dirkertrigeq

Description: Trigonometric equality for the Dirichlet kernel. (Contributed by Glauco Siliprandi, 11-Dec-2019)

	Ref	Expression
Hypotheses	dirkertrigeq.d	\|- D = ( n e. NN \|-> ( s e. RR \|-> if ( ( s mod ( 2 x. _pi ) ) = 0 , ( ( ( 2 x. n ) + 1 ) / ( 2 x. _pi ) ) , ( ( sin ` ( ( n + ( 1 / 2 ) ) x. s ) ) / ( ( 2 x. _pi ) x. ( sin ` ( s / 2 ) ) ) ) ) ) )
	dirkertrigeq.n	\|- ( ph -> N e. NN )
	dirkertrigeq.f	\|- F = ( D ` N )
	dirkertrigeq.h	\|- H = ( s e. RR \|-> ( ( ( 1 / 2 ) + sum_ k e. ( 1 ... N ) ( cos ` ( k x. s ) ) ) / _pi ) )
Assertion	dirkertrigeq	\|- ( ph -> F = H )

Proof

Step	Hyp	Ref	Expression
1		dirkertrigeq.d	\|- D = ( n e. NN \|-> ( s e. RR \|-> if ( ( s mod ( 2 x. _pi ) ) = 0 , ( ( ( 2 x. n ) + 1 ) / ( 2 x. _pi ) ) , ( ( sin ` ( ( n + ( 1 / 2 ) ) x. s ) ) / ( ( 2 x. _pi ) x. ( sin ` ( s / 2 ) ) ) ) ) ) )
2		dirkertrigeq.n	\|- ( ph -> N e. NN )
3		dirkertrigeq.f	\|- F = ( D ` N )
4		dirkertrigeq.h	\|- H = ( s e. RR \|-> ( ( ( 1 / 2 ) + sum_ k e. ( 1 ... N ) ( cos ` ( k x. s ) ) ) / _pi ) )
5	3	a1i	\|- ( ph -> F = ( D ` N ) )
6	1	dirkerval	\|- ( N e. NN -> ( D ` N ) = ( s e. RR \|-> if ( ( s mod ( 2 x. _pi ) ) = 0 , ( ( ( 2 x. N ) + 1 ) / ( 2 x. _pi ) ) , ( ( sin ` ( ( N + ( 1 / 2 ) ) x. s ) ) / ( ( 2 x. _pi ) x. ( sin ` ( s / 2 ) ) ) ) ) ) )
7	2 6	syl	\|- ( ph -> ( D ` N ) = ( s e. RR \|-> if ( ( s mod ( 2 x. _pi ) ) = 0 , ( ( ( 2 x. N ) + 1 ) / ( 2 x. _pi ) ) , ( ( sin ` ( ( N + ( 1 / 2 ) ) x. s ) ) / ( ( 2 x. _pi ) x. ( sin ` ( s / 2 ) ) ) ) ) ) )
8		2cnd	\|- ( ph -> 2 e. CC )
9	2	nncnd	\|- ( ph -> N e. CC )
10	8 9	mulcld	\|- ( ph -> ( 2 x. N ) e. CC )
11		peano2cn	\|- ( ( 2 x. N ) e. CC -> ( ( 2 x. N ) + 1 ) e. CC )
12	10 11	syl	\|- ( ph -> ( ( 2 x. N ) + 1 ) e. CC )
13		picn	\|- _pi e. CC
14	13	a1i	\|- ( ph -> _pi e. CC )
15		2ne0	\|- 2 =/= 0
16	15	a1i	\|- ( ph -> 2 =/= 0 )
17		pire	\|- _pi e. RR
18		pipos	\|- 0 < _pi
19	17 18	gt0ne0ii	\|- _pi =/= 0
