.11/61.34 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 61.11/61.34 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 61.11/61.34 Found x2:(P a)
% 61.11/61.34 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 61.11/61.34 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 61.11/61.34 Found x2:(P a)
% 61.11/61.34 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 61.11/61.34 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 61.11/61.34 Found x2:(P a)
% 61.11/61.34 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 61.11/61.34 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 61.11/61.34 Found x2:(P a)
% 61.11/61.34 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 61.11/61.34 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 61.11/61.34 Found x2:(P a)
% 61.11/61.34 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 61.11/61.34 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 61.11/61.34 Found x2:(P a)
% 61.11/61.34 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 61.11/61.34 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 61.11/61.34 Found x2:(P a)
% 61.11/61.34 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 62.59/62.84 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 62.59/62.84 Found x2:(P a)
% 62.59/62.84 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 62.59/62.84 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 62.59/62.84 Found x2:(P a)
% 62.59/62.84 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 62.59/62.84 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 62.59/62.84 Found x2:(P a)
% 62.59/62.84 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 62.59/62.84 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 62.59/62.84 Found x2:(P a)
% 62.59/62.84 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 62.59/62.84 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 62.59/62.84 Found x2:(P a)
% 62.59/62.84 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 62.59/62.84 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 62.59/62.84 Found x2:(P a)
% 62.59/62.84 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 62.59/62.84 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 62.59/62.84 Found x2:(P a)
% 62.59/62.84 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 62.59/62.84 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 62.59/62.84 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 62.59/62.84 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 62.59/62.84 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 62.59/62.84 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 62.59/62.84 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 62.59/62.84 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 62.59/62.84 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 62.59/62.84 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 62.59/62.84 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 62.59/62.84 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 62.59/62.84 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 62.59/62.84 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 62.59/62.84 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 62.59/62.84 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 62.59/62.84 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 62.59/62.84 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 62.59/62.84 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 62.59/62.84 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 62.59/62.84 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 62.59/62.84 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 62.59/62.84 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 62.59/62.84 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 62.59/62.84 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 62.59/62.84 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 62.59/62.84 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 62.59/62.84 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 62.59/62.84 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 62.59/62.84 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 62.59/62.84 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 62.59/62.84 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 62.59/62.84 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 62.59/62.84 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 62.59/62.84 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 62.59/62.84 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 62.59/62.84 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 62.59/62.84 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 62.59/62.84 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 62.59/62.84 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 62.59/62.84 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 62.59/62.84 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 62.59/62.84 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 62.59/62.84 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 62.59/62.84 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 62.59/62.84 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 62.59/62.84 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 62.59/62.84 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 62.59/62.84 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 62.59/62.84 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 62.59/62.84 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 62.59/62.84 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 62.59/62.84 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 62.59/62.84 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 62.59/62.84 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 62.59/62.84 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 62.59/62.84 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 62.59/62.84 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 62.59/62.84 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 62.59/62.84 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 62.59/62.84 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 62.59/62.84 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 62.59/62.84 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 62.59/62.84 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 62.59/62.84 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 63.44/63.68 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 63.44/63.68 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 63.44/63.68 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 63.44/63.68 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 63.44/63.68 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 63.44/63.68 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 63.44/63.68 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 63.44/63.68 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 63.44/63.68 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 63.44/63.68 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 63.44/63.68 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 63.44/63.68 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 63.44/63.68 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 63.44/63.68 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 63.44/63.68 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 63.44/63.68 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 63.44/63.68 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 63.44/63.68 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 63.44/63.68 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 63.44/63.68 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 63.44/63.68 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 63.44/63.68 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 63.44/63.68 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 63.44/63.68 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 63.44/63.68 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 63.44/63.68 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 63.44/63.68 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 63.44/63.68 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 63.44/63.68 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 63.44/63.68 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 63.44/63.68 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 63.44/63.68 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 63.44/63.68 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 63.44/63.68 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 63.44/63.68 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 63.44/63.68 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 63.44/63.68 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 63.44/63.68 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 63.44/63.68 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 63.44/63.68 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 63.44/63.68 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 63.44/63.68 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 63.44/63.68 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 63.44/63.68 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 63.44/63.68 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 63.44/63.68 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 63.44/63.68 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 63.44/63.68 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 63.44/63.68 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 63.44/63.68 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 63.44/63.68 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 63.44/63.68 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 63.44/63.68 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 63.44/63.68 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 63.44/63.68 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 63.44/63.68 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 63.44/63.68 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 63.44/63.68 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 63.44/63.68 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 63.44/63.68 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 63.44/63.68 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 63.44/63.68 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 63.44/63.68 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 63.44/63.68 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 63.44/63.68 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 63.44/63.68 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 63.44/63.68 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 63.44/63.68 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 63.44/63.68 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 63.44/63.68 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 63.44/63.68 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 63.44/63.68 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 63.44/63.68 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 63.44/63.68 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 63.44/63.68 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 63.44/63.68 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 63.44/63.68 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 70.10/70.37 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 70.10/70.37 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 70.10/70.37 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 70.10/70.37 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 70.10/70.37 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 70.10/70.37 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 70.10/70.37 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 70.10/70.37 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 70.10/70.37 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 70.10/70.37 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 70.10/70.37 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 70.10/70.37 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((g a)->False))
% 70.10/70.37 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g a)->False))
% 70.10/70.37 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g a)->False))
% 70.10/70.37 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g a)->False))
% 70.10/70.37 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 70.10/70.37 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((g a)->False))
% 70.10/70.37 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g a)->False))
% 70.10/70.37 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g a)->False))
% 70.10/70.37 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g a)->False))
% 70.10/70.37 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 70.10/70.37 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((g a)->False))
% 70.10/70.37 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g a)->False))
% 70.10/70.37 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g a)->False))
% 70.10/70.37 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g a)->False))
% 70.10/70.37 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 70.10/70.37 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 70.10/70.37 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 70.10/70.37 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 70.10/70.37 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 70.10/70.37 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 70.10/70.37 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 70.10/70.37 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 70.10/70.37 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 70.10/70.37 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 70.10/70.37 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 70.10/70.37 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 70.10/70.37 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 70.10/70.37 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 70.10/70.37 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 70.10/70.37 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 70.10/70.37 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 70.10/70.37 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 70.10/70.37 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 70.10/70.37 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 70.10/70.37 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 70.10/70.37 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 70.10/70.37 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 70.10/70.37 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 70.10/70.37 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 70.10/70.37 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 70.10/70.37 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 70.10/70.37 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 70.10/70.37 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 70.10/70.37 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 70.10/70.37 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 70.10/70.37 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 70.10/70.37 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 70.10/70.37 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 70.10/70.37 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 70.10/70.37 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 70.10/70.37 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 70.10/70.37 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 70.10/70.37 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 70.10/70.37 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 70.10/70.37 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 70.10/70.37 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 70.10/70.37 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 70.10/70.37 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 70.10/70.37 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 70.10/70.37 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 70.10/70.37 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 70.10/70.37 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 70.10/70.37 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 70.10/70.37 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 71.21/71.46 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 71.21/71.46 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 71.21/71.46 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 71.21/71.46 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 71.21/71.46 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 71.21/71.46 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 71.21/71.46 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 71.21/71.46 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 71.21/71.46 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 71.21/71.46 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 71.21/71.46 Found eq_ref00:=(eq_ref0 (((eq Prop) a) b)):(((eq Prop) (((eq Prop) a) b)) (((eq Prop) a) b))
% 71.21/71.46 Found (eq_ref0 (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 71.21/71.46 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 71.21/71.46 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 71.21/71.46 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 71.21/71.46 Found x:(P a)
% 71.21/71.46 Instantiate: b0:=a:Prop
% 71.21/71.46 Found x as proof of (P0 b0)
% 71.21/71.46 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 71.21/71.46 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 71.21/71.46 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 71.21/71.46 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 71.21/71.46 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 71.21/71.46 Found eq_ref00:=(eq_ref0 ((f b)->False)):(((eq Prop) ((f b)->False)) ((f b)->False))
% 71.21/71.46 Found (eq_ref0 ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 71.21/71.46 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 71.21/71.46 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 71.21/71.46 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 71.21/71.46 Found eq_ref00:=(eq_ref0 ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))):(((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False)))
% 71.21/71.46 Found (eq_ref0 ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) b0)
% 71.21/71.46 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) b0)
% 71.21/71.46 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) b0)
% 71.21/71.46 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) b0)
% 71.21/71.46 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 71.21/71.46 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 71.21/71.46 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 71.21/71.46 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 71.21/71.46 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 71.21/71.46 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 71.21/71.46 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 71.21/71.46 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 71.21/71.46 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 71.21/71.46 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 71.21/71.46 Found eq_ref00:=(eq_ref0 ((f b)->False)):(((eq Prop) ((f b)->False)) ((f b)->False))
% 71.21/71.46 Found (eq_ref0 ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 71.21/71.46 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 71.21/71.46 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 71.21/71.46 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 71.21/71.46 Found eq_ref00:=(eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))):(((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) ((or (((eq Prop) a) b)) ((f a)->False)))
% 71.21/71.46 Found (eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 71.38/71.66 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 71.38/71.66 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 71.38/71.66 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 71.38/71.66 Found eq_ref00:=(eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))):(((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) ((or (((eq Prop) a) b)) ((f a)->False)))
% 71.38/71.66 Found (eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 71.38/71.66 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 71.38/71.66 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 71.38/71.66 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 71.38/71.66 Found eq_ref00:=(eq_ref0 ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))):(((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False)))
% 71.38/71.66 Found (eq_ref0 ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) b0)
% 71.38/71.66 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) b0)
% 71.38/71.66 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) b0)
% 71.38/71.66 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) b0)
% 71.38/71.66 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 71.38/71.66 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 71.38/71.66 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 71.38/71.66 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 71.38/71.66 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 71.38/71.66 Found eq_ref00:=(eq_ref0 ((f b)->False)):(((eq Prop) ((f b)->False)) ((f b)->False))
% 71.38/71.66 Found (eq_ref0 ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 71.38/71.66 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 71.38/71.66 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 71.38/71.66 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 71.38/71.66 Found eq_ref00:=(eq_ref0 ((f b)->False)):(((eq Prop) ((f b)->False)) ((f b)->False))
% 71.38/71.66 Found (eq_ref0 ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 71.38/71.66 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 71.38/71.66 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 71.38/71.66 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 71.38/71.66 Found eq_ref00:=(eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))):(((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) ((or (((eq Prop) a) b)) ((f a)->False)))
% 71.38/71.66 Found (eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 71.38/71.66 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 71.38/71.66 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 71.38/71.66 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 71.38/71.66 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 71.38/71.66 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 71.38/71.66 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 72.34/72.63 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 72.34/72.63 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 72.34/72.63 Found eq_ref00:=(eq_ref0 ((f b)->False)):(((eq Prop) ((f b)->False)) ((f b)->False))
% 72.34/72.63 Found (eq_ref0 ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 72.34/72.63 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 72.34/72.63 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 72.34/72.63 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 72.34/72.63 Found eq_ref00:=(eq_ref0 ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))):(((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False)))
% 72.34/72.63 Found (eq_ref0 ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) b0)
% 72.34/72.63 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) b0)
% 72.34/72.63 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) b0)
% 72.34/72.63 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) b0)
% 72.34/72.63 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 72.34/72.63 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 72.34/72.63 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 72.34/72.63 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 72.34/72.63 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 72.34/72.63 Found eq_ref00:=(eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))):(((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) ((or (((eq Prop) a) b)) ((f a)->False)))
% 72.34/72.63 Found (eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 72.34/72.63 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 72.34/72.63 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 72.34/72.63 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 72.34/72.63 Found eq_ref00:=(eq_ref0 ((f b)->False)):(((eq Prop) ((f b)->False)) ((f b)->False))
% 72.34/72.63 Found (eq_ref0 ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 72.34/72.63 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 72.34/72.63 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 72.34/72.63 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 72.34/72.63 Found eq_ref00:=(eq_ref0 ((g a)->False)):(((eq Prop) ((g a)->False)) ((g a)->False))
% 72.34/72.63 Found (eq_ref0 ((g a)->False)) as proof of (((eq Prop) ((g a)->False)) b0)
% 72.34/72.63 Found ((eq_ref Prop) ((g a)->False)) as proof of (((eq Prop) ((g a)->False)) b0)
% 72.34/72.63 Found ((eq_ref Prop) ((g a)->False)) as proof of (((eq Prop) ((g a)->False)) b0)
% 72.34/72.63 Found ((eq_ref Prop) ((g a)->False)) as proof of (((eq Prop) ((g a)->False)) b0)
% 72.34/72.63 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 72.34/72.63 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f b)->False))
% 72.34/72.63 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 72.34/72.63 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 72.34/72.63 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 72.34/72.63 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 72.34/72.63 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f b)->False))
% 72.34/72.63 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 72.34/72.63 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 72.34/72.63 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 72.34/72.63 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 81.87/82.12 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f b)->False))
% 81.87/82.12 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 81.87/82.12 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 81.87/82.12 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 81.87/82.12 Found x2:(P a)
% 81.87/82.12 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 81.87/82.12 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 81.87/82.12 Found x2:(P a)
% 81.87/82.12 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 81.87/82.12 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 81.87/82.12 Found x2:(P a)
% 81.87/82.12 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 81.87/82.12 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 81.87/82.12 Found x2:(P a)
% 81.87/82.12 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 81.87/82.12 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 81.87/82.12 Found x2:(P a)
% 81.87/82.12 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 81.87/82.12 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 81.87/82.12 Found x2:(P a)
% 81.87/82.12 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 81.87/82.12 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 81.87/82.12 Found x2:(P a)
% 81.87/82.12 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 81.87/82.12 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 81.87/82.12 Found x2:(P a)
% 81.87/82.12 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 81.87/82.12 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 81.87/82.12 Found x2:(P a)
% 81.87/82.12 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 81.87/82.12 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 81.87/82.12 Found x2:(P a)
% 81.87/82.12 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 81.87/82.12 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 81.87/82.12 Found x2:(P a)
% 81.87/82.12 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 81.87/82.12 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 81.87/82.12 Found x2:(P a)
% 81.87/82.12 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 81.87/82.12 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 81.87/82.12 Found x2:(P a)
% 81.87/82.12 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 81.87/82.12 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 81.87/82.12 Found x2:(P a)
% 81.87/82.12 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 81.87/82.12 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 81.87/82.12 Found x2:(P a)
% 81.87/82.12 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 81.87/82.12 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 81.87/82.12 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 81.87/82.12 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((g b)->False))
% 81.87/82.12 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g b)->False))
% 81.87/82.12 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g b)->False))
% 81.87/82.12 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g b)->False))
% 81.87/82.12 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 81.87/82.12 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((p f)->False))
% 81.87/82.12 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((p f)->False))
% 81.87/82.12 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((p f)->False))
% 81.87/82.12 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((p f)->False))
% 81.87/82.12 Found classic0:=(classic (p g)):((or (p g)) (not (p g)))
% 81.87/82.12 Found (classic (p g)) as proof of ((or (p g)) b0)
% 81.87/82.12 Found (classic (p g)) as proof of ((or (p g)) b0)
% 81.87/82.12 Found (classic (p g)) as proof of ((or (p g)) b0)
% 81.87/82.12 Found (classic (p g)) as proof of (P b0)
% 81.87/82.12 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 81.87/82.12 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((g b)->False))
% 81.87/82.12 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g b)->False))
% 81.87/82.12 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g b)->False))
% 81.87/82.12 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g b)->False))
% 81.87/82.12 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 81.87/82.12 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((g b)->False))
% 81.87/82.12 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g b)->False))
% 81.87/82.12 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g b)->False))
% 81.87/82.12 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g b)->False))
% 81.87/82.12 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 81.87/82.12 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((p f)->False))
% 81.87/82.12 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((p f)->False))
% 81.87/82.12 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((p f)->False))
% 81.87/82.12 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((p f)->False))
% 81.87/82.12 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 81.87/82.12 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((p f)->False))
% 81.87/82.12 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((p f)->False))
% 81.87/82.12 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((p f)->False))
% 81.87/82.12 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((p f)->False))
% 81.87/82.12 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 83.59/83.85 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 83.59/83.85 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 83.59/83.85 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 83.59/83.85 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 83.59/83.85 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 83.59/83.85 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 83.59/83.85 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 83.59/83.85 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 83.59/83.85 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 83.59/83.85 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 83.59/83.85 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 83.59/83.85 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 83.59/83.85 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 83.59/83.85 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 83.59/83.85 Found eq_ref00:=(eq_ref0 (((eq Prop) a) b)):(((eq Prop) (((eq Prop) a) b)) (((eq Prop) a) b))
% 83.59/83.85 Found (eq_ref0 (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 83.59/83.85 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 83.59/83.85 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 83.59/83.85 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 83.59/83.85 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 83.59/83.85 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 83.59/83.85 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 83.59/83.85 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 83.59/83.85 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 83.59/83.85 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 83.59/83.85 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 83.59/83.85 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 83.59/83.85 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 83.59/83.85 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 83.59/83.85 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 83.59/83.85 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 83.59/83.85 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 83.59/83.85 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 83.59/83.85 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 83.59/83.85 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 83.59/83.85 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 83.59/83.85 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 83.59/83.85 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 83.59/83.85 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 83.59/83.85 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 83.59/83.85 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 83.59/83.85 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 83.59/83.85 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 83.59/83.85 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 83.59/83.85 Found x:(P a)
% 83.59/83.85 Instantiate: b0:=a:Prop
% 83.59/83.85 Found x as proof of (P0 b0)
% 83.59/83.85 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 83.59/83.85 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 83.59/83.85 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 83.59/83.85 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 83.59/83.85 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 83.59/83.85 Found eq_ref00:=(eq_ref0 (not (f b))):(((eq Prop) (not (f b))) (not (f b)))
% 83.59/83.85 Found (eq_ref0 (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 83.59/83.85 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 83.59/83.85 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 83.59/83.85 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 83.59/83.85 Found eq_ref00:=(eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))):(((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) ((or (((eq Prop) a) b)) ((f a)->False)))
% 83.85/84.10 Found (eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 83.85/84.10 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 83.85/84.10 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 83.85/84.10 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 83.85/84.10 Found eq_ref00:=(eq_ref0 (not (f b))):(((eq Prop) (not (f b))) (not (f b)))
% 83.85/84.10 Found (eq_ref0 (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 83.85/84.10 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 83.85/84.10 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 83.85/84.10 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 83.85/84.10 Found eq_ref00:=(eq_ref0 (not (f b))):(((eq Prop) (not (f b))) (not (f b)))
% 83.85/84.10 Found (eq_ref0 (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 83.85/84.10 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 83.85/84.10 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 83.85/84.10 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 83.85/84.10 Found eq_ref00:=(eq_ref0 (not (f b))):(((eq Prop) (not (f b))) (not (f b)))
% 83.85/84.10 Found (eq_ref0 (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 83.85/84.10 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 83.85/84.10 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 83.85/84.10 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 83.85/84.10 Found eq_ref00:=(eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))):(((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) ((or (((eq Prop) a) b)) ((f a)->False)))
% 83.85/84.10 Found (eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 83.85/84.10 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 83.85/84.10 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 83.85/84.10 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 83.85/84.10 Found eq_ref00:=(eq_ref0 (not (f b))):(((eq Prop) (not (f b))) (not (f b)))
% 83.85/84.10 Found (eq_ref0 (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 83.85/84.10 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 83.85/84.10 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 83.85/84.10 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 83.85/84.10 Found eq_ref00:=(eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))):(((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) ((or (((eq Prop) a) b)) ((f a)->False)))
% 83.85/84.10 Found (eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 83.85/84.10 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 83.85/84.10 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 83.85/84.10 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 83.85/84.10 Found eq_ref00:=(eq_ref0 ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))):(((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b))))
% 83.85/84.10 Found (eq_ref0 ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) b0)
% 83.85/84.10 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) b0)
% 83.85/84.10 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) b0)
% 84.96/85.26 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) b0)
% 84.96/85.26 Found eq_ref00:=(eq_ref0 (not (g a))):(((eq Prop) (not (g a))) (not (g a)))
% 84.96/85.26 Found (eq_ref0 (not (g a))) as proof of (((eq Prop) (not (g a))) b0)
% 84.96/85.26 Found ((eq_ref Prop) (not (g a))) as proof of (((eq Prop) (not (g a))) b0)
% 84.96/85.26 Found ((eq_ref Prop) (not (g a))) as proof of (((eq Prop) (not (g a))) b0)
% 84.96/85.26 Found ((eq_ref Prop) (not (g a))) as proof of (((eq Prop) (not (g a))) b0)
% 84.96/85.26 Found eq_ref00:=(eq_ref0 ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))):(((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b))))
% 84.96/85.26 Found (eq_ref0 ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) b0)
% 84.96/85.26 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) b0)
% 84.96/85.26 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) b0)
% 84.96/85.26 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) b0)
% 84.96/85.26 Found eq_ref00:=(eq_ref0 ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))):(((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b))))
% 84.96/85.26 Found (eq_ref0 ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) b0)
% 84.96/85.26 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) b0)
% 84.96/85.26 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) b0)
% 84.96/85.26 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) b0)
% 84.96/85.26 Found eq_ref00:=(eq_ref0 (not (f b))):(((eq Prop) (not (f b))) (not (f b)))
% 84.96/85.26 Found (eq_ref0 (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 84.96/85.26 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 84.96/85.26 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 84.96/85.26 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 84.96/85.26 Found eq_ref00:=(eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))):(((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) ((or (((eq Prop) a) b)) ((f a)->False)))
% 84.96/85.26 Found (eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 84.96/85.26 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 84.96/85.26 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 84.96/85.26 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 84.96/85.26 Found classic0:=(classic (p g)):((or (p g)) (not (p g)))
% 84.96/85.26 Found (classic (p g)) as proof of ((or (p g)) b0)
% 84.96/85.26 Found (classic (p g)) as proof of ((or (p g)) b0)
% 84.96/85.26 Found (classic (p g)) as proof of ((or (p g)) b0)
% 84.96/85.26 Found (classic (p g)) as proof of (P b0)
% 84.96/85.26 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 84.96/85.26 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 84.96/85.26 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 84.96/85.26 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 84.96/85.26 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 84.96/85.26 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 84.96/85.26 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 90.08/90.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 90.08/90.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 90.08/90.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 90.08/90.33 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 90.08/90.33 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 90.08/90.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 90.08/90.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 90.08/90.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 90.08/90.33 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 90.08/90.33 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 90.08/90.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 90.08/90.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 90.08/90.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 90.08/90.33 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 90.08/90.33 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 90.08/90.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 90.08/90.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 90.08/90.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 90.08/90.33 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 90.08/90.33 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 90.08/90.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 90.08/90.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 90.08/90.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 90.08/90.33 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 90.08/90.33 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 90.08/90.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 90.08/90.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 90.08/90.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 90.08/90.33 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 90.08/90.33 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 90.08/90.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 90.08/90.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 90.08/90.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 90.08/90.33 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 90.08/90.33 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 90.08/90.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 90.08/90.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 90.08/90.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 90.08/90.33 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 90.08/90.33 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 90.08/90.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 90.08/90.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 90.08/90.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 90.08/90.33 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 90.08/90.33 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 90.08/90.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 90.08/90.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 90.08/90.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 90.08/90.33 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 90.08/90.33 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 90.08/90.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 90.08/90.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 90.08/90.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 90.08/90.33 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 90.08/90.33 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 90.08/90.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 90.08/90.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 90.08/90.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 90.08/90.33 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 90.08/90.33 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 90.08/90.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 90.08/90.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 90.08/90.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 90.08/90.33 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 90.08/90.33 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 90.08/90.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 90.08/90.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 90.08/90.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 90.08/90.33 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 90.08/90.33 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 90.08/90.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 90.08/90.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 90.08/90.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 90.08/90.33 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 90.08/90.33 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 90.08/90.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 90.08/90.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 90.08/90.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 91.28/91.60 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 91.28/91.60 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 91.28/91.60 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 91.28/91.60 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 91.28/91.60 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 91.28/91.60 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 91.28/91.60 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 91.28/91.60 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 91.28/91.60 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 91.28/91.60 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 91.28/91.60 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 91.28/91.60 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 91.28/91.60 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 91.28/91.60 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 91.28/91.60 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 91.28/91.60 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 91.28/91.60 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 91.28/91.60 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 91.28/91.60 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 91.28/91.60 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 91.28/91.60 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 91.28/91.60 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 91.28/91.60 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 91.28/91.60 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 91.28/91.60 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 91.28/91.60 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 91.28/91.60 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 91.28/91.60 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 91.28/91.60 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 91.28/91.60 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 91.28/91.60 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 91.28/91.60 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 91.28/91.60 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 91.28/91.60 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 91.28/91.60 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 91.28/91.60 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 91.28/91.60 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 91.28/91.60 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 91.28/91.60 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 91.28/91.60 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 91.28/91.60 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 91.28/91.60 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 91.28/91.60 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 91.28/91.60 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 91.28/91.60 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 91.28/91.60 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 91.28/91.60 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 91.28/91.60 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 91.28/91.60 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 91.28/91.60 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 91.28/91.60 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 91.28/91.60 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 91.28/91.60 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 91.28/91.60 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 91.28/91.60 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 91.28/91.60 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 91.28/91.60 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 91.28/91.60 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 91.28/91.60 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 91.28/91.60 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 91.28/91.60 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 91.28/91.60 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 91.28/91.60 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 91.28/91.60 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 91.28/91.60 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 91.28/91.60 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 91.28/91.60 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 91.28/91.60 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 91.28/91.60 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 91.28/91.60 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 91.28/91.60 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 91.28/91.60 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 91.28/91.60 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 91.28/91.60 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 91.28/91.60 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 91.28/91.60 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 91.28/91.60 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 91.28/91.60 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 93.00/93.26 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 93.00/93.26 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 93.00/93.26 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 93.00/93.26 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 93.00/93.26 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 93.00/93.26 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 93.00/93.26 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 93.00/93.26 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 93.00/93.26 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 93.00/93.26 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 93.00/93.26 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 93.00/93.26 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 93.00/93.26 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 93.00/93.26 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 93.00/93.26 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 93.00/93.26 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 93.00/93.26 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 93.00/93.26 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 93.00/93.26 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 93.00/93.26 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 93.00/93.26 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 93.00/93.26 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 93.00/93.26 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 93.00/93.26 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 93.00/93.26 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 93.00/93.26 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 93.00/93.26 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 93.00/93.26 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 93.00/93.26 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 93.00/93.26 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 93.00/93.26 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 93.00/93.26 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 93.00/93.26 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 93.00/93.26 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 93.00/93.26 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 93.00/93.26 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 93.00/93.26 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 93.00/93.26 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 93.00/93.26 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 93.00/93.26 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 93.00/93.26 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 93.00/93.26 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 93.00/93.26 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 93.00/93.26 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 93.00/93.26 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 93.00/93.26 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 93.00/93.26 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 93.00/93.26 Found classic0:=(classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))):((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) (not ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))))
