gbowpos

Description: Any weak odd Goldbach number is positive. (Contributed by AV, 20-Jul-2020)

		Ref	Expression
	Assertion	gbowpos	\|- ( Z e. GoldbachOddW -> Z e. NN )

Step	Hyp	Ref	Expression
1		isgbow	\|- ( Z e. GoldbachOddW <-> ( Z e. Odd /\ E. p e. Prime E. q e. Prime E. r e. Prime Z = ( ( p + q ) + r ) ) )
2		prmnn	\|- ( p e. Prime -> p e. NN )
3		prmnn	\|- ( q e. Prime -> q e. NN )
4	2 3	anim12i	\|- ( ( p e. Prime /\ q e. Prime ) -> ( p e. NN /\ q e. NN ) )
5	4	adantr	\|- ( ( ( p e. Prime /\ q e. Prime ) /\ r e. Prime ) -> ( p e. NN /\ q e. NN ) )
6		nnaddcl	\|- ( ( p e. NN /\ q e. NN ) -> ( p + q ) e. NN )
7	5 6	syl	\|- ( ( ( p e. Prime /\ q e. Prime ) /\ r e. Prime ) -> ( p + q ) e. NN )
8		prmnn	\|- ( r e. Prime -> r e. NN )
9	8	adantl	\|- ( ( ( p e. Prime /\ q e. Prime ) /\ r e. Prime ) -> r e. NN )
10	7 9	nnaddcld	\|- ( ( ( p e. Prime /\ q e. Prime ) /\ r e. Prime ) -> ( ( p + q ) + r ) e. NN )
11		eleq1	\|- ( Z = ( ( p + q ) + r ) -> ( Z e. NN <-> ( ( p + q ) + r ) e. NN ) )
12	10 11	syl5ibrcom	\|- ( ( ( p e. Prime /\ q e. Prime ) /\ r e. Prime ) -> ( Z = ( ( p + q ) + r ) -> Z e. NN ) )
13	12	rexlimdva	\|- ( ( p e. Prime /\ q e. Prime ) -> ( E. r e. Prime Z = ( ( p + q ) + r ) -> Z e. NN ) )
14	13	a1i	\|- ( Z e. Odd -> ( ( p e. Prime /\ q e. Prime ) -> ( E. r e. Prime Z = ( ( p + q ) + r ) -> Z e. NN ) ) )
15	14	rexlimdvv	\|- ( Z e. Odd -> ( E. p e. Prime E. q e. Prime E. r e. Prime Z = ( ( p + q ) + r ) -> Z e. NN ) )
16	15	imp	\|- ( ( Z e. Odd /\ E. p e. Prime E. q e. Prime E. r e. Prime Z = ( ( p + q ) + r ) ) -> Z e. NN )
17	1 16	sylbi	\|- ( Z e. GoldbachOddW -> Z e. NN )

Metamath Proof Explorer