20	19	a1i	\|- ( ph -> _pi =/= 0 )
21	12 8 14 16 20	divdiv1d	\|- ( ph -> ( ( ( ( 2 x. N ) + 1 ) / 2 ) / _pi ) = ( ( ( 2 x. N ) + 1 ) / ( 2 x. _pi ) ) )
22	21	eqcomd	\|- ( ph -> ( ( ( 2 x. N ) + 1 ) / ( 2 x. _pi ) ) = ( ( ( ( 2 x. N ) + 1 ) / 2 ) / _pi ) )
23	22	ad2antrr	\|- ( ( ( ph /\ s e. RR ) /\ ( s mod ( 2 x. _pi ) ) = 0 ) -> ( ( ( 2 x. N ) + 1 ) / ( 2 x. _pi ) ) = ( ( ( ( 2 x. N ) + 1 ) / 2 ) / _pi ) )
24		iftrue	\|- ( ( s mod ( 2 x. _pi ) ) = 0 -> if ( ( s mod ( 2 x. _pi ) ) = 0 , ( ( ( 2 x. N ) + 1 ) / ( 2 x. _pi ) ) , ( ( sin ` ( ( N + ( 1 / 2 ) ) x. s ) ) / ( ( 2 x. _pi ) x. ( sin ` ( s / 2 ) ) ) ) ) = ( ( ( 2 x. N ) + 1 ) / ( 2 x. _pi ) ) )
25	24	adantl	\|- ( ( ( ph /\ s e. RR ) /\ ( s mod ( 2 x. _pi ) ) = 0 ) -> if ( ( s mod ( 2 x. _pi ) ) = 0 , ( ( ( 2 x. N ) + 1 ) / ( 2 x. _pi ) ) , ( ( sin ` ( ( N + ( 1 / 2 ) ) x. s ) ) / ( ( 2 x. _pi ) x. ( sin ` ( s / 2 ) ) ) ) ) = ( ( ( 2 x. N ) + 1 ) / ( 2 x. _pi ) ) )
26		elfzelz	\|- ( k e. ( 1 ... N ) -> k e. ZZ )
27	26	zcnd	\|- ( k e. ( 1 ... N ) -> k e. CC )
28	27	adantl	\|- ( ( ( s e. RR /\ ( s mod ( 2 x. _pi ) ) = 0 ) /\ k e. ( 1 ... N ) ) -> k e. CC )
29		recn	\|- ( s e. RR -> s e. CC )
30	29	ad2antrr	\|- ( ( ( s e. RR /\ ( s mod ( 2 x. _pi ) ) = 0 ) /\ k e. ( 1 ... N ) ) -> s e. CC )
31		2cn	\|- 2 e. CC
32	31 13	mulcli	\|- ( 2 x. _pi ) e. CC
33	32	a1i	\|- ( ( ( s e. RR /\ ( s mod ( 2 x. _pi ) ) = 0 ) /\ k e. ( 1 ... N ) ) -> ( 2 x. _pi ) e. CC )
34	31 13 15 19	mulne0i	\|- ( 2 x. _pi ) =/= 0
35	34	a1i	\|- ( ( ( s e. RR /\ ( s mod ( 2 x. _pi ) ) = 0 ) /\ k e. ( 1 ... N ) ) -> ( 2 x. _pi ) =/= 0 )
36	28 30 33 35	divassd	\|- ( ( ( s e. RR /\ ( s mod ( 2 x. _pi ) ) = 0 ) /\ k e. ( 1 ... N ) ) -> ( ( k x. s ) / ( 2 x. _pi ) ) = ( k x. ( s / ( 2 x. _pi ) ) ) )
37	26	adantl	\|- ( ( ( s e. RR /\ ( s mod ( 2 x. _pi ) ) = 0 ) /\ k e. ( 1 ... N ) ) -> k e. ZZ )
38		simpr	\|- ( ( s e. RR /\ ( s mod ( 2 x. _pi ) ) = 0 ) -> ( s mod ( 2 x. _pi ) ) = 0 )