% 93.00/93.26 Found (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)
% 93.00/93.26 Found (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)
% 93.00/93.26 Found (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)
% 93.00/93.26 Found (or_intror00 (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False)))) as proof of (P ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0))
% 93.00/93.26 Found ((or_intror0 ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)) (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False)))) as proof of (P ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0))
% 93.00/93.26 Found (((or_intror ((g b)->False)) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)) (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False)))) as proof of (P ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0))
% 93.00/93.26 Found (((or_intror ((g b)->False)) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)) (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False)))) as proof of (P ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0))
% 95.98/96.29 Found classic0:=(classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))):((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) (not ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))))
% 95.98/96.29 Found (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)
% 95.98/96.29 Found (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)
% 95.98/96.29 Found (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)
% 95.98/96.29 Found (or_intror00 (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False)))) as proof of (P ((or ((g b)->False)) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)))
% 95.98/96.29 Found ((or_intror0 ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)) (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False)))) as proof of (P ((or ((g b)->False)) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)))
% 95.98/96.29 Found (((or_intror ((g b)->False)) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)) (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False)))) as proof of (P ((or ((g b)->False)) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)))
% 95.98/96.29 Found (((or_intror ((g b)->False)) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)) (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False)))) as proof of (P ((or ((g b)->False)) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)))
% 95.98/96.29 Found classic0:=(classic ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))):((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) (not ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))))
% 95.98/96.29 Found (classic ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) as proof of ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) a0)
% 95.98/96.29 Found (classic ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) as proof of ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) a0)
% 95.98/96.29 Found (classic ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) as proof of ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) a0)
% 95.98/96.29 Found (or_intror00 (classic ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False)))) as proof of (P ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) a0))
% 95.98/96.29 Found ((or_intror0 ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) a0)) (classic ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False)))) as proof of (P ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) a0))
% 95.98/96.29 Found (((or_intror (p g)) ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) a0)) (classic ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False)))) as proof of (P ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) a0))
% 95.98/96.29 Found (((or_intror (p g)) ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) a0)) (classic ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False)))) as proof of (P ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) a0))
% 97.41/97.68 Found classic0:=(classic ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))):((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) (not ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))))
% 97.41/97.68 Found (classic ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) as proof of ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) a0)
% 97.41/97.68 Found (classic ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) as proof of ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) a0)
% 97.41/97.68 Found (classic ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) as proof of ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) a0)
% 97.41/97.68 Found (or_intror00 (classic ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False)))) as proof of (P ((or (p g)) ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) a0)))
% 97.41/97.68 Found ((or_intror0 ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) a0)) (classic ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False)))) as proof of (P ((or (p g)) ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) a0)))
% 97.41/97.68 Found (((or_intror (p g)) ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) a0)) (classic ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False)))) as proof of (P ((or (p g)) ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) a0)))
% 97.41/97.68 Found (((or_intror (p g)) ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) a0)) (classic ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False)))) as proof of (P ((or (p g)) ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) a0)))
% 97.41/97.68 Found classic0:=(classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))):((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) (not ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))))
% 97.41/97.68 Found (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) as proof of ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) a0)
% 97.41/97.68 Found (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) as proof of ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) a0)
% 97.41/97.68 Found (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) as proof of ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) a0)
% 97.41/97.68 Found (or_intror00 (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False)))) as proof of (P ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) a0))
% 97.41/97.68 Found ((or_intror0 ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) a0)) (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False)))) as proof of (P ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) a0))
% 98.48/98.77 Found (((or_intror ((p f)->False)) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) a0)) (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False)))) as proof of (P ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) a0))
% 98.48/98.77 Found (((or_intror ((p f)->False)) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) a0)) (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False)))) as proof of (P ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) a0))
% 98.48/98.77 Found classic0:=(classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))):((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) (not ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))))
% 98.48/98.77 Found (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) as proof of ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) a0)
% 98.48/98.77 Found (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) as proof of ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) a0)
% 98.48/98.77 Found (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) as proof of ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) a0)
% 98.48/98.77 Found (or_intror00 (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False)))) as proof of (P ((or ((p f)->False)) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) a0)))
% 98.48/98.77 Found ((or_intror0 ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) a0)) (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False)))) as proof of (P ((or ((p f)->False)) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) a0)))
% 98.48/98.77 Found (((or_intror ((p f)->False)) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) a0)) (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False)))) as proof of (P ((or ((p f)->False)) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) a0)))
% 98.48/98.77 Found (((or_intror ((p f)->False)) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) a0)) (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False)))) as proof of (P ((or ((p f)->False)) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) a0)))
% 98.48/98.77 Found classic0:=(classic ((or (((eq Prop) a) b)) ((f a)->False))):((or ((or (((eq Prop) a) b)) ((f a)->False))) (not ((or (((eq Prop) a) b)) ((f a)->False))))
% 98.48/98.77 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 98.48/98.77 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 98.48/98.77 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 98.48/98.77 Found (or_intror00 (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 98.48/98.77 Found ((or_intror0 ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 98.48/98.77 Found (((or_intror ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 103.60/103.86 Found (((or_intror ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 103.60/103.86 Found classic0:=(classic ((or (((eq Prop) a) b)) ((f a)->False))):((or ((or (((eq Prop) a) b)) ((f a)->False))) (not ((or (((eq Prop) a) b)) ((f a)->False))))
% 103.60/103.86 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 103.60/103.86 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 103.60/103.86 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 103.60/103.86 Found (or_intror00 (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 103.60/103.86 Found ((or_intror0 ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 103.60/103.86 Found (((or_intror ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 103.60/103.86 Found (((or_intror ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 103.60/103.86 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 103.60/103.86 Found (eq_ref0 a0) as proof of (((eq Prop) a0) b0)
% 103.60/103.86 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 103.60/103.86 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 103.60/103.86 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 103.60/103.86 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 103.60/103.86 Found (eq_ref0 b0) as proof of (((eq Prop) b0) (p g))
% 103.60/103.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (p g))
% 103.60/103.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (p g))
% 103.60/103.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (p g))
% 103.60/103.86 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 103.60/103.86 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 103.60/103.86 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 103.60/103.86 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 103.60/103.86 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 103.60/103.86 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 103.60/103.86 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 103.60/103.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 103.60/103.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 103.60/103.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 103.60/103.86 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 103.60/103.86 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 103.60/103.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 103.60/103.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 103.60/103.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 103.60/103.86 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 103.60/103.86 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 103.60/103.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 103.60/103.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 103.60/103.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 103.60/103.86 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 103.60/103.86 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 103.60/103.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 103.60/103.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 103.60/103.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 103.60/103.86 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 103.60/103.86 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 103.60/103.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 103.60/103.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 103.60/103.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 103.60/103.86 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 103.60/103.86 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 103.60/103.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 103.60/103.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 103.60/103.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 103.60/103.86 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 103.60/103.86 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 105.56/105.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 105.56/105.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 105.56/105.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 105.56/105.86 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 105.56/105.86 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 105.56/105.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 105.56/105.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 105.56/105.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 105.56/105.86 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 105.56/105.86 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 105.56/105.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 105.56/105.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 105.56/105.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 105.56/105.86 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 105.56/105.86 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 105.56/105.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 105.56/105.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 105.56/105.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 105.56/105.86 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 105.56/105.86 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 105.56/105.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 105.56/105.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 105.56/105.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 105.56/105.86 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 105.56/105.86 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 105.56/105.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 105.56/105.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 105.56/105.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 105.56/105.86 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 105.56/105.86 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 105.56/105.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 105.56/105.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 105.56/105.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 105.56/105.86 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 105.56/105.86 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 105.56/105.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 105.56/105.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 105.56/105.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 105.56/105.86 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 105.56/105.86 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 105.56/105.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 105.56/105.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 105.56/105.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 105.56/105.86 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 105.56/105.86 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 105.56/105.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 105.56/105.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 105.56/105.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 105.56/105.86 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 105.56/105.86 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 105.56/105.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 105.56/105.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 105.56/105.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 105.56/105.86 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 105.56/105.86 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 105.56/105.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 105.56/105.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 105.56/105.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 105.56/105.86 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 105.56/105.86 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 105.56/105.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 105.56/105.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 105.56/105.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 105.56/105.86 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 105.56/105.86 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 105.56/105.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 105.56/105.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 105.56/105.86 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 105.56/105.86 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 105.56/105.86 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 105.56/105.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 105.56/105.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 105.56/105.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 105.56/105.86 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 105.56/105.86 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 105.56/105.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 105.56/105.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 108.43/108.69 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 108.43/108.69 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 108.43/108.69 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 108.43/108.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 108.43/108.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 108.43/108.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 108.43/108.69 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 108.43/108.69 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 108.43/108.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 108.43/108.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 108.43/108.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 108.43/108.69 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 108.43/108.69 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 108.43/108.69 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 108.43/108.69 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 108.43/108.69 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 108.43/108.69 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 108.43/108.69 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 108.43/108.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 108.43/108.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 108.43/108.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 108.43/108.69 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 108.43/108.69 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 108.43/108.69 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 108.43/108.69 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 108.43/108.69 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 108.43/108.69 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 108.43/108.69 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 108.43/108.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 108.43/108.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 108.43/108.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 108.43/108.69 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 108.43/108.69 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 108.43/108.69 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 108.43/108.69 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 108.43/108.69 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 108.43/108.69 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 108.43/108.69 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 108.43/108.69 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 108.43/108.69 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 108.43/108.69 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 108.43/108.69 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 108.43/108.69 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 108.43/108.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 108.43/108.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 108.43/108.69 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 108.43/108.69 Found x3:(P a)
% 108.43/108.69 Found (fun (x3:(P a))=> x3) as proof of (P a)
% 108.43/108.69 Found (fun (x3:(P a))=> x3) as proof of (P0 a)
% 108.43/108.69 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 108.43/108.69 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 108.43/108.69 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 108.43/108.69 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 108.43/108.69 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 108.43/108.69 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 108.43/108.69 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 108.43/108.69 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 108.43/108.69 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 108.43/108.69 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 108.43/108.69 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 108.43/108.69 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((g a)->False))
% 108.43/108.69 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g a)->False))
% 108.43/108.69 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g a)->False))
% 108.43/108.69 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g a)->False))
% 108.43/108.69 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 108.43/108.69 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((g a)->False))
% 108.43/108.69 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g a)->False))
% 108.43/108.69 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g a)->False))
% 108.43/108.69 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g a)->False))
% 108.43/108.69 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 108.43/108.69 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((g a)->False))
% 108.43/108.69 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g a)->False))
% 108.43/108.69 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g a)->False))
% 108.43/108.69 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g a)->False))
% 108.43/108.69 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 108.43/108.69 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((g a)->False))
% 112.36/112.70 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g a)->False))
% 112.36/112.70 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g a)->False))
% 112.36/112.70 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g a)->False))
% 112.36/112.70 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 112.36/112.70 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((g a)->False))
% 112.36/112.70 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g a)->False))
% 112.36/112.70 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g a)->False))
% 112.36/112.70 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g a)->False))
% 112.36/112.70 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 112.36/112.70 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((g a)->False))
% 112.36/112.70 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g a)->False))
% 112.36/112.70 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g a)->False))
% 112.36/112.70 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g a)->False))
% 112.36/112.70 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 112.36/112.70 Found (eq_ref0 a0) as proof of (((eq Prop) a0) (not (f b)))
% 112.36/112.70 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 112.36/112.70 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 112.36/112.70 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 112.36/112.70 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 112.36/112.70 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 112.36/112.70 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 112.36/112.70 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 112.36/112.70 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 112.36/112.70 Found x:(P0 b0)
% 112.36/112.70 Instantiate: b0:=a:Prop
% 112.36/112.70 Found (fun (x:(P0 b0))=> x) as proof of (P0 a)
% 112.36/112.70 Found (fun (P0:(Prop->Prop)) (x:(P0 b0))=> x) as proof of ((P0 b0)->(P0 a))
% 112.36/112.70 Found (fun (P0:(Prop->Prop)) (x:(P0 b0))=> x) as proof of (P b0)
% 112.36/112.70 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 112.36/112.70 Found (eq_ref0 a0) as proof of (((eq Prop) a0) (not (f b)))
% 112.36/112.70 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 112.36/112.70 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 112.36/112.70 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 112.36/112.70 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 112.36/112.70 Found (eq_ref0 a0) as proof of (((eq Prop) a0) (not (f b)))
% 112.36/112.70 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 112.36/112.70 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 112.36/112.70 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 112.36/112.70 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 112.36/112.70 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 112.36/112.70 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 112.36/112.70 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 112.36/112.70 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 112.36/112.70 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 112.36/112.70 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 112.36/112.70 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 112.36/112.70 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 112.36/112.70 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 112.36/112.70 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 112.36/112.70 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 112.36/112.70 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 112.36/112.70 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 112.36/112.70 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 112.36/112.70 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 112.36/112.70 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((g b)->False))
% 112.36/112.70 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g b)->False))
% 112.36/112.70 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g b)->False))
% 112.36/112.70 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g b)->False))
% 112.36/112.70 Found x2:(P a)
% 112.36/112.70 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 112.36/112.70 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 112.36/112.70 Found x2:(P a)
% 112.36/112.70 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 112.36/112.70 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 112.36/112.70 Found x2:(P a)
% 112.36/112.70 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 112.36/112.70 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 112.36/112.70 Found x2:(P a)
% 112.36/112.70 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 112.36/112.70 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 112.36/112.70 Found x2:(P a)
% 112.36/112.70 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 112.36/112.70 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 113.95/114.24 Found x2:(P a)
% 113.95/114.24 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 113.95/114.24 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 113.95/114.24 Found x2:(P a)
% 113.95/114.24 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 113.95/114.24 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 113.95/114.24 Found x2:(P a)
% 113.95/114.24 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 113.95/114.24 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 113.95/114.24 Found x2:(P a)
% 113.95/114.24 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 113.95/114.24 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 113.95/114.24 Found x2:(P a)
% 113.95/114.24 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 113.95/114.24 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 113.95/114.24 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 113.95/114.24 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((g b)->False))
% 113.95/114.24 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g b)->False))
% 113.95/114.24 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g b)->False))
% 113.95/114.24 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g b)->False))
% 113.95/114.24 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 113.95/114.24 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((g b)->False))
% 113.95/114.24 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g b)->False))
% 113.95/114.24 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g b)->False))
% 113.95/114.24 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g b)->False))
% 113.95/114.24 Found x2:(P a)
% 113.95/114.24 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 113.95/114.24 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 113.95/114.24 Found x2:(P a)
% 113.95/114.24 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 113.95/114.24 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 113.95/114.24 Found x2:(P a)
% 113.95/114.24 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 113.95/114.24 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 113.95/114.24 Found x2:(P a)
% 113.95/114.24 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 113.95/114.24 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 113.95/114.24 Found x2:(P a)
% 113.95/114.24 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 113.95/114.24 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 113.95/114.24 Found x2:(P a)
% 113.95/114.24 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 113.95/114.24 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 113.95/114.24 Found x2:(P a)
% 113.95/114.24 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 113.95/114.24 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 113.95/114.24 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 113.95/114.24 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 113.95/114.24 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 113.95/114.24 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 113.95/114.24 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 113.95/114.24 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 113.95/114.24 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 113.95/114.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 113.95/114.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 113.95/114.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 113.95/114.24 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 113.95/114.24 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 113.95/114.24 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 113.95/114.24 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 113.95/114.24 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 113.95/114.24 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 113.95/114.24 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 113.95/114.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 113.95/114.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 113.95/114.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 113.95/114.24 Found x2:(P a)
% 113.95/114.24 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 113.95/114.24 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 113.95/114.24 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 113.95/114.24 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 113.95/114.24 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 113.95/114.24 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 113.95/114.24 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 113.95/114.24 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 113.95/114.24 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 113.95/114.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 113.95/114.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 113.95/114.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 113.95/114.24 Found x2:(P a)
% 113.95/114.24 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 113.95/114.24 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 113.95/114.24 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 113.95/114.24 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 113.95/114.24 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 113.95/114.24 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 113.95/114.24 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 113.95/114.24 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 113.95/114.24 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 114.92/115.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 114.92/115.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 114.92/115.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 114.92/115.24 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 114.92/115.24 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 114.92/115.24 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 114.92/115.24 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 114.92/115.24 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 114.92/115.24 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 114.92/115.24 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 114.92/115.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 114.92/115.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 114.92/115.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 114.92/115.24 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 114.92/115.24 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 114.92/115.24 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 114.92/115.24 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 114.92/115.24 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 114.92/115.24 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 114.92/115.24 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 114.92/115.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 114.92/115.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 114.92/115.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 114.92/115.24 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 114.92/115.24 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 114.92/115.24 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 114.92/115.24 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 114.92/115.24 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 114.92/115.24 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 114.92/115.24 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 114.92/115.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 114.92/115.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 114.92/115.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 114.92/115.24 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 114.92/115.24 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 114.92/115.24 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 114.92/115.24 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 114.92/115.24 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 114.92/115.24 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 114.92/115.24 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 114.92/115.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 114.92/115.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 114.92/115.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 114.92/115.24 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 114.92/115.24 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 114.92/115.24 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 114.92/115.24 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 114.92/115.24 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 114.92/115.24 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 114.92/115.24 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 114.92/115.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 114.92/115.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 114.92/115.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 114.92/115.24 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 114.92/115.24 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 114.92/115.24 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 114.92/115.24 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 114.92/115.24 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 114.92/115.24 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 114.92/115.24 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 114.92/115.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 114.92/115.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 114.92/115.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 114.92/115.24 Found x2:(P a)
% 114.92/115.24 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 114.92/115.24 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 114.92/115.24 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 114.92/115.24 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 114.92/115.24 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 114.92/115.24 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 114.92/115.24 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 114.92/115.24 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 114.92/115.24 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 114.92/115.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 114.92/115.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 114.92/115.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 114.92/115.24 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 114.92/115.24 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 114.92/115.24 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 115.83/116.14 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 115.83/116.14 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 115.83/116.14 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 115.83/116.14 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 115.83/116.14 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 115.83/116.14 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 115.83/116.14 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 115.83/116.14 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 115.83/116.14 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 115.83/116.14 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 115.83/116.14 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 115.83/116.14 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 115.83/116.14 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 115.83/116.14 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 115.83/116.14 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 115.83/116.14 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 115.83/116.14 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 115.83/116.14 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 115.83/116.14 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 115.83/116.14 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 115.83/116.14 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 115.83/116.14 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 115.83/116.14 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 115.83/116.14 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 115.83/116.14 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 115.83/116.14 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 115.83/116.14 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 115.83/116.14 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 115.83/116.14 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 115.83/116.14 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 115.83/116.14 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 115.83/116.14 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 115.83/116.14 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 115.83/116.14 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 115.83/116.14 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 115.83/116.14 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 115.83/116.14 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 115.83/116.14 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 115.83/116.14 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 115.83/116.14 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 115.83/116.14 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 115.83/116.14 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 115.83/116.14 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 115.83/116.14 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 115.83/116.14 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 115.83/116.14 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 115.83/116.14 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 115.83/116.14 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 115.83/116.14 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 115.83/116.14 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 115.83/116.14 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 115.83/116.14 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 115.83/116.14 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 115.83/116.14 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 115.83/116.14 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 115.83/116.14 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 115.83/116.14 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 115.83/116.14 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 115.83/116.14 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 115.83/116.14 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 115.83/116.14 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 115.83/116.14 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 115.83/116.14 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 115.83/116.14 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 115.83/116.14 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 115.83/116.14 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 115.83/116.14 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 115.83/116.14 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 115.83/116.14 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 115.83/116.14 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 115.83/116.14 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 115.83/116.14 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 115.83/116.14 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 115.83/116.14 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 115.83/116.14 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 115.83/116.14 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 115.83/116.14 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 115.83/116.14 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 118.54/118.81 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 118.54/118.81 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 118.54/118.81 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 118.54/118.81 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 118.54/118.81 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 118.54/118.81 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 118.54/118.81 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 118.54/118.81 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 118.54/118.81 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 118.54/118.81 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 118.54/118.81 Found (eq_ref0 a0) as proof of (((eq Prop) a0) b0)
% 118.54/118.81 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 118.54/118.81 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 118.54/118.81 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 118.54/118.81 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 118.54/118.81 Found (eq_ref0 b0) as proof of (((eq Prop) b0) (p g))
% 118.54/118.81 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (p g))
% 118.54/118.81 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (p g))
% 118.54/118.81 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (p g))
% 118.54/118.81 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 118.54/118.81 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f b)->False))
% 118.54/118.81 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 118.54/118.81 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 118.54/118.81 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 118.54/118.81 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 118.54/118.81 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f b)->False))
