erler

Description: The relation used to build the ring localization is an equivalence relation. (Contributed by Thierry Arnoux, 4-May-2025)

	Ref	Expression
Hypotheses	erler.1	\|- B = ( Base ` R )
	erler.2	\|- .0. = ( 0g ` R )
	erler.3	\|- .1. = ( 1r ` R )
	erler.4	\|- .x. = ( .r ` R )
	erler.5	\|- .- = ( -g ` R )
	erler.w	\|- W = ( B X. S )
	erler.q	\|- .~ = ( R ~RL S )
	erler.r	\|- ( ph -> R e. CRing )
	erler.s	\|- ( ph -> S e. ( SubMnd ` ( mulGrp ` R ) ) )
Assertion	erler	\|- ( ph -> .~ Er W )

Proof

Step	Hyp	Ref	Expression
1		erler.1	\|- B = ( Base ` R )
2		erler.2	\|- .0. = ( 0g ` R )
3		erler.3	\|- .1. = ( 1r ` R )
4		erler.4	\|- .x. = ( .r ` R )
5		erler.5	\|- .- = ( -g ` R )
6		erler.w	\|- W = ( B X. S )
7		erler.q	\|- .~ = ( R ~RL S )
8		erler.r	\|- ( ph -> R e. CRing )
9		erler.s	\|- ( ph -> S e. ( SubMnd ` ( mulGrp ` R ) ) )
10		eqid	\|- { <. a , b >. \| ( ( a e. W /\ b e. W ) /\ E. t e. S ( t .x. ( ( ( 1st ` a ) .x. ( 2nd ` b ) ) .- ( ( 1st ` b ) .x. ( 2nd ` a ) ) ) ) = .0. ) } = { <. a , b >. \| ( ( a e. W /\ b e. W ) /\ E. t e. S ( t .x. ( ( ( 1st ` a ) .x. ( 2nd ` b ) ) .- ( ( 1st ` b ) .x. ( 2nd ` a ) ) ) ) = .0. ) }
11	10	relopabiv	\|- Rel { <. a , b >. \| ( ( a e. W /\ b e. W ) /\ E. t e. S ( t .x. ( ( ( 1st ` a ) .x. ( 2nd ` b ) ) .- ( ( 1st ` b ) .x. ( 2nd ` a ) ) ) ) = .0. ) }
12	11	a1i	\|- ( ph -> Rel { <. a , b >. \| ( ( a e. W /\ b e. W ) /\ E. t e. S ( t .x. ( ( ( 1st ` a ) .x. ( 2nd ` b ) ) .- ( ( 1st ` b ) .x. ( 2nd ` a ) ) ) ) = .0. ) } )
13		eqid	\|- ( mulGrp ` R ) = ( mulGrp ` R )
14	13 1	mgpbas	\|- B = ( Base ` ( mulGrp ` R ) )
15	14	submss	\|- ( S e. ( SubMnd ` ( mulGrp ` R ) ) -> S C_ B )
16	9 15	syl	\|- ( ph -> S C_ B )
17	1 2 4 5 6 10 16	erlval	\|- ( ph -> ( R ~RL S ) = { <. a , b >. \| ( ( a e. W /\ b e. W ) /\ E. t e. S ( t .x. ( ( ( 1st ` a ) .x. ( 2nd ` b ) ) .- ( ( 1st ` b ) .x. ( 2nd ` a ) ) ) ) = .0. ) } )
18	7 17	eqtrid	\|- ( ph -> .~ = { <. a , b >. \| ( ( a e. W /\ b e. W ) /\ E. t e. S ( t .x. ( ( ( 1st ` a ) .x. ( 2nd ` b ) ) .- ( ( 1st ` b ) .x. ( 2nd ` a ) ) ) ) = .0. ) } )
19	18	releqd	\|- ( ph -> ( Rel .~ <-> Rel { <. a , b >. \| ( ( a e. W /\ b e. W ) /\ E. t e. S ( t .x. ( ( ( 1st ` a ) .x. ( 2nd ` b ) ) .- ( ( 1st ` b ) .x. ( 2nd ` a ) ) ) ) = .0. ) } ) )
20	12 19	mpbird	\|- ( ph -> Rel .~ )
21		simpl	\|- ( ( a = x /\ b = y ) -> a = x )
22	21	fveq2d	\|- ( ( a = x /\ b = y ) -> ( 1st ` a ) = ( 1st ` x ) )
23		simpr	\|- ( ( a = x /\ b = y ) -> b = y )
24	23	fveq2d	\|- ( ( a = x /\ b = y ) -> ( 2nd ` b ) = ( 2nd ` y ) )
25	22 24	oveq12d	\|- ( ( a = x /\ b = y ) -> ( ( 1st ` a ) .x. ( 2nd ` b ) ) = ( ( 1st ` x ) .x. ( 2nd ` y ) ) )
26	23	fveq2d	\|- ( ( a = x /\ b = y ) -> ( 1st ` b ) = ( 1st ` y ) )
27	21	fveq2d	\|- ( ( a = x /\ b = y ) -> ( 2nd ` a ) = ( 2nd ` x ) )
28	26 27	oveq12d	\|- ( ( a = x /\ b = y ) -> ( ( 1st ` b ) .x. ( 2nd ` a ) ) = ( ( 1st ` y ) .x. ( 2nd ` x ) ) )
29	25 28	oveq12d	\|- ( ( a = x /\ b = y ) -> ( ( ( 1st ` a ) .x. ( 2nd ` b ) ) .- ( ( 1st ` b ) .x. ( 2nd ` a ) ) ) = ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) )
30	29	oveq2d	\|- ( ( a = x /\ b = y ) -> ( t .x. ( ( ( 1st ` a ) .x. ( 2nd ` b ) ) .- ( ( 1st ` b ) .x. ( 2nd ` a ) ) ) ) = ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) )
31	30	eqeq1d	\|- ( ( a = x /\ b = y ) -> ( ( t .x. ( ( ( 1st ` a ) .x. ( 2nd ` b ) ) .- ( ( 1st ` b ) .x. ( 2nd ` a ) ) ) ) = .0. <-> ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) )
32	31	rexbidv	\|- ( ( a = x /\ b = y ) -> ( E. t e. S ( t .x. ( ( ( 1st ` a ) .x. ( 2nd ` b ) ) .- ( ( 1st ` b ) .x. ( 2nd ` a ) ) ) ) = .0. <-> E. t e. S ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) )
33	32	adantl	\|- ( ( ph /\ ( a = x /\ b = y ) ) -> ( E. t e. S ( t .x. ( ( ( 1st ` a ) .x. ( 2nd ` b ) ) .- ( ( 1st ` b ) .x. ( 2nd ` a ) ) ) ) = .0. <-> E. t e. S ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) )
34	18 33	brab2d	\|- ( ph -> ( x .~ y <-> ( ( x e. W /\ y e. W ) /\ E. t e. S ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) ) )
35	34	biimpa	\|- ( ( ph /\ x .~ y ) -> ( ( x e. W /\ y e. W ) /\ E. t e. S ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) )
36	35	simplrd	\|- ( ( ph /\ x .~ y ) -> y e. W )
37	35	simplld	\|- ( ( ph /\ x .~ y ) -> x e. W )
38	36 37	jca	\|- ( ( ph /\ x .~ y ) -> ( y e. W /\ x e. W ) )
39	35	simprd	\|- ( ( ph /\ x .~ y ) -> E. t e. S ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. )
40	8	crngringd	\|- ( ph -> R e. Ring )
41	40	ringgrpd	\|- ( ph -> R e. Grp )
42	41	ad3antrrr	\|- ( ( ( ( ph /\ x .~ y ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) -> R e. Grp )
43	40	ad3antrrr	\|- ( ( ( ( ph /\ x .~ y ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) -> R e. Ring )
44	37	ad2antrr	\|- ( ( ( ( ph /\ x .~ y ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) -> x e. W )
45		xp1st	\|- ( x e. ( B X. S ) -> ( 1st ` x ) e. B )
46	45 6	eleq2s	\|- ( x e. W -> ( 1st ` x ) e. B )
47	44 46	syl	\|- ( ( ( ( ph /\ x .~ y ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) -> ( 1st ` x ) e. B )
48	16	ad3antrrr	\|- ( ( ( ( ph /\ x .~ y ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) -> S C_ B )
49	36	ad2antrr	\|- ( ( ( ( ph /\ x .~ y ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) -> y e. W )
