:: PROCAL_1 semantic presentation 
:: Showing IDV graph ... (Click the Palm Trees again to close it)
theorem Th1: :: PROCAL_1:1 
:: Showing IDV graph ... (Click the Palm Tree again to close it) 
Lm1:
for p, q being Element of CQC-WFF holds p 'or' q = ('not' p) => q
theorem Th2: :: PROCAL_1:2 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem Th3: :: PROCAL_1:3 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem Th4: :: PROCAL_1:4 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem Th5: :: PROCAL_1:5 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem Th6: :: PROCAL_1:6 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem Th7: :: PROCAL_1:7 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem Th8: :: PROCAL_1:8 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem :: PROCAL_1:9 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem :: PROCAL_1:10 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem Th11: :: PROCAL_1:11 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem :: PROCAL_1:12 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem :: PROCAL_1:13 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem :: PROCAL_1:14 :: Showing IDV graph ... (Click the Palm Tree again to close it)
Lm2:
for p, q being Element of CQC-WFF holds (p '&' q) => (('not' ('not' p)) '&' q) in TAUT
Lm3:
for p, q being Element of CQC-WFF holds (('not' ('not' p)) '&' q) => (p '&' q) in TAUT
theorem Th15: :: PROCAL_1:15 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem Th16: :: PROCAL_1:16 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem Th17: :: PROCAL_1:17 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem Th18: :: PROCAL_1:18 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem Th19: :: PROCAL_1:19 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem Th20: :: PROCAL_1:20 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem Th21: :: PROCAL_1:21 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem :: PROCAL_1:22 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem :: PROCAL_1:23 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem :: PROCAL_1:24 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem Th25: :: PROCAL_1:25 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem :: PROCAL_1:26 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem Th27: :: PROCAL_1:27 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem Th28: :: PROCAL_1:28 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem :: PROCAL_1:29 :: Showing IDV graph ... (Click the Palm Tree again to close it)
Lm4:
for p, q being Element of CQC-WFF st p in TAUT & q in TAUT holds
p '&' q in TAUT
theorem :: PROCAL_1:30 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem :: PROCAL_1:31 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem Th32: :: PROCAL_1:32 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem Th33: :: PROCAL_1:33 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem :: PROCAL_1:34 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem Th35: :: PROCAL_1:35 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem Th36: :: PROCAL_1:36 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem :: PROCAL_1:37 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem :: PROCAL_1:38 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem :: PROCAL_1:39 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem Th40: :: PROCAL_1:40 :: Showing IDV graph ... (Click the Palm Tree again to close it)
Lm5:
for p, q, r being Element of CQC-WFF st p => q in TAUT holds
(r '&' p) => (r '&' q) in TAUT
Lm6:
for p, q, r being Element of CQC-WFF st p => q in TAUT holds
(p 'or' r) => (q 'or' r) in TAUT
Lm7:
for p, q, r being Element of CQC-WFF st p => q in TAUT holds
(r 'or' p) => (r 'or' q) in TAUT
theorem :: PROCAL_1:41 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem :: PROCAL_1:42 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem :: PROCAL_1:43 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem :: PROCAL_1:44 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem :: PROCAL_1:45 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem :: PROCAL_1:46 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem :: PROCAL_1:47 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem :: PROCAL_1:48 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem :: PROCAL_1:49 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem :: PROCAL_1:50 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem Th51: :: PROCAL_1:51 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem :: PROCAL_1:52 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem :: PROCAL_1:53 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem :: PROCAL_1:54 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem :: PROCAL_1:55 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem :: PROCAL_1:56 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem :: PROCAL_1:57 :: Showing IDV graph ... (Click the Palm Tree again to close it)
theorem :: PROCAL_1:58 :: Showing IDV graph ... (Click the Palm Tree again to close it)