% 118.54/118.81 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 118.54/118.81 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 118.54/118.81 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 118.54/118.81 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 118.54/118.81 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f b)->False))
% 118.54/118.81 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 118.54/118.81 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 118.54/118.81 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 118.54/118.81 Found eq_ref00:=(eq_ref0 a0):(((eq (Prop->Prop)) a0) a0)
% 118.54/118.81 Found (eq_ref0 a0) as proof of (((eq (Prop->Prop)) a0) g)
% 118.54/118.81 Found ((eq_ref (Prop->Prop)) a0) as proof of (((eq (Prop->Prop)) a0) g)
% 118.54/118.81 Found ((eq_ref (Prop->Prop)) a0) as proof of (((eq (Prop->Prop)) a0) g)
% 118.54/118.81 Found ((eq_ref (Prop->Prop)) a0) as proof of (((eq (Prop->Prop)) a0) g)
% 118.54/118.81 Found classic0:=(classic ((p f)->False)):((or ((p f)->False)) (not ((p f)->False)))
% 118.54/118.81 Found (classic ((p f)->False)) as proof of ((or ((p f)->False)) b0)
% 118.54/118.81 Found (classic ((p f)->False)) as proof of ((or ((p f)->False)) b0)
% 118.54/118.81 Found (classic ((p f)->False)) as proof of ((or ((p f)->False)) b0)
% 118.54/118.81 Found (classic ((p f)->False)) as proof of (P b0)
% 118.54/118.81 Found eq_ref00:=(eq_ref0 a0):(((eq (Prop->Prop)) a0) a0)
% 118.54/118.81 Found (eq_ref0 a0) as proof of (((eq (Prop->Prop)) a0) g)
% 118.54/118.81 Found ((eq_ref (Prop->Prop)) a0) as proof of (((eq (Prop->Prop)) a0) g)
% 118.54/118.81 Found ((eq_ref (Prop->Prop)) a0) as proof of (((eq (Prop->Prop)) a0) g)
% 118.54/118.81 Found ((eq_ref (Prop->Prop)) a0) as proof of (((eq (Prop->Prop)) a0) g)
% 118.54/118.81 Found eq_ref00:=(eq_ref0 a0):(((eq (Prop->Prop)) a0) a0)
% 118.54/118.81 Found (eq_ref0 a0) as proof of (((eq (Prop->Prop)) a0) g)
% 118.54/118.81 Found ((eq_ref (Prop->Prop)) a0) as proof of (((eq (Prop->Prop)) a0) g)
% 118.54/118.81 Found ((eq_ref (Prop->Prop)) a0) as proof of (((eq (Prop->Prop)) a0) g)
% 118.54/118.81 Found ((eq_ref (Prop->Prop)) a0) as proof of (((eq (Prop->Prop)) a0) g)
% 118.54/118.81 Found eq_ref00:=(eq_ref0 a0):(((eq (Prop->Prop)) a0) a0)
% 118.54/118.81 Found (eq_ref0 a0) as proof of (((eq (Prop->Prop)) a0) g)
% 118.54/118.81 Found ((eq_ref (Prop->Prop)) a0) as proof of (((eq (Prop->Prop)) a0) g)
% 118.54/118.81 Found ((eq_ref (Prop->Prop)) a0) as proof of (((eq (Prop->Prop)) a0) g)
% 118.54/118.81 Found ((eq_ref (Prop->Prop)) a0) as proof of (((eq (Prop->Prop)) a0) g)
% 118.54/118.81 Found eq_ref00:=(eq_ref0 a0):(((eq (Prop->Prop)) a0) a0)
% 118.54/118.81 Found (eq_ref0 a0) as proof of (((eq (Prop->Prop)) a0) g)
% 118.54/118.81 Found ((eq_ref (Prop->Prop)) a0) as proof of (((eq (Prop->Prop)) a0) g)
% 118.54/118.81 Found ((eq_ref (Prop->Prop)) a0) as proof of (((eq (Prop->Prop)) a0) g)
% 118.54/118.81 Found ((eq_ref (Prop->Prop)) a0) as proof of (((eq (Prop->Prop)) a0) g)
% 118.54/118.81 Found eq_ref00:=(eq_ref0 a0):(((eq (Prop->Prop)) a0) a0)
% 118.54/118.81 Found (eq_ref0 a0) as proof of (((eq (Prop->Prop)) a0) g)
% 122.56/122.83 Found ((eq_ref (Prop->Prop)) a0) as proof of (((eq (Prop->Prop)) a0) g)
% 122.56/122.83 Found ((eq_ref (Prop->Prop)) a0) as proof of (((eq (Prop->Prop)) a0) g)
% 122.56/122.83 Found ((eq_ref (Prop->Prop)) a0) as proof of (((eq (Prop->Prop)) a0) g)
% 122.56/122.83 Found eq_ref00:=(eq_ref0 a0):(((eq (Prop->Prop)) a0) a0)
% 122.56/122.83 Found (eq_ref0 a0) as proof of (((eq (Prop->Prop)) a0) g)
% 122.56/122.83 Found ((eq_ref (Prop->Prop)) a0) as proof of (((eq (Prop->Prop)) a0) g)
% 122.56/122.83 Found ((eq_ref (Prop->Prop)) a0) as proof of (((eq (Prop->Prop)) a0) g)
% 122.56/122.83 Found ((eq_ref (Prop->Prop)) a0) as proof of (((eq (Prop->Prop)) a0) g)
% 122.56/122.83 Found eq_ref00:=(eq_ref0 a0):(((eq (Prop->Prop)) a0) a0)
% 122.56/122.83 Found (eq_ref0 a0) as proof of (((eq (Prop->Prop)) a0) g)
% 122.56/122.83 Found ((eq_ref (Prop->Prop)) a0) as proof of (((eq (Prop->Prop)) a0) g)
% 122.56/122.83 Found ((eq_ref (Prop->Prop)) a0) as proof of (((eq (Prop->Prop)) a0) g)
% 122.56/122.83 Found ((eq_ref (Prop->Prop)) a0) as proof of (((eq (Prop->Prop)) a0) g)
% 122.56/122.83 Found eq_ref00:=(eq_ref0 a0):(((eq (Prop->Prop)) a0) a0)
% 122.56/122.83 Found (eq_ref0 a0) as proof of (((eq (Prop->Prop)) a0) g)
% 122.56/122.83 Found ((eq_ref (Prop->Prop)) a0) as proof of (((eq (Prop->Prop)) a0) g)
% 122.56/122.83 Found ((eq_ref (Prop->Prop)) a0) as proof of (((eq (Prop->Prop)) a0) g)
% 122.56/122.83 Found ((eq_ref (Prop->Prop)) a0) as proof of (((eq (Prop->Prop)) a0) g)
% 122.56/122.83 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 122.56/122.83 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f b)->False))
% 122.56/122.83 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 122.56/122.83 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 122.56/122.83 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 122.56/122.83 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 122.56/122.83 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f b)->False))
% 122.56/122.83 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 122.56/122.83 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 122.56/122.83 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 122.56/122.83 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 122.56/122.83 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f b)->False))
% 122.56/122.83 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 122.56/122.83 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 122.56/122.83 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 122.56/122.83 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 122.56/122.83 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f b)->False))
% 122.56/122.83 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 122.56/122.83 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 122.56/122.83 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 122.56/122.83 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 122.56/122.83 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f b)->False))
% 122.56/122.83 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 122.56/122.83 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 122.56/122.83 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 122.56/122.83 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 122.56/122.83 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f b)->False))
% 122.56/122.83 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 122.56/122.83 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 122.56/122.83 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 122.56/122.83 Found classic0:=(classic (((eq Prop) a) b)):((or (((eq Prop) a) b)) (not (((eq Prop) a) b)))
% 122.56/122.83 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 122.56/122.83 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 122.56/122.83 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 122.56/122.83 Found (or_intror00 (classic (((eq Prop) a) b))) as proof of (P ((or (((eq Prop) a) b)) a0))
% 122.56/122.83 Found ((or_intror0 ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (((eq Prop) a) b)) a0))
% 122.56/122.83 Found (((or_intror ((f b)->False)) ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (((eq Prop) a) b)) a0))
% 122.56/122.83 Found (((or_intror ((f b)->False)) ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (((eq Prop) a) b)) a0))
% 122.56/122.83 Found classic0:=(classic (((eq Prop) a) b)):((or (((eq Prop) a) b)) (not (((eq Prop) a) b)))
% 122.56/122.83 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 123.67/123.98 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 123.67/123.98 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 123.67/123.98 Found (or_intror00 (classic (((eq Prop) a) b))) as proof of (P ((or ((f b)->False)) ((or (((eq Prop) a) b)) a0)))
% 123.67/123.98 Found ((or_intror0 ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or ((f b)->False)) ((or (((eq Prop) a) b)) a0)))
% 123.67/123.98 Found (((or_intror ((f b)->False)) ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or ((f b)->False)) ((or (((eq Prop) a) b)) a0)))
% 123.67/123.98 Found (((or_intror ((f b)->False)) ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or ((f b)->False)) ((or (((eq Prop) a) b)) a0)))
% 123.67/123.98 Found eq_ref00:=(eq_ref0 (((eq Prop) a) b)):(((eq Prop) (((eq Prop) a) b)) (((eq Prop) a) b))
% 123.67/123.98 Found (eq_ref0 (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 123.67/123.98 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 123.67/123.98 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 123.67/123.98 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 123.67/123.98 Found eq_ref00:=(eq_ref0 (((eq Prop) a) b)):(((eq Prop) (((eq Prop) a) b)) (((eq Prop) a) b))
% 123.67/123.98 Found (eq_ref0 (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 123.67/123.98 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 123.67/123.98 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 123.67/123.98 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 123.67/123.98 Found eq_ref00:=(eq_ref0 (((eq Prop) a) b)):(((eq Prop) (((eq Prop) a) b)) (((eq Prop) a) b))
% 123.67/123.98 Found (eq_ref0 (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 123.67/123.98 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 123.67/123.98 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 123.67/123.98 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 123.67/123.98 Found eq_ref00:=(eq_ref0 (((eq Prop) a) b)):(((eq Prop) (((eq Prop) a) b)) (((eq Prop) a) b))
% 123.67/123.98 Found (eq_ref0 (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 123.67/123.98 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 123.67/123.98 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 123.67/123.98 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 123.67/123.98 Found eq_ref00:=(eq_ref0 (((eq Prop) a) b)):(((eq Prop) (((eq Prop) a) b)) (((eq Prop) a) b))
% 123.67/123.98 Found (eq_ref0 (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 123.67/123.98 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 123.67/123.98 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 123.67/123.98 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 123.67/123.98 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 123.67/123.98 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 123.67/123.98 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 123.67/123.98 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 123.67/123.98 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 123.67/123.98 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 123.67/123.98 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 123.67/123.98 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 123.67/123.98 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 123.67/123.98 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 123.67/123.98 Found eq_ref00:=(eq_ref0 ((f b)->False)):(((eq Prop) ((f b)->False)) ((f b)->False))
% 123.67/123.98 Found (eq_ref0 ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 123.67/123.98 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 123.67/123.98 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 123.67/123.98 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 123.90/124.19 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 123.90/124.19 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 123.90/124.19 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 123.90/124.19 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 123.90/124.19 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 123.90/124.19 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 123.90/124.19 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 123.90/124.19 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 123.90/124.19 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 123.90/124.19 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 123.90/124.19 Found eq_ref00:=(eq_ref0 ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))):(((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False)))
% 123.90/124.19 Found (eq_ref0 ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) b0)
% 123.90/124.19 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) b0)
% 123.90/124.19 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) b0)
% 123.90/124.19 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) b0)
% 123.90/124.19 Found eq_ref00:=(eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))):(((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) ((or (((eq Prop) a) b)) ((f a)->False)))
% 123.90/124.19 Found (eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 123.90/124.19 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 123.90/124.19 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 123.90/124.19 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 123.90/124.19 Found eq_ref00:=(eq_ref0 ((f b)->False)):(((eq Prop) ((f b)->False)) ((f b)->False))
% 123.90/124.19 Found (eq_ref0 ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 123.90/124.19 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 123.90/124.19 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 123.90/124.19 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 123.90/124.19 Found eq_ref00:=(eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))):(((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) ((or (((eq Prop) a) b)) ((f a)->False)))
% 123.90/124.19 Found (eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 123.90/124.19 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 123.90/124.19 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 123.90/124.19 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 123.90/124.19 Found eq_ref00:=(eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))):(((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) ((or (((eq Prop) a) b)) ((f a)->False)))
% 123.90/124.19 Found (eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 123.90/124.19 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 123.90/124.19 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 123.90/124.19 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 124.07/124.39 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 124.07/124.39 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 124.07/124.39 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 124.07/124.39 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 124.07/124.39 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 124.07/124.39 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 124.07/124.39 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 124.07/124.39 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 124.07/124.39 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 124.07/124.39 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 124.07/124.39 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 124.07/124.39 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 124.07/124.39 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 124.07/124.39 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 124.07/124.39 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 124.07/124.39 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 124.07/124.39 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 124.07/124.39 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 124.07/124.39 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 124.07/124.39 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 124.07/124.39 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 124.07/124.39 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 124.07/124.39 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 124.07/124.39 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 124.07/124.39 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 124.07/124.39 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 124.07/124.39 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 124.07/124.39 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 124.07/124.39 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 124.07/124.39 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 124.07/124.39 Found eq_ref00:=(eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))):(((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) ((or (((eq Prop) a) b)) ((f a)->False)))
% 124.07/124.39 Found (eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 124.07/124.39 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 124.07/124.39 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 124.07/124.39 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 124.07/124.39 Found eq_ref00:=(eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))):(((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) ((or (((eq Prop) a) b)) ((f a)->False)))
% 124.07/124.39 Found (eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 124.07/124.39 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 124.07/124.39 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 124.07/124.39 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 124.07/124.39 Found eq_ref00:=(eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))):(((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) ((or (((eq Prop) a) b)) ((f a)->False)))
% 124.07/124.39 Found (eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 128.95/129.30 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 128.95/129.30 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 128.95/129.30 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 128.95/129.30 Found eq_ref00:=(eq_ref0 ((f b)->False)):(((eq Prop) ((f b)->False)) ((f b)->False))
% 128.95/129.30 Found (eq_ref0 ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 128.95/129.30 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 128.95/129.30 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 128.95/129.30 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 128.95/129.30 Found eq_ref00:=(eq_ref0 ((f b)->False)):(((eq Prop) ((f b)->False)) ((f b)->False))
% 128.95/129.30 Found (eq_ref0 ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 128.95/129.30 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 128.95/129.30 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 128.95/129.30 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 128.95/129.30 Found x:(P a)
% 128.95/129.30 Instantiate: b0:=a:Prop
% 128.95/129.30 Found x as proof of (P0 b0)
% 128.95/129.30 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 128.95/129.30 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 128.95/129.30 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 128.95/129.30 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 128.95/129.30 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 128.95/129.30 Found x:(P a)
% 128.95/129.30 Instantiate: b0:=a:Prop
% 128.95/129.30 Found x as proof of (P0 b0)
% 128.95/129.30 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 128.95/129.30 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 128.95/129.30 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 128.95/129.30 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 128.95/129.30 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 128.95/129.30 Found x:(P a)
% 128.95/129.30 Instantiate: b0:=a:Prop
% 128.95/129.30 Found x as proof of (P0 b0)
% 128.95/129.30 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 128.95/129.30 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 128.95/129.30 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 128.95/129.30 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 128.95/129.30 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 128.95/129.30 Found x:(P a)
% 128.95/129.30 Instantiate: b0:=a:Prop
% 128.95/129.30 Found x as proof of (P0 b0)
% 128.95/129.30 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 128.95/129.30 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 128.95/129.30 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 128.95/129.30 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 128.95/129.30 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 128.95/129.30 Found x:(P a)
% 128.95/129.30 Instantiate: b0:=a:Prop
% 128.95/129.30 Found x as proof of (P0 b0)
% 128.95/129.30 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 128.95/129.30 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 128.95/129.30 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 128.95/129.30 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 128.95/129.30 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 128.95/129.30 Found x:(P a)
% 128.95/129.30 Instantiate: b0:=a:Prop
% 128.95/129.30 Found x as proof of (P0 b0)
% 128.95/129.30 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 128.95/129.30 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 128.95/129.30 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 128.95/129.30 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 128.95/129.30 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 128.95/129.30 Found x:(P b)
% 128.95/129.30 Instantiate: b0:=b:Prop
% 128.95/129.30 Found x as proof of (P0 b0)
% 128.95/129.30 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 128.95/129.30 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 128.95/129.30 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 128.95/129.30 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 128.95/129.30 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 128.95/129.30 Found classic0:=(classic (not (p f))):((or (not (p f))) (not (not (p f))))
% 128.95/129.30 Found (classic (not (p f))) as proof of ((or (not (p f))) b0)
% 128.95/129.30 Found (classic (not (p f))) as proof of ((or (not (p f))) b0)
% 128.95/129.30 Found (classic (not (p f))) as proof of ((or (not (p f))) b0)
% 128.95/129.30 Found (classic (not (p f))) as proof of (P b0)
% 128.95/129.30 Found x3:(P a)
% 128.95/129.30 Found (fun (x3:(P a))=> x3) as proof of (P a)
% 128.95/129.30 Found (fun (x3:(P a))=> x3) as proof of (P0 a)
% 128.95/129.30 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 128.95/129.30 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 128.95/129.30 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 131.59/131.88 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 131.59/131.88 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 131.59/131.88 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 131.59/131.88 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 131.59/131.88 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 131.59/131.88 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 131.59/131.88 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 131.59/131.88 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 131.59/131.88 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 131.59/131.88 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 131.59/131.88 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 131.59/131.88 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 131.59/131.88 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 131.59/131.88 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 131.59/131.88 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 131.59/131.88 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 131.59/131.88 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 131.59/131.88 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 131.59/131.88 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 131.59/131.88 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 131.59/131.88 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 131.59/131.88 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 131.59/131.88 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 131.59/131.88 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 131.59/131.88 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 131.59/131.88 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 131.59/131.88 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 131.59/131.88 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 131.59/131.88 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 131.59/131.88 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 131.59/131.88 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 131.59/131.88 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 131.59/131.88 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 131.59/131.88 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 131.59/131.88 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 131.59/131.88 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 131.59/131.88 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 131.59/131.88 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 131.59/131.88 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 131.59/131.88 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 131.59/131.88 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 131.59/131.88 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 131.59/131.88 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 131.59/131.88 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 131.59/131.88 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 131.59/131.88 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 131.59/131.88 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 131.59/131.88 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 131.59/131.88 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 131.59/131.88 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 131.59/131.88 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 131.59/131.88 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 131.59/131.88 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 131.59/131.88 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 131.59/131.88 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 131.59/131.88 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 131.59/131.88 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 131.59/131.88 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 131.59/131.88 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 131.59/131.88 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 131.59/131.88 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 131.59/131.88 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 131.59/131.88 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 131.59/131.88 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 131.59/131.88 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 131.59/131.88 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 131.59/131.88 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 131.59/131.88 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 131.59/131.88 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 131.59/131.88 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 131.59/131.88 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 131.59/131.88 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 131.59/131.88 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 131.59/131.88 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 131.59/131.88 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 131.59/131.88 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 131.59/131.88 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 132.82/133.15 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 132.82/133.15 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 132.82/133.15 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 132.82/133.15 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 132.82/133.15 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 132.82/133.15 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 132.82/133.15 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 132.82/133.15 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 132.82/133.15 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 132.82/133.15 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 132.82/133.15 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 132.82/133.15 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 132.82/133.15 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 132.82/133.15 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 132.82/133.15 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 132.82/133.15 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 132.82/133.15 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 132.82/133.15 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 132.82/133.15 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 132.82/133.15 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 132.82/133.15 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 132.82/133.15 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 132.82/133.15 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 132.82/133.15 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 132.82/133.15 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 132.82/133.15 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 132.82/133.15 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 132.82/133.15 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 132.82/133.15 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 132.82/133.15 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 132.82/133.15 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 132.82/133.15 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 132.82/133.15 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 132.82/133.15 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 132.82/133.15 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 132.82/133.15 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 132.82/133.15 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 132.82/133.15 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 132.82/133.15 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 132.82/133.15 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 132.82/133.15 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 132.82/133.15 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 132.82/133.15 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 132.82/133.15 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 132.82/133.15 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 132.82/133.15 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 132.82/133.15 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 132.82/133.15 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 132.82/133.15 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 132.82/133.15 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 132.82/133.15 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 132.82/133.15 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 132.82/133.15 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 132.82/133.15 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 132.82/133.15 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 132.82/133.15 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 132.82/133.15 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 132.82/133.15 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 132.82/133.15 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 132.82/133.15 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 132.82/133.15 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 132.82/133.15 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 132.82/133.15 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 132.82/133.15 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 132.82/133.15 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 132.82/133.15 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 132.82/133.15 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 132.82/133.15 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 132.82/133.15 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 132.82/133.15 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 132.82/133.15 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 132.82/133.15 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 132.82/133.15 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 132.82/133.15 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 132.82/133.15 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 132.82/133.15 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 132.82/133.15 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 132.82/133.15 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 140.45/140.81 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 140.45/140.81 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 140.45/140.81 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 140.45/140.81 Found (eq_ref0 a0) as proof of (((eq Prop) a0) (not (g a)))
% 140.45/140.81 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g a)))
% 140.45/140.81 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g a)))
% 140.45/140.81 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g a)))
% 140.45/140.81 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 140.45/140.81 Found (eq_ref0 a0) as proof of (((eq Prop) a0) (not (g a)))
% 140.45/140.81 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g a)))
% 140.45/140.81 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g a)))
% 140.45/140.81 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g a)))
% 140.45/140.81 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 140.45/140.81 Found (eq_ref0 a0) as proof of (((eq Prop) a0) (not (g a)))
% 140.45/140.81 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g a)))
% 140.45/140.81 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g a)))
% 140.45/140.81 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g a)))
% 140.45/140.81 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 140.45/140.81 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 140.45/140.81 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 140.45/140.81 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 140.45/140.81 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 140.45/140.81 Found x:(P0 b0)
% 140.45/140.81 Instantiate: b0:=a:Prop
% 140.45/140.81 Found (fun (x:(P0 b0))=> x) as proof of (P0 a)
% 140.45/140.81 Found (fun (P0:(Prop->Prop)) (x:(P0 b0))=> x) as proof of ((P0 b0)->(P0 a))
% 140.45/140.81 Found (fun (P0:(Prop->Prop)) (x:(P0 b0))=> x) as proof of (P b0)
% 140.45/140.81 Found x2:(P a)
% 140.45/140.81 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 140.45/140.81 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 140.45/140.81 Found x2:(P a)
% 140.45/140.81 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 140.45/140.81 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 140.45/140.81 Found x2:(P a)
% 140.45/140.81 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 140.45/140.81 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 140.45/140.81 Found x2:(P a)
% 140.45/140.81 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 140.45/140.81 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 140.45/140.81 Found x2:(P a)
% 140.45/140.81 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 140.45/140.81 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 140.45/140.81 Found x2:(P a)
% 140.45/140.81 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 140.45/140.81 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 140.45/140.81 Found x2:(P a)
% 140.45/140.81 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 140.45/140.81 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 140.45/140.81 Found x2:(P a)
% 140.45/140.81 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 140.45/140.81 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 140.45/140.81 Found x2:(P a)
% 140.45/140.81 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 140.45/140.81 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 140.45/140.81 Found x2:(P a)
% 140.45/140.81 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 140.45/140.81 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 140.45/140.81 Found x2:(P a)
% 140.45/140.81 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 140.45/140.81 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 140.45/140.81 Found x2:(P a)
% 140.45/140.81 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 140.45/140.81 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 140.45/140.81 Found x2:(P a)
% 140.45/140.81 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 140.45/140.81 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 140.45/140.81 Found x2:(P a)
% 140.45/140.81 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 140.45/140.81 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 140.45/140.81 Found x2:(P a)
% 140.45/140.81 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 140.45/140.81 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 140.45/140.81 Found x2:(P a)
% 140.45/140.81 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 140.45/140.81 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 140.45/140.81 Found x2:(P a)
% 140.45/140.81 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 140.45/140.81 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 140.45/140.81 Found x2:(P a)
% 140.45/140.81 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 140.45/140.81 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 140.45/140.81 Found x2:(P a)
% 140.45/140.81 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 140.45/140.81 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 140.45/140.81 Found x2:(P a)
% 140.45/140.81 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 140.45/140.81 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 140.45/140.81 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 140.45/140.81 Found (eq_ref0 a0) as proof of (((eq Prop) a0) b0)
% 140.45/140.81 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 140.45/140.81 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 140.45/140.81 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 140.45/140.81 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 140.45/140.81 Found (eq_ref0 b0) as proof of (((eq Prop) b0) ((p f)->False))
% 140.45/140.81 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) ((p f)->False))
% 142.88/143.18 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) ((p f)->False))
% 142.88/143.18 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) ((p f)->False))
% 142.88/143.18 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 142.88/143.18 Found (eq_ref0 a0) as proof of (((eq Prop) a0) b0)
% 142.88/143.18 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 142.88/143.18 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 142.88/143.18 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 142.88/143.18 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 142.88/143.18 Found (eq_ref0 b0) as proof of (((eq Prop) b0) ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) ((p f)->False)))
% 142.88/143.18 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) ((p f)->False)))
% 142.88/143.18 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) ((p f)->False)))
% 142.88/143.18 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False))) ((p f)->False)))
% 142.88/143.18 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 142.88/143.18 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 142.88/143.18 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 142.88/143.18 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 142.88/143.18 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 142.88/143.18 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 142.88/143.18 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 142.88/143.18 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 142.88/143.18 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 142.88/143.18 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 142.88/143.18 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 142.88/143.18 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 142.88/143.18 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 142.88/143.18 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 142.88/143.18 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 142.88/143.18 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 142.88/143.18 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 142.88/143.18 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 142.88/143.18 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 142.88/143.18 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 142.88/143.18 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 142.88/143.18 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 142.88/143.18 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 142.88/143.18 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 142.88/143.18 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 142.88/143.18 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 142.88/143.18 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 142.88/143.18 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 142.88/143.18 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 142.88/143.18 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 142.88/143.18 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 142.88/143.18 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 142.88/143.18 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 142.88/143.18 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 142.88/143.18 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 142.88/143.18 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 142.88/143.18 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 142.88/143.18 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 142.88/143.18 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 142.88/143.18 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 142.88/143.18 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 142.88/143.18 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 142.88/143.18 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 142.88/143.18 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 142.88/143.18 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 149.18/149.53 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 149.18/149.53 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 149.18/149.53 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 149.18/149.53 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 149.18/149.53 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 149.18/149.53 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 149.18/149.53 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 149.18/149.53 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 149.18/149.53 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 149.18/149.53 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 149.18/149.53 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 149.18/149.53 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 149.18/149.53 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 149.18/149.53 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 149.18/149.53 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 149.18/149.53 Found eq_ref00:=(eq_ref0 (((eq Prop) a) b)):(((eq Prop) (((eq Prop) a) b)) (((eq Prop) a) b))
% 149.18/149.53 Found (eq_ref0 (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 149.18/149.53 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 149.18/149.53 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 149.18/149.53 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 149.18/149.53 Found eq_ref00:=(eq_ref0 (((eq Prop) a) b)):(((eq Prop) (((eq Prop) a) b)) (((eq Prop) a) b))
% 149.18/149.53 Found (eq_ref0 (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 149.18/149.53 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 149.18/149.53 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 149.18/149.53 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 149.18/149.53 Found eq_ref00:=(eq_ref0 (((eq Prop) a) b)):(((eq Prop) (((eq Prop) a) b)) (((eq Prop) a) b))
% 149.18/149.53 Found (eq_ref0 (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 149.18/149.53 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 149.18/149.53 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 149.18/149.53 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 149.18/149.53 Found eq_ref00:=(eq_ref0 (((eq Prop) a) b)):(((eq Prop) (((eq Prop) a) b)) (((eq Prop) a) b))
% 149.18/149.53 Found (eq_ref0 (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 149.18/149.53 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 149.18/149.53 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 149.18/149.53 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 149.18/149.53 Found eq_ref00:=(eq_ref0 (((eq Prop) a) b)):(((eq Prop) (((eq Prop) a) b)) (((eq Prop) a) b))
% 149.18/149.53 Found (eq_ref0 (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 149.18/149.53 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 149.18/149.53 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 149.18/149.53 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 149.18/149.53 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 149.18/149.53 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 149.18/149.53 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 149.18/149.53 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 149.18/149.53 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 149.18/149.53 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 149.18/149.53 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 149.18/149.53 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 149.18/149.53 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 149.18/149.53 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 149.18/149.53 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 149.18/149.53 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 149.88/150.20 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 149.88/150.20 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 149.88/150.20 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 149.88/150.20 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 149.88/150.20 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 149.88/150.20 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 149.88/150.20 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 149.88/150.20 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 149.88/150.20 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 149.88/150.20 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 149.88/150.20 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 149.88/150.20 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 149.88/150.20 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 149.88/150.20 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 149.88/150.20 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 149.88/150.20 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 149.88/150.20 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 149.88/150.20 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 149.88/150.20 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 149.88/150.20 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 149.88/150.20 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 149.88/150.20 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 149.88/150.20 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 149.88/150.20 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 149.88/150.20 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 149.88/150.20 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 149.88/150.20 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 149.88/150.20 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 149.88/150.20 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 149.88/150.20 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 149.88/150.20 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 149.88/150.20 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 149.88/150.20 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 149.88/150.20 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 149.88/150.20 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 149.88/150.20 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 149.88/150.20 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 149.88/150.20 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 149.88/150.20 Found eq_ref00:=(eq_ref0 (not (f b))):(((eq Prop) (not (f b))) (not (f b)))
% 149.88/150.20 Found (eq_ref0 (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 149.88/150.20 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 149.88/150.20 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 149.88/150.20 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 149.88/150.20 Found eq_ref00:=(eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))):(((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) ((or (((eq Prop) a) b)) ((f a)->False)))
% 149.88/150.20 Found (eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 149.88/150.20 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 149.88/150.20 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 149.88/150.20 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 150.10/150.44 Found eq_ref00:=(eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))):(((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) ((or (((eq Prop) a) b)) ((f a)->False)))
% 150.10/150.44 Found (eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 150.10/150.44 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 150.10/150.44 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 150.10/150.44 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 150.10/150.44 Found eq_ref00:=(eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))):(((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) ((or (((eq Prop) a) b)) ((f a)->False)))
% 150.10/150.44 Found (eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 150.10/150.44 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 150.10/150.44 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 150.10/150.44 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 150.10/150.44 Found eq_ref00:=(eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))):(((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) ((or (((eq Prop) a) b)) ((f a)->False)))
