3pthdlem1

	Ref	Expression
Hypotheses	3wlkd.p	\|- P = <" A B C D ">
	3wlkd.f	\|- F = <" J K L ">
	3wlkd.s	\|- ( ph -> ( ( A e. V /\ B e. V ) /\ ( C e. V /\ D e. V ) ) )
	3wlkd.n	\|- ( ph -> ( ( A =/= B /\ A =/= C ) /\ ( B =/= C /\ B =/= D ) /\ C =/= D ) )
Assertion	3pthdlem1	\|- ( ph -> A. k e. ( 0 ..^ ( # ` P ) ) A. j e. ( 1 ..^ ( # ` F ) ) ( k =/= j -> ( P ` k ) =/= ( P ` j ) ) )

Proof

Step	Hyp	Ref	Expression
1		3wlkd.p	\|- P = <" A B C D ">
2		3wlkd.f	\|- F = <" J K L ">
3		3wlkd.s	\|- ( ph -> ( ( A e. V /\ B e. V ) /\ ( C e. V /\ D e. V ) ) )
4		3wlkd.n	\|- ( ph -> ( ( A =/= B /\ A =/= C ) /\ ( B =/= C /\ B =/= D ) /\ C =/= D ) )
5	1 2 3	3wlkdlem3	\|- ( ph -> ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) /\ ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) ) )
6		simpr1l	\|- ( ( ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) /\ ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) ) /\ ( ( A =/= B /\ A =/= C ) /\ ( B =/= C /\ B =/= D ) /\ C =/= D ) ) -> A =/= B )
7		simpl	\|- ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) -> ( P ` 0 ) = A )
8	7	adantr	\|- ( ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) /\ ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) ) -> ( P ` 0 ) = A )
9		simpr	\|- ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) -> ( P ` 1 ) = B )
10	9	adantr	\|- ( ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) /\ ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) ) -> ( P ` 1 ) = B )
11	8 10	neeq12d	\|- ( ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) /\ ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) ) -> ( ( P ` 0 ) =/= ( P ` 1 ) <-> A =/= B ) )
12	11	adantr	\|- ( ( ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) /\ ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) ) /\ ( ( A =/= B /\ A =/= C ) /\ ( B =/= C /\ B =/= D ) /\ C =/= D ) ) -> ( ( P ` 0 ) =/= ( P ` 1 ) <-> A =/= B ) )
13	6 12	mpbird	\|- ( ( ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) /\ ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) ) /\ ( ( A =/= B /\ A =/= C ) /\ ( B =/= C /\ B =/= D ) /\ C =/= D ) ) -> ( P ` 0 ) =/= ( P ` 1 ) )
14	13	a1d	\|- ( ( ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) /\ ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) ) /\ ( ( A =/= B /\ A =/= C ) /\ ( B =/= C /\ B =/= D ) /\ C =/= D ) ) -> ( 0 =/= 1 -> ( P ` 0 ) =/= ( P ` 1 ) ) )