39		simpl	\|- ( ( s e. RR /\ ( s mod ( 2 x. _pi ) ) = 0 ) -> s e. RR )
40		2rp	\|- 2 e. RR+
41		pirp	\|- _pi e. RR+
42		rpmulcl	\|- ( ( 2 e. RR+ /\ _pi e. RR+ ) -> ( 2 x. _pi ) e. RR+ )
43	40 41 42	mp2an	\|- ( 2 x. _pi ) e. RR+
44		mod0	\|- ( ( s e. RR /\ ( 2 x. _pi ) e. RR+ ) -> ( ( s mod ( 2 x. _pi ) ) = 0 <-> ( s / ( 2 x. _pi ) ) e. ZZ ) )
45	39 43 44	sylancl	\|- ( ( s e. RR /\ ( s mod ( 2 x. _pi ) ) = 0 ) -> ( ( s mod ( 2 x. _pi ) ) = 0 <-> ( s / ( 2 x. _pi ) ) e. ZZ ) )
46	38 45	mpbid	\|- ( ( s e. RR /\ ( s mod ( 2 x. _pi ) ) = 0 ) -> ( s / ( 2 x. _pi ) ) e. ZZ )
47	46	adantr	\|- ( ( ( s e. RR /\ ( s mod ( 2 x. _pi ) ) = 0 ) /\ k e. ( 1 ... N ) ) -> ( s / ( 2 x. _pi ) ) e. ZZ )
48	37 47	zmulcld	\|- ( ( ( s e. RR /\ ( s mod ( 2 x. _pi ) ) = 0 ) /\ k e. ( 1 ... N ) ) -> ( k x. ( s / ( 2 x. _pi ) ) ) e. ZZ )
49	36 48	eqeltrd	\|- ( ( ( s e. RR /\ ( s mod ( 2 x. _pi ) ) = 0 ) /\ k e. ( 1 ... N ) ) -> ( ( k x. s ) / ( 2 x. _pi ) ) e. ZZ )
50	27	adantl	\|- ( ( s e. RR /\ k e. ( 1 ... N ) ) -> k e. CC )
51	29	adantr	\|- ( ( s e. RR /\ k e. ( 1 ... N ) ) -> s e. CC )
52	50 51	mulcld	\|- ( ( s e. RR /\ k e. ( 1 ... N ) ) -> ( k x. s ) e. CC )
53		coseq1	\|- ( ( k x. s ) e. CC -> ( ( cos ` ( k x. s ) ) = 1 <-> ( ( k x. s ) / ( 2 x. _pi ) ) e. ZZ ) )
54	52 53	syl	\|- ( ( s e. RR /\ k e. ( 1 ... N ) ) -> ( ( cos ` ( k x. s ) ) = 1 <-> ( ( k x. s ) / ( 2 x. _pi ) ) e. ZZ ) )
55	54	adantlr	\|- ( ( ( s e. RR /\ ( s mod ( 2 x. _pi ) ) = 0 ) /\ k e. ( 1 ... N ) ) -> ( ( cos ` ( k x. s ) ) = 1 <-> ( ( k x. s ) / ( 2 x. _pi ) ) e. ZZ ) )
56	49 55	mpbird	\|- ( ( ( s e. RR /\ ( s mod ( 2 x. _pi ) ) = 0 ) /\ k e. ( 1 ... N ) ) -> ( cos ` ( k x. s ) ) = 1 )
57	56	ralrimiva	\|- ( ( s e. RR /\ ( s mod ( 2 x. _pi ) ) = 0 ) -> A. k e. ( 1 ... N ) ( cos ` ( k x. s ) ) = 1 )
58	57	adantll	\|- ( ( ( ph /\ s e. RR ) /\ ( s mod ( 2 x. _pi ) ) = 0 ) -> A. k e. ( 1 ... N ) ( cos ` ( k x. s ) ) = 1 )