% 150.10/150.44 Found (eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 150.10/150.44 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 150.10/150.44 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 150.10/150.44 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 150.10/150.44 Found eq_ref00:=(eq_ref0 (not (f b))):(((eq Prop) (not (f b))) (not (f b)))
% 150.10/150.44 Found (eq_ref0 (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 150.10/150.44 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 150.10/150.44 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 150.10/150.44 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 150.10/150.44 Found eq_ref00:=(eq_ref0 (not (f b))):(((eq Prop) (not (f b))) (not (f b)))
% 150.10/150.44 Found (eq_ref0 (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 150.10/150.44 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 150.10/150.44 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 150.10/150.44 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 150.10/150.44 Found eq_ref00:=(eq_ref0 ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))):(((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b))))
% 150.10/150.44 Found (eq_ref0 ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) b0)
% 150.10/150.44 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) b0)
% 150.10/150.44 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) b0)
% 150.10/150.44 Found ((eq_ref Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of (((eq Prop) ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) b0)
% 150.10/150.44 Found eq_ref00:=(eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))):(((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) ((or (((eq Prop) a) b)) ((f a)->False)))
% 150.10/150.44 Found (eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 150.10/150.44 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 151.83/152.18 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 151.83/152.18 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 151.83/152.18 Found eq_ref00:=(eq_ref0 (not (f b))):(((eq Prop) (not (f b))) (not (f b)))
% 151.83/152.18 Found (eq_ref0 (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 151.83/152.18 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 151.83/152.18 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 151.83/152.18 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 151.83/152.18 Found eq_ref00:=(eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))):(((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) ((or (((eq Prop) a) b)) ((f a)->False)))
% 151.83/152.18 Found (eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 151.83/152.18 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 151.83/152.18 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 151.83/152.18 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 151.83/152.18 Found x:(P a)
% 151.83/152.18 Instantiate: b0:=a:Prop
% 151.83/152.18 Found x as proof of (P0 b0)
% 151.83/152.18 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 151.83/152.18 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 151.83/152.18 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 151.83/152.18 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 151.83/152.18 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 151.83/152.18 Found x:(P a)
% 151.83/152.18 Instantiate: b0:=a:Prop
% 151.83/152.18 Found x as proof of (P0 b0)
% 151.83/152.18 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 151.83/152.18 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 151.83/152.18 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 151.83/152.18 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 151.83/152.18 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 151.83/152.18 Found x:(P a)
% 151.83/152.18 Instantiate: b0:=a:Prop
% 151.83/152.18 Found x as proof of (P0 b0)
% 151.83/152.18 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 151.83/152.18 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 151.83/152.18 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 151.83/152.18 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 151.83/152.18 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 151.83/152.18 Found x:(P a)
% 151.83/152.18 Instantiate: b0:=a:Prop
% 151.83/152.18 Found x as proof of (P0 b0)
% 151.83/152.18 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 151.83/152.18 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 151.83/152.18 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 151.83/152.18 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 151.83/152.18 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 151.83/152.18 Found x:(P a)
% 151.83/152.18 Instantiate: b0:=a:Prop
% 151.83/152.18 Found x as proof of (P0 b0)
% 151.83/152.18 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 151.83/152.18 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 151.83/152.18 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 151.83/152.18 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 151.83/152.18 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 151.83/152.18 Found x:(P a)
% 151.83/152.18 Instantiate: b0:=a:Prop
% 151.83/152.18 Found x as proof of (P0 b0)
% 151.83/152.18 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 151.83/152.18 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 151.83/152.18 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 151.83/152.18 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 151.83/152.18 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 151.83/152.18 Found x:(P b)
% 151.83/152.18 Instantiate: b0:=b:Prop
% 151.83/152.18 Found x as proof of (P0 b0)
% 151.83/152.18 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 151.83/152.18 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 151.83/152.18 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 151.83/152.18 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 151.83/152.18 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 151.83/152.18 Found classic0:=(classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))):((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) (not ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))))
% 151.83/152.18 Found (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)
% 151.83/152.18 Found (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)
% 152.14/152.46 Found (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)
% 152.14/152.46 Found (or_intror10 (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False)))) as proof of (P ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0))
% 152.14/152.46 Found ((or_intror1 ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)) (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False)))) as proof of (P ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0))
% 152.14/152.46 Found (((or_intror ((g b)->False)) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)) (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False)))) as proof of (P ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0))
% 152.14/152.46 Found (((or_intror ((g b)->False)) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)) (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False)))) as proof of (P ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0))
% 152.14/152.46 Found classic0:=(classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))):((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) (not ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))))
% 152.14/152.46 Found (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)
% 152.14/152.46 Found (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)
% 152.14/152.46 Found (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)
% 152.14/152.46 Found (or_intror10 (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False)))) as proof of (P ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0))
% 152.14/152.46 Found ((or_intror1 ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)) (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False)))) as proof of (P ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0))
% 152.14/152.46 Found (((or_intror ((g b)->False)) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)) (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False)))) as proof of (P ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0))
% 152.14/152.46 Found (((or_intror ((g b)->False)) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)) (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False)))) as proof of (P ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0))
% 152.14/152.46 Found classic0:=(classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))):((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) (not ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))))
% 152.14/152.46 Found (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)
% 152.14/152.46 Found (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)
% 152.14/152.46 Found (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)
% 152.14/152.46 Found (or_intror10 (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False)))) as proof of (P ((or ((g b)->False)) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)))
% 152.14/152.46 Found ((or_intror1 ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)) (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False)))) as proof of (P ((or ((g b)->False)) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)))
% 152.14/152.46 Found (((or_intror ((g b)->False)) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)) (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False)))) as proof of (P ((or ((g b)->False)) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)))
% 153.49/153.81 Found (((or_intror ((g b)->False)) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)) (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False)))) as proof of (P ((or ((g b)->False)) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)))
% 153.49/153.81 Found classic0:=(classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))):((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) (not ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))))
% 153.49/153.81 Found (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)
% 153.49/153.81 Found (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)
% 153.49/153.81 Found (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)
% 153.49/153.81 Found (or_intror10 (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False)))) as proof of (P ((or ((g b)->False)) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)))
% 153.49/153.81 Found ((or_intror1 ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)) (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False)))) as proof of (P ((or ((g b)->False)) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)))
% 153.49/153.81 Found (((or_intror ((g b)->False)) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)) (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False)))) as proof of (P ((or ((g b)->False)) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)))
% 153.49/153.81 Found (((or_intror ((g b)->False)) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)) (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False)))) as proof of (P ((or ((g b)->False)) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)))
% 153.49/153.81 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 153.49/153.81 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 153.49/153.81 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 153.49/153.81 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 153.49/153.81 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 153.49/153.81 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 153.49/153.81 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 153.49/153.81 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 153.49/153.81 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 153.49/153.81 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 153.49/153.81 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 153.49/153.81 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 153.49/153.81 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 153.49/153.81 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 153.49/153.81 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 153.49/153.81 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 153.49/153.81 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 153.49/153.81 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 153.49/153.81 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 153.49/153.81 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 153.49/153.81 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 153.49/153.81 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 153.49/153.81 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 153.49/153.81 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 153.49/153.81 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 153.49/153.81 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 153.49/153.81 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 153.49/153.81 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 153.49/153.81 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 153.49/153.81 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 153.49/153.81 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 153.49/153.81 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 153.49/153.81 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 153.49/153.81 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 155.01/155.37 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 155.01/155.37 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 155.01/155.37 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 155.01/155.37 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 155.01/155.37 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 155.01/155.37 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 155.01/155.37 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 155.01/155.37 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 155.01/155.37 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 155.01/155.37 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 155.01/155.37 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 155.01/155.37 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 155.01/155.37 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 155.01/155.37 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 155.01/155.37 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 155.01/155.37 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 155.01/155.37 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 155.01/155.37 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 155.01/155.37 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 155.01/155.37 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 155.01/155.37 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 155.01/155.37 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 155.01/155.37 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 155.01/155.37 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 155.01/155.37 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 155.01/155.37 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 155.01/155.37 Found classic0:=(classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))):((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) (not ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))))
% 155.01/155.37 Found (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) as proof of ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) a0)
% 155.01/155.37 Found (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) as proof of ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) a0)
% 155.01/155.37 Found (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) as proof of ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) a0)
% 155.01/155.37 Found (or_intror10 (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False)))) as proof of (P ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) a0))
% 155.01/155.37 Found ((or_intror1 ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) a0)) (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False)))) as proof of (P ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) a0))
% 155.01/155.37 Found (((or_intror ((p f)->False)) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) a0)) (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False)))) as proof of (P ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) a0))
% 155.01/155.37 Found (((or_intror ((p f)->False)) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) a0)) (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False)))) as proof of (P ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) a0))
% 155.01/155.37 Found classic0:=(classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))):((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) (not ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))))
% 155.01/155.37 Found (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) as proof of ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) a0)
% 155.01/155.37 Found (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) as proof of ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) a0)
% 155.90/156.27 Found (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) as proof of ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) a0)
% 155.90/156.27 Found (or_intror10 (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False)))) as proof of (P ((or ((p f)->False)) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) a0)))
% 155.90/156.27 Found ((or_intror1 ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) a0)) (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False)))) as proof of (P ((or ((p f)->False)) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) a0)))
% 155.90/156.27 Found (((or_intror ((p f)->False)) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) a0)) (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False)))) as proof of (P ((or ((p f)->False)) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) a0)))
% 155.90/156.27 Found (((or_intror ((p f)->False)) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) a0)) (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False)))) as proof of (P ((or ((p f)->False)) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) a0)))
% 155.90/156.27 Found classic0:=(classic ((or (((eq Prop) a) b)) ((f a)->False))):((or ((or (((eq Prop) a) b)) ((f a)->False))) (not ((or (((eq Prop) a) b)) ((f a)->False))))
% 155.90/156.27 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 155.90/156.27 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 155.90/156.27 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 155.90/156.27 Found (or_intror00 (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 155.90/156.27 Found ((or_intror0 ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 155.90/156.27 Found (((or_intror (not (g a))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 155.90/156.27 Found (((or_intror (not (g a))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 155.90/156.27 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 155.90/156.27 Found (eq_ref0 a0) as proof of (((eq Prop) a0) (not (g b)))
% 155.90/156.27 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g b)))
% 155.90/156.27 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g b)))
% 155.90/156.27 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g b)))
% 155.90/156.27 Found classic0:=(classic ((or (((eq Prop) a) b)) ((f a)->False))):((or ((or (((eq Prop) a) b)) ((f a)->False))) (not ((or (((eq Prop) a) b)) ((f a)->False))))
% 155.90/156.27 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 155.90/156.27 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 155.90/156.27 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 155.90/156.27 Found (or_intror00 (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or (not (g a))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 155.90/156.27 Found ((or_intror0 ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or (not (g a))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 155.90/156.27 Found (((or_intror (not (g a))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or (not (g a))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 160.53/160.88 Found (((or_intror (not (g a))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or (not (g a))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 160.53/160.88 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 160.53/160.88 Found (eq_ref0 a0) as proof of (((eq Prop) a0) (not (g b)))
% 160.53/160.88 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g b)))
% 160.53/160.88 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g b)))
% 160.53/160.88 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g b)))
% 160.53/160.88 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 160.53/160.88 Found (eq_ref0 a0) as proof of (((eq Prop) a0) (not (g b)))
% 160.53/160.88 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g b)))
% 160.53/160.88 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g b)))
% 160.53/160.88 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g b)))
% 160.53/160.88 Found classic0:=(classic (((eq Prop) a) b)):((or (((eq Prop) a) b)) (not (((eq Prop) a) b)))
% 160.53/160.88 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 160.53/160.88 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 160.53/160.88 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 160.53/160.88 Found (or_intror00 (classic (((eq Prop) a) b))) as proof of (P ((or (((eq Prop) a) b)) a0))
% 160.53/160.88 Found ((or_intror0 ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (((eq Prop) a) b)) a0))
% 160.53/160.88 Found (((or_intror (not (f b))) ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (((eq Prop) a) b)) a0))
% 160.53/160.88 Found (((or_intror (not (f b))) ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (((eq Prop) a) b)) a0))
% 160.53/160.88 Found classic0:=(classic (((eq Prop) a) b)):((or (((eq Prop) a) b)) (not (((eq Prop) a) b)))
% 160.53/160.88 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 160.53/160.88 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 160.53/160.88 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 160.53/160.88 Found (or_intror00 (classic (((eq Prop) a) b))) as proof of (P ((or (not (f b))) ((or (((eq Prop) a) b)) a0)))
% 160.53/160.88 Found ((or_intror0 ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (not (f b))) ((or (((eq Prop) a) b)) a0)))
% 160.53/160.88 Found (((or_intror (not (f b))) ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (not (f b))) ((or (((eq Prop) a) b)) a0)))
% 160.53/160.88 Found (((or_intror (not (f b))) ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (not (f b))) ((or (((eq Prop) a) b)) a0)))
% 160.53/160.88 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 160.53/160.88 Found (eq_ref0 a0) as proof of (((eq Prop) a0) b0)
% 160.53/160.88 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 160.53/160.88 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 160.53/160.88 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 160.53/160.88 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 160.53/160.88 Found (eq_ref0 b0) as proof of (((eq Prop) b0) ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) (not (p f))))
% 160.53/160.88 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) (not (p f))))
% 160.53/160.88 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) (not (p f))))
% 160.53/160.88 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) (not (p f))))
% 160.53/160.88 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 160.53/160.88 Found (eq_ref0 a0) as proof of (((eq Prop) a0) b0)
% 160.53/160.88 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 160.53/160.88 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 160.53/160.88 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 160.53/160.88 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 160.53/160.88 Found (eq_ref0 b0) as proof of (((eq Prop) b0) (not (p f)))
% 160.53/160.88 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (not (p f)))
% 160.53/160.88 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (not (p f)))
% 166.17/166.56 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (not (p f)))
% 166.17/166.56 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 166.17/166.56 Found (eq_ref0 a0) as proof of (((eq Prop) a0) (not (p f)))
% 166.17/166.56 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (p f)))
% 166.17/166.56 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (p f)))
% 166.17/166.56 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (p f)))
% 166.17/166.56 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 166.17/166.56 Found (eq_ref0 a0) as proof of (((eq Prop) a0) (not (p f)))
% 166.17/166.56 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (p f)))
% 166.17/166.56 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (p f)))
% 166.17/166.56 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (p f)))
% 166.17/166.56 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 166.17/166.56 Found (eq_ref0 a0) as proof of (((eq Prop) a0) (not (p f)))
% 166.17/166.56 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (p f)))
% 166.17/166.56 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (p f)))
% 166.17/166.56 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (p f)))
% 166.17/166.56 Found classic0:=(classic ((or (((eq Prop) a) b)) ((f a)->False))):((or ((or (((eq Prop) a) b)) ((f a)->False))) (not ((or (((eq Prop) a) b)) ((f a)->False))))
% 166.17/166.56 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 166.17/166.56 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 166.17/166.56 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 166.17/166.56 Found (or_intror10 (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 166.17/166.56 Found ((or_intror1 ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 166.17/166.56 Found (((or_intror ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 166.17/166.56 Found (((or_intror ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 166.17/166.56 Found classic0:=(classic ((or (((eq Prop) a) b)) ((f a)->False))):((or ((or (((eq Prop) a) b)) ((f a)->False))) (not ((or (((eq Prop) a) b)) ((f a)->False))))
% 166.17/166.56 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 166.17/166.56 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 166.17/166.56 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 166.17/166.56 Found (or_intror10 (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 166.17/166.56 Found ((or_intror1 ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 166.17/166.56 Found (((or_intror ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 166.17/166.56 Found (((or_intror ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 166.17/166.56 Found classic0:=(classic ((or (((eq Prop) a) b)) ((f a)->False))):((or ((or (((eq Prop) a) b)) ((f a)->False))) (not ((or (((eq Prop) a) b)) ((f a)->False))))
% 166.17/166.56 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 166.17/166.56 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 166.17/166.56 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 166.17/166.56 Found (or_intror10 (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 166.31/166.70 Found ((or_intror1 ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 166.31/166.70 Found (((or_intror ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 166.31/166.70 Found (((or_intror ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 166.31/166.70 Found classic0:=(classic ((or (((eq Prop) a) b)) ((f a)->False))):((or ((or (((eq Prop) a) b)) ((f a)->False))) (not ((or (((eq Prop) a) b)) ((f a)->False))))
% 166.31/166.70 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 166.31/166.70 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 166.31/166.70 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 166.31/166.70 Found (or_intror10 (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 166.31/166.70 Found ((or_intror1 ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 166.31/166.70 Found (((or_intror ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 166.31/166.70 Found (((or_intror ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 166.31/166.70 Found classic0:=(classic ((or (((eq Prop) a) b)) ((f a)->False))):((or ((or (((eq Prop) a) b)) ((f a)->False))) (not ((or (((eq Prop) a) b)) ((f a)->False))))
% 166.31/166.70 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 166.31/166.70 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 166.31/166.70 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 166.31/166.70 Found (or_intror10 (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 166.31/166.70 Found ((or_intror1 ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 166.31/166.70 Found (((or_intror ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 166.31/166.70 Found (((or_intror ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 166.31/166.70 Found classic0:=(classic ((or (((eq Prop) a) b)) ((f a)->False))):((or ((or (((eq Prop) a) b)) ((f a)->False))) (not ((or (((eq Prop) a) b)) ((f a)->False))))
% 166.31/166.70 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 166.31/166.70 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 166.31/166.70 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 166.31/166.70 Found (or_intror10 (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 166.31/166.70 Found ((or_intror1 ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 170.41/170.79 Found (((or_intror ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 170.41/170.79 Found (((or_intror ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 170.41/170.79 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 170.41/170.79 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 170.41/170.79 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 170.41/170.79 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 170.41/170.79 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 170.41/170.79 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 170.41/170.79 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 170.41/170.79 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 170.41/170.79 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 170.41/170.79 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 170.41/170.79 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 170.41/170.79 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 170.41/170.79 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 170.41/170.79 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 170.41/170.79 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 170.41/170.79 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 170.41/170.79 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 170.41/170.79 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 170.41/170.79 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 170.41/170.79 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 170.41/170.79 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 170.41/170.79 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 170.41/170.79 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 170.41/170.79 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 170.41/170.79 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 170.41/170.79 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 170.41/170.79 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 170.41/170.79 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 170.41/170.79 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 170.41/170.79 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 170.41/170.79 Found classic0:=(classic ((g b)->False)):((or ((g b)->False)) (not ((g b)->False)))
% 170.41/170.79 Found (classic ((g b)->False)) as proof of ((or ((g b)->False)) b0)
% 170.41/170.79 Found (classic ((g b)->False)) as proof of ((or ((g b)->False)) b0)
% 170.41/170.79 Found (classic ((g b)->False)) as proof of ((or ((g b)->False)) b0)
% 170.41/170.79 Found (classic ((g b)->False)) as proof of (P b0)
% 170.41/170.79 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 170.41/170.79 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 170.41/170.79 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 170.41/170.79 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 170.41/170.79 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 170.41/170.79 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 170.41/170.79 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 170.41/170.79 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 170.41/170.79 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 170.41/170.79 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 170.41/170.79 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 170.41/170.79 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 170.41/170.79 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 170.41/170.79 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 170.41/170.79 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 170.41/170.79 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 170.41/170.79 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 170.41/170.79 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 170.41/170.79 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 170.41/170.79 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 170.41/170.79 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 170.41/170.79 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 170.41/170.79 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 170.41/170.79 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 170.41/170.79 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 170.41/170.79 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 170.41/170.79 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 170.41/170.79 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 170.41/170.79 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 170.41/170.79 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 170.41/170.79 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 171.46/171.80 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 171.46/171.80 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 171.46/171.80 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 171.46/171.80 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 171.46/171.80 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 171.46/171.80 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 171.46/171.80 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 171.46/171.80 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 171.46/171.80 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 171.46/171.80 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 171.46/171.80 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 171.46/171.80 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 171.46/171.80 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 171.46/171.80 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 171.46/171.80 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 171.46/171.80 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 171.46/171.80 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 171.46/171.80 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 171.46/171.80 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 171.46/171.80 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 171.46/171.80 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 171.46/171.80 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 171.46/171.80 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 171.46/171.80 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 171.46/171.80 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 171.46/171.80 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 171.46/171.80 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 171.46/171.80 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 171.46/171.80 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 171.46/171.80 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 171.46/171.80 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 171.46/171.80 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 171.46/171.80 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 171.46/171.80 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 171.46/171.80 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 171.46/171.80 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 171.46/171.80 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 171.46/171.80 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 171.46/171.80 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 171.46/171.80 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 171.46/171.80 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 171.46/171.80 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 171.46/171.80 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 171.46/171.80 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 171.46/171.80 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 171.46/171.80 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 171.46/171.80 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 171.46/171.80 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 171.46/171.80 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 171.46/171.80 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 171.46/171.80 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 171.46/171.80 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 171.46/171.80 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 171.46/171.80 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 171.46/171.80 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 171.46/171.80 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 171.46/171.80 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 171.46/171.80 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 171.46/171.80 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 171.46/171.80 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 171.46/171.80 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 171.46/171.80 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 171.46/171.80 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 171.46/171.80 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 171.46/171.80 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 171.46/171.80 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 171.46/171.80 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 171.46/171.80 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 171.46/171.80 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 171.46/171.80 Found classic0:=(classic ((p f)->False)):((or ((p f)->False)) (not ((p f)->False)))
% 171.46/171.80 Found (classic ((p f)->False)) as proof of ((or ((p f)->False)) b0)
% 171.46/171.80 Found (classic ((p f)->False)) as proof of ((or ((p f)->False)) b0)
% 171.46/171.80 Found (classic ((p f)->False)) as proof of ((or ((p f)->False)) b0)
% 171.46/171.80 Found (classic ((p f)->False)) as proof of (P b0)
% 171.46/171.80 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 171.46/171.80 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 175.74/176.11 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 175.74/176.11 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 175.74/176.11 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 175.74/176.11 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 175.74/176.11 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 175.74/176.11 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 175.74/176.11 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 175.74/176.11 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 175.74/176.11 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 175.74/176.11 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 175.74/176.11 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 175.74/176.11 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 175.74/176.11 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 175.74/176.11 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 175.74/176.11 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 175.74/176.11 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 175.74/176.11 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 175.74/176.11 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 175.74/176.11 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 175.74/176.11 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 175.74/176.11 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 175.74/176.11 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 175.74/176.11 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 175.74/176.11 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 175.74/176.11 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 175.74/176.11 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 175.74/176.11 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 175.74/176.11 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 175.74/176.11 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 175.74/176.11 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 175.74/176.11 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 175.74/176.11 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 175.74/176.11 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 175.74/176.11 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 175.74/176.11 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 175.74/176.11 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 175.74/176.11 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 175.74/176.11 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 175.74/176.11 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 175.74/176.12 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((g a)->False))
% 175.74/176.12 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g a)->False))
% 175.74/176.12 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g a)->False))
% 175.74/176.12 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g a)->False))
% 175.74/176.12 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 175.74/176.12 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 175.74/176.12 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 175.74/176.12 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 175.74/176.12 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 175.74/176.12 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 175.74/176.12 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 175.74/176.12 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 175.74/176.12 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 175.74/176.12 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 175.74/176.12 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 175.74/176.12 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((g a)->False))
% 175.74/176.12 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g a)->False))
% 175.74/176.12 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g a)->False))
% 175.74/176.12 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g a)->False))
% 175.74/176.12 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 175.74/176.12 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((g a)->False))
% 175.74/176.12 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g a)->False))
% 175.74/176.12 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g a)->False))
% 175.74/176.12 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((g a)->False))
% 175.74/176.12 Found x2:(P b0)
% 175.74/176.12 Found (fun (x2:(P b0))=> x2) as proof of (P b0)
% 175.74/176.12 Found (fun (x2:(P b0))=> x2) as proof of (P0 b0)
% 175.74/176.12 Found classic0:=(classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))):((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))))
% 175.74/176.12 Found (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)
% 175.74/176.12 Found (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)
% 177.13/177.48 Found (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)
% 177.13/177.48 Found (or_intror00 (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b))))) as proof of (P ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0))
% 177.13/177.48 Found ((or_intror0 ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)) (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b))))) as proof of (P ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0))
% 177.13/177.48 Found (((or_intror (not (g b))) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)) (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b))))) as proof of (P ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0))
% 177.13/177.48 Found (((or_intror (not (g b))) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)) (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b))))) as proof of (P ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0))
% 177.13/177.48 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 177.13/177.48 Found (eq_ref0 a0) as proof of (((eq Prop) a0) (not (f b)))
% 177.13/177.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 177.13/177.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 177.13/177.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 177.13/177.48 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 177.13/177.48 Found (eq_ref0 a0) as proof of (((eq Prop) a0) (not (f b)))
% 177.13/177.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 177.13/177.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 177.13/177.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 177.13/177.48 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 177.13/177.48 Found (eq_ref0 a0) as proof of (((eq Prop) a0) (not (f b)))
% 177.13/177.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 177.13/177.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 177.13/177.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 177.13/177.48 Found classic0:=(classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))):((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))))
% 177.13/177.48 Found (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)
% 177.13/177.48 Found (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)
% 177.13/177.48 Found (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)
% 177.13/177.48 Found (or_intror00 (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b))))) as proof of (P ((or (not (g b))) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)))
% 177.13/177.48 Found ((or_intror0 ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)) (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b))))) as proof of (P ((or (not (g b))) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)))
% 177.13/177.48 Found (((or_intror (not (g b))) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)) (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b))))) as proof of (P ((or (not (g b))) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)))
% 177.13/177.48 Found (((or_intror (not (g b))) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)) (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b))))) as proof of (P ((or (not (g b))) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)))
% 177.13/177.48 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 177.13/177.48 Found (eq_ref0 a0) as proof of (((eq Prop) a0) (not (f b)))
% 177.13/177.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 177.13/177.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 177.13/177.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 177.13/177.48 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 180.07/180.46 Found (eq_ref0 a0) as proof of (((eq Prop) a0) (not (f b)))
% 180.07/180.46 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 180.07/180.46 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 180.07/180.46 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 180.07/180.46 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 180.07/180.46 Found (eq_ref0 a0) as proof of (((eq Prop) a0) (not (f b)))
% 180.07/180.46 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 180.07/180.46 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 180.07/180.46 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 180.07/180.46 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 180.07/180.46 Found (eq_ref0 a0) as proof of (((eq Prop) a0) (not (f b)))
% 180.07/180.46 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 180.07/180.46 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 180.07/180.46 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 180.07/180.46 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 180.07/180.46 Found (eq_ref0 a0) as proof of (((eq Prop) a0) (not (f b)))
% 180.07/180.46 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 180.07/180.46 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 180.07/180.46 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 180.07/180.46 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 180.07/180.46 Found (eq_ref0 a0) as proof of (((eq Prop) a0) (not (f b)))