15		simpr1r	\|- ( ( ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) /\ ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) ) /\ ( ( A =/= B /\ A =/= C ) /\ ( B =/= C /\ B =/= D ) /\ C =/= D ) ) -> A =/= C )
16		simpl	\|- ( ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) -> ( P ` 2 ) = C )
17	16	adantl	\|- ( ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) /\ ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) ) -> ( P ` 2 ) = C )
18	8 17	neeq12d	\|- ( ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) /\ ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) ) -> ( ( P ` 0 ) =/= ( P ` 2 ) <-> A =/= C ) )
19	18	adantr	\|- ( ( ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) /\ ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) ) /\ ( ( A =/= B /\ A =/= C ) /\ ( B =/= C /\ B =/= D ) /\ C =/= D ) ) -> ( ( P ` 0 ) =/= ( P ` 2 ) <-> A =/= C ) )
20	15 19	mpbird	\|- ( ( ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) /\ ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) ) /\ ( ( A =/= B /\ A =/= C ) /\ ( B =/= C /\ B =/= D ) /\ C =/= D ) ) -> ( P ` 0 ) =/= ( P ` 2 ) )
21	20	a1d	\|- ( ( ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) /\ ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) ) /\ ( ( A =/= B /\ A =/= C ) /\ ( B =/= C /\ B =/= D ) /\ C =/= D ) ) -> ( 0 =/= 2 -> ( P ` 0 ) =/= ( P ` 2 ) ) )
22	14 21	jca	\|- ( ( ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) /\ ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) ) /\ ( ( A =/= B /\ A =/= C ) /\ ( B =/= C /\ B =/= D ) /\ C =/= D ) ) -> ( ( 0 =/= 1 -> ( P ` 0 ) =/= ( P ` 1 ) ) /\ ( 0 =/= 2 -> ( P ` 0 ) =/= ( P ` 2 ) ) ) )
23		eqid	\|- 1 = 1
24	23	2a1i	\|- ( ( ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) /\ ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) ) /\ ( ( A =/= B /\ A =/= C ) /\ ( B =/= C /\ B =/= D ) /\ C =/= D ) ) -> ( ( P ` 1 ) = ( P ` 1 ) -> 1 = 1 ) )
25	24	necon3d	\|- ( ( ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) /\ ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) ) /\ ( ( A =/= B /\ A =/= C ) /\ ( B =/= C /\ B =/= D ) /\ C =/= D ) ) -> ( 1 =/= 1 -> ( P ` 1 ) =/= ( P ` 1 ) ) )
26		simpr2l	\|- ( ( ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) /\ ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) ) /\ ( ( A =/= B /\ A =/= C ) /\ ( B =/= C /\ B =/= D ) /\ C =/= D ) ) -> B =/= C )
27	10 17	neeq12d	\|- ( ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) /\ ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) ) -> ( ( P ` 1 ) =/= ( P ` 2 ) <-> B =/= C ) )
