oadist2 - Quantum Logic Explorer

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Theorem oadist2 1009

Description: Distributive inference derived from OA.

**Hypothesis**
Ref	Expression
oadist2.1	(d ∪ ((b ∪ c) →₂((a →₂b) ∩ (a →₂c)))) = ((b ∪ c) →₀((a →₂b) ∩ (a →₂c)))

**Assertion**
Ref	Expression
oadist2	((a →₂b) ∩ (d ∪ ((b ∪ c) →₂((a →₂b) ∩ (a →₂c))))) = (((a →₂b) ∩ d) ∪ ((a →₂b) ∩ ((b ∪ c) →₂((a →₂b) ∩ (a →₂c)))))

**Proof of Theorem oadist2**
Step	Hyp	Ref	Expression
1		oadist2.1	. . 3 (d ∪ ((b ∪ c) →₂((a →₂b) ∩ (a →₂c)))) = ((b ∪ c) →₀((a →₂b) ∩ (a →₂c)))
2	1	bile 142	. 2 (d ∪ ((b ∪ c) →₂((a →₂b) ∩ (a →₂c)))) ≤ ((b ∪ c) →₀((a →₂b) ∩ (a →₂c)))
3	2	oadist2a 1007	1 ((a →₂b) ∩ (d ∪ ((b ∪ c) →₂((a →₂b) ∩ (a →₂c))))) = (((a →₂b) ∩ d) ∪ ((a →₂b) ∩ ((b ∪ c) →₂((a →₂b) ∩ (a →₂c)))))

Colors of variables: term

Syntax hints: = wb 1 ∪ wo 6 ∩ wa 7 →₀wi0 11 →₂wi2 13

This theorem is referenced by: oadist12 1010

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-i0 43 df-i1 44 df-i2 45 df-le1 130 df-le2 131