50		xp2nd	\|- ( y e. ( B X. S ) -> ( 2nd ` y ) e. S )
51	50 6	eleq2s	\|- ( y e. W -> ( 2nd ` y ) e. S )
52	49 51	syl	\|- ( ( ( ( ph /\ x .~ y ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) -> ( 2nd ` y ) e. S )
53	48 52	sseldd	\|- ( ( ( ( ph /\ x .~ y ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) -> ( 2nd ` y ) e. B )
54	1 4 43 47 53	ringcld	\|- ( ( ( ( ph /\ x .~ y ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) -> ( ( 1st ` x ) .x. ( 2nd ` y ) ) e. B )
55		xp1st	\|- ( y e. ( B X. S ) -> ( 1st ` y ) e. B )
56	55 6	eleq2s	\|- ( y e. W -> ( 1st ` y ) e. B )
57	49 56	syl	\|- ( ( ( ( ph /\ x .~ y ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) -> ( 1st ` y ) e. B )
58		xp2nd	\|- ( x e. ( B X. S ) -> ( 2nd ` x ) e. S )
59	58 6	eleq2s	\|- ( x e. W -> ( 2nd ` x ) e. S )
60	44 59	syl	\|- ( ( ( ( ph /\ x .~ y ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) -> ( 2nd ` x ) e. S )
61	48 60	sseldd	\|- ( ( ( ( ph /\ x .~ y ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) -> ( 2nd ` x ) e. B )
62	1 4 43 57 61	ringcld	\|- ( ( ( ( ph /\ x .~ y ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) -> ( ( 1st ` y ) .x. ( 2nd ` x ) ) e. B )
63		eqid	\|- ( invg ` R ) = ( invg ` R )
64	1 5 63	grpinvsub	\|- ( ( R e. Grp /\ ( ( 1st ` x ) .x. ( 2nd ` y ) ) e. B /\ ( ( 1st ` y ) .x. ( 2nd ` x ) ) e. B ) -> ( ( invg ` R ) ` ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = ( ( ( 1st ` y ) .x. ( 2nd ` x ) ) .- ( ( 1st ` x ) .x. ( 2nd ` y ) ) ) )
65	42 54 62 64	syl3anc	\|- ( ( ( ( ph /\ x .~ y ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) -> ( ( invg ` R ) ` ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = ( ( ( 1st ` y ) .x. ( 2nd ` x ) ) .- ( ( 1st ` x ) .x. ( 2nd ` y ) ) ) )
66	65	oveq2d	\|- ( ( ( ( ph /\ x .~ y ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) -> ( t .x. ( ( invg ` R ) ` ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) ) = ( t .x. ( ( ( 1st ` y ) .x. ( 2nd ` x ) ) .- ( ( 1st ` x ) .x. ( 2nd ` y ) ) ) ) )
67		simplr	\|- ( ( ( ( ph /\ x .~ y ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) -> t e. S )
68	48 67	sseldd	\|- ( ( ( ( ph /\ x .~ y ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) -> t e. B )
69	1 5	grpsubcl	\|- ( ( R e. Grp /\ ( ( 1st ` x ) .x. ( 2nd ` y ) ) e. B /\ ( ( 1st ` y ) .x. ( 2nd ` x ) ) e. B ) -> ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) e. B )
70	42 54 62 69	syl3anc	\|- ( ( ( ( ph /\ x .~ y ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) -> ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) e. B )
71	1 4 63 43 68 70	ringmneg2	\|- ( ( ( ( ph /\ x .~ y ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) -> ( t .x. ( ( invg ` R ) ` ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) ) = ( ( invg ` R ) ` ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) ) )
72		simpr	\|- ( ( ( ( ph /\ x .~ y ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) -> ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. )
73	72	fveq2d	\|- ( ( ( ( ph /\ x .~ y ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) -> ( ( invg ` R ) ` ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) ) = ( ( invg ` R ) ` .0. ) )
74	2 63	grpinvid	\|- ( R e. Grp -> ( ( invg ` R ) ` .0. ) = .0. )
75	42 74	syl	\|- ( ( ( ( ph /\ x .~ y ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) -> ( ( invg ` R ) ` .0. ) = .0. )
76	71 73 75	3eqtrd	\|- ( ( ( ( ph /\ x .~ y ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) -> ( t .x. ( ( invg ` R ) ` ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) ) = .0. )
77	66 76	eqtr3d	\|- ( ( ( ( ph /\ x .~ y ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) -> ( t .x. ( ( ( 1st ` y ) .x. ( 2nd ` x ) ) .- ( ( 1st ` x ) .x. ( 2nd ` y ) ) ) ) = .0. )
78	77	ex	\|- ( ( ( ph /\ x .~ y ) /\ t e. S ) -> ( ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. -> ( t .x. ( ( ( 1st ` y ) .x. ( 2nd ` x ) ) .- ( ( 1st ` x ) .x. ( 2nd ` y ) ) ) ) = .0. ) )
79	78	reximdva	\|- ( ( ph /\ x .~ y ) -> ( E. t e. S ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. -> E. t e. S ( t .x. ( ( ( 1st ` y ) .x. ( 2nd ` x ) ) .- ( ( 1st ` x ) .x. ( 2nd ` y ) ) ) ) = .0. ) )
80	39 79	mpd	\|- ( ( ph /\ x .~ y ) -> E. t e. S ( t .x. ( ( ( 1st ` y ) .x. ( 2nd ` x ) ) .- ( ( 1st ` x ) .x. ( 2nd ` y ) ) ) ) = .0. )
81	38 80	jca	\|- ( ( ph /\ x .~ y ) -> ( ( y e. W /\ x e. W ) /\ E. t e. S ( t .x. ( ( ( 1st ` y ) .x. ( 2nd ` x ) ) .- ( ( 1st ` x ) .x. ( 2nd ` y ) ) ) ) = .0. ) )
82		simpl	\|- ( ( a = y /\ b = x ) -> a = y )
83	82	fveq2d	\|- ( ( a = y /\ b = x ) -> ( 1st ` a ) = ( 1st ` y ) )
84		simpr	\|- ( ( a = y /\ b = x ) -> b = x )
85	84	fveq2d	\|- ( ( a = y /\ b = x ) -> ( 2nd ` b ) = ( 2nd ` x ) )
86	83 85	oveq12d	\|- ( ( a = y /\ b = x ) -> ( ( 1st ` a ) .x. ( 2nd ` b ) ) = ( ( 1st ` y ) .x. ( 2nd ` x ) ) )
87	84	fveq2d	\|- ( ( a = y /\ b = x ) -> ( 1st ` b ) = ( 1st ` x ) )
88	82	fveq2d	\|- ( ( a = y /\ b = x ) -> ( 2nd ` a ) = ( 2nd ` y ) )
89	87 88	oveq12d	\|- ( ( a = y /\ b = x ) -> ( ( 1st ` b ) .x. ( 2nd ` a ) ) = ( ( 1st ` x ) .x. ( 2nd ` y ) ) )