% 180.07/180.46 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 180.07/180.46 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 180.07/180.46 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 180.07/180.46 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 180.07/180.46 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 180.07/180.46 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 180.07/180.46 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 180.07/180.46 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 180.07/180.46 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 180.07/180.46 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 180.07/180.46 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 180.07/180.46 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 180.07/180.46 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 180.07/180.46 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 180.07/180.46 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 180.07/180.46 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 180.07/180.46 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 180.07/180.46 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 180.07/180.46 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 180.07/180.46 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 180.07/180.46 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 180.07/180.46 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 180.07/180.46 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 180.07/180.46 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 180.07/180.46 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 180.07/180.46 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 180.07/180.46 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 180.07/180.46 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 180.07/180.46 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 180.07/180.46 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 180.07/180.46 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 180.07/180.46 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 180.07/180.46 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 180.07/180.46 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 180.07/180.46 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 180.07/180.46 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 180.07/180.46 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 180.07/180.46 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 180.07/180.46 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 180.07/180.46 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 180.07/180.46 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 180.07/180.46 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 180.07/180.46 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 180.07/180.46 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 180.07/180.46 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 180.07/180.46 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 180.07/180.46 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 180.07/180.46 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 180.07/180.46 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 180.07/180.46 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 180.07/180.46 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 180.07/180.46 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 180.07/180.46 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 182.95/183.30 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 182.95/183.30 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 182.95/183.30 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 182.95/183.30 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 182.95/183.30 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 182.95/183.30 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 182.95/183.30 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 182.95/183.30 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 182.95/183.30 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 182.95/183.30 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 182.95/183.30 Found x3:(P a)
% 182.95/183.30 Found (fun (x3:(P a))=> x3) as proof of (P a)
% 182.95/183.30 Found (fun (x3:(P a))=> x3) as proof of (P0 a)
% 182.95/183.30 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 182.95/183.30 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 182.95/183.30 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 182.95/183.30 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 182.95/183.30 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 182.95/183.30 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 182.95/183.30 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 182.95/183.30 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 182.95/183.30 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 182.95/183.30 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 182.95/183.30 Found x3:(P a)
% 182.95/183.30 Found (fun (x3:(P a))=> x3) as proof of (P a)
% 182.95/183.30 Found (fun (x3:(P a))=> x3) as proof of (P0 a)
% 182.95/183.30 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 182.95/183.30 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 182.95/183.30 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 182.95/183.30 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 182.95/183.30 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 182.95/183.30 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 182.95/183.30 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 182.95/183.30 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 182.95/183.30 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 182.95/183.30 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 182.95/183.30 Found x3:(P a)
% 182.95/183.30 Found (fun (x3:(P a))=> x3) as proof of (P a)
% 182.95/183.30 Found (fun (x3:(P a))=> x3) as proof of (P0 a)
% 182.95/183.30 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 182.95/183.30 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 182.95/183.30 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 182.95/183.30 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 182.95/183.30 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 182.95/183.30 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 182.95/183.30 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 182.95/183.30 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 182.95/183.30 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 182.95/183.30 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 182.95/183.30 Found x3:(P a)
% 182.95/183.30 Found (fun (x3:(P a))=> x3) as proof of (P a)
% 182.95/183.30 Found (fun (x3:(P a))=> x3) as proof of (P0 a)
% 182.95/183.30 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 182.95/183.30 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 182.95/183.30 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 182.95/183.30 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 182.95/183.30 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 182.95/183.30 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 182.95/183.30 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 182.95/183.30 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 182.95/183.30 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 182.95/183.30 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 182.95/183.30 Found x3:(P a)
% 182.95/183.30 Found (fun (x3:(P a))=> x3) as proof of (P a)
% 182.95/183.30 Found (fun (x3:(P a))=> x3) as proof of (P0 a)
% 182.95/183.30 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 182.95/183.30 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 182.95/183.30 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 182.95/183.30 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 182.95/183.30 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 182.95/183.30 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 182.95/183.30 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 182.95/183.30 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 182.95/183.30 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 182.95/183.30 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 182.95/183.30 Found x3:(P a)
% 182.95/183.30 Found (fun (x3:(P a))=> x3) as proof of (P a)
% 182.95/183.30 Found (fun (x3:(P a))=> x3) as proof of (P0 a)
% 182.95/183.30 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 182.95/183.30 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 182.95/183.30 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 182.95/183.30 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 182.95/183.30 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 185.74/186.10 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 185.74/186.10 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 185.74/186.10 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 185.74/186.10 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 185.74/186.10 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 185.74/186.10 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 185.74/186.10 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 185.74/186.10 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 185.74/186.10 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 185.74/186.10 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 185.74/186.10 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 185.74/186.10 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 185.74/186.10 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 185.74/186.10 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 185.74/186.10 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 185.74/186.10 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 185.74/186.10 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 185.74/186.10 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 185.74/186.10 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 185.74/186.10 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 185.74/186.10 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 185.74/186.10 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 185.74/186.10 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 185.74/186.10 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 185.74/186.10 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 185.74/186.10 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 185.74/186.10 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 185.74/186.10 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 185.74/186.10 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 185.74/186.10 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 185.74/186.10 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 185.74/186.10 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 185.74/186.10 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 185.74/186.10 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 185.74/186.10 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 185.74/186.10 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 185.74/186.10 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 185.74/186.10 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 185.74/186.10 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 185.74/186.10 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 185.74/186.10 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 185.74/186.10 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 185.74/186.10 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 185.74/186.10 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 185.74/186.10 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 185.74/186.10 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 185.74/186.10 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 185.74/186.10 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 185.74/186.10 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 185.74/186.10 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 185.74/186.10 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 185.74/186.10 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 185.74/186.10 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 185.74/186.10 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 185.74/186.10 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 185.74/186.10 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 185.74/186.10 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 185.74/186.10 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 185.74/186.10 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 185.74/186.10 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 185.74/186.10 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 185.74/186.10 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 185.74/186.10 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 185.74/186.10 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 185.74/186.10 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 185.74/186.10 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 185.74/186.10 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 190.80/191.16 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 190.80/191.16 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 190.80/191.16 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 190.80/191.16 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 190.80/191.16 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 190.80/191.16 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 190.80/191.16 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 190.80/191.16 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 190.80/191.16 Found classic0:=(classic (not (g b))):((or (not (g b))) (not (not (g b))))
% 190.80/191.16 Found (classic (not (g b))) as proof of ((or (not (g b))) b0)
% 190.80/191.16 Found (classic (not (g b))) as proof of ((or (not (g b))) b0)
% 190.80/191.16 Found (classic (not (g b))) as proof of ((or (not (g b))) b0)
% 190.80/191.16 Found (classic (not (g b))) as proof of (P b0)
% 190.80/191.16 Found classic0:=(classic (not (p f))):((or (not (p f))) (not (not (p f))))
% 190.80/191.16 Found (classic (not (p f))) as proof of ((or (not (p f))) b0)
% 190.80/191.16 Found (classic (not (p f))) as proof of ((or (not (p f))) b0)
% 190.80/191.16 Found (classic (not (p f))) as proof of ((or (not (p f))) b0)
% 190.80/191.16 Found (classic (not (p f))) as proof of (P b0)
% 190.80/191.16 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 190.80/191.16 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 190.80/191.16 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 190.80/191.16 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 190.80/191.16 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 190.80/191.16 Found x:(P0 b0)
% 190.80/191.16 Instantiate: b0:=a:Prop
% 190.80/191.16 Found (fun (x:(P0 b0))=> x) as proof of (P0 a)
% 190.80/191.16 Found (fun (P0:(Prop->Prop)) (x:(P0 b0))=> x) as proof of ((P0 b0)->(P0 a))
% 190.80/191.16 Found (fun (P0:(Prop->Prop)) (x:(P0 b0))=> x) as proof of (P b0)
% 190.80/191.16 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 190.80/191.16 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 190.80/191.16 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 190.80/191.16 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 190.80/191.16 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 190.80/191.16 Found x:(P0 b0)
% 190.80/191.16 Instantiate: b0:=a:Prop
% 190.80/191.16 Found (fun (x:(P0 b0))=> x) as proof of (P0 a)
% 190.80/191.16 Found (fun (P0:(Prop->Prop)) (x:(P0 b0))=> x) as proof of ((P0 b0)->(P0 a))
% 190.80/191.16 Found (fun (P0:(Prop->Prop)) (x:(P0 b0))=> x) as proof of (P b0)
% 190.80/191.16 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 190.80/191.16 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 190.80/191.16 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 190.80/191.16 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 190.80/191.16 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 190.80/191.16 Found x:(P0 b0)
% 190.80/191.16 Instantiate: b0:=a:Prop
% 190.80/191.16 Found (fun (x:(P0 b0))=> x) as proof of (P0 a)
% 190.80/191.16 Found (fun (P0:(Prop->Prop)) (x:(P0 b0))=> x) as proof of ((P0 b0)->(P0 a))
% 190.80/191.16 Found (fun (P0:(Prop->Prop)) (x:(P0 b0))=> x) as proof of (P b0)
% 190.80/191.16 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 190.80/191.16 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 190.80/191.16 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 190.80/191.16 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 190.80/191.16 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 190.80/191.16 Found x:(P0 b0)
% 190.80/191.16 Instantiate: b0:=a:Prop
% 190.80/191.16 Found (fun (x:(P0 b0))=> x) as proof of (P0 a)
% 190.80/191.16 Found (fun (P0:(Prop->Prop)) (x:(P0 b0))=> x) as proof of ((P0 b0)->(P0 a))
% 190.80/191.16 Found (fun (P0:(Prop->Prop)) (x:(P0 b0))=> x) as proof of (P b0)
% 190.80/191.16 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 190.80/191.16 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 190.80/191.16 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 190.80/191.16 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 190.80/191.16 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 190.80/191.16 Found x:(P0 b0)
% 190.80/191.16 Instantiate: b0:=a:Prop
% 190.80/191.16 Found (fun (x:(P0 b0))=> x) as proof of (P0 a)
% 190.80/191.16 Found (fun (P0:(Prop->Prop)) (x:(P0 b0))=> x) as proof of ((P0 b0)->(P0 a))
% 190.80/191.16 Found (fun (P0:(Prop->Prop)) (x:(P0 b0))=> x) as proof of (P b0)
% 190.80/191.16 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 190.80/191.16 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 190.80/191.16 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 190.80/191.16 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 190.80/191.16 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 190.80/191.16 Found x:(P0 b0)
% 190.80/191.16 Instantiate: b0:=a:Prop
% 190.80/191.16 Found (fun (x:(P0 b0))=> x) as proof of (P0 a)
% 190.80/191.16 Found (fun (P0:(Prop->Prop)) (x:(P0 b0))=> x) as proof of ((P0 b0)->(P0 a))
% 190.80/191.16 Found (fun (P0:(Prop->Prop)) (x:(P0 b0))=> x) as proof of (P b0)
% 190.80/191.16 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 196.12/196.48 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f b)->False))
% 196.12/196.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 196.12/196.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 196.12/196.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 196.12/196.48 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 196.12/196.48 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f b)->False))
% 196.12/196.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 196.12/196.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 196.12/196.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 196.12/196.48 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 196.12/196.48 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f b)->False))
% 196.12/196.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 196.12/196.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 196.12/196.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 196.12/196.48 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 196.12/196.48 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f b)->False))
% 196.12/196.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 196.12/196.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 196.12/196.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 196.12/196.48 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 196.12/196.48 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f b)->False))
% 196.12/196.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 196.12/196.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 196.12/196.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 196.12/196.48 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 196.12/196.48 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f b)->False))
% 196.12/196.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 196.12/196.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 196.12/196.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 196.12/196.48 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 196.12/196.48 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f b)->False))
% 196.12/196.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 196.12/196.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 196.12/196.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 196.12/196.48 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 196.12/196.48 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f b)->False))
% 196.12/196.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 196.12/196.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 196.12/196.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 196.12/196.48 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 196.12/196.48 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f b)->False))
% 196.12/196.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 196.12/196.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 196.12/196.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f b)->False))
% 196.12/196.48 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 196.12/196.48 Found (eq_ref0 a0) as proof of (((eq Prop) a0) b0)
% 196.12/196.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 196.12/196.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 196.12/196.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 196.12/196.48 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 196.12/196.48 Found (eq_ref0 b0) as proof of (((eq Prop) b0) ((p f)->False))
% 196.12/196.48 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) ((p f)->False))
% 196.12/196.48 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) ((p f)->False))
% 196.12/196.48 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) ((p f)->False))
% 196.12/196.48 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 196.12/196.48 Found (eq_ref0 a0) as proof of (((eq Prop) a0) b0)
% 196.12/196.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 196.12/196.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 196.12/196.48 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 196.12/196.48 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 196.12/196.48 Found (eq_ref0 b0) as proof of (((eq Prop) b0) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False)))
% 196.12/196.48 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False)))
% 196.12/196.48 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False)))
% 198.16/198.51 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False)))
% 198.16/198.51 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 198.16/198.51 Found (eq_ref0 a0) as proof of (((eq Prop) a0) b0)
% 198.16/198.51 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 198.16/198.51 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 198.16/198.51 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 198.16/198.51 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 198.16/198.51 Found (eq_ref0 b0) as proof of (((eq Prop) b0) ((g b)->False))
% 198.16/198.51 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) ((g b)->False))
% 198.16/198.51 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) ((g b)->False))
% 198.16/198.51 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) ((g b)->False))
% 198.16/198.51 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 198.16/198.51 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 198.16/198.51 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 198.16/198.51 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 198.16/198.51 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 198.16/198.51 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 198.16/198.51 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 198.16/198.51 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 198.16/198.51 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 198.16/198.51 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 198.16/198.51 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 198.16/198.51 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 198.16/198.51 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 198.16/198.51 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 198.16/198.51 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 198.16/198.51 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 198.16/198.51 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 198.16/198.51 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 198.16/198.51 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 198.16/198.51 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 198.16/198.51 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 198.16/198.51 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 198.16/198.51 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 198.16/198.51 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 198.16/198.51 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 198.16/198.51 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 198.16/198.51 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 198.16/198.51 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 198.16/198.51 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 198.16/198.51 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 198.16/198.51 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 198.16/198.51 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 198.16/198.51 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 198.16/198.51 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 198.16/198.51 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 198.16/198.51 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 198.16/198.51 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 198.16/198.51 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 198.16/198.51 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 198.16/198.51 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 198.16/198.51 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 198.16/198.51 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 198.16/198.51 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 198.16/198.51 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 198.16/198.51 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 198.16/198.51 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 198.16/198.51 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 198.16/198.51 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 198.16/198.51 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 198.16/198.51 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 198.16/198.51 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 198.16/198.51 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 198.16/198.51 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 198.16/198.51 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 198.16/198.51 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 198.16/198.51 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 198.16/198.51 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 198.16/198.51 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 198.16/198.51 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 198.16/198.51 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 198.16/198.51 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 199.38/199.75 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 199.38/199.75 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 199.38/199.75 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 199.38/199.75 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 199.38/199.75 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 199.38/199.75 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 199.38/199.75 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 199.38/199.75 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 199.38/199.75 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 199.38/199.75 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 199.38/199.75 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 199.38/199.75 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 199.38/199.75 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 199.38/199.75 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 199.38/199.75 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 199.38/199.75 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 199.38/199.75 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 199.38/199.75 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 199.38/199.75 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 199.38/199.75 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 199.38/199.75 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 199.38/199.75 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 199.38/199.75 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 199.38/199.75 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 199.38/199.75 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 199.38/199.75 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 199.38/199.75 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 199.38/199.75 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 199.38/199.75 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 199.38/199.75 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 199.38/199.75 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 199.38/199.75 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 199.38/199.75 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 199.38/199.75 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 199.38/199.75 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 199.38/199.75 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 199.38/199.75 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 199.38/199.75 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 199.38/199.75 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 199.38/199.75 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 199.38/199.75 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 199.38/199.75 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 199.38/199.75 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 199.38/199.75 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 199.38/199.75 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 199.38/199.75 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 199.38/199.75 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 199.38/199.75 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 199.38/199.75 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 199.38/199.75 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 199.38/199.75 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 199.38/199.75 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 199.38/199.75 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 199.38/199.75 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 199.38/199.75 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 199.38/199.75 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 199.38/199.75 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 199.38/199.75 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 199.38/199.75 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 199.38/199.75 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 199.38/199.75 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 199.38/199.75 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 199.38/199.75 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 199.38/199.75 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 199.38/199.75 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 199.38/199.75 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 199.38/199.75 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 199.38/199.75 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 199.38/199.75 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 199.38/199.75 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 199.38/199.75 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 199.38/199.75 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 199.38/199.75 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 199.38/199.75 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 199.38/199.75 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 199.38/199.75 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 199.38/199.75 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 199.38/199.75 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 202.92/203.32 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 202.92/203.32 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 202.92/203.32 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 202.92/203.32 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 202.92/203.32 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 202.92/203.32 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 202.92/203.32 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 202.92/203.32 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 202.92/203.32 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 202.92/203.32 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 202.92/203.32 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 202.92/203.32 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 202.92/203.32 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 202.92/203.32 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 202.92/203.32 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 202.92/203.32 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 202.92/203.32 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 202.92/203.32 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 202.92/203.32 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 202.92/203.32 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 202.92/203.32 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 202.92/203.32 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 202.92/203.32 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 202.92/203.32 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 202.92/203.32 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 202.92/203.32 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 202.92/203.32 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 202.92/203.32 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 202.92/203.32 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 202.92/203.32 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 202.92/203.32 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 202.92/203.32 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 202.92/203.32 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 202.92/203.32 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 202.92/203.32 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 202.92/203.32 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 202.92/203.32 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 202.92/203.32 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 202.92/203.32 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 202.92/203.32 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 202.92/203.32 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 202.92/203.32 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 202.92/203.32 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 202.92/203.32 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 202.92/203.32 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 202.92/203.32 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 202.92/203.32 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 202.92/203.32 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 202.92/203.32 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 202.92/203.32 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 202.92/203.32 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 202.92/203.32 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 202.92/203.32 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 202.92/203.32 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 202.92/203.32 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 202.92/203.32 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 202.92/203.32 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 202.92/203.32 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 202.92/203.32 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 202.92/203.32 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 202.92/203.32 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 202.92/203.32 Found classic0:=(classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))):((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))))
% 202.92/203.32 Found (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) as proof of ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) a0)
% 202.92/203.32 Found (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) as proof of ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) a0)
% 202.92/203.32 Found (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) as proof of ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) a0)
% 202.92/203.32 Found (or_intror00 (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a))))) as proof of (P ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) a0))
% 205.86/206.22 Found ((or_intror0 ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) a0)) (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a))))) as proof of (P ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) a0))
% 205.86/206.22 Found (((or_intror (not (p f))) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) a0)) (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a))))) as proof of (P ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) a0))
% 205.86/206.22 Found (((or_intror (not (p f))) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) a0)) (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a))))) as proof of (P ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) a0))
% 205.86/206.22 Found classic0:=(classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))):((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))))
% 205.86/206.22 Found (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) as proof of ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) a0)
% 205.86/206.22 Found (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) as proof of ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) a0)
% 205.86/206.22 Found (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) as proof of ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) a0)
% 205.86/206.22 Found (or_intror00 (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a))))) as proof of (P ((or (not (p f))) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) a0)))
% 205.86/206.22 Found ((or_intror0 ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) a0)) (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a))))) as proof of (P ((or (not (p f))) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) a0)))
% 205.86/206.22 Found (((or_intror (not (p f))) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) a0)) (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a))))) as proof of (P ((or (not (p f))) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) a0)))
% 205.86/206.22 Found (((or_intror (not (p f))) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) a0)) (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a))))) as proof of (P ((or (not (p f))) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) a0)))
% 205.86/206.22 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 205.86/206.22 Found (eq_ref0 a) as proof of (((eq Prop) a) b1)
% 205.86/206.22 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b1)
% 205.86/206.22 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b1)
% 205.86/206.22 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b1)
% 205.86/206.22 Found eq_ref00:=(eq_ref0 b1):(((eq Prop) b1) b1)
% 205.86/206.22 Found (eq_ref0 b1) as proof of (((eq Prop) b1) b)
% 205.86/206.22 Found ((eq_ref Prop) b1) as proof of (((eq Prop) b1) b)
% 205.86/206.22 Found ((eq_ref Prop) b1) as proof of (((eq Prop) b1) b)
% 205.86/206.22 Found ((eq_ref Prop) b1) as proof of (((eq Prop) b1) b)
% 205.86/206.22 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 205.86/206.22 Found (eq_ref0 a0) as proof of (((eq Prop) a0) (not (g a)))
% 205.86/206.22 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g a)))
% 205.86/206.22 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g a)))
% 205.86/206.22 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g a)))
% 205.86/206.22 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 205.86/206.22 Found (eq_ref0 a0) as proof of (((eq Prop) a0) (not (g a)))
% 206.47/206.85 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g a)))
% 206.47/206.85 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g a)))
% 206.47/206.85 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g a)))
% 206.47/206.85 Found classic0:=(classic (((eq Prop) a) b)):((or (((eq Prop) a) b)) (not (((eq Prop) a) b)))
% 206.47/206.85 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 206.47/206.85 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 206.47/206.85 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 206.47/206.85 Found (or_intror10 (classic (((eq Prop) a) b))) as proof of (P ((or (((eq Prop) a) b)) a0))
% 206.47/206.85 Found ((or_intror1 ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (((eq Prop) a) b)) a0))
% 206.47/206.85 Found (((or_intror ((f b)->False)) ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (((eq Prop) a) b)) a0))
% 206.47/206.85 Found (((or_intror ((f b)->False)) ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (((eq Prop) a) b)) a0))
% 206.47/206.85 Found classic0:=(classic (((eq Prop) a) b)):((or (((eq Prop) a) b)) (not (((eq Prop) a) b)))
% 206.47/206.85 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 206.47/206.85 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 206.47/206.85 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 206.47/206.85 Found (or_intror10 (classic (((eq Prop) a) b))) as proof of (P ((or (((eq Prop) a) b)) a0))
% 206.47/206.85 Found ((or_intror1 ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (((eq Prop) a) b)) a0))
% 206.47/206.85 Found (((or_intror ((f b)->False)) ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (((eq Prop) a) b)) a0))
% 206.47/206.85 Found (((or_intror ((f b)->False)) ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (((eq Prop) a) b)) a0))
% 206.47/206.85 Found classic0:=(classic (((eq Prop) a) b)):((or (((eq Prop) a) b)) (not (((eq Prop) a) b)))
% 206.47/206.85 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 206.47/206.85 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 206.47/206.85 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 206.47/206.85 Found (or_intror10 (classic (((eq Prop) a) b))) as proof of (P ((or (((eq Prop) a) b)) a0))
% 206.47/206.85 Found ((or_intror1 ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (((eq Prop) a) b)) a0))
% 206.47/206.85 Found (((or_intror ((f b)->False)) ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (((eq Prop) a) b)) a0))
% 206.47/206.85 Found (((or_intror ((f b)->False)) ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (((eq Prop) a) b)) a0))
% 206.47/206.85 Found classic0:=(classic (((eq Prop) a) b)):((or (((eq Prop) a) b)) (not (((eq Prop) a) b)))
% 206.47/206.85 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 206.47/206.85 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 206.47/206.85 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 206.47/206.85 Found (or_intror10 (classic (((eq Prop) a) b))) as proof of (P ((or (((eq Prop) a) b)) a0))
% 206.47/206.85 Found ((or_intror1 ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (((eq Prop) a) b)) a0))
% 206.47/206.85 Found (((or_intror ((f b)->False)) ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (((eq Prop) a) b)) a0))
% 206.47/206.85 Found (((or_intror ((f b)->False)) ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (((eq Prop) a) b)) a0))
% 206.47/206.85 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 206.47/206.85 Found (eq_ref0 a0) as proof of (((eq Prop) a0) (not (g a)))
% 206.47/206.85 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g a)))
% 206.47/206.85 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g a)))
% 206.47/206.85 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g a)))
% 206.47/206.85 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 206.47/206.85 Found (eq_ref0 a0) as proof of (((eq Prop) a0) (not (g a)))
% 206.47/206.85 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g a)))
% 206.47/206.85 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g a)))
% 206.47/206.85 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g a)))
% 206.47/206.85 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 206.92/207.31 Found (eq_ref0 a0) as proof of (((eq Prop) a0) (not (g a)))
% 206.92/207.31 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g a)))
% 206.92/207.31 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g a)))
% 206.92/207.31 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g a)))
% 206.92/207.31 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 206.92/207.31 Found (eq_ref0 a0) as proof of (((eq Prop) a0) (not (g a)))
% 206.92/207.31 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g a)))
% 206.92/207.31 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g a)))
% 206.92/207.31 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g a)))
% 206.92/207.31 Found classic0:=(classic (((eq Prop) a) b)):((or (((eq Prop) a) b)) (not (((eq Prop) a) b)))
% 206.92/207.31 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 206.92/207.31 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 206.92/207.31 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 206.92/207.31 Found (or_intror10 (classic (((eq Prop) a) b))) as proof of (P ((or ((f b)->False)) ((or (((eq Prop) a) b)) a0)))
% 206.92/207.31 Found ((or_intror1 ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or ((f b)->False)) ((or (((eq Prop) a) b)) a0)))
% 206.92/207.31 Found (((or_intror ((f b)->False)) ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or ((f b)->False)) ((or (((eq Prop) a) b)) a0)))
% 206.92/207.31 Found (((or_intror ((f b)->False)) ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or ((f b)->False)) ((or (((eq Prop) a) b)) a0)))
% 206.92/207.31 Found classic0:=(classic (((eq Prop) a) b)):((or (((eq Prop) a) b)) (not (((eq Prop) a) b)))
% 206.92/207.31 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 206.92/207.31 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 206.92/207.31 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 206.92/207.31 Found (or_intror10 (classic (((eq Prop) a) b))) as proof of (P ((or ((f b)->False)) ((or (((eq Prop) a) b)) a0)))
% 206.92/207.31 Found ((or_intror1 ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or ((f b)->False)) ((or (((eq Prop) a) b)) a0)))
% 206.92/207.31 Found (((or_intror ((f b)->False)) ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or ((f b)->False)) ((or (((eq Prop) a) b)) a0)))
% 206.92/207.31 Found (((or_intror ((f b)->False)) ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or ((f b)->False)) ((or (((eq Prop) a) b)) a0)))
% 206.92/207.31 Found classic0:=(classic (((eq Prop) a) b)):((or (((eq Prop) a) b)) (not (((eq Prop) a) b)))
% 206.92/207.31 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 206.92/207.31 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 206.92/207.31 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 206.92/207.31 Found (or_intror10 (classic (((eq Prop) a) b))) as proof of (P ((or ((f b)->False)) ((or (((eq Prop) a) b)) a0)))
% 206.92/207.31 Found ((or_intror1 ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or ((f b)->False)) ((or (((eq Prop) a) b)) a0)))
% 206.92/207.31 Found (((or_intror ((f b)->False)) ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or ((f b)->False)) ((or (((eq Prop) a) b)) a0)))
% 206.92/207.31 Found (((or_intror ((f b)->False)) ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or ((f b)->False)) ((or (((eq Prop) a) b)) a0)))
% 206.92/207.31 Found classic0:=(classic (((eq Prop) a) b)):((or (((eq Prop) a) b)) (not (((eq Prop) a) b)))
% 206.92/207.31 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 206.92/207.31 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 206.92/207.31 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 206.92/207.31 Found (or_intror10 (classic (((eq Prop) a) b))) as proof of (P ((or ((f b)->False)) ((or (((eq Prop) a) b)) a0)))
% 206.92/207.31 Found ((or_intror1 ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or ((f b)->False)) ((or (((eq Prop) a) b)) a0)))
% 206.92/207.31 Found (((or_intror ((f b)->False)) ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or ((f b)->False)) ((or (((eq Prop) a) b)) a0)))
% 206.92/207.31 Found (((or_intror ((f b)->False)) ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or ((f b)->False)) ((or (((eq Prop) a) b)) a0)))
% 207.62/207.99 Found classic0:=(classic ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))):((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) (not ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))))
% 207.62/207.99 Found (classic ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) as proof of ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) a0)
% 207.62/207.99 Found (classic ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) as proof of ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) a0)
% 207.62/207.99 Found (classic ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) as proof of ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) a0)
% 207.62/207.99 Found (or_intror00 (classic ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b))))) as proof of (P ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) a0))
% 207.62/207.99 Found ((or_intror0 ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) a0)) (classic ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b))))) as proof of (P ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) a0))
% 207.62/207.99 Found (((or_intror (p g)) ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) a0)) (classic ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b))))) as proof of (P ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) a0))
% 207.62/207.99 Found (((or_intror (p g)) ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) a0)) (classic ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b))))) as proof of (P ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) a0))