59	58	sumeq2d	\|- ( ( ( ph /\ s e. RR ) /\ ( s mod ( 2 x. _pi ) ) = 0 ) -> sum_ k e. ( 1 ... N ) ( cos ` ( k x. s ) ) = sum_ k e. ( 1 ... N ) 1 )
60		fzfid	\|- ( ( ( ph /\ s e. RR ) /\ ( s mod ( 2 x. _pi ) ) = 0 ) -> ( 1 ... N ) e. Fin )
61		1cnd	\|- ( ( ( ph /\ s e. RR ) /\ ( s mod ( 2 x. _pi ) ) = 0 ) -> 1 e. CC )
62		fsumconst	\|- ( ( ( 1 ... N ) e. Fin /\ 1 e. CC ) -> sum_ k e. ( 1 ... N ) 1 = ( ( # ` ( 1 ... N ) ) x. 1 ) )
63	60 61 62	syl2anc	\|- ( ( ( ph /\ s e. RR ) /\ ( s mod ( 2 x. _pi ) ) = 0 ) -> sum_ k e. ( 1 ... N ) 1 = ( ( # ` ( 1 ... N ) ) x. 1 ) )
64	2	nnnn0d	\|- ( ph -> N e. NN0 )
65		hashfz1	\|- ( N e. NN0 -> ( # ` ( 1 ... N ) ) = N )
66	64 65	syl	\|- ( ph -> ( # ` ( 1 ... N ) ) = N )
67	66	oveq1d	\|- ( ph -> ( ( # ` ( 1 ... N ) ) x. 1 ) = ( N x. 1 ) )
68	9	mulridd	\|- ( ph -> ( N x. 1 ) = N )
69	67 68	eqtrd	\|- ( ph -> ( ( # ` ( 1 ... N ) ) x. 1 ) = N )
70	69	ad2antrr	\|- ( ( ( ph /\ s e. RR ) /\ ( s mod ( 2 x. _pi ) ) = 0 ) -> ( ( # ` ( 1 ... N ) ) x. 1 ) = N )
71	59 63 70	3eqtrd	\|- ( ( ( ph /\ s e. RR ) /\ ( s mod ( 2 x. _pi ) ) = 0 ) -> sum_ k e. ( 1 ... N ) ( cos ` ( k x. s ) ) = N )
72	71	oveq2d	\|- ( ( ( ph /\ s e. RR ) /\ ( s mod ( 2 x. _pi ) ) = 0 ) -> ( ( 1 / 2 ) + sum_ k e. ( 1 ... N ) ( cos ` ( k x. s ) ) ) = ( ( 1 / 2 ) + N ) )
73	9	div1d	\|- ( ph -> ( N / 1 ) = N )
74	73	eqcomd	\|- ( ph -> N = ( N / 1 ) )
75	74	oveq2d	\|- ( ph -> ( ( 1 / 2 ) + N ) = ( ( 1 / 2 ) + ( N / 1 ) ) )
76		1cnd	\|- ( ph -> 1 e. CC )
77		ax-1ne0	\|- 1 =/= 0
78	77	a1i	\|- ( ph -> 1 =/= 0 )
79	76 8 9 76 16 78	divadddivd	\|- ( ph -> ( ( 1 / 2 ) + ( N / 1 ) ) = ( ( ( 1 x. 1 ) + ( N x. 2 ) ) / ( 2 x. 1 ) ) )
80	76 76	mulcld	\|- ( ph -> ( 1 x. 1 ) e. CC )
81	9 8	mulcld	\|- ( ph -> ( N x. 2 ) e. CC )
82	80 81	addcomd	\|- ( ph -> ( ( 1 x. 1 ) + ( N x. 2 ) ) = ( ( N x. 2 ) + ( 1 x. 1 ) ) )
83	9 8	mulcomd	\|- ( ph -> ( N x. 2 ) = ( 2 x. N ) )