90	86 89	oveq12d	\|- ( ( a = y /\ b = x ) -> ( ( ( 1st ` a ) .x. ( 2nd ` b ) ) .- ( ( 1st ` b ) .x. ( 2nd ` a ) ) ) = ( ( ( 1st ` y ) .x. ( 2nd ` x ) ) .- ( ( 1st ` x ) .x. ( 2nd ` y ) ) ) )
91	90	oveq2d	\|- ( ( a = y /\ b = x ) -> ( t .x. ( ( ( 1st ` a ) .x. ( 2nd ` b ) ) .- ( ( 1st ` b ) .x. ( 2nd ` a ) ) ) ) = ( t .x. ( ( ( 1st ` y ) .x. ( 2nd ` x ) ) .- ( ( 1st ` x ) .x. ( 2nd ` y ) ) ) ) )
92	91	eqeq1d	\|- ( ( a = y /\ b = x ) -> ( ( t .x. ( ( ( 1st ` a ) .x. ( 2nd ` b ) ) .- ( ( 1st ` b ) .x. ( 2nd ` a ) ) ) ) = .0. <-> ( t .x. ( ( ( 1st ` y ) .x. ( 2nd ` x ) ) .- ( ( 1st ` x ) .x. ( 2nd ` y ) ) ) ) = .0. ) )
93	92	rexbidv	\|- ( ( a = y /\ b = x ) -> ( E. t e. S ( t .x. ( ( ( 1st ` a ) .x. ( 2nd ` b ) ) .- ( ( 1st ` b ) .x. ( 2nd ` a ) ) ) ) = .0. <-> E. t e. S ( t .x. ( ( ( 1st ` y ) .x. ( 2nd ` x ) ) .- ( ( 1st ` x ) .x. ( 2nd ` y ) ) ) ) = .0. ) )
94	93	adantl	\|- ( ( ph /\ ( a = y /\ b = x ) ) -> ( E. t e. S ( t .x. ( ( ( 1st ` a ) .x. ( 2nd ` b ) ) .- ( ( 1st ` b ) .x. ( 2nd ` a ) ) ) ) = .0. <-> E. t e. S ( t .x. ( ( ( 1st ` y ) .x. ( 2nd ` x ) ) .- ( ( 1st ` x ) .x. ( 2nd ` y ) ) ) ) = .0. ) )
95	18 94	brab2d	\|- ( ph -> ( y .~ x <-> ( ( y e. W /\ x e. W ) /\ E. t e. S ( t .x. ( ( ( 1st ` y ) .x. ( 2nd ` x ) ) .- ( ( 1st ` x ) .x. ( 2nd ` y ) ) ) ) = .0. ) ) )
96	95	adantr	\|- ( ( ph /\ x .~ y ) -> ( y .~ x <-> ( ( y e. W /\ x e. W ) /\ E. t e. S ( t .x. ( ( ( 1st ` y ) .x. ( 2nd ` x ) ) .- ( ( 1st ` x ) .x. ( 2nd ` y ) ) ) ) = .0. ) ) )
97	81 96	mpbird	\|- ( ( ph /\ x .~ y ) -> y .~ x )
98	9	ad6antr	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> S e. ( SubMnd ` ( mulGrp ` R ) ) )
99	98 15	syl	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> S C_ B )
100	37	adantr	\|- ( ( ( ph /\ x .~ y ) /\ y .~ z ) -> x e. W )
101	100	ad4antr	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> x e. W )
102	101 6	eleqtrdi	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> x e. ( B X. S ) )
103		1st2nd2	\|- ( x e. ( B X. S ) -> x = <. ( 1st ` x ) , ( 2nd ` x ) >. )
104	102 103	syl	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> x = <. ( 1st ` x ) , ( 2nd ` x ) >. )
105		simpl	\|- ( ( a = y /\ b = z ) -> a = y )
106	105	fveq2d	\|- ( ( a = y /\ b = z ) -> ( 1st ` a ) = ( 1st ` y ) )
107		simpr	\|- ( ( a = y /\ b = z ) -> b = z )
108	107	fveq2d	\|- ( ( a = y /\ b = z ) -> ( 2nd ` b ) = ( 2nd ` z ) )
109	106 108	oveq12d	\|- ( ( a = y /\ b = z ) -> ( ( 1st ` a ) .x. ( 2nd ` b ) ) = ( ( 1st ` y ) .x. ( 2nd ` z ) ) )
110	107	fveq2d	\|- ( ( a = y /\ b = z ) -> ( 1st ` b ) = ( 1st ` z ) )
111	105	fveq2d	\|- ( ( a = y /\ b = z ) -> ( 2nd ` a ) = ( 2nd ` y ) )
112	110 111	oveq12d	\|- ( ( a = y /\ b = z ) -> ( ( 1st ` b ) .x. ( 2nd ` a ) ) = ( ( 1st ` z ) .x. ( 2nd ` y ) ) )
113	109 112	oveq12d	\|- ( ( a = y /\ b = z ) -> ( ( ( 1st ` a ) .x. ( 2nd ` b ) ) .- ( ( 1st ` b ) .x. ( 2nd ` a ) ) ) = ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) )
114	113	oveq2d	\|- ( ( a = y /\ b = z ) -> ( t .x. ( ( ( 1st ` a ) .x. ( 2nd ` b ) ) .- ( ( 1st ` b ) .x. ( 2nd ` a ) ) ) ) = ( t .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) )
115	114	eqeq1d	\|- ( ( a = y /\ b = z ) -> ( ( t .x. ( ( ( 1st ` a ) .x. ( 2nd ` b ) ) .- ( ( 1st ` b ) .x. ( 2nd ` a ) ) ) ) = .0. <-> ( t .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) )
116	115	rexbidv	\|- ( ( a = y /\ b = z ) -> ( E. t e. S ( t .x. ( ( ( 1st ` a ) .x. ( 2nd ` b ) ) .- ( ( 1st ` b ) .x. ( 2nd ` a ) ) ) ) = .0. <-> E. t e. S ( t .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) )
117		oveq1	\|- ( t = u -> ( t .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) )
118	117	eqeq1d	\|- ( t = u -> ( ( t .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. <-> ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) )
119	118	cbvrexvw	\|- ( E. t e. S ( t .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. <-> E. u e. S ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. )
120	116 119	bitrdi	\|- ( ( a = y /\ b = z ) -> ( E. t e. S ( t .x. ( ( ( 1st ` a ) .x. ( 2nd ` b ) ) .- ( ( 1st ` b ) .x. ( 2nd ` a ) ) ) ) = .0. <-> E. u e. S ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) )
121	120	adantl	\|- ( ( ph /\ ( a = y /\ b = z ) ) -> ( E. t e. S ( t .x. ( ( ( 1st ` a ) .x. ( 2nd ` b ) ) .- ( ( 1st ` b ) .x. ( 2nd ` a ) ) ) ) = .0. <-> E. u e. S ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) )
122	18 121	brab2d	\|- ( ph -> ( y .~ z <-> ( ( y e. W /\ z e. W ) /\ E. u e. S ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) ) )
123	122	biimpa	\|- ( ( ph /\ y .~ z ) -> ( ( y e. W /\ z e. W ) /\ E. u e. S ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) )
124	123	adantlr	\|- ( ( ( ph /\ x .~ y ) /\ y .~ z ) -> ( ( y e. W /\ z e. W ) /\ E. u e. S ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) )
125	124	simplrd	\|- ( ( ( ph /\ x .~ y ) /\ y .~ z ) -> z e. W )
126	125	ad4antr	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> z e. W )
127	126 6	eleqtrdi	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> z e. ( B X. S ) )
128		1st2nd2	\|- ( z e. ( B X. S ) -> z = <. ( 1st ` z ) , ( 2nd ` z ) >. )
129	127 128	syl	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> z = <. ( 1st ` z ) , ( 2nd ` z ) >. )
130	101 46	syl	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( 1st ` x ) e. B )