28	27	adantr	\|- ( ( ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) /\ ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) ) /\ ( ( A =/= B /\ A =/= C ) /\ ( B =/= C /\ B =/= D ) /\ C =/= D ) ) -> ( ( P ` 1 ) =/= ( P ` 2 ) <-> B =/= C ) )
29	26 28	mpbird	\|- ( ( ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) /\ ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) ) /\ ( ( A =/= B /\ A =/= C ) /\ ( B =/= C /\ B =/= D ) /\ C =/= D ) ) -> ( P ` 1 ) =/= ( P ` 2 ) )
30	29	a1d	\|- ( ( ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) /\ ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) ) /\ ( ( A =/= B /\ A =/= C ) /\ ( B =/= C /\ B =/= D ) /\ C =/= D ) ) -> ( 1 =/= 2 -> ( P ` 1 ) =/= ( P ` 2 ) ) )
31	25 30	jca	\|- ( ( ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) /\ ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) ) /\ ( ( A =/= B /\ A =/= C ) /\ ( B =/= C /\ B =/= D ) /\ C =/= D ) ) -> ( ( 1 =/= 1 -> ( P ` 1 ) =/= ( P ` 1 ) ) /\ ( 1 =/= 2 -> ( P ` 1 ) =/= ( P ` 2 ) ) ) )
32	29	necomd	\|- ( ( ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) /\ ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) ) /\ ( ( A =/= B /\ A =/= C ) /\ ( B =/= C /\ B =/= D ) /\ C =/= D ) ) -> ( P ` 2 ) =/= ( P ` 1 ) )
33	32	a1d	\|- ( ( ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) /\ ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) ) /\ ( ( A =/= B /\ A =/= C ) /\ ( B =/= C /\ B =/= D ) /\ C =/= D ) ) -> ( 2 =/= 1 -> ( P ` 2 ) =/= ( P ` 1 ) ) )
34		eqid	\|- 2 = 2
35	34	2a1i	\|- ( ( ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) /\ ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) ) /\ ( ( A =/= B /\ A =/= C ) /\ ( B =/= C /\ B =/= D ) /\ C =/= D ) ) -> ( ( P ` 2 ) = ( P ` 2 ) -> 2 = 2 ) )
36	35	necon3d	\|- ( ( ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) /\ ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) ) /\ ( ( A =/= B /\ A =/= C ) /\ ( B =/= C /\ B =/= D ) /\ C =/= D ) ) -> ( 2 =/= 2 -> ( P ` 2 ) =/= ( P ` 2 ) ) )
37		simpr2r	\|- ( ( ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) /\ ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) ) /\ ( ( A =/= B /\ A =/= C ) /\ ( B =/= C /\ B =/= D ) /\ C =/= D ) ) -> B =/= D )
38		simpr	\|- ( ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) -> ( P ` 3 ) = D )
39	38	adantl	\|- ( ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) /\ ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) ) -> ( P ` 3 ) = D )
