pmtr3ncomlem1

	Ref	Expression
Hypotheses	pmtr3ncom.t	\|- T = ( pmTrsp ` D )
	pmtr3ncom.f	\|- F = ( T ` { X , Y } )
	pmtr3ncom.g	\|- G = ( T ` { Y , Z } )
Assertion	pmtr3ncomlem1	\|- ( ( D e. V /\ ( X e. D /\ Y e. D /\ Z e. D ) /\ ( X =/= Y /\ X =/= Z /\ Y =/= Z ) ) -> ( ( G o. F ) ` X ) =/= ( ( F o. G ) ` X ) )

Proof

Step	Hyp	Ref	Expression
1		pmtr3ncom.t	\|- T = ( pmTrsp ` D )
2		pmtr3ncom.f	\|- F = ( T ` { X , Y } )
3		pmtr3ncom.g	\|- G = ( T ` { Y , Z } )
4		necom	\|- ( Y =/= Z <-> Z =/= Y )
5	4	biimpi	\|- ( Y =/= Z -> Z =/= Y )
6	5	3ad2ant3	\|- ( ( X =/= Y /\ X =/= Z /\ Y =/= Z ) -> Z =/= Y )
7	6	3ad2ant3	\|- ( ( D e. V /\ ( X e. D /\ Y e. D /\ Z e. D ) /\ ( X =/= Y /\ X =/= Z /\ Y =/= Z ) ) -> Z =/= Y )
8		simp1	\|- ( ( D e. V /\ ( X e. D /\ Y e. D /\ Z e. D ) /\ ( X =/= Y /\ X =/= Z /\ Y =/= Z ) ) -> D e. V )
9		simp1	\|- ( ( X e. D /\ Y e. D /\ Z e. D ) -> X e. D )
10	9	3ad2ant2	\|- ( ( D e. V /\ ( X e. D /\ Y e. D /\ Z e. D ) /\ ( X =/= Y /\ X =/= Z /\ Y =/= Z ) ) -> X e. D )
11		simp2	\|- ( ( X e. D /\ Y e. D /\ Z e. D ) -> Y e. D )
12	11	3ad2ant2	\|- ( ( D e. V /\ ( X e. D /\ Y e. D /\ Z e. D ) /\ ( X =/= Y /\ X =/= Z /\ Y =/= Z ) ) -> Y e. D )
13	10 12	prssd	\|- ( ( D e. V /\ ( X e. D /\ Y e. D /\ Z e. D ) /\ ( X =/= Y /\ X =/= Z /\ Y =/= Z ) ) -> { X , Y } C_ D )
14		simp1	\|- ( ( X =/= Y /\ X =/= Z /\ Y =/= Z ) -> X =/= Y )
15	14	3ad2ant3	\|- ( ( D e. V /\ ( X e. D /\ Y e. D /\ Z e. D ) /\ ( X =/= Y /\ X =/= Z /\ Y =/= Z ) ) -> X =/= Y )
16		enpr2	\|- ( ( X e. D /\ Y e. D /\ X =/= Y ) -> { X , Y } ~~ 2o )
17	10 12 15 16	syl3anc	\|- ( ( D e. V /\ ( X e. D /\ Y e. D /\ Z e. D ) /\ ( X =/= Y /\ X =/= Z /\ Y =/= Z ) ) -> { X , Y } ~~ 2o )
18	1	pmtrf	\|- ( ( D e. V /\ { X , Y } C_ D /\ { X , Y } ~~ 2o ) -> ( T ` { X , Y } ) : D --> D )
19	8 13 17 18	syl3anc	\|- ( ( D e. V /\ ( X e. D /\ Y e. D /\ Z e. D ) /\ ( X =/= Y /\ X =/= Z /\ Y =/= Z ) ) -> ( T ` { X , Y } ) : D --> D )
20	2	feq1i	\|- ( F : D --> D <-> ( T ` { X , Y } ) : D --> D )
21	19 20	sylibr	\|- ( ( D e. V /\ ( X e. D /\ Y e. D /\ Z e. D ) /\ ( X =/= Y /\ X =/= Z /\ Y =/= Z ) ) -> F : D --> D )
22	21	ffnd	\|- ( ( D e. V /\ ( X e. D /\ Y e. D /\ Z e. D ) /\ ( X =/= Y /\ X =/= Z /\ Y =/= Z ) ) -> F Fn D )
23		fvco2	\|- ( ( F Fn D /\ X e. D ) -> ( ( G o. F ) ` X ) = ( G ` ( F ` X ) ) )
