:: LUKASI_1 semantic presentation  Show TPTP formulae Show IDV graph for whole article:: Showing IDV graph ... (Click the Palm Trees again to close it)

theorem Th1: :: LUKASI_1:1  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q, r being Element of CQC-WFF holds (p => q) => ((q => r) => (p => r)) in TAUT
proof end;

theorem Th2: :: LUKASI_1:2  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q, r being Element of CQC-WFF st p => q in TAUT holds
(q => r) => (p => r) in TAUT
proof end;

theorem Th3: :: LUKASI_1:3  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q, r being Element of CQC-WFF st p => q in TAUT & q => r in TAUT holds
p => r in TAUT
proof end;

theorem Th4: :: LUKASI_1:4  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p being Element of CQC-WFF holds p => p in TAUT
proof end;

Lm1: for q, r, p, s being Element of CQC-WFF holds (((q => r) => (p => r)) => s) => ((p => q) => s) in TAUT
proof end;

Lm2: for p, q, r, s being Element of CQC-WFF holds (p => (q => r)) => ((s => q) => (p => (s => r))) in TAUT
proof end;

Lm3: for p, q, r, s being Element of CQC-WFF holds (p => q) => (((p => r) => s) => ((q => r) => s)) in TAUT
proof end;

Lm4: for t, p, r, s, q being Element of CQC-WFF holds (t => ((p => r) => s)) => ((p => q) => (t => ((q => r) => s))) in TAUT
proof end;

Lm5: for p, q, r being Element of CQC-WFF holds ((('not' p) => q) => r) => (p => r) in TAUT
proof end;

Lm6: for p, r, s, q being Element of CQC-WFF holds p => (((('not' p) => r) => s) => ((q => r) => s)) in TAUT
proof end;

Lm7: for q, p being Element of CQC-WFF holds (q => ((('not' p) => p) => p)) => ((('not' p) => p) => p) in TAUT
proof end;

Lm8: for t, p being Element of CQC-WFF holds t => ((('not' p) => p) => p) in TAUT
proof end;

Lm9: for p, q, t being Element of CQC-WFF holds (('not' p) => q) => (t => ((q => p) => p)) in TAUT
proof end;

Lm10: for t, q, p, r being Element of CQC-WFF holds ((t => ((q => p) => p)) => r) => ((('not' p) => q) => r) in TAUT
proof end;

Lm11: for p, q being Element of CQC-WFF holds (('not' p) => q) => ((q => p) => p) in TAUT
proof end;

Lm12: for p, q being Element of CQC-WFF holds p => ((q => p) => p) in TAUT
proof end;

theorem Th5: :: LUKASI_1:5  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for q, p being Element of CQC-WFF holds q => (p => q) in TAUT
proof end;

theorem Th6: :: LUKASI_1:6  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q, r being Element of CQC-WFF holds ((p => q) => r) => (q => r) in TAUT
proof end;

theorem Th7: :: LUKASI_1:7  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for q, p being Element of CQC-WFF holds q => ((q => p) => p) in TAUT
proof end;

theorem Th8: :: LUKASI_1:8  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for s, q, p being Element of CQC-WFF holds (s => (q => p)) => (q => (s => p)) in TAUT
proof end;

theorem Th9: :: LUKASI_1:9  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for q, r, p being Element of CQC-WFF holds (q => r) => ((p => q) => (p => r)) in TAUT
proof end;

Lm13: for q, s, p, r being Element of CQC-WFF holds ((q => (s => p)) => r) => ((s => (q => p)) => r) in TAUT
proof end;

Lm14: for p, q being Element of CQC-WFF holds ((p => q) => p) => p in TAUT
proof end;

Lm15: for p, r, s, q being Element of CQC-WFF holds ((p => r) => s) => ((p => q) => ((q => r) => s)) in TAUT
proof end;

Lm16: for p, q, r being Element of CQC-WFF holds ((p => q) => r) => ((r => p) => p) in TAUT
proof end;

