oadistc0 - Quantum Logic Explorer

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Theorem oadistc0 1021

Description: Pre-distributive law.

**Hypotheses**
Ref	Expression
oadistc0.1	d ≤ ((a →₂b) ∩ (a →₂c))
oadistc0.2	((a →₂c) ∩ ((a →₂b) ∩ ((b ∪ c)^⊥ ∪ d))) ≤ (((a →₂b) ∩ (b ∪ c)^⊥ ) ∪ d)

**Assertion**
Ref	Expression
oadistc0	((a →₂b) ∩ ((b ∪ c)^⊥ ∪ d)) = (((a →₂b) ∩ (b ∪ c)^⊥ ) ∪ d)

**Proof of Theorem oadistc0**
Step	Hyp	Ref	Expression
1		ancom 74	. . . . 5 ((a →₂c) ∩ ((a →₂b) ∩ ((b ∪ c)^⊥ ∪ d))) = (((a →₂b) ∩ ((b ∪ c)^⊥ ∪ d)) ∩ (a →₂c))
2		oadistc0.1	. . . . . . . . 9 d ≤ ((a →₂b) ∩ (a →₂c))
3	2	lelor 166	. . . . . . . 8 ((b ∪ c)^⊥ ∪ d) ≤ ((b ∪ c)^⊥ ∪ ((a →₂b) ∩ (a →₂c)))
4	3	lelan 167	. . . . . . 7 ((a →₂b) ∩ ((b ∪ c)^⊥ ∪ d)) ≤ ((a →₂b) ∩ ((b ∪ c)^⊥ ∪ ((a →₂b) ∩ (a →₂c))))
5		oal2 999	. . . . . . 7 ((a →₂b) ∩ ((b ∪ c)^⊥ ∪ ((a →₂b) ∩ (a →₂c)))) ≤ (a →₂c)
6	4, 5	letr 137	. . . . . 6 ((a →₂b) ∩ ((b ∪ c)^⊥ ∪ d)) ≤ (a →₂c)
7	6	df2le2 136	. . . . 5 (((a →₂b) ∩ ((b ∪ c)^⊥ ∪ d)) ∩ (a →₂c)) = ((a →₂b) ∩ ((b ∪ c)^⊥ ∪ d))
8	1, 7	ax-r2 36	. . . 4 ((a →₂c) ∩ ((a →₂b) ∩ ((b ∪ c)^⊥ ∪ d))) = ((a →₂b) ∩ ((b ∪ c)^⊥ ∪ d))
9	8	ax-r1 35	. . 3 ((a →₂b) ∩ ((b ∪ c)^⊥ ∪ d)) = ((a →₂c) ∩ ((a →₂b) ∩ ((b ∪ c)^⊥ ∪ d)))
10		oadistc0.2	. . 3 ((a →₂c) ∩ ((a →₂b) ∩ ((b ∪ c)^⊥ ∪ d))) ≤ (((a →₂b) ∩ (b ∪ c)^⊥ ) ∪ d)
11	9, 10	bltr 138	. 2 ((a →₂b) ∩ ((b ∪ c)^⊥ ∪ d)) ≤ (((a →₂b) ∩ (b ∪ c)^⊥ ) ∪ d)
12		ledior 177	. . 3 (((a →₂b) ∩ (b ∪ c)^⊥ ) ∪ d) ≤ (((a →₂b) ∪ d) ∩ ((b ∪ c)^⊥ ∪ d))
13		ax-a2 31	. . . . 5 ((a →₂b) ∪ d) = (d ∪ (a →₂b))
14		lea 160	. . . . . . 7 ((a →₂b) ∩ (a →₂c)) ≤ (a →₂b)
15	2, 14	letr 137	. . . . . 6 d ≤ (a →₂b)
16	15	df-le2 131	. . . . 5 (d ∪ (a →₂b)) = (a →₂b)
17	13, 16	ax-r2 36	. . . 4 ((a →₂b) ∪ d) = (a →₂b)
18	17	ran 78	. . 3 (((a →₂b) ∪ d) ∩ ((b ∪ c)^⊥ ∪ d)) = ((a →₂b) ∩ ((b ∪ c)^⊥ ∪ d))
19	12, 18	lbtr 139	. 2 (((a →₂b) ∩ (b ∪ c)^⊥ ) ∪ d) ≤ ((a →₂b) ∩ ((b ∪ c)^⊥ ∪ d))
20	11, 19	lebi 145	1 ((a →₂b) ∩ ((b ∪ c)^⊥ ∪ d)) = (((a →₂b) ∩ (b ∪ c)^⊥ ) ∪ d)

Colors of variables: term

Syntax hints: = wb 1 ≤ wle 2 ^⊥ wn 4 ∪ wo 6 ∩ wa 7 →₂wi2 13

This theorem was proved from axioms: ax-a1 30 ax-a2 31 ax-a3 32 ax-a5 34 ax-r1 35 ax-r2 36 ax-r4 37 ax-r5 38 ax-3oa 998

This theorem depends on definitions: df-a 40 df-t 41 df-f 42 df-i1 44 df-i2 45 df-le1 130 df-le2 131

This theorem is referenced by: (None)

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