24	22 10 23	syl2anc	\|- ( ( D e. V /\ ( X e. D /\ Y e. D /\ Z e. D ) /\ ( X =/= Y /\ X =/= Z /\ Y =/= Z ) ) -> ( ( G o. F ) ` X ) = ( G ` ( F ` X ) ) )
25	2	fveq1i	\|- ( F ` X ) = ( ( T ` { X , Y } ) ` X )
26	10 12 15	3jca	\|- ( ( D e. V /\ ( X e. D /\ Y e. D /\ Z e. D ) /\ ( X =/= Y /\ X =/= Z /\ Y =/= Z ) ) -> ( X e. D /\ Y e. D /\ X =/= Y ) )
27	1	pmtrprfv	\|- ( ( D e. V /\ ( X e. D /\ Y e. D /\ X =/= Y ) ) -> ( ( T ` { X , Y } ) ` X ) = Y )
28	8 26 27	syl2anc	\|- ( ( D e. V /\ ( X e. D /\ Y e. D /\ Z e. D ) /\ ( X =/= Y /\ X =/= Z /\ Y =/= Z ) ) -> ( ( T ` { X , Y } ) ` X ) = Y )
29	25 28	eqtrid	\|- ( ( D e. V /\ ( X e. D /\ Y e. D /\ Z e. D ) /\ ( X =/= Y /\ X =/= Z /\ Y =/= Z ) ) -> ( F ` X ) = Y )
30	29	fveq2d	\|- ( ( D e. V /\ ( X e. D /\ Y e. D /\ Z e. D ) /\ ( X =/= Y /\ X =/= Z /\ Y =/= Z ) ) -> ( G ` ( F ` X ) ) = ( G ` Y ) )
31	3	fveq1i	\|- ( G ` Y ) = ( ( T ` { Y , Z } ) ` Y )
32		simp3	\|- ( ( X e. D /\ Y e. D /\ Z e. D ) -> Z e. D )
33	32	3ad2ant2	\|- ( ( D e. V /\ ( X e. D /\ Y e. D /\ Z e. D ) /\ ( X =/= Y /\ X =/= Z /\ Y =/= Z ) ) -> Z e. D )
34		simp3	\|- ( ( X =/= Y /\ X =/= Z /\ Y =/= Z ) -> Y =/= Z )
35	34	3ad2ant3	\|- ( ( D e. V /\ ( X e. D /\ Y e. D /\ Z e. D ) /\ ( X =/= Y /\ X =/= Z /\ Y =/= Z ) ) -> Y =/= Z )
36	12 33 35	3jca	\|- ( ( D e. V /\ ( X e. D /\ Y e. D /\ Z e. D ) /\ ( X =/= Y /\ X =/= Z /\ Y =/= Z ) ) -> ( Y e. D /\ Z e. D /\ Y =/= Z ) )
37	1	pmtrprfv	\|- ( ( D e. V /\ ( Y e. D /\ Z e. D /\ Y =/= Z ) ) -> ( ( T ` { Y , Z } ) ` Y ) = Z )
38	8 36 37	syl2anc	\|- ( ( D e. V /\ ( X e. D /\ Y e. D /\ Z e. D ) /\ ( X =/= Y /\ X =/= Z /\ Y =/= Z ) ) -> ( ( T ` { Y , Z } ) ` Y ) = Z )
39	31 38	eqtrid	\|- ( ( D e. V /\ ( X e. D /\ Y e. D /\ Z e. D ) /\ ( X =/= Y /\ X =/= Z /\ Y =/= Z ) ) -> ( G ` Y ) = Z )
40	24 30 39	3eqtrd	\|- ( ( D e. V /\ ( X e. D /\ Y e. D /\ Z e. D ) /\ ( X =/= Y /\ X =/= Z /\ Y =/= Z ) ) -> ( ( G o. F ) ` X ) = Z )
41	11 32	prssd	\|- ( ( X e. D /\ Y e. D /\ Z e. D ) -> { Y , Z } C_ D )
42	41	3ad2ant2	\|- ( ( D e. V /\ ( X e. D /\ Y e. D /\ Z e. D ) /\ ( X =/= Y /\ X =/= Z /\ Y =/= Z ) ) -> { Y , Z } C_ D )
43		enpr2	\|- ( ( Y e. D /\ Z e. D /\ Y =/= Z ) -> { Y , Z } ~~ 2o )
44	12 33 35 43	syl3anc	\|- ( ( D e. V /\ ( X e. D /\ Y e. D /\ Z e. D ) /\ ( X =/= Y /\ X =/= Z /\ Y =/= Z ) ) -> { Y , Z } ~~ 2o )
