Quantum Logic Explorer

Quantum Logic Explorer

< Previous Next >
Related theorems
GIF version

Theorem ka4lem 221

Description: Lemma for KA4 soundness (AND version) - uses OL only.

**Assertion**
Ref	Expression
ka4lem	((a ∩ b)^⊥ ∪ ((a ∩ c) ≡ (b ∩ c))) = 1

**Proof of Theorem ka4lem**
Step	Hyp	Ref	Expression
1		df-a 39	. . . 4 (a ∩ b) = (a^⊥ ∪ b^⊥ )^⊥
2	1	con2 64	. . 3 (a ∩ b)^⊥ = (a^⊥ ∪ b^⊥ )
3		df-a 39	. . . . 5 (a ∩ c) = (a^⊥ ∪ c^⊥ )^⊥
4		df-a 39	. . . . 5 (b ∩ c) = (b^⊥ ∪ c^⊥ )^⊥
5	3, 4	2bi 91	. . . 4 ((a ∩ c) ≡ (b ∩ c)) = ((a^⊥ ∪ c^⊥ )^⊥ ≡ (b^⊥ ∪ c^⊥ )^⊥ )
6		conb 114	. . . . 5 ((a^⊥ ∪ c^⊥ ) ≡ (b^⊥ ∪ c^⊥ )) = ((a^⊥ ∪ c^⊥ )^⊥ ≡ (b^⊥ ∪ c^⊥ )^⊥ )
7	6	ax-r1 34	. . . 4 ((a^⊥ ∪ c^⊥ )^⊥ ≡ (b^⊥ ∪ c^⊥ )^⊥ ) = ((a^⊥ ∪ c^⊥ ) ≡ (b^⊥ ∪ c^⊥ ))
8	5, 7	ax-r2 35	. . 3 ((a ∩ c) ≡ (b ∩ c)) = ((a^⊥ ∪ c^⊥ ) ≡ (b^⊥ ∪ c^⊥ ))
9	2, 8	2or 67	. 2 ((a ∩ b)^⊥ ∪ ((a ∩ c) ≡ (b ∩ c))) = ((a^⊥ ∪ b^⊥ ) ∪ ((a^⊥ ∪ c^⊥ ) ≡ (b^⊥ ∪ c^⊥ )))
10		ka4lemo 220	. 2 ((a^⊥ ∪ b^⊥ ) ∪ ((a^⊥ ∪ c^⊥ ) ≡ (b^⊥ ∪ c^⊥ ))) = 1
11	9, 10	ax-r2 35	1 ((a ∩ b)^⊥ ∪ ((a ∩ c) ≡ (b ∩ c))) = 1

Colors of variables: term

Syntax hints: = wb 1 ^⊥ wn 4 ≡ tb 5 ∪ wo 6 ∩ wa 7 1wt 9

This theorem was proved from axioms: ax-a1 29 ax-a2 30 ax-a3 31 ax-a4 32 ax-a5 33 ax-r1 34 ax-r2 35 ax-r4 36 ax-r5 37

This theorem depends on definitions: df-b 38 df-a 39 df-t 40 df-f 41 df-le1 122 df-le2 123