ax6e2ndVD

Description: The following User's Proof is a Virtual Deduction proof (see wvd1 ) completed automatically by a Metamath tools program invoking mmj2 and the Metamath Proof Assistant. ax6e2nd is ax6e2ndVD without virtual deductions and was automatically derived from ax6e2ndVD . (Contributed by Alan Sare, 25-Mar-2014) (Proof modification is discouraged.) (New usage is discouraged.)

		Ref	Expression
	Assertion	ax6e2ndVD	$⊢ \neg \forall x x = y \to \exists x \exists y (x = u \land y = v)$

Proof

Step	Hyp	Ref	Expression
1		vex	$⊢ u \in V$
2		ax6e	$⊢ \exists y y = v$
3	1 2	pm3.2i	$⊢ (u \in V \land \exists y y = v)$
4		19.42v	$⊢ \exists y (u \in V \land y = v) \leftrightarrow (u \in V \land \exists y y = v)$
5	4	biimpri	$⊢ (u \in V \land \exists y y = v) \to \exists y (u \in V \land y = v)$
6	3 5	e0a	$⊢ \exists y (u \in V \land y = v)$
7		isset	$⊢ u \in V \leftrightarrow \exists x x = u$
8	7	anbi1i	$⊢ (u \in V \land y = v) \leftrightarrow (\exists x x = u \land y = v)$
9	8	exbii	$⊢ \exists y (u \in V \land y = v) \leftrightarrow \exists y (\exists x x = u \land y = v)$
10	6 9	mpbi	$⊢ \exists y (\exists x x = u \land y = v)$
11		idn1	$⊢ (\neg \forall x x = y \to \neg \forall x x = y)$
12		hbnae	$⊢ \neg \forall x x = y \to \forall y \neg \forall x x = y$
13		hbn1	$⊢ \neg \forall x x = y \to \forall x \neg \forall x x = y$
14		ax-5	$⊢ z = v \to \forall x z = v$
15		ax-5	$⊢ y = v \to \forall z y = v$
16		idn1	$⊢ (z = y \to z = y)$
17		equequ1	$⊢ z = y \to (z = v \leftrightarrow y = v)$
18	16 17	e1a	$⊢ (z = y \to (z = v \leftrightarrow y = v))$
19	18	in1	$⊢ z = y \to (z = v \leftrightarrow y = v)$
20	14 15 19	dvelimh	$⊢ \neg \forall x x = y \to (y = v \to \forall x y = v)$
21	11 20	e1a	$⊢ (\neg \forall x x = y \to (y = v \to \forall x y = v))$
22	21	in1	$⊢ \neg \forall x x = y \to (y = v \to \forall x y = v)$
23	22	alimi	$⊢ \forall x \neg \forall x x = y \to \forall x (y = v \to \forall x y = v)$
24	13 23	syl	$⊢ \neg \forall x x = y \to \forall x (y = v \to \forall x y = v)$
25	11 24	e1a	$⊢ (\neg \forall x x = y \to \forall x (y = v \to \forall x y = v))$
26		19.41rg	$⊢ \forall x (y = v \to \forall x y = v) \to ((\exists x x = u \land y = v) \to \exists x (x = u \land y = v))$
27	25 26	e1a	$⊢ (\neg \forall x x = y \to ((\exists x x = u \land y = v) \to \exists x (x = u \land y = v)))$
28	27	in1	$⊢ \neg \forall x x = y \to ((\exists x x = u \land y = v) \to \exists x (x = u \land y = v))$
29	28	alimi	$⊢ \forall y \neg \forall x x = y \to \forall y ((\exists x x = u \land y = v) \to \exists x (x = u \land y = v))$
30	12 29	syl	$⊢ \neg \forall x x = y \to \forall y ((\exists x x = u \land y = v) \to \exists x (x = u \land y = v))$
31	11 30	e1a	$⊢ (\neg \forall x x = y \to \forall y ((\exists x x = u \land y = v) \to \exists x (x = u \land y = v)))$
32		exim	$⊢ \forall y ((\exists x x = u \land y = v) \to \exists x (x = u \land y = v)) \to (\exists y (\exists x x = u \land y = v) \to \exists y \exists x (x = u \land y = v))$
33	31 32	e1a	$⊢ (\neg \forall x x = y \to (\exists y (\exists x x = u \land y = v) \to \exists y \exists x (x = u \land y = v)))$
34		pm2.27	$⊢ \exists y (\exists x x = u \land y = v) \to ((\exists y (\exists x x = u \land y = v) \to \exists y \exists x (x = u \land y = v)) \to \exists y \exists x (x = u \land y = v))$
35	10 33 34	e01	$⊢ (\neg \forall x x = y \to \exists y \exists x (x = u \land y = v))$
36		excomim	$⊢ \exists y \exists x (x = u \land y = v) \to \exists x \exists y (x = u \land y = v)$
37	35 36	e1a	$⊢ (\neg \forall x x = y \to \exists x \exists y (x = u \land y = v))$
38	37	in1	$⊢ \neg \forall x x = y \to \exists x \exists y (x = u \land y = v)$