% 207.62/207.99 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 207.62/207.99 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 207.62/207.99 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 207.62/207.99 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 207.62/207.99 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 207.62/207.99 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 207.62/207.99 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 207.62/207.99 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 207.62/207.99 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 207.62/207.99 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 207.62/207.99 Found classic0:=(classic ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))):((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) (not ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))))
% 207.62/207.99 Found (classic ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) as proof of ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) a0)
% 207.62/207.99 Found (classic ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) as proof of ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) a0)
% 207.62/207.99 Found (classic ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) as proof of ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) a0)
% 207.62/207.99 Found (or_intror00 (classic ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b))))) as proof of (P ((or (p g)) ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) a0)))
% 211.12/211.50 Found ((or_intror0 ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) a0)) (classic ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b))))) as proof of (P ((or (p g)) ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) a0)))
% 211.12/211.50 Found (((or_intror (p g)) ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) a0)) (classic ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b))))) as proof of (P ((or (p g)) ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) a0)))
% 211.12/211.50 Found (((or_intror (p g)) ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) a0)) (classic ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b))))) as proof of (P ((or (p g)) ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) a0)))
% 211.12/211.50 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 211.12/211.50 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 211.12/211.50 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 211.12/211.50 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 211.12/211.50 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 211.12/211.50 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 211.12/211.50 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 211.12/211.50 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 211.12/211.50 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 211.12/211.50 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 211.12/211.50 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 211.12/211.50 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 211.12/211.50 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 211.12/211.50 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 211.12/211.50 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 211.12/211.50 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 211.12/211.50 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 211.12/211.50 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 211.12/211.50 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 211.12/211.50 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 211.12/211.50 Found x3:(P b)
% 211.12/211.50 Found (fun (x3:(P b))=> x3) as proof of (P b)
% 211.12/211.50 Found (fun (x3:(P b))=> x3) as proof of (P0 b)
% 211.12/211.50 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 211.12/211.50 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 211.12/211.50 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 211.12/211.50 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 211.12/211.50 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 211.12/211.50 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 211.12/211.50 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 211.12/211.50 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 211.12/211.50 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 211.12/211.50 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 211.12/211.50 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 211.12/211.50 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 211.12/211.50 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 211.12/211.50 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 211.12/211.50 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 211.12/211.50 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 211.12/211.50 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 211.12/211.50 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 211.12/211.50 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 211.12/211.50 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 211.12/211.50 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 211.12/211.50 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 211.12/211.50 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 211.12/211.50 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 211.12/211.50 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 211.12/211.50 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 211.12/211.50 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 211.12/211.50 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 211.12/211.50 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 211.12/211.50 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 211.12/211.50 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 211.12/211.50 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 211.93/212.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 211.93/212.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 211.93/212.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 211.93/212.33 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 211.93/212.33 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 211.93/212.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 211.93/212.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 211.93/212.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 211.93/212.33 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 211.93/212.33 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 211.93/212.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 211.93/212.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 211.93/212.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 211.93/212.33 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 211.93/212.33 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 211.93/212.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 211.93/212.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 211.93/212.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 211.93/212.33 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 211.93/212.33 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 211.93/212.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 211.93/212.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 211.93/212.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 211.93/212.33 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 211.93/212.33 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 211.93/212.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 211.93/212.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 211.93/212.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 211.93/212.33 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 211.93/212.33 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 211.93/212.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 211.93/212.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 211.93/212.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 211.93/212.33 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 211.93/212.33 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 211.93/212.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 211.93/212.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 211.93/212.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 211.93/212.33 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 211.93/212.33 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 211.93/212.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 211.93/212.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 211.93/212.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 211.93/212.33 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 211.93/212.33 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 211.93/212.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 211.93/212.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 211.93/212.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 211.93/212.33 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 211.93/212.33 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 211.93/212.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 211.93/212.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 211.93/212.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 211.93/212.33 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 211.93/212.33 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 211.93/212.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 211.93/212.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 211.93/212.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 211.93/212.33 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 211.93/212.33 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 211.93/212.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 211.93/212.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 211.93/212.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 211.93/212.33 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 211.93/212.33 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 211.93/212.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 211.93/212.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 211.93/212.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 211.93/212.33 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 211.93/212.33 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 211.93/212.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 211.93/212.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 211.93/212.33 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 211.93/212.33 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 211.93/212.33 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 211.93/212.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 211.93/212.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 211.93/212.33 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 213.11/213.51 Found x2:(P b0)
% 213.11/213.51 Found (fun (x2:(P b0))=> x2) as proof of (P b0)
% 213.11/213.51 Found (fun (x2:(P b0))=> x2) as proof of (P0 b0)
% 213.11/213.51 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 213.11/213.51 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 213.11/213.51 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 213.11/213.51 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 213.11/213.51 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 213.11/213.51 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 213.11/213.51 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 213.11/213.51 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 213.11/213.51 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 213.11/213.51 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 213.11/213.51 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 213.11/213.51 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 213.11/213.51 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 213.11/213.51 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 213.11/213.51 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 213.11/213.51 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 213.11/213.51 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 213.11/213.51 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 213.11/213.51 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 213.11/213.51 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 213.11/213.51 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 213.11/213.51 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 213.11/213.51 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 213.11/213.51 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 213.11/213.51 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 213.11/213.51 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 213.11/213.51 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 213.11/213.51 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 213.11/213.51 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 213.11/213.51 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 213.11/213.51 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 213.11/213.51 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 213.11/213.51 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 213.11/213.51 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 213.11/213.51 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 213.11/213.51 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 213.11/213.51 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 213.11/213.51 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 213.11/213.51 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 213.11/213.51 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 213.11/213.51 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 213.11/213.51 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 213.11/213.51 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 213.11/213.51 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 213.11/213.51 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 213.11/213.51 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 213.11/213.51 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 213.11/213.51 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 213.11/213.51 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 213.11/213.51 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 213.11/213.51 Found eq_ref00:=(eq_ref0 (((eq Prop) a) b)):(((eq Prop) (((eq Prop) a) b)) (((eq Prop) a) b))
% 213.11/213.51 Found (eq_ref0 (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 213.11/213.51 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 213.11/213.51 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 213.11/213.51 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 213.11/213.51 Found eq_ref00:=(eq_ref0 (((eq Prop) a) b)):(((eq Prop) (((eq Prop) a) b)) (((eq Prop) a) b))
% 213.11/213.51 Found (eq_ref0 (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 213.11/213.51 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 213.11/213.51 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 213.11/213.51 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 213.11/213.51 Found eq_ref00:=(eq_ref0 (((eq Prop) a) b)):(((eq Prop) (((eq Prop) a) b)) (((eq Prop) a) b))
% 213.11/213.51 Found (eq_ref0 (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 213.11/213.51 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 213.11/213.51 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 213.11/213.51 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 213.11/213.51 Found eq_ref00:=(eq_ref0 (((eq Prop) a) b)):(((eq Prop) (((eq Prop) a) b)) (((eq Prop) a) b))
% 213.42/213.87 Found (eq_ref0 (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 213.42/213.87 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 213.42/213.87 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 213.42/213.87 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 213.42/213.87 Found eq_ref00:=(eq_ref0 (((eq Prop) a) b)):(((eq Prop) (((eq Prop) a) b)) (((eq Prop) a) b))
% 213.42/213.87 Found (eq_ref0 (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 213.42/213.87 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 213.42/213.87 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 213.42/213.87 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 213.42/213.87 Found eq_ref00:=(eq_ref0 (((eq Prop) a) b)):(((eq Prop) (((eq Prop) a) b)) (((eq Prop) a) b))
% 213.42/213.87 Found (eq_ref0 (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 213.42/213.87 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 213.42/213.87 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 213.42/213.87 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 213.42/213.87 Found eq_ref00:=(eq_ref0 (((eq Prop) a) b)):(((eq Prop) (((eq Prop) a) b)) (((eq Prop) a) b))
% 213.42/213.87 Found (eq_ref0 (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 213.42/213.87 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 213.42/213.87 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 213.42/213.87 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 213.42/213.87 Found eq_ref00:=(eq_ref0 (((eq Prop) a) b)):(((eq Prop) (((eq Prop) a) b)) (((eq Prop) a) b))
% 213.42/213.87 Found (eq_ref0 (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 213.42/213.87 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 213.42/213.87 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 213.42/213.87 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 213.42/213.87 Found eq_ref00:=(eq_ref0 (((eq Prop) a) b)):(((eq Prop) (((eq Prop) a) b)) (((eq Prop) a) b))
% 213.42/213.87 Found (eq_ref0 (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 213.42/213.87 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 213.42/213.87 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 213.42/213.87 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 213.42/213.87 Found eq_ref00:=(eq_ref0 (((eq Prop) a) b)):(((eq Prop) (((eq Prop) a) b)) (((eq Prop) a) b))
% 213.42/213.87 Found (eq_ref0 (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 213.42/213.87 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 213.42/213.87 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 213.42/213.87 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 213.42/213.87 Found x2:(P a)
% 213.42/213.87 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 213.42/213.87 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 213.42/213.87 Found x2:(P a)
% 213.42/213.87 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 213.42/213.87 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 213.42/213.87 Found x2:(P a)
% 213.42/213.87 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 213.42/213.87 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 213.42/213.87 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 213.42/213.87 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 213.42/213.87 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 213.42/213.87 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 213.42/213.87 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 213.42/213.87 Found eq_ref00:=(eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))):(((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) ((or (((eq Prop) a) b)) ((f a)->False)))
% 213.42/213.87 Found (eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 213.42/213.87 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 213.81/214.18 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 213.81/214.18 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 213.81/214.18 Found eq_ref00:=(eq_ref0 ((f b)->False)):(((eq Prop) ((f b)->False)) ((f b)->False))
% 213.81/214.18 Found (eq_ref0 ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 213.81/214.18 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 213.81/214.18 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 213.81/214.18 Found ((eq_ref Prop) ((f b)->False)) as proof of (((eq Prop) ((f b)->False)) b0)
% 213.81/214.18 Found eq_ref00:=(eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))):(((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) ((or (((eq Prop) a) b)) ((f a)->False)))
% 213.81/214.18 Found (eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 213.81/214.18 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 213.81/214.18 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 213.81/214.18 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 213.81/214.18 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 213.81/214.18 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 213.81/214.18 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 213.81/214.18 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 213.81/214.18 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 213.81/214.18 Found eq_ref00:=(eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))):(((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) ((or (((eq Prop) a) b)) ((f a)->False)))
% 213.81/214.18 Found (eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 213.81/214.18 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 213.81/214.18 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 213.81/214.18 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 213.81/214.18 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 213.81/214.18 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 213.81/214.18 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 213.81/214.18 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 213.81/214.18 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 213.81/214.18 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 213.81/214.18 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 213.81/214.18 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 213.81/214.18 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 213.81/214.18 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 213.81/214.18 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 213.81/214.18 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 213.81/214.18 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 213.81/214.18 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 213.81/214.18 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 213.81/214.18 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 213.81/214.18 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 213.81/214.18 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 213.81/214.18 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 213.81/214.18 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 216.36/216.76 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 216.36/216.76 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 216.36/216.76 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 216.36/216.76 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 216.36/216.76 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 216.36/216.76 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 216.36/216.76 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 216.36/216.76 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 216.36/216.76 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 216.36/216.76 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 216.36/216.76 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 216.36/216.76 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 216.36/216.76 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 216.36/216.76 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 216.36/216.76 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 216.36/216.76 Found x2:(P a)
% 216.36/216.76 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 216.36/216.76 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 216.36/216.76 Found x2:(P a)
% 216.36/216.76 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 216.36/216.76 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 216.36/216.76 Found x2:(P a)
% 216.36/216.76 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 216.36/216.76 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 216.36/216.76 Found x2:(P a)
% 216.36/216.76 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 216.36/216.76 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 216.36/216.76 Found x2:(P a)
% 216.36/216.76 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 216.36/216.76 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 216.36/216.76 Found x2:(P a)
% 216.36/216.76 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 216.36/216.76 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 216.36/216.76 Found x2:(P a)
% 216.36/216.76 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 216.36/216.76 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 216.36/216.76 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 216.36/216.76 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 216.36/216.76 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 216.36/216.76 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 216.36/216.76 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 216.36/216.76 Found eq_ref00:=(eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))):(((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) ((or (((eq Prop) a) b)) ((f a)->False)))
% 216.36/216.76 Found (eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 216.36/216.76 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 216.36/216.76 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 216.36/216.76 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 216.36/216.76 Found x2:(P a)
% 216.36/216.76 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 216.36/216.76 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 216.36/216.76 Found x2:(P a)
% 216.36/216.76 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 216.36/216.76 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 216.36/216.76 Found x2:(P a)
% 216.36/216.76 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 216.36/216.76 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 216.36/216.76 Found x2:(P a)
% 216.36/216.76 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 216.36/216.76 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 216.36/216.76 Found x2:(P a)
% 216.36/216.76 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 216.36/216.76 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 216.36/216.76 Found x2:(P a)
% 216.36/216.76 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 216.36/216.76 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 216.36/216.76 Found x:(P a)
% 216.36/216.76 Instantiate: b0:=a:Prop
% 216.36/216.76 Found x as proof of (P0 b0)
% 216.36/216.76 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 216.36/216.76 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 216.36/216.76 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 216.36/216.76 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 216.36/216.76 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 216.36/216.76 Found x:(P a)
% 216.36/216.76 Instantiate: b0:=a:Prop
% 216.36/216.76 Found x as proof of (P0 b0)
% 218.34/218.74 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 218.34/218.74 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found x:(P a)
% 218.34/218.74 Instantiate: b0:=a:Prop
% 218.34/218.74 Found x as proof of (P0 b0)
% 218.34/218.74 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 218.34/218.74 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found x:(P a)
% 218.34/218.74 Instantiate: b0:=a:Prop
% 218.34/218.74 Found x as proof of (P0 b0)
% 218.34/218.74 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 218.34/218.74 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found x:(P a)
% 218.34/218.74 Instantiate: b0:=a:Prop
% 218.34/218.74 Found x as proof of (P0 b0)
% 218.34/218.74 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 218.34/218.74 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found x:(P a)
% 218.34/218.74 Instantiate: b0:=a:Prop
% 218.34/218.74 Found x as proof of (P0 b0)
% 218.34/218.74 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 218.34/218.74 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found x:(P a)
% 218.34/218.74 Instantiate: b0:=a:Prop
% 218.34/218.74 Found x as proof of (P0 b0)
% 218.34/218.74 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 218.34/218.74 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found x:(P a)
% 218.34/218.74 Instantiate: b0:=a:Prop
% 218.34/218.74 Found x as proof of (P0 b0)
% 218.34/218.74 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 218.34/218.74 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found x:(P a)
% 218.34/218.74 Instantiate: b0:=a:Prop
% 218.34/218.74 Found x as proof of (P0 b0)
% 218.34/218.74 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 218.34/218.74 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found x:(P a)
% 218.34/218.74 Instantiate: b0:=a:Prop
% 218.34/218.74 Found x as proof of (P0 b0)
% 218.34/218.74 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 218.34/218.74 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found x:(P a)
% 218.34/218.74 Instantiate: b0:=a:Prop
% 218.34/218.74 Found x as proof of (P0 b0)
% 218.34/218.74 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 218.34/218.74 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found x:(P a)
% 218.34/218.74 Instantiate: b0:=a:Prop
% 218.34/218.74 Found x as proof of (P0 b0)
% 218.34/218.74 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 218.34/218.74 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found x:(P b)
% 218.34/218.74 Instantiate: b0:=b:Prop
% 218.34/218.74 Found x as proof of (P0 b0)
% 218.34/218.74 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 218.34/218.74 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 218.34/218.74 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 218.34/218.74 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 218.34/218.74 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 218.34/218.74 Found x:(P a)
% 218.34/218.74 Instantiate: b0:=a:Prop
% 218.34/218.74 Found x as proof of (P0 b0)
% 218.34/218.74 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 218.34/218.74 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 218.34/218.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 222.37/222.78 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 222.37/222.78 Found x:(P a)
% 222.37/222.78 Instantiate: b0:=a:Prop
% 222.37/222.78 Found x as proof of (P0 b0)
% 222.37/222.78 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 222.37/222.78 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 222.37/222.78 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 222.37/222.78 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 222.37/222.78 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 222.37/222.78 Found x:(P a)
% 222.37/222.78 Instantiate: b0:=a:Prop
% 222.37/222.78 Found x as proof of (P0 b0)
% 222.37/222.78 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 222.37/222.78 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 222.37/222.78 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 222.37/222.78 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 222.37/222.78 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 222.37/222.78 Found x:(P b)
% 222.37/222.78 Instantiate: b0:=b:Prop
% 222.37/222.78 Found x as proof of (P0 b0)
% 222.37/222.78 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 222.37/222.78 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 222.37/222.78 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 222.37/222.78 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 222.37/222.78 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 222.37/222.78 Found x:(P b)
% 222.37/222.78 Instantiate: b0:=b:Prop
% 222.37/222.78 Found x as proof of (P0 b0)
% 222.37/222.78 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 222.37/222.78 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 222.37/222.78 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 222.37/222.78 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 222.37/222.78 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 222.37/222.78 Found x:(P b)
% 222.37/222.78 Instantiate: b0:=b:Prop
% 222.37/222.78 Found x as proof of (P0 b0)
% 222.37/222.78 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 222.37/222.78 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 222.37/222.78 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 222.37/222.78 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 222.37/222.78 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 222.37/222.78 Found x:(P b)
% 222.37/222.78 Instantiate: b0:=b:Prop
% 222.37/222.78 Found x as proof of (P0 b0)
% 222.37/222.78 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 222.37/222.78 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 222.37/222.78 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 222.37/222.78 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 222.37/222.78 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 222.37/222.78 Found x:(P b)
% 222.37/222.78 Instantiate: b0:=b:Prop
% 222.37/222.78 Found x as proof of (P0 b0)
% 222.37/222.78 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 222.37/222.78 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 222.37/222.78 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 222.37/222.78 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 222.37/222.78 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 222.37/222.78 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 222.37/222.78 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 222.37/222.78 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 222.37/222.78 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 222.37/222.78 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 222.37/222.78 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 222.37/222.78 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 222.37/222.78 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 222.37/222.78 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 222.37/222.78 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 222.37/222.78 Found x3:(P a)
% 222.37/222.78 Found (fun (x3:(P a))=> x3) as proof of (P a)
% 222.37/222.78 Found (fun (x3:(P a))=> x3) as proof of (P0 a)
% 222.37/222.78 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 222.37/222.78 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 222.37/222.78 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 222.37/222.78 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 222.37/222.78 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 222.37/222.78 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 222.37/222.78 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 222.37/222.78 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 222.37/222.78 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 222.37/222.78 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 222.37/222.78 Found x3:(P a)
% 222.37/222.78 Found (fun (x3:(P a))=> x3) as proof of (P a)
% 222.37/222.78 Found (fun (x3:(P a))=> x3) as proof of (P0 a)
% 222.37/222.78 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 222.37/222.78 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 222.37/222.78 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 222.37/222.78 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 222.37/222.78 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 222.37/222.78 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 222.37/222.78 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 222.37/222.78 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 222.37/222.78 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 227.63/228.02 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 227.63/228.02 Found x3:(P a)
% 227.63/228.02 Found (fun (x3:(P a))=> x3) as proof of (P a)
% 227.63/228.02 Found (fun (x3:(P a))=> x3) as proof of (P0 a)
% 227.63/228.02 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 227.63/228.02 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 227.63/228.02 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 227.63/228.02 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 227.63/228.02 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 227.63/228.02 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 227.63/228.02 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 227.63/228.02 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 227.63/228.02 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 227.63/228.02 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 227.63/228.02 Found x3:(P a)
% 227.63/228.02 Found (fun (x3:(P a))=> x3) as proof of (P a)
% 227.63/228.02 Found (fun (x3:(P a))=> x3) as proof of (P0 a)
% 227.63/228.02 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 227.63/228.02 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 227.63/228.02 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 227.63/228.02 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 227.63/228.02 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 227.63/228.02 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 227.63/228.02 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 227.63/228.02 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 227.63/228.02 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 227.63/228.02 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 227.63/228.02 Found x3:(P a)
% 227.63/228.02 Found (fun (x3:(P a))=> x3) as proof of (P a)
% 227.63/228.02 Found (fun (x3:(P a))=> x3) as proof of (P0 a)
% 227.63/228.02 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 227.63/228.02 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 227.63/228.02 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 227.63/228.02 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 227.63/228.02 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 227.63/228.02 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 227.63/228.02 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 227.63/228.02 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 227.63/228.02 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 227.63/228.02 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 227.63/228.02 Found x3:(P a)
% 227.63/228.02 Found (fun (x3:(P a))=> x3) as proof of (P a)
% 227.63/228.02 Found (fun (x3:(P a))=> x3) as proof of (P0 a)
% 227.63/228.02 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 227.63/228.02 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 227.63/228.02 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 227.63/228.02 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 227.63/228.02 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 227.63/228.02 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 227.63/228.02 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 227.63/228.02 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 227.63/228.02 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 227.63/228.02 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 227.63/228.02 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 227.63/228.02 Found (eq_ref0 a0) as proof of (((eq Prop) a0) b0)
% 227.63/228.02 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 227.63/228.02 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 227.63/228.02 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 227.63/228.02 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 227.63/228.02 Found (eq_ref0 b0) as proof of (((eq Prop) b0) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b))))
% 227.63/228.02 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b))))
% 227.63/228.02 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b))))
% 227.63/228.02 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b))))
% 227.63/228.02 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 227.63/228.02 Found (eq_ref0 a0) as proof of (((eq Prop) a0) b0)
% 227.63/228.02 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 227.63/228.02 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 227.63/228.02 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 227.63/228.02 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 227.63/228.02 Found (eq_ref0 b0) as proof of (((eq Prop) b0) (not (g b)))
% 227.63/228.02 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (not (g b)))
% 227.63/228.02 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (not (g b)))
% 227.63/228.02 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (not (g b)))
% 230.52/230.91 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 230.52/230.91 Found (eq_ref0 a0) as proof of (((eq Prop) a0) b0)
% 230.52/230.91 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 230.52/230.91 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 230.52/230.91 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 230.52/230.91 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 230.52/230.91 Found (eq_ref0 b0) as proof of (((eq Prop) b0) (not (p f)))
% 230.52/230.91 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (not (p f)))
% 230.52/230.91 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (not (p f)))
% 230.52/230.91 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) (not (p f)))
% 230.52/230.91 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 230.52/230.91 Found (eq_ref0 a0) as proof of (((eq Prop) a0) (not (g b)))
% 230.52/230.91 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g b)))
% 230.52/230.91 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g b)))
% 230.52/230.91 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g b)))
% 230.52/230.91 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 230.52/230.91 Found (eq_ref0 a0) as proof of (((eq Prop) a0) (not (g b)))
% 230.52/230.91 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g b)))
% 230.52/230.91 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g b)))
% 230.52/230.91 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g b)))
% 230.52/230.91 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 230.52/230.91 Found (eq_ref0 a0) as proof of (((eq Prop) a0) (not (g b)))
% 230.52/230.91 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g b)))
% 230.52/230.91 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g b)))
% 230.52/230.91 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (g b)))
% 230.52/230.91 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 230.52/230.91 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 230.52/230.91 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 230.52/230.91 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 230.52/230.91 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 230.52/230.91 Found x:(P0 b0)
% 230.52/230.91 Instantiate: b0:=a:Prop
% 230.52/230.91 Found (fun (x:(P0 b0))=> x) as proof of (P0 a)
% 230.52/230.91 Found (fun (P0:(Prop->Prop)) (x:(P0 b0))=> x) as proof of ((P0 b0)->(P0 a))
% 230.52/230.91 Found (fun (P0:(Prop->Prop)) (x:(P0 b0))=> x) as proof of (P b0)
% 230.52/230.91 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 230.52/230.91 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 230.52/230.91 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 230.52/230.91 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 230.52/230.91 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 230.52/230.91 Found x:(P0 b0)
% 230.52/230.91 Instantiate: b0:=a:Prop
% 230.52/230.91 Found (fun (x:(P0 b0))=> x) as proof of (P0 a)
% 230.52/230.91 Found (fun (P0:(Prop->Prop)) (x:(P0 b0))=> x) as proof of ((P0 b0)->(P0 a))
% 230.52/230.91 Found (fun (P0:(Prop->Prop)) (x:(P0 b0))=> x) as proof of (P b0)
% 230.52/230.91 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 230.52/230.91 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 230.52/230.91 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 230.52/230.91 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 230.52/230.91 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 230.52/230.91 Found x:(P0 b0)
% 230.52/230.91 Instantiate: b0:=a:Prop
% 230.52/230.91 Found (fun (x:(P0 b0))=> x) as proof of (P0 a)
% 230.52/230.91 Found (fun (P0:(Prop->Prop)) (x:(P0 b0))=> x) as proof of ((P0 b0)->(P0 a))
% 230.52/230.91 Found (fun (P0:(Prop->Prop)) (x:(P0 b0))=> x) as proof of (P b0)
% 230.52/230.91 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 230.52/230.91 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 230.52/230.91 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 230.52/230.91 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 230.52/230.91 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 230.52/230.91 Found x:(P0 b0)
% 230.52/230.91 Instantiate: b0:=a:Prop
% 230.52/230.91 Found (fun (x:(P0 b0))=> x) as proof of (P0 a)
% 230.52/230.91 Found (fun (P0:(Prop->Prop)) (x:(P0 b0))=> x) as proof of ((P0 b0)->(P0 a))
% 230.52/230.91 Found (fun (P0:(Prop->Prop)) (x:(P0 b0))=> x) as proof of (P b0)
% 230.52/230.91 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 230.52/230.91 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 230.52/230.91 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 230.52/230.91 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 230.52/230.91 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 230.52/230.91 Found x:(P0 b0)
% 230.52/230.91 Instantiate: b0:=a:Prop
% 230.52/230.91 Found (fun (x:(P0 b0))=> x) as proof of (P0 a)
% 230.52/230.91 Found (fun (P0:(Prop->Prop)) (x:(P0 b0))=> x) as proof of ((P0 b0)->(P0 a))
% 230.52/230.91 Found (fun (P0:(Prop->Prop)) (x:(P0 b0))=> x) as proof of (P b0)
% 230.52/230.91 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 230.52/230.91 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 230.52/230.91 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 238.35/238.75 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 238.35/238.75 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 238.35/238.75 Found x:(P0 b0)
% 238.35/238.75 Instantiate: b0:=a:Prop
% 238.35/238.75 Found (fun (x:(P0 b0))=> x) as proof of (P0 a)
% 238.35/238.75 Found (fun (P0:(Prop->Prop)) (x:(P0 b0))=> x) as proof of ((P0 b0)->(P0 a))
% 238.35/238.75 Found (fun (P0:(Prop->Prop)) (x:(P0 b0))=> x) as proof of (P b0)
% 238.35/238.75 Found eq_ref00:=(eq_ref0 b00):(((eq Prop) b00) b00)
% 238.35/238.75 Found (eq_ref0 b00) as proof of (((eq Prop) b00) b0)
% 238.35/238.75 Found ((eq_ref Prop) b00) as proof of (((eq Prop) b00) b0)
% 238.35/238.75 Found ((eq_ref Prop) b00) as proof of (((eq Prop) b00) b0)
% 238.35/238.75 Found ((eq_ref Prop) b00) as proof of (((eq Prop) b00) b0)
% 238.35/238.75 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 238.35/238.75 Found (eq_ref0 b) as proof of (((eq Prop) b) b00)
% 238.35/238.75 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b00)
% 238.35/238.75 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b00)
% 238.35/238.75 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b00)
% 238.35/238.75 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 238.35/238.75 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 238.35/238.75 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 238.35/238.75 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 238.35/238.75 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 238.35/238.75 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 238.35/238.75 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 238.35/238.75 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 238.35/238.75 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 238.35/238.75 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 238.35/238.75 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 238.35/238.75 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 238.35/238.75 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 238.35/238.75 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 238.35/238.75 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 238.35/238.75 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 238.35/238.75 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 238.35/238.75 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 238.35/238.75 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 238.35/238.75 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 238.35/238.75 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 238.35/238.75 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 238.35/238.75 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 238.35/238.75 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 238.35/238.75 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 238.35/238.75 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 238.35/238.75 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 238.35/238.75 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 238.35/238.75 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 238.35/238.75 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 238.35/238.75 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 238.35/238.75 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 238.35/238.75 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 238.35/238.75 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 238.35/238.75 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 238.35/238.75 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 238.35/238.75 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 238.35/238.75 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 238.35/238.75 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 238.35/238.75 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 238.35/238.75 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 238.35/238.75 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 238.35/238.75 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 238.35/238.75 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 238.35/238.75 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 238.35/238.75 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 238.35/238.75 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 238.35/238.75 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 238.35/238.75 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 238.35/238.75 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 238.35/238.75 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 241.72/242.11 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 241.72/242.11 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 241.72/242.11 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 241.72/242.11 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 241.72/242.11 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 241.72/242.11 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 241.72/242.11 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 241.72/242.11 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 241.72/242.11 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 241.72/242.11 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 241.72/242.11 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 241.72/242.11 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 241.72/242.11 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 241.72/242.11 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 241.72/242.11 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 241.72/242.11 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 241.72/242.11 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 241.72/242.11 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 241.72/242.11 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 241.72/242.11 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 241.72/242.11 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 241.72/242.11 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 241.72/242.11 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 241.72/242.11 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 241.72/242.11 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 241.72/242.11 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 241.72/242.11 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 241.72/242.11 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 241.72/242.11 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 241.72/242.11 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 241.72/242.11 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 241.72/242.11 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 241.72/242.11 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 241.72/242.11 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 241.72/242.11 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 241.72/242.11 Found (eq_ref0 a0) as proof of (((eq Prop) a0) ((f a)->False))
