Metamath Proof Explorer

Theorem iinexg

Description: The existence of a class intersection. x is normally a free-variable parameter in B , which should be read B ( x ) . (Contributed by FL, 19-Sep-2011)

		Ref	Expression
	Assertion	iinexg	$⊢ (A \neq \emptyset \land \forall x \in A B \in C) \to ⋂_{x \in A} B \in V$

Proof

Step	Hyp	Ref	Expression
1		dfiin2g	$⊢ \forall x \in A B \in C \to ⋂_{x \in A} B = ⋂ \{y \| \exists x \in A y = B\}$
2	1	adantl	$⊢ (A \neq \emptyset \land \forall x \in A B \in C) \to ⋂_{x \in A} B = ⋂ \{y \| \exists x \in A y = B\}$
3		elisset	$⊢ B \in C \to \exists y y = B$
4	3	rgenw	$⊢ \forall x \in A (B \in C \to \exists y y = B)$
5		r19.2z	$⊢ (A \neq \emptyset \land \forall x \in A (B \in C \to \exists y y = B)) \to \exists x \in A (B \in C \to \exists y y = B)$
6	4 5	mpan2	$⊢ A \neq \emptyset \to \exists x \in A (B \in C \to \exists y y = B)$
7		r19.35	$⊢ \exists x \in A (B \in C \to \exists y y = B) \leftrightarrow (\forall x \in A B \in C \to \exists x \in A \exists y y = B)$
8	6 7	sylib	$⊢ A \neq \emptyset \to (\forall x \in A B \in C \to \exists x \in A \exists y y = B)$
9	8	imp	$⊢ (A \neq \emptyset \land \forall x \in A B \in C) \to \exists x \in A \exists y y = B$
10		rexcom4	$⊢ \exists x \in A \exists y y = B \leftrightarrow \exists y \exists x \in A y = B$
11	9 10	sylib	$⊢ (A \neq \emptyset \land \forall x \in A B \in C) \to \exists y \exists x \in A y = B$
12		abn0	$⊢ \{y \| \exists x \in A y = B\} \neq \emptyset \leftrightarrow \exists y \exists x \in A y = B$
13	11 12	sylibr	$⊢ (A \neq \emptyset \land \forall x \in A B \in C) \to \{y \| \exists x \in A y = B\} \neq \emptyset$
14		intex	$⊢ \{y \| \exists x \in A y = B\} \neq \emptyset \leftrightarrow ⋂ \{y \| \exists x \in A y = B\} \in V$
15	13 14	sylib	$⊢ (A \neq \emptyset \land \forall x \in A B \in C) \to ⋂ \{y \| \exists x \in A y = B\} \in V$
16	2 15	eqeltrd	$⊢ (A \neq \emptyset \land \forall x \in A B \in C) \to ⋂_{x \in A} B \in V$