40	10 39	neeq12d	\|- ( ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) /\ ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) ) -> ( ( P ` 1 ) =/= ( P ` 3 ) <-> B =/= D ) )
41	40	adantr	\|- ( ( ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) /\ ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) ) /\ ( ( A =/= B /\ A =/= C ) /\ ( B =/= C /\ B =/= D ) /\ C =/= D ) ) -> ( ( P ` 1 ) =/= ( P ` 3 ) <-> B =/= D ) )
42	37 41	mpbird	\|- ( ( ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) /\ ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) ) /\ ( ( A =/= B /\ A =/= C ) /\ ( B =/= C /\ B =/= D ) /\ C =/= D ) ) -> ( P ` 1 ) =/= ( P ` 3 ) )
43	42	necomd	\|- ( ( ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) /\ ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) ) /\ ( ( A =/= B /\ A =/= C ) /\ ( B =/= C /\ B =/= D ) /\ C =/= D ) ) -> ( P ` 3 ) =/= ( P ` 1 ) )
44	43	a1d	\|- ( ( ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) /\ ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) ) /\ ( ( A =/= B /\ A =/= C ) /\ ( B =/= C /\ B =/= D ) /\ C =/= D ) ) -> ( 3 =/= 1 -> ( P ` 3 ) =/= ( P ` 1 ) ) )
45		simp3	\|- ( ( ( A =/= B /\ A =/= C ) /\ ( B =/= C /\ B =/= D ) /\ C =/= D ) -> C =/= D )
46	45	necomd	\|- ( ( ( A =/= B /\ A =/= C ) /\ ( B =/= C /\ B =/= D ) /\ C =/= D ) -> D =/= C )
47	46	adantl	\|- ( ( ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) /\ ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) ) /\ ( ( A =/= B /\ A =/= C ) /\ ( B =/= C /\ B =/= D ) /\ C =/= D ) ) -> D =/= C )
48		simpl	\|- ( ( ( P ` 3 ) = D /\ ( P ` 2 ) = C ) -> ( P ` 3 ) = D )
49		simpr	\|- ( ( ( P ` 3 ) = D /\ ( P ` 2 ) = C ) -> ( P ` 2 ) = C )
50	48 49	neeq12d	\|- ( ( ( P ` 3 ) = D /\ ( P ` 2 ) = C ) -> ( ( P ` 3 ) =/= ( P ` 2 ) <-> D =/= C ) )
51	50	ancoms	\|- ( ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) -> ( ( P ` 3 ) =/= ( P ` 2 ) <-> D =/= C ) )
52	51	adantl	\|- ( ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) /\ ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) ) -> ( ( P ` 3 ) =/= ( P ` 2 ) <-> D =/= C ) )
53	52	adantr	\|- ( ( ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) /\ ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) ) /\ ( ( A =/= B /\ A =/= C ) /\ ( B =/= C /\ B =/= D ) /\ C =/= D ) ) -> ( ( P ` 3 ) =/= ( P ` 2 ) <-> D =/= C ) )