131		xp1st	\|- ( z e. ( B X. S ) -> ( 1st ` z ) e. B )
132	131 6	eleq2s	\|- ( z e. W -> ( 1st ` z ) e. B )
133	126 132	syl	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( 1st ` z ) e. B )
134	101 59	syl	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( 2nd ` x ) e. S )
135		xp2nd	\|- ( z e. ( B X. S ) -> ( 2nd ` z ) e. S )
136	135 6	eleq2s	\|- ( z e. W -> ( 2nd ` z ) e. S )
137	126 136	syl	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( 2nd ` z ) e. S )
138		simp-4r	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> t e. S )
139		simplr	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> u e. S )
140	13 4	mgpplusg	\|- .x. = ( +g ` ( mulGrp ` R ) )
141	140	submcl	\|- ( ( S e. ( SubMnd ` ( mulGrp ` R ) ) /\ t e. S /\ u e. S ) -> ( t .x. u ) e. S )
142	98 138 139 141	syl3anc	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( t .x. u ) e. S )
143	36	ad5antr	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> y e. W )
144	143 51	syl	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( 2nd ` y ) e. S )
145	140	submcl	\|- ( ( S e. ( SubMnd ` ( mulGrp ` R ) ) /\ ( t .x. u ) e. S /\ ( 2nd ` y ) e. S ) -> ( ( t .x. u ) .x. ( 2nd ` y ) ) e. S )
146	98 142 144 145	syl3anc	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( t .x. u ) .x. ( 2nd ` y ) ) e. S )
147	40	ad6antr	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> R e. Ring )
148	99 144	sseldd	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( 2nd ` y ) e. B )
149	99 137	sseldd	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( 2nd ` z ) e. B )
150	1 4 147 130 149	ringcld	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( 1st ` x ) .x. ( 2nd ` z ) ) e. B )
151	99 134	sseldd	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( 2nd ` x ) e. B )
152	1 4 147 133 151	ringcld	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( 1st ` z ) .x. ( 2nd ` x ) ) e. B )
153	1 4 5 147 148 150 152	ringsubdi	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( 2nd ` y ) .x. ( ( ( 1st ` x ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` x ) ) ) ) = ( ( ( 2nd ` y ) .x. ( ( 1st ` x ) .x. ( 2nd ` z ) ) ) .- ( ( 2nd ` y ) .x. ( ( 1st ` z ) .x. ( 2nd ` x ) ) ) ) )
154	8	ad6antr	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> R e. CRing )
155	1 4 154 148 130 149	crng12d	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( 2nd ` y ) .x. ( ( 1st ` x ) .x. ( 2nd ` z ) ) ) = ( ( 1st ` x ) .x. ( ( 2nd ` y ) .x. ( 2nd ` z ) ) ) )
156	1 4 154 148 149	crngcomd	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( 2nd ` y ) .x. ( 2nd ` z ) ) = ( ( 2nd ` z ) .x. ( 2nd ` y ) ) )
157	156	oveq2d	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( 1st ` x ) .x. ( ( 2nd ` y ) .x. ( 2nd ` z ) ) ) = ( ( 1st ` x ) .x. ( ( 2nd ` z ) .x. ( 2nd ` y ) ) ) )
158	1 4 154 130 149 148	crng12d	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( 1st ` x ) .x. ( ( 2nd ` z ) .x. ( 2nd ` y ) ) ) = ( ( 2nd ` z ) .x. ( ( 1st ` x ) .x. ( 2nd ` y ) ) ) )
159	155 157 158	3eqtrd	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( 2nd ` y ) .x. ( ( 1st ` x ) .x. ( 2nd ` z ) ) ) = ( ( 2nd ` z ) .x. ( ( 1st ` x ) .x. ( 2nd ` y ) ) ) )
160	1 4 154 148 133 151	crng12d	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( 2nd ` y ) .x. ( ( 1st ` z ) .x. ( 2nd ` x ) ) ) = ( ( 1st ` z ) .x. ( ( 2nd ` y ) .x. ( 2nd ` x ) ) ) )
161	1 4 154 148 151	crngcomd	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( 2nd ` y ) .x. ( 2nd ` x ) ) = ( ( 2nd ` x ) .x. ( 2nd ` y ) ) )
162	161	oveq2d	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( 1st ` z ) .x. ( ( 2nd ` y ) .x. ( 2nd ` x ) ) ) = ( ( 1st ` z ) .x. ( ( 2nd ` x ) .x. ( 2nd ` y ) ) ) )
163	1 4 154 133 151 148	crng12d	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( 1st ` z ) .x. ( ( 2nd ` x ) .x. ( 2nd ` y ) ) ) = ( ( 2nd ` x ) .x. ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) )
164	160 162 163	3eqtrd	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( 2nd ` y ) .x. ( ( 1st ` z ) .x. ( 2nd ` x ) ) ) = ( ( 2nd ` x ) .x. ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) )
165	159 164	oveq12d	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( ( 2nd ` y ) .x. ( ( 1st ` x ) .x. ( 2nd ` z ) ) ) .- ( ( 2nd ` y ) .x. ( ( 1st ` z ) .x. ( 2nd ` x ) ) ) ) = ( ( ( 2nd ` z ) .x. ( ( 1st ` x ) .x. ( 2nd ` y ) ) ) .- ( ( 2nd ` x ) .x. ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) )
166	1 4 147 130 148	ringcld	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( 1st ` x ) .x. ( 2nd ` y ) ) e. B )
167	143 56	syl	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( 1st ` y ) e. B )
168	1 4 147 167 151	ringcld	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( 1st ` y ) .x. ( 2nd ` x ) ) e. B )
169	1 4 5 147 149 166 168	ringsubdi	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( 2nd ` z ) .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = ( ( ( 2nd ` z ) .x. ( ( 1st ` x ) .x. ( 2nd ` y ) ) ) .- ( ( 2nd ` z ) .x. ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) )
170	1 4 147 167 149	ringcld	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( 1st ` y ) .x. ( 2nd ` z ) ) e. B )