Lm17: for r, p, s, q being Element of CQC-WFF holds (((r => p) => p) => s) => (((p => q) => r) => s) in TAUT
proof end;

Lm18: for q, r, p being Element of CQC-WFF holds ((q => r) => p) => ((q => p) => p) in TAUT
proof end;

theorem Th10: :: LUKASI_1:10  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for q, r being Element of CQC-WFF holds (q => (q => r)) => (q => r) in TAUT
proof end;

Lm19: for q, s, r, p being Element of CQC-WFF holds (q => s) => (((q => r) => p) => ((s => p) => p)) in TAUT
proof end;

Lm20: for q, r, p, s being Element of CQC-WFF holds ((q => r) => p) => ((q => s) => ((s => p) => p)) in TAUT
proof end;

Lm21: for q, s, p, r being Element of CQC-WFF holds (q => s) => ((s => (p => (q => r))) => (p => (q => r))) in TAUT
proof end;

Lm22: for s, p, q, r being Element of CQC-WFF holds (s => (p => (q => r))) => ((q => s) => (p => (q => r))) in TAUT
proof end;

theorem Th11: :: LUKASI_1:11  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q, r being Element of CQC-WFF holds (p => (q => r)) => ((p => q) => (p => r)) in TAUT
proof end;

theorem Th12: :: LUKASI_1:12  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p being Element of CQC-WFF holds ('not' VERUM ) => p in TAUT
proof end;

theorem Th13: :: LUKASI_1:13  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for q, p being Element of CQC-WFF st q in TAUT holds
p => q in TAUT
proof end;

theorem :: LUKASI_1:14  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q being Element of CQC-WFF st p in TAUT holds
(p => q) => q in TAUT
proof end;

theorem Th15: :: LUKASI_1:15  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for s, q, p being Element of CQC-WFF st s => (q => p) in TAUT holds
q => (s => p) in TAUT
proof end;

theorem Th16: :: LUKASI_1:16  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for s, q, p being Element of CQC-WFF st s => (q => p) in TAUT & q in TAUT holds
s => p in TAUT
proof end;

theorem :: LUKASI_1:17  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for s, q, p being Element of CQC-WFF st s => (q => p) in TAUT & q in TAUT & s in TAUT holds
p in TAUT
proof end;

theorem :: LUKASI_1:18  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for q, r being Element of CQC-WFF st q => (q => r) in TAUT holds
q => r in TAUT
proof end;

theorem Th19: :: LUKASI_1:19  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q, r being Element of CQC-WFF st p => (q => r) in TAUT holds
(p => q) => (p => r) in TAUT
proof end;

theorem Th20: :: LUKASI_1:20  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q, r being Element of CQC-WFF st p => (q => r) in TAUT & p => q in TAUT holds
p => r in TAUT
proof end;

theorem :: LUKASI_1:21  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q, r being Element of CQC-WFF st p => (q => r) in TAUT & p => q in TAUT & p in TAUT holds
r in TAUT
proof end;

theorem Th22: :: LUKASI_1:22  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q, r, s being Element of CQC-WFF st p => (q => r) in TAUT & p => (r => s) in TAUT holds
p => (q => s) in TAUT
proof end;

theorem :: LUKASI_1:23  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p being Element of CQC-WFF holds p => VERUM in TAUT by Th13, CQC_THE1:77;

Lm23: for p being Element of CQC-WFF holds ('not' p) => (p => ('not' VERUM )) in TAUT
proof end;

Lm24: for p being Element of CQC-WFF holds (('not' p) => ('not' VERUM )) => p in TAUT
proof end;

theorem Th24: :: LUKASI_1:24  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q being Element of CQC-WFF holds (('not' p) => ('not' q)) => (q => p) in TAUT
proof end;

theorem Th25: :: LUKASI_1:25  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p being Element of CQC-WFF holds ('not' ('not' p)) => p in TAUT
proof end;

