Metamath Proof Explorer

Theorem bj-consensus

Description: Version of consensus expressed using the conditional operator. (Remark: it may be better to express it as consensus , using only binary connectives, and hinting at the fact that it is a Boolean algebra identity, like the absorption identities.) (Contributed by BJ, 30-Sep-2019)

		Ref	Expression
	Assertion	bj-consensus	$⊢ (if- (φ, ψ, χ) \lor (ψ \land χ)) \leftrightarrow if- (φ, ψ, χ)$

Proof

Step	Hyp	Ref	Expression
1		anifp	$⊢ (ψ \land χ) \to if- (φ, ψ, χ)$
2	1	bj-jaoi2	$⊢ (if- (φ, ψ, χ) \lor (ψ \land χ)) \to if- (φ, ψ, χ)$
3		orc	$⊢ if- (φ, ψ, χ) \to (if- (φ, ψ, χ) \lor (ψ \land χ))$
4	2 3	impbii	$⊢ (if- (φ, ψ, χ) \lor (ψ \land χ)) \leftrightarrow if- (φ, ψ, χ)$