Metamath Proof Explorer

Theorem hash2exprb

Description: A set of size two is an unordered pair if and only if it contains two different elements. (Contributed by Alexander van der Vekens, 14-Jan-2018)

		Ref	Expression
	Assertion	hash2exprb	$⊢ V \in W \to (\|V\| = 2 \leftrightarrow \exists a \exists b (a \neq b \land V = \{a, b\}))$

Proof

Step	Hyp	Ref	Expression
1		hash2prde	$⊢ (V \in W \land \|V\| = 2) \to \exists a \exists b (a \neq b \land V = \{a, b\})$
2	1	ex	$⊢ V \in W \to (\|V\| = 2 \to \exists a \exists b (a \neq b \land V = \{a, b\}))$
3		hashprg	$⊢ (a \in V \land b \in V) \to (a \neq b \leftrightarrow \|\{a, b\}\| = 2)$
4	3	el2v	$⊢ a \neq b \leftrightarrow \|\{a, b\}\| = 2$
5	4	a1i	$⊢ V = \{a, b\} \to (a \neq b \leftrightarrow \|\{a, b\}\| = 2)$
6	5	biimpd	$⊢ V = \{a, b\} \to (a \neq b \to \|\{a, b\}\| = 2)$
7		fveqeq2	$⊢ V = \{a, b\} \to (\|V\| = 2 \leftrightarrow \|\{a, b\}\| = 2)$
8	6 7	sylibrd	$⊢ V = \{a, b\} \to (a \neq b \to \|V\| = 2)$
9	8	impcom	$⊢ (a \neq b \land V = \{a, b\}) \to \|V\| = 2$
10	9	a1i	$⊢ V \in W \to ((a \neq b \land V = \{a, b\}) \to \|V\| = 2)$
11	10	exlimdvv	$⊢ V \in W \to (\exists a \exists b (a \neq b \land V = \{a, b\}) \to \|V\| = 2)$
12	2 11	impbid	$⊢ V \in W \to (\|V\| = 2 \leftrightarrow \exists a \exists b (a \neq b \land V = \{a, b\}))$