% 241.72/242.11 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 241.72/242.11 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 241.72/242.11 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) ((f a)->False))
% 241.72/242.11 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 241.72/242.11 Found (eq_ref0 a) as proof of (((eq Prop) a) b1)
% 241.72/242.11 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b1)
% 241.72/242.11 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b1)
% 241.72/242.11 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b1)
% 241.72/242.11 Found eq_ref00:=(eq_ref0 b1):(((eq Prop) b1) b1)
% 241.72/242.11 Found (eq_ref0 b1) as proof of (((eq Prop) b1) b)
% 241.72/242.11 Found ((eq_ref Prop) b1) as proof of (((eq Prop) b1) b)
% 241.72/242.11 Found ((eq_ref Prop) b1) as proof of (((eq Prop) b1) b)
% 241.72/242.11 Found ((eq_ref Prop) b1) as proof of (((eq Prop) b1) b)
% 241.72/242.11 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 241.72/242.11 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 241.72/242.11 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 241.72/242.11 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 241.72/242.11 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 241.72/242.11 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 241.72/242.11 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 241.72/242.11 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 241.72/242.11 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 241.72/242.11 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 241.72/242.11 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 241.72/242.11 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 241.72/242.11 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 241.72/242.11 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 241.72/242.11 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 241.72/242.11 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 241.72/242.11 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 241.72/242.11 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 241.72/242.11 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 241.72/242.11 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 242.96/243.35 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 242.96/243.35 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 242.96/243.35 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 242.96/243.35 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 242.96/243.35 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 242.96/243.35 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 242.96/243.35 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 242.96/243.35 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 242.96/243.35 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 242.96/243.35 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 242.96/243.35 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 242.96/243.35 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 242.96/243.35 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 242.96/243.35 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 242.96/243.35 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 242.96/243.35 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 242.96/243.35 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 242.96/243.35 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 242.96/243.35 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 242.96/243.35 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 242.96/243.35 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 242.96/243.35 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 242.96/243.35 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 242.96/243.35 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 242.96/243.35 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 242.96/243.35 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 242.96/243.35 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 242.96/243.35 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 242.96/243.35 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 242.96/243.35 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 242.96/243.35 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 242.96/243.35 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 242.96/243.35 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 242.96/243.35 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 242.96/243.35 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 242.96/243.35 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 242.96/243.35 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 242.96/243.35 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 242.96/243.35 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 242.96/243.35 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 242.96/243.35 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 242.96/243.35 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 242.96/243.35 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 242.96/243.35 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 242.96/243.35 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 242.96/243.35 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 242.96/243.35 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 242.96/243.35 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 242.96/243.35 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 242.96/243.35 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 242.96/243.35 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 242.96/243.35 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 242.96/243.35 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 242.96/243.35 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 242.96/243.35 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 242.96/243.35 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 242.96/243.35 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 242.96/243.35 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 242.96/243.35 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 242.96/243.35 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 242.96/243.35 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 242.96/243.35 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 242.96/243.35 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 242.96/243.35 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 242.96/243.35 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 242.96/243.35 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 242.96/243.35 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 242.96/243.35 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 242.96/243.35 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 242.96/243.35 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 242.96/243.35 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 242.96/243.35 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 242.96/243.35 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 242.96/243.35 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 242.96/243.35 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 242.96/243.35 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 242.96/243.35 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 242.96/243.35 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 244.21/244.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 244.21/244.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 244.21/244.65 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 244.21/244.65 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 244.21/244.65 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 244.21/244.65 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 244.21/244.65 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 244.21/244.65 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 244.21/244.65 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 244.21/244.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 244.21/244.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 244.21/244.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 244.21/244.65 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 244.21/244.65 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 244.21/244.65 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 244.21/244.65 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 244.21/244.65 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 244.21/244.65 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 244.21/244.65 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 244.21/244.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 244.21/244.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 244.21/244.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 244.21/244.65 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 244.21/244.65 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 244.21/244.65 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 244.21/244.65 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 244.21/244.65 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 244.21/244.65 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 244.21/244.65 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 244.21/244.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 244.21/244.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 244.21/244.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 244.21/244.65 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 244.21/244.65 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 244.21/244.65 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 244.21/244.65 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 244.21/244.65 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 244.21/244.65 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 244.21/244.65 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 244.21/244.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 244.21/244.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 244.21/244.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 244.21/244.65 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 244.21/244.65 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 244.21/244.65 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 244.21/244.65 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 244.21/244.65 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 244.21/244.65 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 244.21/244.65 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 244.21/244.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 244.21/244.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 244.21/244.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 244.21/244.65 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 244.21/244.65 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 244.21/244.65 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 244.21/244.65 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 244.21/244.65 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 244.21/244.65 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 244.21/244.65 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 244.21/244.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 244.21/244.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 244.21/244.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 244.21/244.65 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 244.21/244.65 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 244.21/244.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 244.21/244.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 244.21/244.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 244.21/244.65 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 244.21/244.65 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 244.21/244.65 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 244.21/244.65 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 244.21/244.65 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 244.21/244.65 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 244.21/244.65 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 244.21/244.65 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 244.21/244.65 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 244.21/244.65 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 245.21/245.65 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 245.21/245.65 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 245.21/245.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 245.21/245.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 245.21/245.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 245.21/245.65 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 245.21/245.65 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 245.21/245.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 245.21/245.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 245.21/245.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 245.21/245.65 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 245.21/245.65 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 245.21/245.65 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 245.21/245.65 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 245.21/245.65 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 245.21/245.65 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 245.21/245.65 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 245.21/245.65 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 245.21/245.65 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 245.21/245.65 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 245.21/245.65 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 245.21/245.65 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 245.21/245.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 245.21/245.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 245.21/245.65 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 245.21/245.65 Found classic0:=(classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))):((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) (not ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))))
% 245.21/245.65 Found (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)
% 245.21/245.65 Found (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)
% 245.21/245.65 Found (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)
% 245.21/245.65 Found (or_intror20 (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False)))) as proof of (P ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0))
% 245.21/245.65 Found ((or_intror2 ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)) (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False)))) as proof of (P ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0))
% 245.21/245.65 Found (((or_intror ((g b)->False)) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)) (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False)))) as proof of (P ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0))
% 245.21/245.65 Found (((or_intror ((g b)->False)) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)) (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False)))) as proof of (P ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0))
% 245.21/245.65 Found classic0:=(classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))):((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) (not ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))))
% 245.21/245.65 Found (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)
% 245.21/245.65 Found (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)
% 245.21/245.65 Found (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) as proof of ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)
% 245.21/245.65 Found (or_intror20 (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False)))) as proof of (P ((or ((g b)->False)) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)))
% 245.21/245.65 Found ((or_intror2 ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)) (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False)))) as proof of (P ((or ((g b)->False)) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)))
% 252.30/252.73 Found (((or_intror ((g b)->False)) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)) (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False)))) as proof of (P ((or ((g b)->False)) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)))
% 252.30/252.73 Found (((or_intror ((g b)->False)) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)) (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False)))) as proof of (P ((or ((g b)->False)) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) a0)))
% 252.30/252.73 Found x3:(P b)
% 252.30/252.73 Found (fun (x3:(P b))=> x3) as proof of (P b)
% 252.30/252.73 Found (fun (x3:(P b))=> x3) as proof of (P0 b)
% 252.30/252.73 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 252.30/252.73 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 252.30/252.73 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 252.30/252.73 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 252.30/252.73 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 252.30/252.73 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 252.30/252.73 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 252.30/252.73 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 252.30/252.73 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 252.30/252.73 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 252.30/252.73 Found classic0:=(classic ((or (((eq Prop) a) b)) ((f a)->False))):((or ((or (((eq Prop) a) b)) ((f a)->False))) (not ((or (((eq Prop) a) b)) ((f a)->False))))
% 252.30/252.73 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 252.30/252.73 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 252.30/252.73 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 252.30/252.73 Found (or_intror10 (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 252.30/252.73 Found ((or_intror1 ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 252.30/252.73 Found (((or_intror (not (g a))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 252.30/252.73 Found (((or_intror (not (g a))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 252.30/252.73 Found classic0:=(classic ((or (((eq Prop) a) b)) ((f a)->False))):((or ((or (((eq Prop) a) b)) ((f a)->False))) (not ((or (((eq Prop) a) b)) ((f a)->False))))
% 252.30/252.73 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 252.30/252.73 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 252.30/252.73 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 252.30/252.73 Found (or_intror10 (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 252.30/252.73 Found ((or_intror1 ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 252.30/252.73 Found (((or_intror (not (g a))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 252.30/252.73 Found (((or_intror (not (g a))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 252.30/252.73 Found classic0:=(classic ((or (((eq Prop) a) b)) ((f a)->False))):((or ((or (((eq Prop) a) b)) ((f a)->False))) (not ((or (((eq Prop) a) b)) ((f a)->False))))
% 252.30/252.73 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 252.30/252.73 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 253.52/253.96 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 253.52/253.96 Found (or_intror10 (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 253.52/253.96 Found ((or_intror1 ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 253.52/253.96 Found (((or_intror (not (g a))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 253.52/253.96 Found (((or_intror (not (g a))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 253.52/253.96 Found classic0:=(classic ((or (((eq Prop) a) b)) ((f a)->False))):((or ((or (((eq Prop) a) b)) ((f a)->False))) (not ((or (((eq Prop) a) b)) ((f a)->False))))
% 253.52/253.96 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 253.52/253.96 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 253.52/253.96 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 253.52/253.96 Found (or_intror10 (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or (not (g a))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 253.52/253.96 Found ((or_intror1 ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or (not (g a))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 253.52/253.96 Found (((or_intror (not (g a))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or (not (g a))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 253.52/253.96 Found (((or_intror (not (g a))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or (not (g a))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 253.52/253.96 Found classic0:=(classic ((or (((eq Prop) a) b)) ((f a)->False))):((or ((or (((eq Prop) a) b)) ((f a)->False))) (not ((or (((eq Prop) a) b)) ((f a)->False))))
% 253.52/253.96 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 253.52/253.96 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 253.52/253.96 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 253.52/253.96 Found (or_intror10 (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or (not (g a))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 253.52/253.96 Found ((or_intror1 ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or (not (g a))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 253.52/253.96 Found (((or_intror (not (g a))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or (not (g a))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 253.52/253.96 Found (((or_intror (not (g a))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or (not (g a))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 253.52/253.96 Found classic0:=(classic ((or (((eq Prop) a) b)) ((f a)->False))):((or ((or (((eq Prop) a) b)) ((f a)->False))) (not ((or (((eq Prop) a) b)) ((f a)->False))))
% 253.52/253.96 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 253.52/253.96 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 253.52/253.96 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 253.52/253.96 Found (or_intror10 (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or (not (g a))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 256.03/256.47 Found ((or_intror1 ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or (not (g a))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 256.03/256.47 Found (((or_intror (not (g a))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or (not (g a))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 256.03/256.47 Found (((or_intror (not (g a))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or (not (g a))) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 256.03/256.47 Found x2:(P a)
% 256.03/256.47 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 256.03/256.47 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 256.03/256.47 Found eq_ref00:=(eq_ref0 (((eq Prop) a) b)):(((eq Prop) (((eq Prop) a) b)) (((eq Prop) a) b))
% 256.03/256.47 Found (eq_ref0 (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 256.03/256.47 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 256.03/256.47 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 256.03/256.47 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 256.03/256.47 Found eq_ref00:=(eq_ref0 (((eq Prop) a) b)):(((eq Prop) (((eq Prop) a) b)) (((eq Prop) a) b))
% 256.03/256.47 Found (eq_ref0 (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 256.03/256.47 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 256.03/256.47 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 256.03/256.47 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 256.03/256.47 Found eq_ref00:=(eq_ref0 (((eq Prop) a) b)):(((eq Prop) (((eq Prop) a) b)) (((eq Prop) a) b))
% 256.03/256.47 Found (eq_ref0 (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 256.03/256.47 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 256.03/256.47 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 256.03/256.47 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 256.03/256.47 Found eq_ref00:=(eq_ref0 (((eq Prop) a) b)):(((eq Prop) (((eq Prop) a) b)) (((eq Prop) a) b))
% 256.03/256.47 Found (eq_ref0 (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 256.03/256.47 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 256.03/256.47 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 256.03/256.47 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 256.03/256.47 Found eq_ref00:=(eq_ref0 (((eq Prop) a) b)):(((eq Prop) (((eq Prop) a) b)) (((eq Prop) a) b))
% 256.03/256.47 Found (eq_ref0 (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 256.03/256.47 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 256.03/256.47 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 256.03/256.47 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 256.03/256.47 Found eq_ref00:=(eq_ref0 (((eq Prop) a) b)):(((eq Prop) (((eq Prop) a) b)) (((eq Prop) a) b))
% 256.03/256.47 Found (eq_ref0 (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 256.03/256.47 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 256.03/256.47 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 256.03/256.47 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 256.03/256.47 Found eq_ref00:=(eq_ref0 (((eq Prop) a) b)):(((eq Prop) (((eq Prop) a) b)) (((eq Prop) a) b))
% 256.03/256.47 Found (eq_ref0 (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 256.03/256.47 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 256.03/256.47 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 256.03/256.47 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 256.03/256.47 Found eq_ref00:=(eq_ref0 (((eq Prop) a) b)):(((eq Prop) (((eq Prop) a) b)) (((eq Prop) a) b))
% 256.03/256.47 Found (eq_ref0 (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 256.55/257.01 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 256.55/257.01 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 256.55/257.01 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 256.55/257.01 Found eq_ref00:=(eq_ref0 (((eq Prop) a) b)):(((eq Prop) (((eq Prop) a) b)) (((eq Prop) a) b))
% 256.55/257.01 Found (eq_ref0 (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 256.55/257.01 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 256.55/257.01 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 256.55/257.01 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 256.55/257.01 Found eq_ref00:=(eq_ref0 (((eq Prop) a) b)):(((eq Prop) (((eq Prop) a) b)) (((eq Prop) a) b))
% 256.55/257.01 Found (eq_ref0 (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 256.55/257.01 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 256.55/257.01 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 256.55/257.01 Found ((eq_ref Prop) (((eq Prop) a) b)) as proof of (((eq Prop) (((eq Prop) a) b)) b0)
% 256.55/257.01 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 256.55/257.01 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 256.55/257.01 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 256.55/257.01 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 256.55/257.01 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 256.55/257.01 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 256.55/257.01 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 256.55/257.01 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 256.55/257.01 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 256.55/257.01 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 256.55/257.01 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 256.55/257.01 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 256.55/257.01 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 256.55/257.01 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 256.55/257.01 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 256.55/257.01 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 256.55/257.01 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 256.55/257.01 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 256.55/257.01 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 256.55/257.01 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 256.55/257.01 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 256.55/257.01 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 256.55/257.01 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 256.55/257.01 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 256.55/257.01 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 256.55/257.01 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 256.55/257.01 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 256.55/257.01 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 256.55/257.01 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 256.55/257.01 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 256.55/257.01 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 256.55/257.01 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 256.55/257.01 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 256.55/257.01 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 256.55/257.01 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 256.55/257.01 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 256.55/257.01 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 257.13/257.52 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 257.13/257.52 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 257.13/257.52 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 257.13/257.52 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 257.13/257.52 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 257.13/257.52 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 257.13/257.52 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 257.13/257.52 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 257.13/257.52 Found eq_ref00:=(eq_ref0 ((f a)->False)):(((eq Prop) ((f a)->False)) ((f a)->False))
% 257.13/257.52 Found (eq_ref0 ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 257.13/257.52 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 257.13/257.52 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 257.13/257.52 Found ((eq_ref Prop) ((f a)->False)) as proof of (((eq Prop) ((f a)->False)) b0)
% 257.13/257.52 Found eq_ref00:=(eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))):(((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) ((or (((eq Prop) a) b)) ((f a)->False)))
% 257.13/257.52 Found (eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 257.13/257.52 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 257.13/257.52 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 257.13/257.52 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 257.13/257.52 Found eq_ref00:=(eq_ref0 (not (f b))):(((eq Prop) (not (f b))) (not (f b)))
% 257.13/257.52 Found (eq_ref0 (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 257.13/257.52 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 257.13/257.52 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 257.13/257.52 Found ((eq_ref Prop) (not (f b))) as proof of (((eq Prop) (not (f b))) b0)
% 257.13/257.52 Found eq_ref00:=(eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))):(((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) ((or (((eq Prop) a) b)) ((f a)->False)))
% 257.13/257.52 Found (eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 257.13/257.52 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 257.13/257.52 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 257.13/257.52 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 257.13/257.52 Found eq_ref00:=(eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))):(((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) ((or (((eq Prop) a) b)) ((f a)->False)))
% 257.13/257.52 Found (eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 257.13/257.52 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 257.13/257.52 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 257.13/257.52 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 257.13/257.52 Found eq_ref00:=(eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))):(((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) ((or (((eq Prop) a) b)) ((f a)->False)))
% 257.13/257.52 Found (eq_ref0 ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 257.13/257.52 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 257.13/257.52 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 257.13/257.52 Found ((eq_ref Prop) ((or (((eq Prop) a) b)) ((f a)->False))) as proof of (((eq Prop) ((or (((eq Prop) a) b)) ((f a)->False))) b0)
% 260.18/260.59 Found classic0:=(classic ((g a)->False)):((or ((g a)->False)) (not ((g a)->False)))
% 260.18/260.59 Found (classic ((g a)->False)) as proof of ((or ((g a)->False)) b0)
% 260.18/260.59 Found (classic ((g a)->False)) as proof of ((or ((g a)->False)) b0)
% 260.18/260.59 Found (classic ((g a)->False)) as proof of ((or ((g a)->False)) b0)
% 260.18/260.59 Found (classic ((g a)->False)) as proof of (P b0)
% 260.18/260.59 Found classic0:=(classic ((g b)->False)):((or ((g b)->False)) (not ((g b)->False)))
% 260.18/260.59 Found (classic ((g b)->False)) as proof of ((or ((g b)->False)) b0)
% 260.18/260.59 Found (classic ((g b)->False)) as proof of ((or ((g b)->False)) b0)
% 260.18/260.59 Found (classic ((g b)->False)) as proof of ((or ((g b)->False)) b0)
% 260.18/260.59 Found (classic ((g b)->False)) as proof of (P b0)
% 260.18/260.59 Found classic0:=(classic ((g b)->False)):((or ((g b)->False)) (not ((g b)->False)))
% 260.18/260.59 Found (classic ((g b)->False)) as proof of ((or ((g b)->False)) b0)
% 260.18/260.59 Found (classic ((g b)->False)) as proof of ((or ((g b)->False)) b0)
% 260.18/260.59 Found (classic ((g b)->False)) as proof of ((or ((g b)->False)) b0)
% 260.18/260.59 Found (classic ((g b)->False)) as proof of (P b0)
% 260.18/260.59 Found x:(P a)
% 260.18/260.59 Instantiate: b0:=a:Prop
% 260.18/260.59 Found x as proof of (P0 b0)
% 260.18/260.59 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 260.18/260.59 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 260.18/260.59 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 260.18/260.59 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 260.18/260.59 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 260.18/260.59 Found x:(P a)
% 260.18/260.59 Instantiate: b0:=a:Prop
% 260.18/260.59 Found x as proof of (P0 b0)
% 260.18/260.59 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 260.18/260.59 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 260.18/260.59 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 260.18/260.59 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 260.18/260.59 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 260.18/260.59 Found x:(P a)
% 260.18/260.59 Instantiate: b0:=a:Prop
% 260.18/260.59 Found x as proof of (P0 b0)
% 260.18/260.59 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 260.18/260.59 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 260.18/260.59 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 260.18/260.59 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 260.18/260.59 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 260.18/260.59 Found x:(P a)
% 260.18/260.59 Instantiate: b0:=a:Prop
% 260.18/260.59 Found x as proof of (P0 b0)
% 260.18/260.59 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 260.18/260.59 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 260.18/260.59 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 260.18/260.59 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 260.18/260.59 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 260.18/260.59 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 260.18/260.59 Found (eq_ref0 b) as proof of (((eq Prop) b) b00)
% 260.18/260.59 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b00)
% 260.18/260.59 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b00)
% 260.18/260.59 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b00)
% 260.18/260.59 Found eq_ref00:=(eq_ref0 b00):(((eq Prop) b00) b00)
% 260.18/260.59 Found (eq_ref0 b00) as proof of (((eq Prop) b00) b0)
% 260.18/260.59 Found ((eq_ref Prop) b00) as proof of (((eq Prop) b00) b0)
% 260.18/260.59 Found ((eq_ref Prop) b00) as proof of (((eq Prop) b00) b0)
% 260.18/260.59 Found ((eq_ref Prop) b00) as proof of (((eq Prop) b00) b0)
% 260.18/260.59 Found x:(P a)
% 260.18/260.59 Instantiate: b0:=a:Prop
% 260.18/260.59 Found x as proof of (P0 b0)
% 260.18/260.59 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 260.18/260.59 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 260.18/260.59 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 260.18/260.59 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 260.18/260.59 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 260.18/260.59 Found x:(P a)
% 260.18/260.59 Instantiate: b0:=a:Prop
% 260.18/260.59 Found x as proof of (P0 b0)
% 260.18/260.59 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 260.18/260.59 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 260.18/260.59 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 260.18/260.59 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 260.18/260.59 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 260.18/260.59 Found x:(P a)
% 260.18/260.59 Instantiate: b0:=a:Prop
% 260.18/260.59 Found x as proof of (P0 b0)
% 260.18/260.59 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 260.18/260.59 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 260.18/260.59 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 260.18/260.59 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 260.18/260.59 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 260.18/260.59 Found x:(P a)
% 260.18/260.59 Instantiate: b0:=a:Prop
% 260.18/260.59 Found x as proof of (P0 b0)
% 260.18/260.59 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 260.18/260.59 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 260.18/260.59 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 261.52/261.95 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 261.52/261.95 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 261.52/261.95 Found x:(P b)
% 261.52/261.95 Instantiate: b0:=b:Prop
% 261.52/261.95 Found x as proof of (P0 b0)
% 261.52/261.95 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 261.52/261.95 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 261.52/261.95 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 261.52/261.95 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 261.52/261.95 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 261.52/261.95 Found x:(P a)
% 261.52/261.95 Instantiate: b0:=a:Prop
% 261.52/261.95 Found x as proof of (P0 b0)
% 261.52/261.95 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 261.52/261.95 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 261.52/261.95 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 261.52/261.95 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 261.52/261.95 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 261.52/261.95 Found x:(P a)
% 261.52/261.95 Instantiate: b0:=a:Prop
% 261.52/261.95 Found x as proof of (P0 b0)
% 261.52/261.95 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 261.52/261.95 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 261.52/261.95 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 261.52/261.95 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 261.52/261.95 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 261.52/261.95 Found x:(P a)
% 261.52/261.95 Instantiate: b0:=a:Prop
% 261.52/261.95 Found x as proof of (P0 b0)
% 261.52/261.95 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 261.52/261.95 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 261.52/261.95 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 261.52/261.95 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 261.52/261.95 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 261.52/261.95 Found x:(P a)
% 261.52/261.95 Instantiate: b0:=a:Prop
% 261.52/261.95 Found x as proof of (P0 b0)
% 261.52/261.95 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 261.52/261.95 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 261.52/261.95 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 261.52/261.95 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 261.52/261.95 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 261.52/261.95 Found x:(P a)
% 261.52/261.95 Instantiate: b0:=a:Prop
% 261.52/261.95 Found x as proof of (P0 b0)
% 261.52/261.95 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 261.52/261.95 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 261.52/261.95 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 261.52/261.95 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 261.52/261.95 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 261.52/261.95 Found x:(P a)
% 261.52/261.95 Instantiate: b0:=a:Prop
% 261.52/261.95 Found x as proof of (P0 b0)
% 261.52/261.95 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 261.52/261.95 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 261.52/261.95 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 261.52/261.95 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 261.52/261.95 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 261.52/261.95 Found x:(P a)
% 261.52/261.95 Instantiate: b0:=a:Prop
% 261.52/261.95 Found x as proof of (P0 b0)
% 261.52/261.95 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 261.52/261.95 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 261.52/261.95 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 261.52/261.95 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 261.52/261.95 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 261.52/261.95 Found x2:(P a)
% 261.52/261.95 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 261.52/261.95 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 261.52/261.95 Found x:(P b)
% 261.52/261.95 Instantiate: b0:=b:Prop
% 261.52/261.95 Found x as proof of (P0 b0)
% 261.52/261.95 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 261.52/261.95 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 261.52/261.95 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 261.52/261.95 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 261.52/261.95 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 261.52/261.95 Found x:(P b)
% 261.52/261.95 Instantiate: b0:=b:Prop
% 261.52/261.95 Found x as proof of (P0 b0)
% 261.52/261.95 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 261.52/261.95 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 261.52/261.95 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 261.52/261.95 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 261.52/261.95 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 261.52/261.95 Found x:(P b)
% 261.52/261.95 Instantiate: b0:=b:Prop
% 261.52/261.95 Found x as proof of (P0 b0)
% 261.52/261.95 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 261.52/261.95 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 261.52/261.95 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 261.52/261.95 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 261.52/261.95 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 261.52/261.95 Found x2:(P a)
% 261.52/261.95 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 261.52/261.95 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 261.52/261.95 Found x2:(P a)
% 261.52/261.95 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 261.52/261.95 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 261.52/261.95 Found x2:(P a)
% 261.52/261.95 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 263.93/264.38 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 263.93/264.38 Found x2:(P a)
% 263.93/264.38 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 263.93/264.38 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 263.93/264.38 Found x2:(P a)
% 263.93/264.38 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 263.93/264.38 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 263.93/264.38 Found x2:(P a)
% 263.93/264.38 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 263.93/264.38 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 263.93/264.38 Found x2:(P a)
% 263.93/264.38 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 263.93/264.38 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 263.93/264.38 Found x2:(P a)
% 263.93/264.38 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 263.93/264.38 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 263.93/264.38 Found x2:(P a)
% 263.93/264.38 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 263.93/264.38 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 263.93/264.38 Found x:(P b)
% 263.93/264.38 Instantiate: b0:=b:Prop
% 263.93/264.38 Found x as proof of (P0 b0)
% 263.93/264.38 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 263.93/264.38 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 263.93/264.38 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 263.93/264.38 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 263.93/264.38 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 263.93/264.38 Found x:(P b)
% 263.93/264.38 Instantiate: b0:=b:Prop
% 263.93/264.38 Found x as proof of (P0 b0)
% 263.93/264.38 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 263.93/264.38 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 263.93/264.38 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 263.93/264.38 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 263.93/264.38 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 263.93/264.38 Found x2:(P a)
% 263.93/264.38 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 263.93/264.38 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 263.93/264.38 Found x2:(P a)
% 263.93/264.38 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 263.93/264.38 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 263.93/264.38 Found x2:(P a)
% 263.93/264.38 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 263.93/264.38 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 263.93/264.38 Found x2:(P a)
% 263.93/264.38 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 263.93/264.38 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 263.93/264.38 Found x2:(P a)
% 263.93/264.38 Found (fun (x2:(P a))=> x2) as proof of (P a)
% 263.93/264.38 Found (fun (x2:(P a))=> x2) as proof of (P0 a)