84	76	mulridd	\|- ( ph -> ( 1 x. 1 ) = 1 )
85	83 84	oveq12d	\|- ( ph -> ( ( N x. 2 ) + ( 1 x. 1 ) ) = ( ( 2 x. N ) + 1 ) )
86	82 85	eqtrd	\|- ( ph -> ( ( 1 x. 1 ) + ( N x. 2 ) ) = ( ( 2 x. N ) + 1 ) )
87	8	mulridd	\|- ( ph -> ( 2 x. 1 ) = 2 )
88	86 87	oveq12d	\|- ( ph -> ( ( ( 1 x. 1 ) + ( N x. 2 ) ) / ( 2 x. 1 ) ) = ( ( ( 2 x. N ) + 1 ) / 2 ) )
89	75 79 88	3eqtrd	\|- ( ph -> ( ( 1 / 2 ) + N ) = ( ( ( 2 x. N ) + 1 ) / 2 ) )
90	89	ad2antrr	\|- ( ( ( ph /\ s e. RR ) /\ ( s mod ( 2 x. _pi ) ) = 0 ) -> ( ( 1 / 2 ) + N ) = ( ( ( 2 x. N ) + 1 ) / 2 ) )
91	72 90	eqtrd	\|- ( ( ( ph /\ s e. RR ) /\ ( s mod ( 2 x. _pi ) ) = 0 ) -> ( ( 1 / 2 ) + sum_ k e. ( 1 ... N ) ( cos ` ( k x. s ) ) ) = ( ( ( 2 x. N ) + 1 ) / 2 ) )
92	91	oveq1d	\|- ( ( ( ph /\ s e. RR ) /\ ( s mod ( 2 x. _pi ) ) = 0 ) -> ( ( ( 1 / 2 ) + sum_ k e. ( 1 ... N ) ( cos ` ( k x. s ) ) ) / _pi ) = ( ( ( ( 2 x. N ) + 1 ) / 2 ) / _pi ) )
93	23 25 92	3eqtr4rd	\|- ( ( ( ph /\ s e. RR ) /\ ( s mod ( 2 x. _pi ) ) = 0 ) -> ( ( ( 1 / 2 ) + sum_ k e. ( 1 ... N ) ( cos ` ( k x. s ) ) ) / _pi ) = if ( ( s mod ( 2 x. _pi ) ) = 0 , ( ( ( 2 x. N ) + 1 ) / ( 2 x. _pi ) ) , ( ( sin ` ( ( N + ( 1 / 2 ) ) x. s ) ) / ( ( 2 x. _pi ) x. ( sin ` ( s / 2 ) ) ) ) ) )
94		iffalse	\|- ( -. ( s mod ( 2 x. _pi ) ) = 0 -> if ( ( s mod ( 2 x. _pi ) ) = 0 , ( ( ( 2 x. N ) + 1 ) / ( 2 x. _pi ) ) , ( ( sin ` ( ( N + ( 1 / 2 ) ) x. s ) ) / ( ( 2 x. _pi ) x. ( sin ` ( s / 2 ) ) ) ) ) = ( ( sin ` ( ( N + ( 1 / 2 ) ) x. s ) ) / ( ( 2 x. _pi ) x. ( sin ` ( s / 2 ) ) ) ) )
95	94	adantl	\|- ( ( ( ph /\ s e. RR ) /\ -. ( s mod ( 2 x. _pi ) ) = 0 ) -> if ( ( s mod ( 2 x. _pi ) ) = 0 , ( ( ( 2 x. N ) + 1 ) / ( 2 x. _pi ) ) , ( ( sin ` ( ( N + ( 1 / 2 ) ) x. s ) ) / ( ( 2 x. _pi ) x. ( sin ` ( s / 2 ) ) ) ) ) = ( ( sin ` ( ( N + ( 1 / 2 ) ) x. s ) ) / ( ( 2 x. _pi ) x. ( sin ` ( s / 2 ) ) ) ) )
96	13	a1i	\|- ( s e. RR -> _pi e. CC )
