infeq5i

		Ref	Expression
	Assertion	infeq5i	$⊢ ω \in V \to \exists x x \subset ⋃ x$

Proof

Step	Hyp	Ref	Expression
1		difexg	$⊢ ω \in V \to ω ∖ \{\emptyset\} \in V$
2		0ex	$⊢ \emptyset \in V$
3	2	snid	$⊢ \emptyset \in \{\emptyset\}$
4		disj4	$⊢ ω \cap \{\emptyset\} = \emptyset \leftrightarrow \neg ω ∖ \{\emptyset\} \subset ω$
5		disj3	$⊢ ω \cap \{\emptyset\} = \emptyset \leftrightarrow ω = ω ∖ \{\emptyset\}$
6	4 5	bitr3i	$⊢ \neg ω ∖ \{\emptyset\} \subset ω \leftrightarrow ω = ω ∖ \{\emptyset\}$
7		peano1	$⊢ \emptyset \in ω$
8		eleq2	$⊢ ω = ω ∖ \{\emptyset\} \to (\emptyset \in ω \leftrightarrow \emptyset \in (ω ∖ \{\emptyset\}))$
9	7 8	mpbii	$⊢ ω = ω ∖ \{\emptyset\} \to \emptyset \in (ω ∖ \{\emptyset\})$
10	9	eldifbd	$⊢ ω = ω ∖ \{\emptyset\} \to \neg \emptyset \in \{\emptyset\}$
11	6 10	sylbi	$⊢ \neg ω ∖ \{\emptyset\} \subset ω \to \neg \emptyset \in \{\emptyset\}$
12	3 11	mt4	$⊢ ω ∖ \{\emptyset\} \subset ω$
13		unidif0	$⊢ ⋃ (ω ∖ \{\emptyset\}) = ⋃ ω$
14		limom	$⊢ Lim ω$
15		limuni	$⊢ Lim ω \to ω = ⋃ ω$
16	14 15	ax-mp	$⊢ ω = ⋃ ω$
17	13 16	eqtr4i	$⊢ ⋃ (ω ∖ \{\emptyset\}) = ω$
18	17	psseq2i	$⊢ ω ∖ \{\emptyset\} \subset ⋃ (ω ∖ \{\emptyset\}) \leftrightarrow ω ∖ \{\emptyset\} \subset ω$
19	12 18	mpbir	$⊢ ω ∖ \{\emptyset\} \subset ⋃ (ω ∖ \{\emptyset\})$
20		psseq1	$⊢ x = ω ∖ \{\emptyset\} \to (x \subset ⋃ x \leftrightarrow ω ∖ \{\emptyset\} \subset ⋃ x)$
21		unieq	$⊢ x = ω ∖ \{\emptyset\} \to ⋃ x = ⋃ (ω ∖ \{\emptyset\})$
22	21	psseq2d	$⊢ x = ω ∖ \{\emptyset\} \to (ω ∖ \{\emptyset\} \subset ⋃ x \leftrightarrow ω ∖ \{\emptyset\} \subset ⋃ (ω ∖ \{\emptyset\}))$
23	20 22	bitrd	$⊢ x = ω ∖ \{\emptyset\} \to (x \subset ⋃ x \leftrightarrow ω ∖ \{\emptyset\} \subset ⋃ (ω ∖ \{\emptyset\}))$
24	23	spcegv	$⊢ ω ∖ \{\emptyset\} \in V \to (ω ∖ \{\emptyset\} \subset ⋃ (ω ∖ \{\emptyset\}) \to \exists x x \subset ⋃ x)$
25	1 19 24	mpisyl	$⊢ ω \in V \to \exists x x \subset ⋃ x$

Metamath Proof Explorer

Theorem infeq5i

Proof