Lm25: now
let p be Element of CQC-WFF ; :: thesis: (p => ('not' VERUM )) => ('not' p) in TAUT
('not' ('not' p)) => p in TAUT by Th25;
then A1: (p => ('not' VERUM )) => (('not' ('not' p)) => ('not' VERUM )) in TAUT by Th2;
(('not' ('not' p)) => ('not' VERUM )) => ('not' p) in TAUT by Lm24;
hence (p => ('not' VERUM )) => ('not' p) in TAUT by A1, Th3; :: thesis: verum
end;

theorem Th26: :: LUKASI_1:26  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q being Element of CQC-WFF holds (p => q) => (('not' q) => ('not' p)) in TAUT
proof end;

theorem Th27: :: LUKASI_1:27  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p being Element of CQC-WFF holds p => ('not' ('not' p)) in TAUT
proof end;

theorem Th28: :: LUKASI_1:28  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q being Element of CQC-WFF holds
( (('not' ('not' p)) => q) => (p => q) in TAUT & (p => q) => (('not' ('not' p)) => q) in TAUT )
proof end;

theorem Th29: :: LUKASI_1:29  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q being Element of CQC-WFF holds
( (p => ('not' ('not' q))) => (p => q) in TAUT & (p => q) => (p => ('not' ('not' q))) in TAUT )
proof end;

theorem Th30: :: LUKASI_1:30  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q being Element of CQC-WFF holds (p => ('not' q)) => (q => ('not' p)) in TAUT
proof end;

theorem Th31: :: LUKASI_1:31  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q being Element of CQC-WFF holds (('not' p) => q) => (('not' q) => p) in TAUT
proof end;

theorem :: LUKASI_1:32  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p being Element of CQC-WFF holds (p => ('not' p)) => ('not' p) in TAUT
proof end;

theorem :: LUKASI_1:33  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q being Element of CQC-WFF holds ('not' p) => (p => q) in TAUT
proof end;

theorem Th34: :: LUKASI_1:34  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q being Element of CQC-WFF holds
( p => q in TAUT iff ('not' q) => ('not' p) in TAUT )
proof end;

theorem :: LUKASI_1:35  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q being Element of CQC-WFF st ('not' p) => ('not' q) in TAUT holds
q => p in TAUT by Th34;

theorem :: LUKASI_1:36  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p being Element of CQC-WFF holds
( p in TAUT iff 'not' ('not' p) in TAUT )
proof end;

theorem :: LUKASI_1:37  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q being Element of CQC-WFF holds
( p => q in TAUT iff p => ('not' ('not' q)) in TAUT )
proof end;

theorem :: LUKASI_1:38  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q being Element of CQC-WFF holds
( p => q in TAUT iff ('not' ('not' p)) => q in TAUT )
proof end;

theorem :: LUKASI_1:39  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q being Element of CQC-WFF st p => ('not' q) in TAUT holds
q => ('not' p) in TAUT
proof end;

theorem :: LUKASI_1:40  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q being Element of CQC-WFF st ('not' p) => q in TAUT holds
('not' q) => p in TAUT
proof end;

theorem Th41: :: LUKASI_1:41  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q, r being Element of CQC-WFF holds |- (p => q) => ((q => r) => (p => r))
proof end;

theorem :: LUKASI_1:42  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q, r being Element of CQC-WFF st |- p => q holds
|- (q => r) => (p => r)
proof end;

theorem Th43: :: LUKASI_1:43  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q, r being Element of CQC-WFF st |- p => q & |- q => r holds
|- p => r
proof end;

theorem Th44: :: LUKASI_1:44  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p being Element of CQC-WFF holds |- p => p
proof end;

theorem Th45: :: LUKASI_1:45  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q being Element of CQC-WFF holds |- p => (q => p)
proof end;

theorem :: LUKASI_1:46  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q being Element of CQC-WFF st |- p holds
|- q => p
proof end;