171	1 4 147 133 148	ringcld	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( 1st ` z ) .x. ( 2nd ` y ) ) e. B )
172	1 4 5 147 151 170 171	ringsubdi	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( 2nd ` x ) .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = ( ( ( 2nd ` x ) .x. ( ( 1st ` y ) .x. ( 2nd ` z ) ) ) .- ( ( 2nd ` x ) .x. ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) )
173	169 172	oveq12d	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( ( 2nd ` z ) .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) ( +g ` R ) ( ( 2nd ` x ) .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) ) = ( ( ( ( 2nd ` z ) .x. ( ( 1st ` x ) .x. ( 2nd ` y ) ) ) .- ( ( 2nd ` z ) .x. ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) ( +g ` R ) ( ( ( 2nd ` x ) .x. ( ( 1st ` y ) .x. ( 2nd ` z ) ) ) .- ( ( 2nd ` x ) .x. ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) ) )
174	1 4 154 167 149 151	crng12d	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( 1st ` y ) .x. ( ( 2nd ` z ) .x. ( 2nd ` x ) ) ) = ( ( 2nd ` z ) .x. ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) )
175	174	oveq2d	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( ( 2nd ` z ) .x. ( ( 1st ` x ) .x. ( 2nd ` y ) ) ) .- ( ( 1st ` y ) .x. ( ( 2nd ` z ) .x. ( 2nd ` x ) ) ) ) = ( ( ( 2nd ` z ) .x. ( ( 1st ` x ) .x. ( 2nd ` y ) ) ) .- ( ( 2nd ` z ) .x. ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) )
176	1 4 154 149 151	crngcomd	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( 2nd ` z ) .x. ( 2nd ` x ) ) = ( ( 2nd ` x ) .x. ( 2nd ` z ) ) )
177	176	oveq2d	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( 1st ` y ) .x. ( ( 2nd ` z ) .x. ( 2nd ` x ) ) ) = ( ( 1st ` y ) .x. ( ( 2nd ` x ) .x. ( 2nd ` z ) ) ) )
178	1 4 154 151 167 149	crng12d	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( 2nd ` x ) .x. ( ( 1st ` y ) .x. ( 2nd ` z ) ) ) = ( ( 1st ` y ) .x. ( ( 2nd ` x ) .x. ( 2nd ` z ) ) ) )
179	177 178	eqtr4d	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( 1st ` y ) .x. ( ( 2nd ` z ) .x. ( 2nd ` x ) ) ) = ( ( 2nd ` x ) .x. ( ( 1st ` y ) .x. ( 2nd ` z ) ) ) )
180	179	oveq1d	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( ( 1st ` y ) .x. ( ( 2nd ` z ) .x. ( 2nd ` x ) ) ) .- ( ( 2nd ` x ) .x. ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = ( ( ( 2nd ` x ) .x. ( ( 1st ` y ) .x. ( 2nd ` z ) ) ) .- ( ( 2nd ` x ) .x. ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) )
181	175 180	oveq12d	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( ( ( 2nd ` z ) .x. ( ( 1st ` x ) .x. ( 2nd ` y ) ) ) .- ( ( 1st ` y ) .x. ( ( 2nd ` z ) .x. ( 2nd ` x ) ) ) ) ( +g ` R ) ( ( ( 1st ` y ) .x. ( ( 2nd ` z ) .x. ( 2nd ` x ) ) ) .- ( ( 2nd ` x ) .x. ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) ) = ( ( ( ( 2nd ` z ) .x. ( ( 1st ` x ) .x. ( 2nd ` y ) ) ) .- ( ( 2nd ` z ) .x. ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) ( +g ` R ) ( ( ( 2nd ` x ) .x. ( ( 1st ` y ) .x. ( 2nd ` z ) ) ) .- ( ( 2nd ` x ) .x. ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) ) )
182	41	ad6antr	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> R e. Grp )
183	1 4 147 149 166	ringcld	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( 2nd ` z ) .x. ( ( 1st ` x ) .x. ( 2nd ` y ) ) ) e. B )
184	1 4 147 149 151	ringcld	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( 2nd ` z ) .x. ( 2nd ` x ) ) e. B )
185	1 4 147 167 184	ringcld	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( 1st ` y ) .x. ( ( 2nd ` z ) .x. ( 2nd ` x ) ) ) e. B )
186	1 4 147 151 171	ringcld	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( 2nd ` x ) .x. ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) e. B )
187		eqid	\|- ( +g ` R ) = ( +g ` R )
188	1 187 5	grpnpncan	\|- ( ( R e. Grp /\ ( ( ( 2nd ` z ) .x. ( ( 1st ` x ) .x. ( 2nd ` y ) ) ) e. B /\ ( ( 1st ` y ) .x. ( ( 2nd ` z ) .x. ( 2nd ` x ) ) ) e. B /\ ( ( 2nd ` x ) .x. ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) e. B ) ) -> ( ( ( ( 2nd ` z ) .x. ( ( 1st ` x ) .x. ( 2nd ` y ) ) ) .- ( ( 1st ` y ) .x. ( ( 2nd ` z ) .x. ( 2nd ` x ) ) ) ) ( +g ` R ) ( ( ( 1st ` y ) .x. ( ( 2nd ` z ) .x. ( 2nd ` x ) ) ) .- ( ( 2nd ` x ) .x. ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) ) = ( ( ( 2nd ` z ) .x. ( ( 1st ` x ) .x. ( 2nd ` y ) ) ) .- ( ( 2nd ` x ) .x. ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) )
189	182 183 185 186 188	syl13anc	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( ( ( 2nd ` z ) .x. ( ( 1st ` x ) .x. ( 2nd ` y ) ) ) .- ( ( 1st ` y ) .x. ( ( 2nd ` z ) .x. ( 2nd ` x ) ) ) ) ( +g ` R ) ( ( ( 1st ` y ) .x. ( ( 2nd ` z ) .x. ( 2nd ` x ) ) ) .- ( ( 2nd ` x ) .x. ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) ) = ( ( ( 2nd ` z ) .x. ( ( 1st ` x ) .x. ( 2nd ` y ) ) ) .- ( ( 2nd ` x ) .x. ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) )
190	173 181 189	3eqtr2rd	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( ( 2nd ` z ) .x. ( ( 1st ` x ) .x. ( 2nd ` y ) ) ) .- ( ( 2nd ` x ) .x. ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = ( ( ( 2nd ` z ) .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) ( +g ` R ) ( ( 2nd ` x ) .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) ) )