54	47 53	mpbird	\|- ( ( ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) /\ ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) ) /\ ( ( A =/= B /\ A =/= C ) /\ ( B =/= C /\ B =/= D ) /\ C =/= D ) ) -> ( P ` 3 ) =/= ( P ` 2 ) )
55	54	a1d	\|- ( ( ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) /\ ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) ) /\ ( ( A =/= B /\ A =/= C ) /\ ( B =/= C /\ B =/= D ) /\ C =/= D ) ) -> ( 3 =/= 2 -> ( P ` 3 ) =/= ( P ` 2 ) ) )
56	44 55	jca	\|- ( ( ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) /\ ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) ) /\ ( ( A =/= B /\ A =/= C ) /\ ( B =/= C /\ B =/= D ) /\ C =/= D ) ) -> ( ( 3 =/= 1 -> ( P ` 3 ) =/= ( P ` 1 ) ) /\ ( 3 =/= 2 -> ( P ` 3 ) =/= ( P ` 2 ) ) ) )
57	33 36 56	jca31	\|- ( ( ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) /\ ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) ) /\ ( ( A =/= B /\ A =/= C ) /\ ( B =/= C /\ B =/= D ) /\ C =/= D ) ) -> ( ( ( 2 =/= 1 -> ( P ` 2 ) =/= ( P ` 1 ) ) /\ ( 2 =/= 2 -> ( P ` 2 ) =/= ( P ` 2 ) ) ) /\ ( ( 3 =/= 1 -> ( P ` 3 ) =/= ( P ` 1 ) ) /\ ( 3 =/= 2 -> ( P ` 3 ) =/= ( P ` 2 ) ) ) ) )
58	22 31 57	jca31	\|- ( ( ( ( ( P ` 0 ) = A /\ ( P ` 1 ) = B ) /\ ( ( P ` 2 ) = C /\ ( P ` 3 ) = D ) ) /\ ( ( A =/= B /\ A =/= C ) /\ ( B =/= C /\ B =/= D ) /\ C =/= D ) ) -> ( ( ( ( 0 =/= 1 -> ( P ` 0 ) =/= ( P ` 1 ) ) /\ ( 0 =/= 2 -> ( P ` 0 ) =/= ( P ` 2 ) ) ) /\ ( ( 1 =/= 1 -> ( P ` 1 ) =/= ( P ` 1 ) ) /\ ( 1 =/= 2 -> ( P ` 1 ) =/= ( P ` 2 ) ) ) ) /\ ( ( ( 2 =/= 1 -> ( P ` 2 ) =/= ( P ` 1 ) ) /\ ( 2 =/= 2 -> ( P ` 2 ) =/= ( P ` 2 ) ) ) /\ ( ( 3 =/= 1 -> ( P ` 3 ) =/= ( P ` 1 ) ) /\ ( 3 =/= 2 -> ( P ` 3 ) =/= ( P ` 2 ) ) ) ) ) )
59	5 4 58	syl2anc	\|- ( ph -> ( ( ( ( 0 =/= 1 -> ( P ` 0 ) =/= ( P ` 1 ) ) /\ ( 0 =/= 2 -> ( P ` 0 ) =/= ( P ` 2 ) ) ) /\ ( ( 1 =/= 1 -> ( P ` 1 ) =/= ( P ` 1 ) ) /\ ( 1 =/= 2 -> ( P ` 1 ) =/= ( P ` 2 ) ) ) ) /\ ( ( ( 2 =/= 1 -> ( P ` 2 ) =/= ( P ` 1 ) ) /\ ( 2 =/= 2 -> ( P ` 2 ) =/= ( P ` 2 ) ) ) /\ ( ( 3 =/= 1 -> ( P ` 3 ) =/= ( P ` 1 ) ) /\ ( 3 =/= 2 -> ( P ` 3 ) =/= ( P ` 2 ) ) ) ) ) )
60	1	fveq2i	\|- ( # ` P ) = ( # ` <" A B C D "> )
61		s4len	\|- ( # ` <" A B C D "> ) = 4
62	60 61	eqtri	\|- ( # ` P ) = 4
63	62	oveq2i	\|- ( 0 ..^ ( # ` P ) ) = ( 0 ..^ 4 )
64		fzo0to42pr	\|- ( 0 ..^ 4 ) = ( { 0 , 1 } u. { 2 , 3 } )
65	63 64	eqtri	\|- ( 0 ..^ ( # ` P ) ) = ( { 0 , 1 } u. { 2 , 3 } )
