flt4lem6

Description: Remove shared factors in a solution to A ^ 4 + B ^ 4 = C ^ 2 . (Contributed by SN, 24-Jul-2024)

	Ref	Expression
Hypotheses	flt4lem6.a	\|- ( ph -> A e. NN )
	flt4lem6.b	\|- ( ph -> B e. NN )
	flt4lem6.c	\|- ( ph -> C e. NN )
	flt4lem6.1	\|- ( ph -> ( ( A ^ 4 ) + ( B ^ 4 ) ) = ( C ^ 2 ) )
Assertion	flt4lem6	\|- ( ph -> ( ( ( A / ( A gcd B ) ) e. NN /\ ( B / ( A gcd B ) ) e. NN /\ ( C / ( ( A gcd B ) ^ 2 ) ) e. NN ) /\ ( ( ( A / ( A gcd B ) ) ^ 4 ) + ( ( B / ( A gcd B ) ) ^ 4 ) ) = ( ( C / ( ( A gcd B ) ^ 2 ) ) ^ 2 ) ) )

Proof

Step	Hyp	Ref	Expression
1		flt4lem6.a	\|- ( ph -> A e. NN )
2		flt4lem6.b	\|- ( ph -> B e. NN )
3		flt4lem6.c	\|- ( ph -> C e. NN )
4		flt4lem6.1	\|- ( ph -> ( ( A ^ 4 ) + ( B ^ 4 ) ) = ( C ^ 2 ) )
5	2	nnzd	\|- ( ph -> B e. ZZ )
6		divgcdnn	\|- ( ( A e. NN /\ B e. ZZ ) -> ( A / ( A gcd B ) ) e. NN )
7	1 5 6	syl2anc	\|- ( ph -> ( A / ( A gcd B ) ) e. NN )
8	1	nnzd	\|- ( ph -> A e. ZZ )
9		divgcdnnr	\|- ( ( B e. NN /\ A e. ZZ ) -> ( B / ( A gcd B ) ) e. NN )
10	2 8 9	syl2anc	\|- ( ph -> ( B / ( A gcd B ) ) e. NN )
11		gcdnncl	\|- ( ( A e. NN /\ B e. NN ) -> ( A gcd B ) e. NN )
12	1 2 11	syl2anc	\|- ( ph -> ( A gcd B ) e. NN )
13	12	nncnd	\|- ( ph -> ( A gcd B ) e. CC )
14	13	flt4lem	\|- ( ph -> ( ( A gcd B ) ^ 4 ) = ( ( ( A gcd B ) ^ 2 ) ^ 2 ) )
15	4 14	oveq12d	\|- ( ph -> ( ( ( A ^ 4 ) + ( B ^ 4 ) ) / ( ( A gcd B ) ^ 4 ) ) = ( ( C ^ 2 ) / ( ( ( A gcd B ) ^ 2 ) ^ 2 ) ) )
16	1	nncnd	\|- ( ph -> A e. CC )
17	12	nnne0d	\|- ( ph -> ( A gcd B ) =/= 0 )
18		4nn0	\|- 4 e. NN0
19	18	a1i	\|- ( ph -> 4 e. NN0 )
20	16 13 17 19	expdivd	\|- ( ph -> ( ( A / ( A gcd B ) ) ^ 4 ) = ( ( A ^ 4 ) / ( ( A gcd B ) ^ 4 ) ) )
21	2	nncnd	\|- ( ph -> B e. CC )
22	21 13 17 19	expdivd	\|- ( ph -> ( ( B / ( A gcd B ) ) ^ 4 ) = ( ( B ^ 4 ) / ( ( A gcd B ) ^ 4 ) ) )
23	20 22	oveq12d	\|- ( ph -> ( ( ( A / ( A gcd B ) ) ^ 4 ) + ( ( B / ( A gcd B ) ) ^ 4 ) ) = ( ( ( A ^ 4 ) / ( ( A gcd B ) ^ 4 ) ) + ( ( B ^ 4 ) / ( ( A gcd B ) ^ 4 ) ) ) )
24	16 19	expcld	\|- ( ph -> ( A ^ 4 ) e. CC )
25	21 19	expcld	\|- ( ph -> ( B ^ 4 ) e. CC )
26	13 19	expcld	\|- ( ph -> ( ( A gcd B ) ^ 4 ) e. CC )