191	153 165 190	3eqtrd	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( 2nd ` y ) .x. ( ( ( 1st ` x ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` x ) ) ) ) = ( ( ( 2nd ` z ) .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) ( +g ` R ) ( ( 2nd ` x ) .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) ) )
192	191	oveq2d	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( t .x. u ) .x. ( ( 2nd ` y ) .x. ( ( ( 1st ` x ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` x ) ) ) ) ) = ( ( t .x. u ) .x. ( ( ( 2nd ` z ) .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) ( +g ` R ) ( ( 2nd ` x ) .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) ) ) )
193	99 142	sseldd	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( t .x. u ) e. B )
194	1 5	grpsubcl	\|- ( ( R e. Grp /\ ( ( 1st ` x ) .x. ( 2nd ` z ) ) e. B /\ ( ( 1st ` z ) .x. ( 2nd ` x ) ) e. B ) -> ( ( ( 1st ` x ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` x ) ) ) e. B )
195	182 150 152 194	syl3anc	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( ( 1st ` x ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` x ) ) ) e. B )
196	1 4 147 193 148 195	ringassd	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( ( t .x. u ) .x. ( 2nd ` y ) ) .x. ( ( ( 1st ` x ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` x ) ) ) ) = ( ( t .x. u ) .x. ( ( 2nd ` y ) .x. ( ( ( 1st ` x ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` x ) ) ) ) ) )
197	99 139	sseldd	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> u e. B )
198	99 138	sseldd	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> t e. B )
199	1 4 154 197 149 198	crng32d	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( u .x. ( 2nd ` z ) ) .x. t ) = ( ( u .x. t ) .x. ( 2nd ` z ) ) )
200	1 4 154 197 198	crngcomd	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( u .x. t ) = ( t .x. u ) )
201	200	oveq1d	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( u .x. t ) .x. ( 2nd ` z ) ) = ( ( t .x. u ) .x. ( 2nd ` z ) ) )
202	199 201	eqtrd	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( u .x. ( 2nd ` z ) ) .x. t ) = ( ( t .x. u ) .x. ( 2nd ` z ) ) )
203	202	oveq1d	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( ( u .x. ( 2nd ` z ) ) .x. t ) .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = ( ( ( t .x. u ) .x. ( 2nd ` z ) ) .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) )
204	1 4 147 197 149	ringcld	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( u .x. ( 2nd ` z ) ) e. B )
205	182 166 168 69	syl3anc	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) e. B )
206	1 4 147 204 198 205	ringassd	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( ( u .x. ( 2nd ` z ) ) .x. t ) .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = ( ( u .x. ( 2nd ` z ) ) .x. ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) ) )
207	1 4 147 193 149 205	ringassd	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( ( t .x. u ) .x. ( 2nd ` z ) ) .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = ( ( t .x. u ) .x. ( ( 2nd ` z ) .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) ) )
208	203 206 207	3eqtr3d	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( u .x. ( 2nd ` z ) ) .x. ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) ) = ( ( t .x. u ) .x. ( ( 2nd ` z ) .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) ) )
209	1 4 154 198 151 197	crng32d	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( t .x. ( 2nd ` x ) ) .x. u ) = ( ( t .x. u ) .x. ( 2nd ` x ) ) )
210	209	oveq1d	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( ( t .x. ( 2nd ` x ) ) .x. u ) .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = ( ( ( t .x. u ) .x. ( 2nd ` x ) ) .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) )
211	1 4 147 198 151	ringcld	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( t .x. ( 2nd ` x ) ) e. B )
212	1 5	grpsubcl	\|- ( ( R e. Grp /\ ( ( 1st ` y ) .x. ( 2nd ` z ) ) e. B /\ ( ( 1st ` z ) .x. ( 2nd ` y ) ) e. B ) -> ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) e. B )
213	182 170 171 212	syl3anc	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) e. B )
214	1 4 147 211 197 213	ringassd	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( ( t .x. ( 2nd ` x ) ) .x. u ) .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = ( ( t .x. ( 2nd ` x ) ) .x. ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) ) )
215	1 4 147 193 151 213	ringassd	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( ( t .x. u ) .x. ( 2nd ` x ) ) .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = ( ( t .x. u ) .x. ( ( 2nd ` x ) .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) ) )
216	210 214 215	3eqtr3d	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( t .x. ( 2nd ` x ) ) .x. ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) ) = ( ( t .x. u ) .x. ( ( 2nd ` x ) .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) ) )
217	208 216	oveq12d	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( ( u .x. ( 2nd ` z ) ) .x. ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) ) ( +g ` R ) ( ( t .x. ( 2nd ` x ) ) .x. ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) ) ) = ( ( ( t .x. u ) .x. ( ( 2nd ` z ) .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) ) ( +g ` R ) ( ( t .x. u ) .x. ( ( 2nd ` x ) .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) ) ) )