theorem Th47: :: LUKASI_1:47  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for s, q, p being Element of CQC-WFF holds |- (s => (q => p)) => (q => (s => p))
proof end;

theorem Th48: :: LUKASI_1:48  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q, r being Element of CQC-WFF st |- p => (q => r) holds
|- q => (p => r)
proof end;

theorem :: LUKASI_1:49  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q, r being Element of CQC-WFF st |- p => (q => r) & |- q holds
|- p => r
proof end;

theorem :: LUKASI_1:50  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p being Element of CQC-WFF holds
( |- p => VERUM & |- ('not' VERUM ) => p )
proof end;

theorem Th51: :: LUKASI_1:51  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q being Element of CQC-WFF holds |- p => ((p => q) => q)
proof end;

theorem Th52: :: LUKASI_1:52  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for q, r being Element of CQC-WFF holds |- (q => (q => r)) => (q => r)
proof end;

theorem :: LUKASI_1:53  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for q, r being Element of CQC-WFF st |- q => (q => r) holds
|- q => r
proof end;

theorem Th54: :: LUKASI_1:54  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q, r being Element of CQC-WFF holds |- (p => (q => r)) => ((p => q) => (p => r))
proof end;

theorem Th55: :: LUKASI_1:55  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q, r being Element of CQC-WFF st |- p => (q => r) holds
|- (p => q) => (p => r)
proof end;

theorem :: LUKASI_1:56  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q, r being Element of CQC-WFF st |- p => (q => r) & |- p => q holds
|- p => r
proof end;

theorem Th57: :: LUKASI_1:57  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q, r being Element of CQC-WFF holds |- ((p => q) => r) => (q => r)
proof end;

theorem :: LUKASI_1:58  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q, r being Element of CQC-WFF st |- (p => q) => r holds
|- q => r
proof end;

theorem Th59: :: LUKASI_1:59  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q, r being Element of CQC-WFF holds |- (p => q) => ((r => p) => (r => q))
proof end;

theorem :: LUKASI_1:60  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q, r being Element of CQC-WFF st |- p => q holds
|- (r => p) => (r => q)
proof end;

theorem Th61: :: LUKASI_1:61  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q being Element of CQC-WFF holds |- (p => q) => (('not' q) => ('not' p))
proof end;

theorem Th62: :: LUKASI_1:62  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q being Element of CQC-WFF holds |- (('not' p) => ('not' q)) => (q => p)
proof end;

theorem :: LUKASI_1:63  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q being Element of CQC-WFF holds
( |- ('not' p) => ('not' q) iff |- q => p )
proof end;

theorem Th64: :: LUKASI_1:64  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p being Element of CQC-WFF holds |- p => ('not' ('not' p))
proof end;

theorem Th65: :: LUKASI_1:65  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p being Element of CQC-WFF holds |- ('not' ('not' p)) => p
proof end;

theorem :: LUKASI_1:66  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p being Element of CQC-WFF holds
( |- 'not' ('not' p) iff |- p )
proof end;

theorem Th67: :: LUKASI_1:67  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q being Element of CQC-WFF holds |- (('not' ('not' p)) => q) => (p => q)
proof end;

theorem :: LUKASI_1:68  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q being Element of CQC-WFF holds
( |- ('not' ('not' p)) => q iff |- p => q )
proof end;

theorem Th69: :: LUKASI_1:69  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q being Element of CQC-WFF holds |- (p => ('not' ('not' q))) => (p => q)
proof end;

theorem :: LUKASI_1:70  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q being Element of CQC-WFF holds
( |- p => ('not' ('not' q)) iff |- p => q )
proof end;

theorem Th71: :: LUKASI_1:71  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q being Element of CQC-WFF holds |- (p => ('not' q)) => (q => ('not' p))
proof end;

theorem :: LUKASI_1:72  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q being Element of CQC-WFF st |- p => ('not' q) holds
|- q => ('not' p)
proof end;