97	19	a1i	\|- ( s e. RR -> _pi =/= 0 )
98	29 96 97	divcan1d	\|- ( s e. RR -> ( ( s / _pi ) x. _pi ) = s )
99	98	eqcomd	\|- ( s e. RR -> s = ( ( s / _pi ) x. _pi ) )
100	99	ad2antrr	\|- ( ( ( s e. RR /\ -. ( s mod ( 2 x. _pi ) ) = 0 ) /\ ( s mod _pi ) = 0 ) -> s = ( ( s / _pi ) x. _pi ) )
101		simpr	\|- ( ( s e. RR /\ ( s mod _pi ) = 0 ) -> ( s mod _pi ) = 0 )
102		simpl	\|- ( ( s e. RR /\ ( s mod _pi ) = 0 ) -> s e. RR )
103		mod0	\|- ( ( s e. RR /\ _pi e. RR+ ) -> ( ( s mod _pi ) = 0 <-> ( s / _pi ) e. ZZ ) )
104	102 41 103	sylancl	\|- ( ( s e. RR /\ ( s mod _pi ) = 0 ) -> ( ( s mod _pi ) = 0 <-> ( s / _pi ) e. ZZ ) )
105	101 104	mpbid	\|- ( ( s e. RR /\ ( s mod _pi ) = 0 ) -> ( s / _pi ) e. ZZ )
106	105	adantlr	\|- ( ( ( s e. RR /\ -. ( s mod ( 2 x. _pi ) ) = 0 ) /\ ( s mod _pi ) = 0 ) -> ( s / _pi ) e. ZZ )
107		rpreccl	\|- ( _pi e. RR+ -> ( 1 / _pi ) e. RR+ )
108	41 107	ax-mp	\|- ( 1 / _pi ) e. RR+
109		moddi	\|- ( ( ( 1 / _pi ) e. RR+ /\ s e. RR /\ ( 2 x. _pi ) e. RR+ ) -> ( ( 1 / _pi ) x. ( s mod ( 2 x. _pi ) ) ) = ( ( ( 1 / _pi ) x. s ) mod ( ( 1 / _pi ) x. ( 2 x. _pi ) ) ) )
110	108 43 109	mp3an13	\|- ( s e. RR -> ( ( 1 / _pi ) x. ( s mod ( 2 x. _pi ) ) ) = ( ( ( 1 / _pi ) x. s ) mod ( ( 1 / _pi ) x. ( 2 x. _pi ) ) ) )
111	29 96 97	divrec2d	\|- ( s e. RR -> ( s / _pi ) = ( ( 1 / _pi ) x. s ) )
112	111	eqcomd	\|- ( s e. RR -> ( ( 1 / _pi ) x. s ) = ( s / _pi ) )
113	96 97	reccld	\|- ( s e. RR -> ( 1 / _pi ) e. CC )
114	32	a1i	\|- ( s e. RR -> ( 2 x. _pi ) e. CC )
115	113 114	mulcomd	\|- ( s e. RR -> ( ( 1 / _pi ) x. ( 2 x. _pi ) ) = ( ( 2 x. _pi ) x. ( 1 / _pi ) ) )
116		2cnd	\|- ( s e. RR -> 2 e. CC )
117	116 96 113	mulassd	\|- ( s e. RR -> ( ( 2 x. _pi ) x. ( 1 / _pi ) ) = ( 2 x. ( _pi x. ( 1 / _pi ) ) ) )
118	13 19	recidi	\|- ( _pi x. ( 1 / _pi ) ) = 1
119	118	oveq2i	\|- ( 2 x. ( _pi x. ( 1 / _pi ) ) ) = ( 2 x. 1 )
120	116	mulridd	\|- ( s e. RR -> ( 2 x. 1 ) = 2 )