218	1 4 147 149 205	ringcld	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( 2nd ` z ) .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) e. B )
219	1 4 147 151 213	ringcld	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( 2nd ` x ) .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) e. B )
220	1 187 4	ringdi	\|- ( ( R e. Ring /\ ( ( t .x. u ) e. B /\ ( ( 2nd ` z ) .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) e. B /\ ( ( 2nd ` x ) .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) e. B ) ) -> ( ( t .x. u ) .x. ( ( ( 2nd ` z ) .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) ( +g ` R ) ( ( 2nd ` x ) .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) ) ) = ( ( ( t .x. u ) .x. ( ( 2nd ` z ) .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) ) ( +g ` R ) ( ( t .x. u ) .x. ( ( 2nd ` x ) .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) ) ) )
221	147 193 218 219 220	syl13anc	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( t .x. u ) .x. ( ( ( 2nd ` z ) .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) ( +g ` R ) ( ( 2nd ` x ) .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) ) ) = ( ( ( t .x. u ) .x. ( ( 2nd ` z ) .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) ) ( +g ` R ) ( ( t .x. u ) .x. ( ( 2nd ` x ) .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) ) ) )
222	217 221	eqtr4d	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( ( u .x. ( 2nd ` z ) ) .x. ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) ) ( +g ` R ) ( ( t .x. ( 2nd ` x ) ) .x. ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) ) ) = ( ( t .x. u ) .x. ( ( ( 2nd ` z ) .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) ( +g ` R ) ( ( 2nd ` x ) .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) ) ) )
223	192 196 222	3eqtr4d	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( ( t .x. u ) .x. ( 2nd ` y ) ) .x. ( ( ( 1st ` x ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` x ) ) ) ) = ( ( ( u .x. ( 2nd ` z ) ) .x. ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) ) ( +g ` R ) ( ( t .x. ( 2nd ` x ) ) .x. ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) ) ) )
224		simpllr	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. )
225	224	oveq2d	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( u .x. ( 2nd ` z ) ) .x. ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) ) = ( ( u .x. ( 2nd ` z ) ) .x. .0. ) )
226	1 4 2 147 204	ringrzd	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( u .x. ( 2nd ` z ) ) .x. .0. ) = .0. )
227	225 226	eqtrd	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( u .x. ( 2nd ` z ) ) .x. ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) ) = .0. )
228		simpr	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. )
229	228	oveq2d	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( t .x. ( 2nd ` x ) ) .x. ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) ) = ( ( t .x. ( 2nd ` x ) ) .x. .0. ) )
230	1 4 2 147 211	ringrzd	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( t .x. ( 2nd ` x ) ) .x. .0. ) = .0. )
231	229 230	eqtrd	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( t .x. ( 2nd ` x ) ) .x. ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) ) = .0. )
232	227 231	oveq12d	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( ( u .x. ( 2nd ` z ) ) .x. ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) ) ( +g ` R ) ( ( t .x. ( 2nd ` x ) ) .x. ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) ) ) = ( .0. ( +g ` R ) .0. ) )
233	1 2	grpidcl	\|- ( R e. Grp -> .0. e. B )
234	182 233	syl	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> .0. e. B )
235	1 187 2 182 234	grplidd	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( .0. ( +g ` R ) .0. ) = .0. )
236	223 232 235	3eqtrd	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> ( ( ( t .x. u ) .x. ( 2nd ` y ) ) .x. ( ( ( 1st ` x ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` x ) ) ) ) = .0. )
237	1 7 99 2 4 5 104 129 130 133 134 137 146 236	erlbrd	\|- ( ( ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) /\ u e. S ) /\ ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. ) -> x .~ z )
238	124	simprd	\|- ( ( ( ph /\ x .~ y ) /\ y .~ z ) -> E. u e. S ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. )
239	238	ad2antrr	\|- ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) -> E. u e. S ( u .x. ( ( ( 1st ` y ) .x. ( 2nd ` z ) ) .- ( ( 1st ` z ) .x. ( 2nd ` y ) ) ) ) = .0. )
240	237 239	r19.29a	\|- ( ( ( ( ( ph /\ x .~ y ) /\ y .~ z ) /\ t e. S ) /\ ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. ) -> x .~ z )
241	39	adantr	\|- ( ( ( ph /\ x .~ y ) /\ y .~ z ) -> E. t e. S ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` y ) ) .- ( ( 1st ` y ) .x. ( 2nd ` x ) ) ) ) = .0. )
242	240 241	r19.29a	\|- ( ( ( ph /\ x .~ y ) /\ y .~ z ) -> x .~ z )
243	242	anasss	\|- ( ( ph /\ ( x .~ y /\ y .~ z ) ) -> x .~ z )
244	13 3	ringidval	\|- .1. = ( 0g ` ( mulGrp ` R ) )
