Metamath Proof Explorer

Theorem mdandyv0

Description: Given the equivalences set in the hypotheses, there exist a proof where ch, th, ta, et match ph, ps accordingly. (Contributed by Jarvin Udandy, 6-Sep-2016)

		Ref	Expression
	Hypotheses	mdandyv0.1	$⊢ φ \leftrightarrow ⊥$
		mdandyv0.2	$⊢ ψ \leftrightarrow ⊤$
		mdandyv0.3	$⊢ χ \leftrightarrow ⊥$
		mdandyv0.4	$⊢ θ \leftrightarrow ⊥$
		mdandyv0.5	$⊢ τ \leftrightarrow ⊥$
		mdandyv0.6	$⊢ η \leftrightarrow ⊥$
	Assertion	mdandyv0	$⊢ ((((χ \leftrightarrow φ) \land (θ \leftrightarrow φ)) \land (τ \leftrightarrow φ)) \land (η \leftrightarrow φ))$

Proof

Step	Hyp	Ref	Expression
1		mdandyv0.1	$⊢ φ \leftrightarrow ⊥$
2		mdandyv0.2	$⊢ ψ \leftrightarrow ⊤$
3		mdandyv0.3	$⊢ χ \leftrightarrow ⊥$
4		mdandyv0.4	$⊢ θ \leftrightarrow ⊥$
5		mdandyv0.5	$⊢ τ \leftrightarrow ⊥$
6		mdandyv0.6	$⊢ η \leftrightarrow ⊥$
7	3 1	bothfbothsame	$⊢ χ \leftrightarrow φ$
8	4 1	bothfbothsame	$⊢ θ \leftrightarrow φ$
9	7 8	pm3.2i	$⊢ ((χ \leftrightarrow φ) \land (θ \leftrightarrow φ))$
10	5 1	bothfbothsame	$⊢ τ \leftrightarrow φ$
11	9 10	pm3.2i	$⊢ (((χ \leftrightarrow φ) \land (θ \leftrightarrow φ)) \land (τ \leftrightarrow φ))$
12	6 1	bothfbothsame	$⊢ η \leftrightarrow φ$
13	11 12	pm3.2i	$⊢ ((((χ \leftrightarrow φ) \land (θ \leftrightarrow φ)) \land (τ \leftrightarrow φ)) \land (η \leftrightarrow φ))$