66	65	raleqi	\|- ( A. k e. ( 0 ..^ ( # ` P ) ) ( ( k =/= 1 -> ( P ` k ) =/= ( P ` 1 ) ) /\ ( k =/= 2 -> ( P ` k ) =/= ( P ` 2 ) ) ) <-> A. k e. ( { 0 , 1 } u. { 2 , 3 } ) ( ( k =/= 1 -> ( P ` k ) =/= ( P ` 1 ) ) /\ ( k =/= 2 -> ( P ` k ) =/= ( P ` 2 ) ) ) )
67		ralunb	\|- ( A. k e. ( { 0 , 1 } u. { 2 , 3 } ) ( ( k =/= 1 -> ( P ` k ) =/= ( P ` 1 ) ) /\ ( k =/= 2 -> ( P ` k ) =/= ( P ` 2 ) ) ) <-> ( A. k e. { 0 , 1 } ( ( k =/= 1 -> ( P ` k ) =/= ( P ` 1 ) ) /\ ( k =/= 2 -> ( P ` k ) =/= ( P ` 2 ) ) ) /\ A. k e. { 2 , 3 } ( ( k =/= 1 -> ( P ` k ) =/= ( P ` 1 ) ) /\ ( k =/= 2 -> ( P ` k ) =/= ( P ` 2 ) ) ) ) )
68		c0ex	\|- 0 e. _V
69		1ex	\|- 1 e. _V
70		neeq1	\|- ( k = 0 -> ( k =/= 1 <-> 0 =/= 1 ) )
71		fveq2	\|- ( k = 0 -> ( P ` k ) = ( P ` 0 ) )
72	71	neeq1d	\|- ( k = 0 -> ( ( P ` k ) =/= ( P ` 1 ) <-> ( P ` 0 ) =/= ( P ` 1 ) ) )
73	70 72	imbi12d	\|- ( k = 0 -> ( ( k =/= 1 -> ( P ` k ) =/= ( P ` 1 ) ) <-> ( 0 =/= 1 -> ( P ` 0 ) =/= ( P ` 1 ) ) ) )
74		neeq1	\|- ( k = 0 -> ( k =/= 2 <-> 0 =/= 2 ) )
75	71	neeq1d	\|- ( k = 0 -> ( ( P ` k ) =/= ( P ` 2 ) <-> ( P ` 0 ) =/= ( P ` 2 ) ) )
76	74 75	imbi12d	\|- ( k = 0 -> ( ( k =/= 2 -> ( P ` k ) =/= ( P ` 2 ) ) <-> ( 0 =/= 2 -> ( P ` 0 ) =/= ( P ` 2 ) ) ) )
77	73 76	anbi12d	\|- ( k = 0 -> ( ( ( k =/= 1 -> ( P ` k ) =/= ( P ` 1 ) ) /\ ( k =/= 2 -> ( P ` k ) =/= ( P ` 2 ) ) ) <-> ( ( 0 =/= 1 -> ( P ` 0 ) =/= ( P ` 1 ) ) /\ ( 0 =/= 2 -> ( P ` 0 ) =/= ( P ` 2 ) ) ) ) )
78		neeq1	\|- ( k = 1 -> ( k =/= 1 <-> 1 =/= 1 ) )
79		fveq2	\|- ( k = 1 -> ( P ` k ) = ( P ` 1 ) )
80	79	neeq1d	\|- ( k = 1 -> ( ( P ` k ) =/= ( P ` 1 ) <-> ( P ` 1 ) =/= ( P ` 1 ) ) )
81	78 80	imbi12d	\|- ( k = 1 -> ( ( k =/= 1 -> ( P ` k ) =/= ( P ` 1 ) ) <-> ( 1 =/= 1 -> ( P ` 1 ) =/= ( P ` 1 ) ) ) )
82		neeq1	\|- ( k = 1 -> ( k =/= 2 <-> 1 =/= 2 ) )
83	79	neeq1d	\|- ( k = 1 -> ( ( P ` k ) =/= ( P ` 2 ) <-> ( P ` 1 ) =/= ( P ` 2 ) ) )
84	82 83	imbi12d	\|- ( k = 1 -> ( ( k =/= 2 -> ( P ` k ) =/= ( P ` 2 ) ) <-> ( 1 =/= 2 -> ( P ` 1 ) =/= ( P ` 2 ) ) ) )
85	81 84	anbi12d	\|- ( k = 1 -> ( ( ( k =/= 1 -> ( P ` k ) =/= ( P ` 1 ) ) /\ ( k =/= 2 -> ( P ` k ) =/= ( P ` 2 ) ) ) <-> ( ( 1 =/= 1 -> ( P ` 1 ) =/= ( P ` 1 ) ) /\ ( 1 =/= 2 -> ( P ` 1 ) =/= ( P ` 2 ) ) ) ) )
86	68 69 77 85	ralpr	\|- ( A. k e. { 0 , 1 } ( ( k =/= 1 -> ( P ` k ) =/= ( P ` 1 ) ) /\ ( k =/= 2 -> ( P ` k ) =/= ( P ` 2 ) ) ) <-> ( ( ( 0 =/= 1 -> ( P ` 0 ) =/= ( P ` 1 ) ) /\ ( 0 =/= 2 -> ( P ` 0 ) =/= ( P ` 2 ) ) ) /\ ( ( 1 =/= 1 -> ( P ` 1 ) =/= ( P ` 1 ) ) /\ ( 1 =/= 2 -> ( P ` 1 ) =/= ( P ` 2 ) ) ) ) )
87		2ex	\|- 2 e. _V
88		3ex	\|- 3 e. _V
