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Quantum Logic Explorer

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Theorem comdr 448

Description: Commutation dual. Kalmbach 83 p. 23.

**Hypothesis**
Ref	Expression
comdr.1	a = ((a ∪ b) ∩ (a ∪ b^⊥ ))

**Assertion**
Ref	Expression
comdr	a C b

**Proof of Theorem comdr**
Step	Hyp	Ref	Expression
1		comdr.1	. . . . 5 a = ((a ∪ b) ∩ (a ∪ b^⊥ ))
2		df-a 39	. . . . . 6 ((a ∪ b) ∩ (a ∪ b^⊥ )) = ((a ∪ b)^⊥ ∪ (a ∪ b^⊥ )^⊥ )^⊥
3		oran 79	. . . . . . . . 9 (a ∪ b) = (a^⊥ ∩ b^⊥ )^⊥
4	3	con2 64	. . . . . . . 8 (a ∪ b)^⊥ = (a^⊥ ∩ b^⊥ )
5		oran 79	. . . . . . . . 9 (a ∪ b^⊥ ) = (a^⊥ ∩ b^⊥ ^⊥ )^⊥
6	5	con2 64	. . . . . . . 8 (a ∪ b^⊥ )^⊥ = (a^⊥ ∩ b^⊥ ^⊥ )
7	4, 6	2or 67	. . . . . . 7 ((a ∪ b)^⊥ ∪ (a ∪ b^⊥ )^⊥ ) = ((a^⊥ ∩ b^⊥ ) ∪ (a^⊥ ∩ b^⊥ ^⊥ ))
8	7	ax-r4 36	. . . . . 6 ((a ∪ b)^⊥ ∪ (a ∪ b^⊥ )^⊥ )^⊥ = ((a^⊥ ∩ b^⊥ ) ∪ (a^⊥ ∩ b^⊥ ^⊥ ))^⊥
9	2, 8	ax-r2 35	. . . . 5 ((a ∪ b) ∩ (a ∪ b^⊥ )) = ((a^⊥ ∩ b^⊥ ) ∪ (a^⊥ ∩ b^⊥ ^⊥ ))^⊥
10	1, 9	ax-r2 35	. . . 4 a = ((a^⊥ ∩ b^⊥ ) ∪ (a^⊥ ∩ b^⊥ ^⊥ ))^⊥
11	10	con2 64	. . 3 a^⊥ = ((a^⊥ ∩ b^⊥ ) ∪ (a^⊥ ∩ b^⊥ ^⊥ ))
12	11	df-c1 124	. 2 a^⊥ C b^⊥
13	12	comcom5 440	1 a C b

Colors of variables: term

Syntax hints: = wb 1 C wc 3 ^⊥ wn 4 ∪ wo 6 ∩ wa 7

This theorem was proved from axioms: ax-a1 29 ax-a2 30 ax-a3 31 ax-a5 33 ax-r1 34 ax-r2 35 ax-r4 36 ax-r5 37 ax-r3 421

This theorem depends on definitions: df-b 38 df-a 39 df-t 40 df-f 41 df-le1 122 df-le2 123 df-c1 124 df-c2 125