theorem Th73: :: LUKASI_1:73  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q being Element of CQC-WFF holds |- (('not' p) => q) => (('not' q) => p)
proof end;

theorem :: LUKASI_1:74  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q being Element of CQC-WFF st |- ('not' p) => q holds
|- ('not' q) => p
proof end;

theorem :: LUKASI_1:75  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q, r being Element of CQC-WFF
for X being Subset of CQC-WFF st X |- p => q holds
X |- (q => r) => (p => r)
proof end;

theorem Th76: :: LUKASI_1:76  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q, r being Element of CQC-WFF
for X being Subset of CQC-WFF st X |- p => q & X |- q => r holds
X |- p => r
proof end;

theorem :: LUKASI_1:77  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p being Element of CQC-WFF
for X being Subset of CQC-WFF holds X |- p => p
proof end;

theorem :: LUKASI_1:78  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q being Element of CQC-WFF
for X being Subset of CQC-WFF st X |- p holds
X |- q => p
proof end;

theorem :: LUKASI_1:79  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q being Element of CQC-WFF
for X being Subset of CQC-WFF st X |- p holds
X |- (p => q) => q
proof end;

theorem Th80: :: LUKASI_1:80  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q, r being Element of CQC-WFF
for X being Subset of CQC-WFF st X |- p => (q => r) holds
X |- q => (p => r)
proof end;

theorem :: LUKASI_1:81  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q, r being Element of CQC-WFF
for X being Subset of CQC-WFF st X |- p => (q => r) & X |- q holds
X |- p => r
proof end;

theorem :: LUKASI_1:82  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q being Element of CQC-WFF
for X being Subset of CQC-WFF st X |- p => (p => q) holds
X |- p => q
proof end;

theorem :: LUKASI_1:83  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q, r being Element of CQC-WFF
for X being Subset of CQC-WFF st X |- (p => q) => r holds
X |- q => r
proof end;

theorem Th84: :: LUKASI_1:84  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q, r being Element of CQC-WFF
for X being Subset of CQC-WFF st X |- p => (q => r) holds
X |- (p => q) => (p => r)
proof end;

theorem :: LUKASI_1:85  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q, r being Element of CQC-WFF
for X being Subset of CQC-WFF st X |- p => (q => r) & X |- p => q holds
X |- p => r
proof end;

theorem :: LUKASI_1:86  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q being Element of CQC-WFF
for X being Subset of CQC-WFF holds
( X |- ('not' p) => ('not' q) iff X |- q => p )
proof end;

theorem :: LUKASI_1:87  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p being Element of CQC-WFF
for X being Subset of CQC-WFF holds
( X |- 'not' ('not' p) iff X |- p )
proof end;

theorem :: LUKASI_1:88  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q being Element of CQC-WFF
for X being Subset of CQC-WFF holds
( X |- p => ('not' ('not' q)) iff X |- p => q )
proof end;

theorem :: LUKASI_1:89  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q being Element of CQC-WFF
for X being Subset of CQC-WFF holds
( X |- ('not' ('not' p)) => q iff X |- p => q )
proof end;

theorem Th90: :: LUKASI_1:90  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q being Element of CQC-WFF
for X being Subset of CQC-WFF st X |- p => ('not' q) holds
X |- q => ('not' p)
proof end;

theorem Th91: :: LUKASI_1:91  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q being Element of CQC-WFF
for X being Subset of CQC-WFF st X |- ('not' p) => q holds
X |- ('not' q) => p
proof end;

theorem :: LUKASI_1:92  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q being Element of CQC-WFF
for X being Subset of CQC-WFF st X |- p => ('not' q) & X |- q holds
X |- 'not' p
proof end;

theorem :: LUKASI_1:93  Show TPTP formulae Show IDV graph:: Showing IDV graph ... (Click the Palm Tree again to close it) Show TPTP problem
for p, q being Element of CQC-WFF
for X being Subset of CQC-WFF st X |- ('not' p) => q & X |- 'not' q holds
X |- p
proof end;