1::	\|- E. y y = v
2::	\|- u e.V
3:1,2:	\|- ( u e. V /\ E. y y = v )
4:3:	\|- E. y ( u e.V /\ y = v )
5::	\|- ( u e. V <-> E. x x = u )
6:5:	\|- ( ( u e.V /\ y = v ) <-> ( E. x x = u /\ y = v ) )
7:6:	\|- ( E. y ( u e. V /\ y = v ) <-> E. y ( E. x x = u /\ y = v ) )
8:4,7:	\|- E. y ( E. x x = u /\ y = v )
9::	\|- ( z = v -> A. x z = v )
10::	\|- ( y = v -> A. z y = v )
11::	\|- (. z = y ->. z = y ).
12:11:	\|- (. z = y ->. ( z = v <-> y = v ) ).
120:11:	\|- ( z = y -> ( z = v <-> y = v ) )
13:9,10,120:	\|- ( -. A. x x = y -> ( y = v -> A. x y = v ) )
14::	\|- (. -. A. x x = y ->. -. A. x x = y ).
15:14,13:	\|- (. -. A. x x = y ->. ( y = v -> A. x y = v ) ).
16:15:	\|- ( -. A. x x = y -> ( y = v -> A. x y = v ) )
17:16:	\|- ( A. x -. A. x x = y -> A. x ( y = v -> A. x y = v ) )
18::	\|- ( -. A. x x = y -> A. x -. A. x x = y )
19:17,18:	\|- ( -. A. x x = y -> A. x ( y = v -> A. x y = v ) )
20:14,19:	\|- (. -. A. x x = y ->. A. x ( y = v -> A. x y = v ) ).
21:20:	\|- (. -. A. x x = y ->. ( ( E. x x = u /\ y = v ) -> E. x ( x = u /\ y = v ) ) ).
22:21:	\|- ( -. A. x x = y -> ( ( E. x x = u /\ y = v ) -> E. x ( x = u /\ y = v ) ) )
23:22:	\|- ( A. y -. A. x x = y -> A. y ( ( E. x x = u /\ y = v ) -> E. x ( x = u /\ y = v ) ) )
24::	\|- ( -. A. x x = y -> A. y -. A. x x = y )
25:23,24:	\|- ( -. A. x x = y -> A. y ( ( E. x x = u /\ y = v ) -> E. x ( x = u /\ y = v ) ) )
26:14,25:	\|- (. -. A. x x = y ->. A. y ( ( E. x x = u /\ y = v ) -> E. x ( x = u /\ y = v ) ) ).
27:26:	\|- (. -. A. x x = y ->. ( E. y ( E. x x = u /\ y = v ) -> E. y E. x ( x = u /\ y = v ) ) ).
28:8,27:	\|- (. -. A. x x = y ->. E. y E. x ( x = u /\ y = v ) ).
29:28:	\|- (. -. A. x x = y ->. E. x E. y ( x = u /\ y = v ) ).
qed:29:	\|- ( -. A. x x = y -> E. x E. y ( x = u /\ y = v ) )

Metamath Proof Explorer

Theorem ax6e2ndVD

Proof