% 263.93/264.38 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 263.93/264.38 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 263.93/264.38 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 263.93/264.38 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 263.93/264.38 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 263.93/264.38 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 263.93/264.38 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 263.93/264.38 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 263.93/264.38 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 263.93/264.38 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 263.93/264.38 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 263.93/264.38 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 263.93/264.38 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 263.93/264.38 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 263.93/264.38 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 263.93/264.38 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 263.93/264.38 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 263.93/264.38 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 263.93/264.38 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 263.93/264.38 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 263.93/264.38 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 263.93/264.38 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 263.93/264.38 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 263.93/264.38 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 263.93/264.38 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 263.93/264.38 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 263.93/264.38 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 263.93/264.38 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 263.93/264.38 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 263.93/264.38 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 263.93/264.38 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 263.93/264.38 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 263.93/264.38 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 263.93/264.38 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 263.93/264.38 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 263.93/264.38 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 263.93/264.38 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 263.93/264.38 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 263.93/264.38 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 263.93/264.38 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 263.93/264.38 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 263.93/264.38 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 265.37/265.86 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 265.37/265.86 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 265.37/265.86 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 265.37/265.86 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 265.37/265.86 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 265.37/265.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 265.37/265.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 265.37/265.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 265.37/265.86 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 265.37/265.86 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 265.37/265.86 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 265.37/265.86 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 265.37/265.86 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 265.37/265.86 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 265.37/265.86 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 265.37/265.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 265.37/265.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 265.37/265.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 265.37/265.86 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 265.37/265.86 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 265.37/265.86 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 265.37/265.86 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 265.37/265.86 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 265.37/265.86 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 265.37/265.86 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 265.37/265.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 265.37/265.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 265.37/265.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 265.37/265.86 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 265.37/265.86 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 265.37/265.86 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 265.37/265.86 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 265.37/265.86 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 265.37/265.86 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 265.37/265.86 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 265.37/265.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 265.37/265.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 265.37/265.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 265.37/265.86 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 265.37/265.86 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 265.37/265.86 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 265.37/265.86 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 265.37/265.86 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 265.37/265.86 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 265.37/265.86 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 265.37/265.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 265.37/265.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 265.37/265.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 265.37/265.86 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 265.37/265.86 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 265.37/265.86 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 265.37/265.86 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 265.37/265.86 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 265.37/265.86 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 265.37/265.86 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 265.37/265.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 265.37/265.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 265.37/265.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 265.37/265.86 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 265.37/265.86 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 265.37/265.86 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 265.37/265.86 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 265.37/265.86 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 265.37/265.86 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 265.37/265.86 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 265.37/265.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 265.37/265.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 265.37/265.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 265.37/265.86 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 265.37/265.86 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 265.37/265.86 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 265.37/265.86 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 265.37/265.86 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 265.37/265.86 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 265.37/265.86 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 265.37/265.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 265.37/265.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 265.37/265.86 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 270.72/271.19 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 270.72/271.19 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 270.72/271.19 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 270.72/271.19 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 270.72/271.19 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 270.72/271.19 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 270.72/271.19 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 270.72/271.19 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 270.72/271.19 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 270.72/271.19 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 270.72/271.19 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 270.72/271.19 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 270.72/271.19 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 270.72/271.19 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 270.72/271.19 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 270.72/271.19 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 270.72/271.19 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 270.72/271.19 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 270.72/271.19 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 270.72/271.19 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 270.72/271.19 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 270.72/271.19 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 270.72/271.19 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 270.72/271.19 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 270.72/271.19 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 270.72/271.19 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 270.72/271.19 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 270.72/271.19 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 270.72/271.19 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 270.72/271.19 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 270.72/271.19 Found classic0:=(classic (((eq Prop) a) b)):((or (((eq Prop) a) b)) (not (((eq Prop) a) b)))
% 270.72/271.19 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 270.72/271.19 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 270.72/271.19 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 270.72/271.19 Found (or_intror10 (classic (((eq Prop) a) b))) as proof of (P ((or (((eq Prop) a) b)) a0))
% 270.72/271.19 Found ((or_intror1 ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (((eq Prop) a) b)) a0))
% 270.72/271.19 Found (((or_intror (not (f b))) ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (((eq Prop) a) b)) a0))
% 270.72/271.19 Found (((or_intror (not (f b))) ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (((eq Prop) a) b)) a0))
% 270.72/271.19 Found classic0:=(classic (((eq Prop) a) b)):((or (((eq Prop) a) b)) (not (((eq Prop) a) b)))
% 270.72/271.19 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 270.72/271.19 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 270.72/271.19 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 270.72/271.19 Found (or_intror10 (classic (((eq Prop) a) b))) as proof of (P ((or (((eq Prop) a) b)) a0))
% 270.72/271.19 Found ((or_intror1 ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (((eq Prop) a) b)) a0))
% 270.72/271.19 Found (((or_intror (not (f b))) ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (((eq Prop) a) b)) a0))
% 270.72/271.19 Found (((or_intror (not (f b))) ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (((eq Prop) a) b)) a0))
% 270.72/271.19 Found classic0:=(classic (((eq Prop) a) b)):((or (((eq Prop) a) b)) (not (((eq Prop) a) b)))
% 270.72/271.19 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 270.72/271.19 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 270.72/271.19 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 270.72/271.19 Found (or_intror10 (classic (((eq Prop) a) b))) as proof of (P ((or (((eq Prop) a) b)) a0))
% 270.72/271.19 Found ((or_intror1 ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (((eq Prop) a) b)) a0))
% 270.72/271.19 Found (((or_intror (not (f b))) ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (((eq Prop) a) b)) a0))
% 270.72/271.19 Found (((or_intror (not (f b))) ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (((eq Prop) a) b)) a0))
% 270.72/271.19 Found classic0:=(classic (((eq Prop) a) b)):((or (((eq Prop) a) b)) (not (((eq Prop) a) b)))
% 270.72/271.19 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 271.39/271.86 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 271.39/271.86 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 271.39/271.86 Found (or_intror10 (classic (((eq Prop) a) b))) as proof of (P ((or (((eq Prop) a) b)) a0))
% 271.39/271.86 Found ((or_intror1 ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (((eq Prop) a) b)) a0))
% 271.39/271.86 Found (((or_intror (not (f b))) ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (((eq Prop) a) b)) a0))
% 271.39/271.86 Found (((or_intror (not (f b))) ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (((eq Prop) a) b)) a0))
% 271.39/271.86 Found classic0:=(classic (((eq Prop) a) b)):((or (((eq Prop) a) b)) (not (((eq Prop) a) b)))
% 271.39/271.86 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 271.39/271.86 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 271.39/271.86 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 271.39/271.86 Found (or_intror10 (classic (((eq Prop) a) b))) as proof of (P ((or (not (f b))) ((or (((eq Prop) a) b)) a0)))
% 271.39/271.86 Found ((or_intror1 ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (not (f b))) ((or (((eq Prop) a) b)) a0)))
% 271.39/271.86 Found (((or_intror (not (f b))) ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (not (f b))) ((or (((eq Prop) a) b)) a0)))
% 271.39/271.86 Found (((or_intror (not (f b))) ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (not (f b))) ((or (((eq Prop) a) b)) a0)))
% 271.39/271.86 Found classic0:=(classic (((eq Prop) a) b)):((or (((eq Prop) a) b)) (not (((eq Prop) a) b)))
% 271.39/271.86 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 271.39/271.86 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 271.39/271.86 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 271.39/271.86 Found (or_intror10 (classic (((eq Prop) a) b))) as proof of (P ((or (not (f b))) ((or (((eq Prop) a) b)) a0)))
% 271.39/271.86 Found ((or_intror1 ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (not (f b))) ((or (((eq Prop) a) b)) a0)))
% 271.39/271.86 Found (((or_intror (not (f b))) ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (not (f b))) ((or (((eq Prop) a) b)) a0)))
% 271.39/271.86 Found (((or_intror (not (f b))) ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (not (f b))) ((or (((eq Prop) a) b)) a0)))
% 271.39/271.86 Found classic0:=(classic (((eq Prop) a) b)):((or (((eq Prop) a) b)) (not (((eq Prop) a) b)))
% 271.39/271.86 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 271.39/271.86 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 271.39/271.86 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 271.39/271.86 Found (or_intror10 (classic (((eq Prop) a) b))) as proof of (P ((or (not (f b))) ((or (((eq Prop) a) b)) a0)))
% 271.39/271.86 Found ((or_intror1 ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (not (f b))) ((or (((eq Prop) a) b)) a0)))
% 271.39/271.86 Found (((or_intror (not (f b))) ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (not (f b))) ((or (((eq Prop) a) b)) a0)))
% 271.39/271.86 Found (((or_intror (not (f b))) ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (not (f b))) ((or (((eq Prop) a) b)) a0)))
% 271.39/271.86 Found classic0:=(classic (((eq Prop) a) b)):((or (((eq Prop) a) b)) (not (((eq Prop) a) b)))
% 271.39/271.86 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 271.39/271.86 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 271.39/271.86 Found (classic (((eq Prop) a) b)) as proof of ((or (((eq Prop) a) b)) a0)
% 271.39/271.86 Found (or_intror10 (classic (((eq Prop) a) b))) as proof of (P ((or (not (f b))) ((or (((eq Prop) a) b)) a0)))
% 271.39/271.86 Found ((or_intror1 ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (not (f b))) ((or (((eq Prop) a) b)) a0)))
% 271.39/271.86 Found (((or_intror (not (f b))) ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (not (f b))) ((or (((eq Prop) a) b)) a0)))
% 271.39/271.86 Found (((or_intror (not (f b))) ((or (((eq Prop) a) b)) a0)) (classic (((eq Prop) a) b))) as proof of (P ((or (not (f b))) ((or (((eq Prop) a) b)) a0)))
% 277.52/277.97 Found classic0:=(classic ((or (((eq Prop) a) b)) ((f a)->False))):((or ((or (((eq Prop) a) b)) ((f a)->False))) (not ((or (((eq Prop) a) b)) ((f a)->False))))
% 277.52/277.97 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 277.52/277.97 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 277.52/277.97 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 277.52/277.97 Found (or_intror20 (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 277.52/277.97 Found ((or_intror2 ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 277.52/277.97 Found (((or_intror ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 277.52/277.97 Found (((or_intror ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 277.52/277.97 Found classic0:=(classic ((or (((eq Prop) a) b)) ((f a)->False))):((or ((or (((eq Prop) a) b)) ((f a)->False))) (not ((or (((eq Prop) a) b)) ((f a)->False))))
% 277.52/277.97 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 277.52/277.97 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 277.52/277.97 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 277.52/277.97 Found (or_intror20 (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 277.52/277.97 Found ((or_intror2 ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 277.52/277.97 Found (((or_intror ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 277.52/277.97 Found (((or_intror ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 277.52/277.97 Found classic0:=(classic ((or (((eq Prop) a) b)) ((f a)->False))):((or ((or (((eq Prop) a) b)) ((f a)->False))) (not ((or (((eq Prop) a) b)) ((f a)->False))))
% 277.52/277.97 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 277.52/277.97 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 277.52/277.97 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 277.52/277.97 Found (or_intror20 (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 277.52/277.97 Found ((or_intror2 ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 277.52/277.97 Found (((or_intror ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 277.52/277.97 Found (((or_intror ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0))
% 277.52/277.97 Found classic0:=(classic ((or (((eq Prop) a) b)) ((f a)->False))):((or ((or (((eq Prop) a) b)) ((f a)->False))) (not ((or (((eq Prop) a) b)) ((f a)->False))))
% 277.52/277.97 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 277.52/277.97 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 277.76/278.20 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 277.76/278.20 Found (or_intror20 (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 277.76/278.20 Found ((or_intror2 ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 277.76/278.20 Found (((or_intror ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 277.76/278.20 Found (((or_intror ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 277.76/278.20 Found classic0:=(classic ((or (((eq Prop) a) b)) ((f a)->False))):((or ((or (((eq Prop) a) b)) ((f a)->False))) (not ((or (((eq Prop) a) b)) ((f a)->False))))
% 277.76/278.20 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 277.76/278.20 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 277.76/278.20 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 277.76/278.20 Found (or_intror20 (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 277.76/278.20 Found ((or_intror2 ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 277.76/278.20 Found (((or_intror ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 277.76/278.20 Found (((or_intror ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 277.76/278.20 Found classic0:=(classic ((or (((eq Prop) a) b)) ((f a)->False))):((or ((or (((eq Prop) a) b)) ((f a)->False))) (not ((or (((eq Prop) a) b)) ((f a)->False))))
% 277.76/278.20 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 277.76/278.20 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 277.76/278.20 Found (classic ((or (((eq Prop) a) b)) ((f a)->False))) as proof of ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)
% 277.76/278.20 Found (or_intror20 (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 277.76/278.20 Found ((or_intror2 ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 277.76/278.20 Found (((or_intror ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 277.76/278.20 Found (((or_intror ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)) (classic ((or (((eq Prop) a) b)) ((f a)->False)))) as proof of (P ((or ((g a)->False)) ((or ((or (((eq Prop) a) b)) ((f a)->False))) a0)))
% 277.76/278.20 Found classic0:=(classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))):((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))))
% 277.76/278.20 Found (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)
% 277.76/278.20 Found (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)
% 279.01/279.44 Found (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)
% 279.01/279.44 Found (or_intror10 (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b))))) as proof of (P ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0))
% 279.01/279.44 Found ((or_intror1 ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)) (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b))))) as proof of (P ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0))
% 279.01/279.44 Found (((or_intror (not (g b))) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)) (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b))))) as proof of (P ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0))
% 279.01/279.44 Found (((or_intror (not (g b))) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)) (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b))))) as proof of (P ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0))
% 279.01/279.44 Found classic0:=(classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))):((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))))
% 279.01/279.44 Found (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)
% 279.01/279.44 Found (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)
% 279.01/279.44 Found (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)
% 279.01/279.44 Found (or_intror10 (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b))))) as proof of (P ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0))
% 279.01/279.44 Found ((or_intror1 ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)) (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b))))) as proof of (P ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0))
% 279.01/279.44 Found (((or_intror (not (g b))) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)) (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b))))) as proof of (P ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0))
% 279.01/279.44 Found (((or_intror (not (g b))) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)) (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b))))) as proof of (P ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0))
% 279.01/279.44 Found classic0:=(classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))):((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))))
% 279.01/279.44 Found (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)
% 279.01/279.44 Found (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)
% 279.01/279.44 Found (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)
% 279.01/279.44 Found (or_intror10 (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b))))) as proof of (P ((or (not (g b))) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)))
% 279.01/279.44 Found ((or_intror1 ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)) (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b))))) as proof of (P ((or (not (g b))) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)))
% 279.01/279.44 Found (((or_intror (not (g b))) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)) (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b))))) as proof of (P ((or (not (g b))) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)))
% 282.40/282.85 Found (((or_intror (not (g b))) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)) (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b))))) as proof of (P ((or (not (g b))) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)))
% 282.40/282.85 Found classic0:=(classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))):((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))))
% 282.40/282.85 Found (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)
% 282.40/282.85 Found (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)
% 282.40/282.85 Found (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) as proof of ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)
% 282.40/282.85 Found (or_intror10 (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b))))) as proof of (P ((or (not (g b))) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)))
% 282.40/282.85 Found ((or_intror1 ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)) (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b))))) as proof of (P ((or (not (g b))) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)))
% 282.40/282.85 Found (((or_intror (not (g b))) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)) (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b))))) as proof of (P ((or (not (g b))) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)))
% 282.40/282.85 Found (((or_intror (not (g b))) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)) (classic ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b))))) as proof of (P ((or (not (g b))) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) a0)))
% 282.40/282.85 Found classic0:=(classic (not (g a))):((or (not (g a))) (not (not (g a))))
% 282.40/282.85 Found (classic (not (g a))) as proof of ((or (not (g a))) b0)
% 282.40/282.85 Found (classic (not (g a))) as proof of ((or (not (g a))) b0)
% 282.40/282.85 Found (classic (not (g a))) as proof of ((or (not (g a))) b0)
% 282.40/282.85 Found (classic (not (g a))) as proof of (P b0)
% 282.40/282.85 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 282.40/282.85 Found (eq_ref0 a0) as proof of (((eq Prop) a0) b0)
% 282.40/282.85 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 282.40/282.85 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 282.40/282.85 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 282.40/282.85 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 282.40/282.85 Found (eq_ref0 b0) as proof of (((eq Prop) b0) ((g a)->False))
% 282.40/282.85 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) ((g a)->False))
% 282.40/282.85 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) ((g a)->False))
% 282.40/282.85 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) ((g a)->False))
% 282.40/282.85 Found classic0:=(classic (not (g b))):((or (not (g b))) (not (not (g b))))
% 282.40/282.85 Found (classic (not (g b))) as proof of ((or (not (g b))) b0)
% 282.40/282.85 Found (classic (not (g b))) as proof of ((or (not (g b))) b0)
% 282.40/282.85 Found (classic (not (g b))) as proof of ((or (not (g b))) b0)
% 282.40/282.85 Found (classic (not (g b))) as proof of (P b0)
% 282.40/282.85 Found classic0:=(classic (not (g b))):((or (not (g b))) (not (not (g b))))
% 282.40/282.85 Found (classic (not (g b))) as proof of ((or (not (g b))) b0)
% 282.40/282.85 Found (classic (not (g b))) as proof of ((or (not (g b))) b0)
% 282.40/282.85 Found (classic (not (g b))) as proof of ((or (not (g b))) b0)
% 282.40/282.85 Found (classic (not (g b))) as proof of (P b0)
% 282.40/282.85 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 282.40/282.85 Found (eq_ref0 a0) as proof of (((eq Prop) a0) b0)
% 282.40/282.85 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 282.40/282.85 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 282.40/282.85 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 282.40/282.85 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 282.40/282.85 Found (eq_ref0 b0) as proof of (((eq Prop) b0) ((g b)->False))
% 282.40/282.85 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) ((g b)->False))
% 285.61/286.07 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) ((g b)->False))
% 285.61/286.07 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) ((g b)->False))
% 285.61/286.07 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 285.61/286.07 Found (eq_ref0 a0) as proof of (((eq Prop) a0) b0)
% 285.61/286.07 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 285.61/286.07 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 285.61/286.07 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 285.61/286.07 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 285.61/286.07 Found (eq_ref0 b0) as proof of (((eq Prop) b0) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False)))
% 285.61/286.07 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False)))
% 285.61/286.07 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False)))
% 285.61/286.07 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False))) ((g b)->False)))
% 285.61/286.07 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 285.61/286.07 Found (eq_ref0 a0) as proof of (((eq Prop) a0) b0)
% 285.61/286.07 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 285.61/286.07 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 285.61/286.07 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 285.61/286.07 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 285.61/286.07 Found (eq_ref0 b0) as proof of (((eq Prop) b0) ((g b)->False))
% 285.61/286.07 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) ((g b)->False))
% 285.61/286.07 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) ((g b)->False))
% 285.61/286.07 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) ((g b)->False))
% 285.61/286.07 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 285.61/286.07 Found (eq_ref0 a0) as proof of (((eq Prop) a0) b0)
% 285.61/286.07 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 285.61/286.07 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 285.61/286.07 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) b0)
% 285.61/286.07 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 285.61/286.07 Found (eq_ref0 b0) as proof of (((eq Prop) b0) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False)))
% 285.61/286.07 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False)))
% 285.61/286.07 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False)))
% 285.61/286.07 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) ((f b)->False))) ((g a)->False)))
% 285.61/286.07 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 285.61/286.07 Found (eq_ref0 a0) as proof of (((eq Prop) a0) (not (f b)))
% 285.61/286.07 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 285.61/286.07 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 285.61/286.07 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 285.61/286.07 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 285.61/286.07 Found (eq_ref0 a0) as proof of (((eq Prop) a0) (not (f b)))
% 285.61/286.07 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 285.61/286.07 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 285.61/286.07 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 285.61/286.07 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 285.61/286.07 Found (eq_ref0 a0) as proof of (((eq Prop) a0) (not (f b)))
% 285.61/286.07 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 285.61/286.07 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 285.61/286.07 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 285.61/286.07 Found classic0:=(classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))):((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))))
% 285.61/286.07 Found (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) as proof of ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) b0)
% 285.61/286.07 Found (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) as proof of ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) b0)
% 291.30/291.74 Found (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) as proof of ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) b0)
% 291.30/291.74 Found (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) as proof of (P b0)
% 291.30/291.74 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 291.30/291.74 Found (eq_ref0 a0) as proof of (((eq Prop) a0) (not (f b)))
% 291.30/291.74 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 291.30/291.74 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 291.30/291.74 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 291.30/291.74 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 291.30/291.74 Found (eq_ref0 a0) as proof of (((eq Prop) a0) (not (f b)))
% 291.30/291.74 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 291.30/291.74 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 291.30/291.74 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 291.30/291.74 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 291.30/291.74 Found (eq_ref0 a0) as proof of (((eq Prop) a0) (not (f b)))
% 291.30/291.74 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 291.30/291.74 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 291.30/291.74 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 291.30/291.74 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 291.30/291.74 Found (eq_ref0 a0) as proof of (((eq Prop) a0) (not (f b)))
% 291.30/291.74 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 291.30/291.74 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 291.30/291.74 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 291.30/291.74 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 291.30/291.74 Found (eq_ref0 a0) as proof of (((eq Prop) a0) (not (f b)))
% 291.30/291.74 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 291.30/291.74 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 291.30/291.74 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 291.30/291.74 Found eq_ref00:=(eq_ref0 a0):(((eq Prop) a0) a0)
% 291.30/291.74 Found (eq_ref0 a0) as proof of (((eq Prop) a0) (not (f b)))
% 291.30/291.74 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 291.30/291.74 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 291.30/291.74 Found ((eq_ref Prop) a0) as proof of (((eq Prop) a0) (not (f b)))
% 291.30/291.74 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 291.30/291.74 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 291.30/291.74 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 291.30/291.74 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 291.30/291.74 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 291.30/291.74 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 291.30/291.74 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 291.30/291.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 291.30/291.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 291.30/291.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 291.30/291.74 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 291.30/291.74 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 291.30/291.74 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 291.30/291.74 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 291.30/291.74 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 291.30/291.74 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 291.30/291.74 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 291.30/291.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 291.30/291.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 291.30/291.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 291.30/291.74 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 291.30/291.74 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 291.30/291.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 291.30/291.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 291.30/291.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 291.30/291.74 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 291.30/291.74 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 291.30/291.74 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 291.30/291.74 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 291.30/291.74 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 291.30/291.74 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 291.30/291.74 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 291.30/291.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 291.30/291.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 291.30/291.74 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 291.30/291.74 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 291.30/291.74 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 292.80/293.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 292.80/293.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 292.80/293.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 292.80/293.24 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 292.80/293.24 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 292.80/293.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 292.80/293.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 292.80/293.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 292.80/293.24 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 292.80/293.24 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 292.80/293.24 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 292.80/293.24 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 292.80/293.24 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 292.80/293.24 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 292.80/293.24 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 292.80/293.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 292.80/293.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 292.80/293.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 292.80/293.24 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 292.80/293.24 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 292.80/293.24 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 292.80/293.24 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 292.80/293.24 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 292.80/293.24 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 292.80/293.24 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 292.80/293.24 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 292.80/293.24 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 292.80/293.24 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 292.80/293.24 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 292.80/293.24 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 292.80/293.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 292.80/293.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 292.80/293.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 292.80/293.24 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 292.80/293.24 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 292.80/293.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 292.80/293.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 292.80/293.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 292.80/293.24 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 292.80/293.24 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 292.80/293.24 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 292.80/293.24 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 292.80/293.24 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 292.80/293.24 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 292.80/293.24 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 292.80/293.24 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 292.80/293.24 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 292.80/293.24 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 292.80/293.24 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 292.80/293.24 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 292.80/293.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 292.80/293.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 292.80/293.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 292.80/293.24 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 292.80/293.24 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 292.80/293.24 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 292.80/293.24 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 292.80/293.24 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 292.80/293.24 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 292.80/293.24 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 292.80/293.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 292.80/293.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 292.80/293.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 292.80/293.24 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 292.80/293.24 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 292.80/293.24 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 292.80/293.24 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 292.80/293.24 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 292.80/293.24 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 292.80/293.24 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 292.80/293.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 292.80/293.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 292.80/293.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 292.80/293.24 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 292.80/293.24 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 292.80/293.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 292.80/293.24 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 295.35/295.87 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 295.35/295.87 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 295.35/295.87 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 295.35/295.87 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 295.35/295.87 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 295.35/295.87 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 295.35/295.87 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 295.35/295.87 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 295.35/295.87 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 295.35/295.87 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 295.35/295.87 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 295.35/295.87 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 295.35/295.87 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 295.35/295.87 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 295.35/295.87 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 295.35/295.87 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 295.35/295.87 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 295.35/295.87 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 295.35/295.87 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 295.35/295.87 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 295.35/295.87 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 295.35/295.87 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 295.35/295.87 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 295.35/295.87 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 295.35/295.87 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 295.35/295.87 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 295.35/295.87 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 295.35/295.87 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 295.35/295.87 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 295.35/295.87 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 295.35/295.87 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 295.35/295.87 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 295.35/295.87 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 295.35/295.87 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 295.35/295.87 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 295.35/295.87 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 295.35/295.87 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 295.35/295.87 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 295.35/295.87 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 295.35/295.87 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 295.35/295.87 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 295.35/295.87 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 295.35/295.87 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 295.35/295.87 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 295.35/295.87 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 295.35/295.87 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 295.35/295.87 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 295.35/295.87 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 295.35/295.87 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 295.35/295.87 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 295.35/295.87 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 295.35/295.87 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 295.35/295.87 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 295.35/295.87 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 295.35/295.87 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 295.35/295.87 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 295.35/295.87 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 295.35/295.87 Found (eq_ref0 b0) as proof of (((eq Prop) b0) a)
% 295.35/295.87 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 295.35/295.87 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 295.35/295.87 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) a)
% 295.35/295.87 Found eq_ref00:=(eq_ref0 b):(((eq Prop) b) b)
% 295.35/295.87 Found (eq_ref0 b) as proof of (((eq Prop) b) b0)
% 295.35/295.87 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 295.35/295.87 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 295.35/295.87 Found ((eq_ref Prop) b) as proof of (((eq Prop) b) b0)
% 295.35/295.87 Found classic0:=(classic ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))):((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) (not ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))))
% 295.35/295.87 Found (classic ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) as proof of ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) b0)
% 295.35/295.87 Found (classic ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) as proof of ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) b0)
% 299.51/299.99 Found (classic ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) as proof of ((or ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) b0)
% 299.51/299.99 Found (classic ((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not (g b)))) as proof of (P b0)
% 299.51/299.99 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 299.51/299.99 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 299.51/299.99 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 299.51/299.99 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 299.51/299.99 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 299.51/299.99 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 299.51/299.99 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 299.51/299.99 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 299.51/299.99 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 299.51/299.99 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 299.51/299.99 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 299.51/299.99 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 299.51/299.99 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 299.51/299.99 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 299.51/299.99 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 299.51/299.99 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 299.51/299.99 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 299.51/299.99 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 299.51/299.99 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 299.51/299.99 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 299.51/299.99 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 299.51/299.99 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 299.51/299.99 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 299.51/299.99 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 299.51/299.99 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 299.51/299.99 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 299.51/299.99 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 299.51/299.99 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 299.51/299.99 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 299.51/299.99 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 299.51/299.99 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 299.51/299.99 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 299.51/299.99 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 299.51/299.99 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 299.51/299.99 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 299.51/299.99 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 299.51/299.99 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 299.51/299.99 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 299.51/299.99 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 299.51/299.99 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 299.51/299.99 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 299.51/299.99 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 299.51/299.99 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 299.51/299.99 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 299.51/299.99 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 299.51/299.99 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 299.51/299.99 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 299.51/299.99 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 299.51/299.99 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 299.51/299.99 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 299.51/299.99 Found eq_ref00:=(eq_ref0 a):(((eq Prop) a) a)
% 299.51/299.99 Found (eq_ref0 a) as proof of (((eq Prop) a) b0)
% 299.51/299.99 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 299.51/299.99 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 299.51/299.99 Found ((eq_ref Prop) a) as proof of (((eq Prop) a) b0)
% 299.51/299.99 Found eq_ref00:=(eq_ref0 b0):(((eq Prop) b0) b0)
% 299.51/299.99 Found (eq_ref0 b0) as proof of (((eq Prop) b0) b)
% 299.51/299.99 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 299.51/299.99 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 299.51/299.99 Found ((eq_ref Prop) b0) as proof of (((eq Prop) b0) b)
% 299.51/299.99 Found classic0:=(classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))):((or ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) (not ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))))
% 299.51/299.99 Found (classic ((or ((or ((or (((eq Prop) a) b)) ((f a)->False))) (not (f b)))) (not (g a)))) as proof of ((or ((or ((
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