45	1	pmtrf	\|- ( ( D e. V /\ { Y , Z } C_ D /\ { Y , Z } ~~ 2o ) -> ( T ` { Y , Z } ) : D --> D )
46	3	feq1i	\|- ( G : D --> D <-> ( T ` { Y , Z } ) : D --> D )
47	45 46	sylibr	\|- ( ( D e. V /\ { Y , Z } C_ D /\ { Y , Z } ~~ 2o ) -> G : D --> D )
48	8 42 44 47	syl3anc	\|- ( ( D e. V /\ ( X e. D /\ Y e. D /\ Z e. D ) /\ ( X =/= Y /\ X =/= Z /\ Y =/= Z ) ) -> G : D --> D )
49	48	ffnd	\|- ( ( D e. V /\ ( X e. D /\ Y e. D /\ Z e. D ) /\ ( X =/= Y /\ X =/= Z /\ Y =/= Z ) ) -> G Fn D )
50		fvco2	\|- ( ( G Fn D /\ X e. D ) -> ( ( F o. G ) ` X ) = ( F ` ( G ` X ) ) )
51	49 10 50	syl2anc	\|- ( ( D e. V /\ ( X e. D /\ Y e. D /\ Z e. D ) /\ ( X =/= Y /\ X =/= Z /\ Y =/= Z ) ) -> ( ( F o. G ) ` X ) = ( F ` ( G ` X ) ) )
52	3	fveq1i	\|- ( G ` X ) = ( ( T ` { Y , Z } ) ` X )
53		id	\|- ( D e. V -> D e. V )
54		3anrot	\|- ( ( X e. D /\ Y e. D /\ Z e. D ) <-> ( Y e. D /\ Z e. D /\ X e. D ) )
55	54	biimpi	\|- ( ( X e. D /\ Y e. D /\ Z e. D ) -> ( Y e. D /\ Z e. D /\ X e. D ) )
56		3anrot	\|- ( ( Y =/= Z /\ Y =/= X /\ Z =/= X ) <-> ( Y =/= X /\ Z =/= X /\ Y =/= Z ) )
57		necom	\|- ( Y =/= X <-> X =/= Y )
58		necom	\|- ( Z =/= X <-> X =/= Z )
59		biid	\|- ( Y =/= Z <-> Y =/= Z )
60	57 58 59	3anbi123i	\|- ( ( Y =/= X /\ Z =/= X /\ Y =/= Z ) <-> ( X =/= Y /\ X =/= Z /\ Y =/= Z ) )
61	56 60	sylbbr	\|- ( ( X =/= Y /\ X =/= Z /\ Y =/= Z ) -> ( Y =/= Z /\ Y =/= X /\ Z =/= X ) )
62	1	pmtrprfv3	\|- ( ( D e. V /\ ( Y e. D /\ Z e. D /\ X e. D ) /\ ( Y =/= Z /\ Y =/= X /\ Z =/= X ) ) -> ( ( T ` { Y , Z } ) ` X ) = X )
63	53 55 61 62	syl3an	\|- ( ( D e. V /\ ( X e. D /\ Y e. D /\ Z e. D ) /\ ( X =/= Y /\ X =/= Z /\ Y =/= Z ) ) -> ( ( T ` { Y , Z } ) ` X ) = X )
64	52 63	eqtrid	\|- ( ( D e. V /\ ( X e. D /\ Y e. D /\ Z e. D ) /\ ( X =/= Y /\ X =/= Z /\ Y =/= Z ) ) -> ( G ` X ) = X )
65	64	fveq2d	\|- ( ( D e. V /\ ( X e. D /\ Y e. D /\ Z e. D ) /\ ( X =/= Y /\ X =/= Z /\ Y =/= Z ) ) -> ( F ` ( G ` X ) ) = ( F ` X ) )
66	51 65 29	3eqtrd	\|- ( ( D e. V /\ ( X e. D /\ Y e. D /\ Z e. D ) /\ ( X =/= Y /\ X =/= Z /\ Y =/= Z ) ) -> ( ( F o. G ) ` X ) = Y )
67	7 40 66	3netr4d	\|- ( ( D e. V /\ ( X e. D /\ Y e. D /\ Z e. D ) /\ ( X =/= Y /\ X =/= Z /\ Y =/= Z ) ) -> ( ( G o. F ) ` X ) =/= ( ( F o. G ) ` X ) )

Metamath Proof Explorer

Theorem pmtr3ncomlem1

Proof