245	244	subm0cl	\|- ( S e. ( SubMnd ` ( mulGrp ` R ) ) -> .1. e. S )
246	9 245	syl	\|- ( ph -> .1. e. S )
247	246	adantr	\|- ( ( ph /\ x e. W ) -> .1. e. S )
248		oveq1	\|- ( t = .1. -> ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` x ) ) .- ( ( 1st ` x ) .x. ( 2nd ` x ) ) ) ) = ( .1. .x. ( ( ( 1st ` x ) .x. ( 2nd ` x ) ) .- ( ( 1st ` x ) .x. ( 2nd ` x ) ) ) ) )
249	248	eqeq1d	\|- ( t = .1. -> ( ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` x ) ) .- ( ( 1st ` x ) .x. ( 2nd ` x ) ) ) ) = .0. <-> ( .1. .x. ( ( ( 1st ` x ) .x. ( 2nd ` x ) ) .- ( ( 1st ` x ) .x. ( 2nd ` x ) ) ) ) = .0. ) )
250	249	adantl	\|- ( ( ( ph /\ x e. W ) /\ t = .1. ) -> ( ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` x ) ) .- ( ( 1st ` x ) .x. ( 2nd ` x ) ) ) ) = .0. <-> ( .1. .x. ( ( ( 1st ` x ) .x. ( 2nd ` x ) ) .- ( ( 1st ` x ) .x. ( 2nd ` x ) ) ) ) = .0. ) )
251	40	adantr	\|- ( ( ph /\ x e. W ) -> R e. Ring )
252	46	adantl	\|- ( ( ph /\ x e. W ) -> ( 1st ` x ) e. B )
253	16	adantr	\|- ( ( ph /\ x e. W ) -> S C_ B )
254	59	adantl	\|- ( ( ph /\ x e. W ) -> ( 2nd ` x ) e. S )
255	253 254	sseldd	\|- ( ( ph /\ x e. W ) -> ( 2nd ` x ) e. B )
256	1 4 251 252 255	ringcld	\|- ( ( ph /\ x e. W ) -> ( ( 1st ` x ) .x. ( 2nd ` x ) ) e. B )
257	1 2 5	grpsubid	\|- ( ( R e. Grp /\ ( ( 1st ` x ) .x. ( 2nd ` x ) ) e. B ) -> ( ( ( 1st ` x ) .x. ( 2nd ` x ) ) .- ( ( 1st ` x ) .x. ( 2nd ` x ) ) ) = .0. )
258	41 256 257	syl2an2r	\|- ( ( ph /\ x e. W ) -> ( ( ( 1st ` x ) .x. ( 2nd ` x ) ) .- ( ( 1st ` x ) .x. ( 2nd ` x ) ) ) = .0. )
259	258	oveq2d	\|- ( ( ph /\ x e. W ) -> ( .1. .x. ( ( ( 1st ` x ) .x. ( 2nd ` x ) ) .- ( ( 1st ` x ) .x. ( 2nd ` x ) ) ) ) = ( .1. .x. .0. ) )
260	41 233	syl	\|- ( ph -> .0. e. B )
261	1 4 3 40 260	ringlidmd	\|- ( ph -> ( .1. .x. .0. ) = .0. )
262	261	adantr	\|- ( ( ph /\ x e. W ) -> ( .1. .x. .0. ) = .0. )
263	259 262	eqtrd	\|- ( ( ph /\ x e. W ) -> ( .1. .x. ( ( ( 1st ` x ) .x. ( 2nd ` x ) ) .- ( ( 1st ` x ) .x. ( 2nd ` x ) ) ) ) = .0. )
264	247 250 263	rspcedvd	\|- ( ( ph /\ x e. W ) -> E. t e. S ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` x ) ) .- ( ( 1st ` x ) .x. ( 2nd ` x ) ) ) ) = .0. )
265	264	ex	\|- ( ph -> ( x e. W -> E. t e. S ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` x ) ) .- ( ( 1st ` x ) .x. ( 2nd ` x ) ) ) ) = .0. ) )
266	265	pm4.71d	\|- ( ph -> ( x e. W <-> ( x e. W /\ E. t e. S ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` x ) ) .- ( ( 1st ` x ) .x. ( 2nd ` x ) ) ) ) = .0. ) ) )
267		pm4.24	\|- ( x e. W <-> ( x e. W /\ x e. W ) )
268	267	anbi1i	\|- ( ( x e. W /\ E. t e. S ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` x ) ) .- ( ( 1st ` x ) .x. ( 2nd ` x ) ) ) ) = .0. ) <-> ( ( x e. W /\ x e. W ) /\ E. t e. S ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` x ) ) .- ( ( 1st ` x ) .x. ( 2nd ` x ) ) ) ) = .0. ) )
269	266 268	bitrdi	\|- ( ph -> ( x e. W <-> ( ( x e. W /\ x e. W ) /\ E. t e. S ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` x ) ) .- ( ( 1st ` x ) .x. ( 2nd ` x ) ) ) ) = .0. ) ) )
270		simpl	\|- ( ( a = x /\ b = x ) -> a = x )
271	270	fveq2d	\|- ( ( a = x /\ b = x ) -> ( 1st ` a ) = ( 1st ` x ) )
272		simpr	\|- ( ( a = x /\ b = x ) -> b = x )
273	272	fveq2d	\|- ( ( a = x /\ b = x ) -> ( 2nd ` b ) = ( 2nd ` x ) )
274	271 273	oveq12d	\|- ( ( a = x /\ b = x ) -> ( ( 1st ` a ) .x. ( 2nd ` b ) ) = ( ( 1st ` x ) .x. ( 2nd ` x ) ) )
275	272	fveq2d	\|- ( ( a = x /\ b = x ) -> ( 1st ` b ) = ( 1st ` x ) )
276	270	fveq2d	\|- ( ( a = x /\ b = x ) -> ( 2nd ` a ) = ( 2nd ` x ) )
277	275 276	oveq12d	\|- ( ( a = x /\ b = x ) -> ( ( 1st ` b ) .x. ( 2nd ` a ) ) = ( ( 1st ` x ) .x. ( 2nd ` x ) ) )
278	274 277	oveq12d	\|- ( ( a = x /\ b = x ) -> ( ( ( 1st ` a ) .x. ( 2nd ` b ) ) .- ( ( 1st ` b ) .x. ( 2nd ` a ) ) ) = ( ( ( 1st ` x ) .x. ( 2nd ` x ) ) .- ( ( 1st ` x ) .x. ( 2nd ` x ) ) ) )
279	278	oveq2d	\|- ( ( a = x /\ b = x ) -> ( t .x. ( ( ( 1st ` a ) .x. ( 2nd ` b ) ) .- ( ( 1st ` b ) .x. ( 2nd ` a ) ) ) ) = ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` x ) ) .- ( ( 1st ` x ) .x. ( 2nd ` x ) ) ) ) )
280	279	eqeq1d	\|- ( ( a = x /\ b = x ) -> ( ( t .x. ( ( ( 1st ` a ) .x. ( 2nd ` b ) ) .- ( ( 1st ` b ) .x. ( 2nd ` a ) ) ) ) = .0. <-> ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` x ) ) .- ( ( 1st ` x ) .x. ( 2nd ` x ) ) ) ) = .0. ) )
281	280	rexbidv	\|- ( ( a = x /\ b = x ) -> ( E. t e. S ( t .x. ( ( ( 1st ` a ) .x. ( 2nd ` b ) ) .- ( ( 1st ` b ) .x. ( 2nd ` a ) ) ) ) = .0. <-> E. t e. S ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` x ) ) .- ( ( 1st ` x ) .x. ( 2nd ` x ) ) ) ) = .0. ) )
282	281	adantl	\|- ( ( ph /\ ( a = x /\ b = x ) ) -> ( E. t e. S ( t .x. ( ( ( 1st ` a ) .x. ( 2nd ` b ) ) .- ( ( 1st ` b ) .x. ( 2nd ` a ) ) ) ) = .0. <-> E. t e. S ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` x ) ) .- ( ( 1st ` x ) .x. ( 2nd ` x ) ) ) ) = .0. ) )
283	18 282	brab2d	\|- ( ph -> ( x .~ x <-> ( ( x e. W /\ x e. W ) /\ E. t e. S ( t .x. ( ( ( 1st ` x ) .x. ( 2nd ` x ) ) .- ( ( 1st ` x ) .x. ( 2nd ` x ) ) ) ) = .0. ) ) )
284	269 283	bitr4d	\|- ( ph -> ( x e. W <-> x .~ x ) )
285	20 97 243 284	iserd	\|- ( ph -> .~ Er W )

Metamath Proof Explorer

Theorem erler

Proof