89		neeq1	\|- ( k = 2 -> ( k =/= 1 <-> 2 =/= 1 ) )
90		fveq2	\|- ( k = 2 -> ( P ` k ) = ( P ` 2 ) )
91	90	neeq1d	\|- ( k = 2 -> ( ( P ` k ) =/= ( P ` 1 ) <-> ( P ` 2 ) =/= ( P ` 1 ) ) )
92	89 91	imbi12d	\|- ( k = 2 -> ( ( k =/= 1 -> ( P ` k ) =/= ( P ` 1 ) ) <-> ( 2 =/= 1 -> ( P ` 2 ) =/= ( P ` 1 ) ) ) )
93		neeq1	\|- ( k = 2 -> ( k =/= 2 <-> 2 =/= 2 ) )
94	90	neeq1d	\|- ( k = 2 -> ( ( P ` k ) =/= ( P ` 2 ) <-> ( P ` 2 ) =/= ( P ` 2 ) ) )
95	93 94	imbi12d	\|- ( k = 2 -> ( ( k =/= 2 -> ( P ` k ) =/= ( P ` 2 ) ) <-> ( 2 =/= 2 -> ( P ` 2 ) =/= ( P ` 2 ) ) ) )
96	92 95	anbi12d	\|- ( k = 2 -> ( ( ( k =/= 1 -> ( P ` k ) =/= ( P ` 1 ) ) /\ ( k =/= 2 -> ( P ` k ) =/= ( P ` 2 ) ) ) <-> ( ( 2 =/= 1 -> ( P ` 2 ) =/= ( P ` 1 ) ) /\ ( 2 =/= 2 -> ( P ` 2 ) =/= ( P ` 2 ) ) ) ) )
97		neeq1	\|- ( k = 3 -> ( k =/= 1 <-> 3 =/= 1 ) )
98		fveq2	\|- ( k = 3 -> ( P ` k ) = ( P ` 3 ) )
99	98	neeq1d	\|- ( k = 3 -> ( ( P ` k ) =/= ( P ` 1 ) <-> ( P ` 3 ) =/= ( P ` 1 ) ) )
100	97 99	imbi12d	\|- ( k = 3 -> ( ( k =/= 1 -> ( P ` k ) =/= ( P ` 1 ) ) <-> ( 3 =/= 1 -> ( P ` 3 ) =/= ( P ` 1 ) ) ) )
101		neeq1	\|- ( k = 3 -> ( k =/= 2 <-> 3 =/= 2 ) )
102	98	neeq1d	\|- ( k = 3 -> ( ( P ` k ) =/= ( P ` 2 ) <-> ( P ` 3 ) =/= ( P ` 2 ) ) )
103	101 102	imbi12d	\|- ( k = 3 -> ( ( k =/= 2 -> ( P ` k ) =/= ( P ` 2 ) ) <-> ( 3 =/= 2 -> ( P ` 3 ) =/= ( P ` 2 ) ) ) )
104	100 103	anbi12d	\|- ( k = 3 -> ( ( ( k =/= 1 -> ( P ` k ) =/= ( P ` 1 ) ) /\ ( k =/= 2 -> ( P ` k ) =/= ( P ` 2 ) ) ) <-> ( ( 3 =/= 1 -> ( P ` 3 ) =/= ( P ` 1 ) ) /\ ( 3 =/= 2 -> ( P ` 3 ) =/= ( P ` 2 ) ) ) ) )
105	87 88 96 104	ralpr	\|- ( A. k e. { 2 , 3 } ( ( k =/= 1 -> ( P ` k ) =/= ( P ` 1 ) ) /\ ( k =/= 2 -> ( P ` k ) =/= ( P ` 2 ) ) ) <-> ( ( ( 2 =/= 1 -> ( P ` 2 ) =/= ( P ` 1 ) ) /\ ( 2 =/= 2 -> ( P ` 2 ) =/= ( P ` 2 ) ) ) /\ ( ( 3 =/= 1 -> ( P ` 3 ) =/= ( P ` 1 ) ) /\ ( 3 =/= 2 -> ( P ` 3 ) =/= ( P ` 2 ) ) ) ) )
106	86 105	anbi12i	\|- ( ( A. k e. { 0 , 1 } ( ( k =/= 1 -> ( P ` k ) =/= ( P ` 1 ) ) /\ ( k =/= 2 -> ( P ` k ) =/= ( P ` 2 ) ) ) /\ A. k e. { 2 , 3 } ( ( k =/= 1 -> ( P ` k ) =/= ( P ` 1 ) ) /\ ( k =/= 2 -> ( P ` k ) =/= ( P ` 2 ) ) ) ) <-> ( ( ( ( 0 =/= 1 -> ( P ` 0 ) =/= ( P ` 1 ) ) /\ ( 0 =/= 2 -> ( P ` 0 ) =/= ( P ` 2 ) ) ) /\ ( ( 1 =/= 1 -> ( P ` 1 ) =/= ( P ` 1 ) ) /\ ( 1 =/= 2 -> ( P ` 1 ) =/= ( P ` 2 ) ) ) ) /\ ( ( ( 2 =/= 1 -> ( P ` 2 ) =/= ( P ` 1 ) ) /\ ( 2 =/= 2 -> ( P ` 2 ) =/= ( P ` 2 ) ) ) /\ ( ( 3 =/= 1 -> ( P ` 3 ) =/= ( P ` 1 ) ) /\ ( 3 =/= 2 -> ( P ` 3 ) =/= ( P ` 2 ) ) ) ) ) )