27	12 19	nnexpcld	\|- ( ph -> ( ( A gcd B ) ^ 4 ) e. NN )
28	27	nnne0d	\|- ( ph -> ( ( A gcd B ) ^ 4 ) =/= 0 )
29	24 25 26 28	divdird	\|- ( ph -> ( ( ( A ^ 4 ) + ( B ^ 4 ) ) / ( ( A gcd B ) ^ 4 ) ) = ( ( ( A ^ 4 ) / ( ( A gcd B ) ^ 4 ) ) + ( ( B ^ 4 ) / ( ( A gcd B ) ^ 4 ) ) ) )
30	23 29	eqtr4d	\|- ( ph -> ( ( ( A / ( A gcd B ) ) ^ 4 ) + ( ( B / ( A gcd B ) ) ^ 4 ) ) = ( ( ( A ^ 4 ) + ( B ^ 4 ) ) / ( ( A gcd B ) ^ 4 ) ) )
31	3	nncnd	\|- ( ph -> C e. CC )
32	12	nnsqcld	\|- ( ph -> ( ( A gcd B ) ^ 2 ) e. NN )
33	32	nncnd	\|- ( ph -> ( ( A gcd B ) ^ 2 ) e. CC )
34	32	nnne0d	\|- ( ph -> ( ( A gcd B ) ^ 2 ) =/= 0 )
35	31 33 34	sqdivd	\|- ( ph -> ( ( C / ( ( A gcd B ) ^ 2 ) ) ^ 2 ) = ( ( C ^ 2 ) / ( ( ( A gcd B ) ^ 2 ) ^ 2 ) ) )
36	15 30 35	3eqtr4d	\|- ( ph -> ( ( ( A / ( A gcd B ) ) ^ 4 ) + ( ( B / ( A gcd B ) ) ^ 4 ) ) = ( ( C / ( ( A gcd B ) ^ 2 ) ) ^ 2 ) )
37	7 19	nnexpcld	\|- ( ph -> ( ( A / ( A gcd B ) ) ^ 4 ) e. NN )
38	10 19	nnexpcld	\|- ( ph -> ( ( B / ( A gcd B ) ) ^ 4 ) e. NN )
39	37 38	nnaddcld	\|- ( ph -> ( ( ( A / ( A gcd B ) ) ^ 4 ) + ( ( B / ( A gcd B ) ) ^ 4 ) ) e. NN )
40	39	nnzd	\|- ( ph -> ( ( ( A / ( A gcd B ) ) ^ 4 ) + ( ( B / ( A gcd B ) ) ^ 4 ) ) e. ZZ )
41	36 40	eqeltrrd	\|- ( ph -> ( ( C / ( ( A gcd B ) ^ 2 ) ) ^ 2 ) e. ZZ )
42	3	nnzd	\|- ( ph -> C e. ZZ )
43		znq	\|- ( ( C e. ZZ /\ ( ( A gcd B ) ^ 2 ) e. NN ) -> ( C / ( ( A gcd B ) ^ 2 ) ) e. QQ )
44	42 32 43	syl2anc	\|- ( ph -> ( C / ( ( A gcd B ) ^ 2 ) ) e. QQ )
45	3	nnred	\|- ( ph -> C e. RR )
46	32	nnred	\|- ( ph -> ( ( A gcd B ) ^ 2 ) e. RR )
47	3	nngt0d	\|- ( ph -> 0 < C )
48	32	nngt0d	\|- ( ph -> 0 < ( ( A gcd B ) ^ 2 ) )
49	45 46 47 48	divgt0d	\|- ( ph -> 0 < ( C / ( ( A gcd B ) ^ 2 ) ) )
50	41 44 49	posqsqznn	\|- ( ph -> ( C / ( ( A gcd B ) ^ 2 ) ) e. NN )
51	7 10 50	3jca	\|- ( ph -> ( ( A / ( A gcd B ) ) e. NN /\ ( B / ( A gcd B ) ) e. NN /\ ( C / ( ( A gcd B ) ^ 2 ) ) e. NN ) )
52	51 36	jca	\|- ( ph -> ( ( ( A / ( A gcd B ) ) e. NN /\ ( B / ( A gcd B ) ) e. NN /\ ( C / ( ( A gcd B ) ^ 2 ) ) e. NN ) /\ ( ( ( A / ( A gcd B ) ) ^ 4 ) + ( ( B / ( A gcd B ) ) ^ 4 ) ) = ( ( C / ( ( A gcd B ) ^ 2 ) ) ^ 2 ) ) )

Metamath Proof Explorer

Theorem flt4lem6

Proof