ifpbi1b

Description: When the first variable is irrelevant, it can be replaced. (Contributed by RP, 25-Apr-2020)

		Ref	Expression
	Assertion	ifpbi1b	$⊢ if- (φ, χ, χ) \leftrightarrow if- (ψ, χ, χ)$

Step	Hyp	Ref	Expression
1		id	$⊢ χ \to χ$
2	1	olci	$⊢ ((φ \to \neg ψ) \lor (χ \to χ))$
3	1	olci	$⊢ ((ψ \to φ) \lor (χ \to χ))$
4	2 3	pm3.2i	$⊢ (((φ \to \neg ψ) \lor (χ \to χ)) \land ((ψ \to φ) \lor (χ \to χ)))$
5	1	olci	$⊢ ((φ \to ψ) \lor (χ \to χ))$
6	1	olci	$⊢ ((\neg ψ \to φ) \lor (χ \to χ))$
7	5 6	pm3.2i	$⊢ (((φ \to ψ) \lor (χ \to χ)) \land ((\neg ψ \to φ) \lor (χ \to χ)))$
8		ifpim123g	$⊢ (if- (φ, χ, χ) \to if- (ψ, χ, χ)) \leftrightarrow ((((φ \to \neg ψ) \lor (χ \to χ)) \land ((ψ \to φ) \lor (χ \to χ))) \land (((φ \to ψ) \lor (χ \to χ)) \land ((\neg ψ \to φ) \lor (χ \to χ))))$
9	4 7 8	mpbir2an	$⊢ if- (φ, χ, χ) \to if- (ψ, χ, χ)$
10	1	olci	$⊢ ((ψ \to \neg φ) \lor (χ \to χ))$
11	10 5	pm3.2i	$⊢ (((ψ \to \neg φ) \lor (χ \to χ)) \land ((φ \to ψ) \lor (χ \to χ)))$
12	1	olci	$⊢ ((\neg φ \to ψ) \lor (χ \to χ))$
13	3 12	pm3.2i	$⊢ (((ψ \to φ) \lor (χ \to χ)) \land ((\neg φ \to ψ) \lor (χ \to χ)))$
14		ifpim123g	$⊢ (if- (ψ, χ, χ) \to if- (φ, χ, χ)) \leftrightarrow ((((ψ \to \neg φ) \lor (χ \to χ)) \land ((φ \to ψ) \lor (χ \to χ))) \land (((ψ \to φ) \lor (χ \to χ)) \land ((\neg φ \to ψ) \lor (χ \to χ))))$
15	11 13 14	mpbir2an	$⊢ if- (ψ, χ, χ) \to if- (φ, χ, χ)$
16	9 15	impbii	$⊢ if- (φ, χ, χ) \leftrightarrow if- (ψ, χ, χ)$

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