107	66 67 106	3bitri	\|- ( A. k e. ( 0 ..^ ( # ` P ) ) ( ( k =/= 1 -> ( P ` k ) =/= ( P ` 1 ) ) /\ ( k =/= 2 -> ( P ` k ) =/= ( P ` 2 ) ) ) <-> ( ( ( ( 0 =/= 1 -> ( P ` 0 ) =/= ( P ` 1 ) ) /\ ( 0 =/= 2 -> ( P ` 0 ) =/= ( P ` 2 ) ) ) /\ ( ( 1 =/= 1 -> ( P ` 1 ) =/= ( P ` 1 ) ) /\ ( 1 =/= 2 -> ( P ` 1 ) =/= ( P ` 2 ) ) ) ) /\ ( ( ( 2 =/= 1 -> ( P ` 2 ) =/= ( P ` 1 ) ) /\ ( 2 =/= 2 -> ( P ` 2 ) =/= ( P ` 2 ) ) ) /\ ( ( 3 =/= 1 -> ( P ` 3 ) =/= ( P ` 1 ) ) /\ ( 3 =/= 2 -> ( P ` 3 ) =/= ( P ` 2 ) ) ) ) ) )
108	59 107	sylibr	\|- ( ph -> A. k e. ( 0 ..^ ( # ` P ) ) ( ( k =/= 1 -> ( P ` k ) =/= ( P ` 1 ) ) /\ ( k =/= 2 -> ( P ` k ) =/= ( P ` 2 ) ) ) )
109	2	fveq2i	\|- ( # ` F ) = ( # ` <" J K L "> )
110		s3len	\|- ( # ` <" J K L "> ) = 3
111	109 110	eqtri	\|- ( # ` F ) = 3
112	111	oveq2i	\|- ( 1 ..^ ( # ` F ) ) = ( 1 ..^ 3 )
113		fzo13pr	\|- ( 1 ..^ 3 ) = { 1 , 2 }
114	112 113	eqtri	\|- ( 1 ..^ ( # ` F ) ) = { 1 , 2 }
115	114	raleqi	\|- ( A. j e. ( 1 ..^ ( # ` F ) ) ( k =/= j -> ( P ` k ) =/= ( P ` j ) ) <-> A. j e. { 1 , 2 } ( k =/= j -> ( P ` k ) =/= ( P ` j ) ) )
116		neeq2	\|- ( j = 1 -> ( k =/= j <-> k =/= 1 ) )
117		fveq2	\|- ( j = 1 -> ( P ` j ) = ( P ` 1 ) )
118	117	neeq2d	\|- ( j = 1 -> ( ( P ` k ) =/= ( P ` j ) <-> ( P ` k ) =/= ( P ` 1 ) ) )
119	116 118	imbi12d	\|- ( j = 1 -> ( ( k =/= j -> ( P ` k ) =/= ( P ` j ) ) <-> ( k =/= 1 -> ( P ` k ) =/= ( P ` 1 ) ) ) )
120		neeq2	\|- ( j = 2 -> ( k =/= j <-> k =/= 2 ) )
121		fveq2	\|- ( j = 2 -> ( P ` j ) = ( P ` 2 ) )
122	121	neeq2d	\|- ( j = 2 -> ( ( P ` k ) =/= ( P ` j ) <-> ( P ` k ) =/= ( P ` 2 ) ) )
123	120 122	imbi12d	\|- ( j = 2 -> ( ( k =/= j -> ( P ` k ) =/= ( P ` j ) ) <-> ( k =/= 2 -> ( P ` k ) =/= ( P ` 2 ) ) ) )
124	69 87 119 123	ralpr	\|- ( A. j e. { 1 , 2 } ( k =/= j -> ( P ` k ) =/= ( P ` j ) ) <-> ( ( k =/= 1 -> ( P ` k ) =/= ( P ` 1 ) ) /\ ( k =/= 2 -> ( P ` k ) =/= ( P ` 2 ) ) ) )
125	115 124	bitri	\|- ( A. j e. ( 1 ..^ ( # ` F ) ) ( k =/= j -> ( P ` k ) =/= ( P ` j ) ) <-> ( ( k =/= 1 -> ( P ` k ) =/= ( P ` 1 ) ) /\ ( k =/= 2 -> ( P ` k ) =/= ( P ` 2 ) ) ) )
126	125	ralbii	\|- ( A. k e. ( 0 ..^ ( # ` P ) ) A. j e. ( 1 ..^ ( # ` F ) ) ( k =/= j -> ( P ` k ) =/= ( P ` j ) ) <-> A. k e. ( 0 ..^ ( # ` P ) ) ( ( k =/= 1 -> ( P ` k ) =/= ( P ` 1 ) ) /\ ( k =/= 2 -> ( P ` k ) =/= ( P ` 2 ) ) ) )
127	108 126	sylibr	\|- ( ph -> A. k e. ( 0 ..^ ( # ` P ) ) A. j e. ( 1 ..^ ( # ` F ) ) ( k =/= j -> ( P ` k ) =/= ( P ` j ) ) )

Metamath Proof Explorer

Theorem 3pthdlem1

Proof