Metamath Proof Explorer

Theorem intmin

Description: Any member of a class is the smallest of those members that include it. (Contributed by NM, 13-Aug-2002) (Proof shortened by Andrew Salmon, 9-Jul-2011)

		Ref	Expression
	Assertion	intmin	$⊢ A \in B \to ⋂ \{x \in B \| A \subseteq x\} = A$

Proof

Step	Hyp	Ref	Expression
1		vex	$⊢ y \in V$
2	1	elintrab	$⊢ y \in ⋂ \{x \in B \| A \subseteq x\} \leftrightarrow \forall x \in B (A \subseteq x \to y \in x)$
3		ssid	$⊢ A \subseteq A$
4		sseq2	$⊢ x = A \to (A \subseteq x \leftrightarrow A \subseteq A)$
5		eleq2	$⊢ x = A \to (y \in x \leftrightarrow y \in A)$
6	4 5	imbi12d	$⊢ x = A \to ((A \subseteq x \to y \in x) \leftrightarrow (A \subseteq A \to y \in A))$
7	6	rspcv	$⊢ A \in B \to (\forall x \in B (A \subseteq x \to y \in x) \to (A \subseteq A \to y \in A))$
8	3 7	mpii	$⊢ A \in B \to (\forall x \in B (A \subseteq x \to y \in x) \to y \in A)$
9	2 8	biimtrid	$⊢ A \in B \to (y \in ⋂ \{x \in B \| A \subseteq x\} \to y \in A)$
10	9	ssrdv	$⊢ A \in B \to ⋂ \{x \in B \| A \subseteq x\} \subseteq A$
11		ssintub	$⊢ A \subseteq ⋂ \{x \in B \| A \subseteq x\}$
12	11	a1i	$⊢ A \in B \to A \subseteq ⋂ \{x \in B \| A \subseteq x\}$
13	10 12	eqssd	$⊢ A \in B \to ⋂ \{x \in B \| A \subseteq x\} = A$