9gbo

		Ref	Expression
	Assertion	9gbo	\|- 9 e. GoldbachOdd

Proof

Step	Hyp	Ref	Expression
1		df-9	\|- 9 = ( 8 + 1 )
2		8even	\|- 8 e. Even
3		evenp1odd	\|- ( 8 e. Even -> ( 8 + 1 ) e. Odd )
4	2 3	ax-mp	\|- ( 8 + 1 ) e. Odd
5	1 4	eqeltri	\|- 9 e. Odd
6		3prm	\|- 3 e. Prime
7		3odd	\|- 3 e. Odd
8	7 7 7	3pm3.2i	\|- ( 3 e. Odd /\ 3 e. Odd /\ 3 e. Odd )
9		gbpart9	\|- 9 = ( ( 3 + 3 ) + 3 )
10	8 9	pm3.2i	\|- ( ( 3 e. Odd /\ 3 e. Odd /\ 3 e. Odd ) /\ 9 = ( ( 3 + 3 ) + 3 ) )
11		eleq1	\|- ( r = 3 -> ( r e. Odd <-> 3 e. Odd ) )
12	11	3anbi3d	\|- ( r = 3 -> ( ( 3 e. Odd /\ 3 e. Odd /\ r e. Odd ) <-> ( 3 e. Odd /\ 3 e. Odd /\ 3 e. Odd ) ) )
13		oveq2	\|- ( r = 3 -> ( ( 3 + 3 ) + r ) = ( ( 3 + 3 ) + 3 ) )
14	13	eqeq2d	\|- ( r = 3 -> ( 9 = ( ( 3 + 3 ) + r ) <-> 9 = ( ( 3 + 3 ) + 3 ) ) )
15	12 14	anbi12d	\|- ( r = 3 -> ( ( ( 3 e. Odd /\ 3 e. Odd /\ r e. Odd ) /\ 9 = ( ( 3 + 3 ) + r ) ) <-> ( ( 3 e. Odd /\ 3 e. Odd /\ 3 e. Odd ) /\ 9 = ( ( 3 + 3 ) + 3 ) ) ) )
16	15	rspcev	\|- ( ( 3 e. Prime /\ ( ( 3 e. Odd /\ 3 e. Odd /\ 3 e. Odd ) /\ 9 = ( ( 3 + 3 ) + 3 ) ) ) -> E. r e. Prime ( ( 3 e. Odd /\ 3 e. Odd /\ r e. Odd ) /\ 9 = ( ( 3 + 3 ) + r ) ) )
17	6 10 16	mp2an	\|- E. r e. Prime ( ( 3 e. Odd /\ 3 e. Odd /\ r e. Odd ) /\ 9 = ( ( 3 + 3 ) + r ) )
18		eleq1	\|- ( p = 3 -> ( p e. Odd <-> 3 e. Odd ) )
19	18	3anbi1d	\|- ( p = 3 -> ( ( p e. Odd /\ q e. Odd /\ r e. Odd ) <-> ( 3 e. Odd /\ q e. Odd /\ r e. Odd ) ) )
20		oveq1	\|- ( p = 3 -> ( p + q ) = ( 3 + q ) )
21	20	oveq1d	\|- ( p = 3 -> ( ( p + q ) + r ) = ( ( 3 + q ) + r ) )
22	21	eqeq2d	\|- ( p = 3 -> ( 9 = ( ( p + q ) + r ) <-> 9 = ( ( 3 + q ) + r ) ) )
23	19 22	anbi12d	\|- ( p = 3 -> ( ( ( p e. Odd /\ q e. Odd /\ r e. Odd ) /\ 9 = ( ( p + q ) + r ) ) <-> ( ( 3 e. Odd /\ q e. Odd /\ r e. Odd ) /\ 9 = ( ( 3 + q ) + r ) ) ) )
24	23	rexbidv	\|- ( p = 3 -> ( E. r e. Prime ( ( p e. Odd /\ q e. Odd /\ r e. Odd ) /\ 9 = ( ( p + q ) + r ) ) <-> E. r e. Prime ( ( 3 e. Odd /\ q e. Odd /\ r e. Odd ) /\ 9 = ( ( 3 + q ) + r ) ) ) )
25		eleq1	\|- ( q = 3 -> ( q e. Odd <-> 3 e. Odd ) )
26	25	3anbi2d	\|- ( q = 3 -> ( ( 3 e. Odd /\ q e. Odd /\ r e. Odd ) <-> ( 3 e. Odd /\ 3 e. Odd /\ r e. Odd ) ) )
27		oveq2	\|- ( q = 3 -> ( 3 + q ) = ( 3 + 3 ) )
28	27	oveq1d	\|- ( q = 3 -> ( ( 3 + q ) + r ) = ( ( 3 + 3 ) + r ) )
29	28	eqeq2d	\|- ( q = 3 -> ( 9 = ( ( 3 + q ) + r ) <-> 9 = ( ( 3 + 3 ) + r ) ) )
30	26 29	anbi12d	\|- ( q = 3 -> ( ( ( 3 e. Odd /\ q e. Odd /\ r e. Odd ) /\ 9 = ( ( 3 + q ) + r ) ) <-> ( ( 3 e. Odd /\ 3 e. Odd /\ r e. Odd ) /\ 9 = ( ( 3 + 3 ) + r ) ) ) )
31	30	rexbidv	\|- ( q = 3 -> ( E. r e. Prime ( ( 3 e. Odd /\ q e. Odd /\ r e. Odd ) /\ 9 = ( ( 3 + q ) + r ) ) <-> E. r e. Prime ( ( 3 e. Odd /\ 3 e. Odd /\ r e. Odd ) /\ 9 = ( ( 3 + 3 ) + r ) ) ) )
32	24 31	rspc2ev	\|- ( ( 3 e. Prime /\ 3 e. Prime /\ E. r e. Prime ( ( 3 e. Odd /\ 3 e. Odd /\ r e. Odd ) /\ 9 = ( ( 3 + 3 ) + r ) ) ) -> E. p e. Prime E. q e. Prime E. r e. Prime ( ( p e. Odd /\ q e. Odd /\ r e. Odd ) /\ 9 = ( ( p + q ) + r ) ) )
33	6 6 17 32	mp3an	\|- E. p e. Prime E. q e. Prime E. r e. Prime ( ( p e. Odd /\ q e. Odd /\ r e. Odd ) /\ 9 = ( ( p + q ) + r ) )
34		isgbo	\|- ( 9 e. GoldbachOdd <-> ( 9 e. Odd /\ E. p e. Prime E. q e. Prime E. r e. Prime ( ( p e. Odd /\ q e. Odd /\ r e. Odd ) /\ 9 = ( ( p + q ) + r ) ) ) )
35	5 33 34	mpbir2an	\|- 9 e. GoldbachOdd

Metamath Proof Explorer

Theorem 9gbo

Proof