121	119 120	eqtrid	\|- ( s e. RR -> ( 2 x. ( _pi x. ( 1 / _pi ) ) ) = 2 )
122	115 117 121	3eqtrd	\|- ( s e. RR -> ( ( 1 / _pi ) x. ( 2 x. _pi ) ) = 2 )
123	112 122	oveq12d	\|- ( s e. RR -> ( ( ( 1 / _pi ) x. s ) mod ( ( 1 / _pi ) x. ( 2 x. _pi ) ) ) = ( ( s / _pi ) mod 2 ) )
124	110 123	eqtr2d	\|- ( s e. RR -> ( ( s / _pi ) mod 2 ) = ( ( 1 / _pi ) x. ( s mod ( 2 x. _pi ) ) ) )
125	124	adantr	\|- ( ( s e. RR /\ -. ( s mod ( 2 x. _pi ) ) = 0 ) -> ( ( s / _pi ) mod 2 ) = ( ( 1 / _pi ) x. ( s mod ( 2 x. _pi ) ) ) )
126	113	adantr	\|- ( ( s e. RR /\ -. ( s mod ( 2 x. _pi ) ) = 0 ) -> ( 1 / _pi ) e. CC )
127		id	\|- ( s e. RR -> s e. RR )
128	43	a1i	\|- ( s e. RR -> ( 2 x. _pi ) e. RR+ )
129	127 128	modcld	\|- ( s e. RR -> ( s mod ( 2 x. _pi ) ) e. RR )
130	129	recnd	\|- ( s e. RR -> ( s mod ( 2 x. _pi ) ) e. CC )
131	130	adantr	\|- ( ( s e. RR /\ -. ( s mod ( 2 x. _pi ) ) = 0 ) -> ( s mod ( 2 x. _pi ) ) e. CC )
132		ax-1cn	\|- 1 e. CC
133	132 13 77 19	divne0i	\|- ( 1 / _pi ) =/= 0
134	133	a1i	\|- ( ( s e. RR /\ -. ( s mod ( 2 x. _pi ) ) = 0 ) -> ( 1 / _pi ) =/= 0 )
135		neqne	\|- ( -. ( s mod ( 2 x. _pi ) ) = 0 -> ( s mod ( 2 x. _pi ) ) =/= 0 )
136	135	adantl	\|- ( ( s e. RR /\ -. ( s mod ( 2 x. _pi ) ) = 0 ) -> ( s mod ( 2 x. _pi ) ) =/= 0 )
137	126 131 134 136	mulne0d	\|- ( ( s e. RR /\ -. ( s mod ( 2 x. _pi ) ) = 0 ) -> ( ( 1 / _pi ) x. ( s mod ( 2 x. _pi ) ) ) =/= 0 )
138	125 137	eqnetrd	\|- ( ( s e. RR /\ -. ( s mod ( 2 x. _pi ) ) = 0 ) -> ( ( s / _pi ) mod 2 ) =/= 0 )
139	138	adantr	\|- ( ( ( s e. RR /\ -. ( s mod ( 2 x. _pi ) ) = 0 ) /\ ( s mod _pi ) = 0 ) -> ( ( s / _pi ) mod 2 ) =/= 0 )
140		oddfl	\|- ( ( ( s / _pi ) e. ZZ /\ ( ( s / _pi ) mod 2 ) =/= 0 ) -> ( s / _pi ) = ( ( 2 x. ( \|_ ` ( ( s / _pi ) / 2 ) ) ) + 1 ) )
141	106 139 140	syl2anc	\|- ( ( ( s e. RR /\ -. ( s mod ( 2 x. _pi ) ) = 0 ) /\ ( s mod _pi ) = 0 ) -> ( s / _pi ) = ( ( 2 x. ( \|_ ` ( ( s / _pi ) / 2 ) ) ) + 1 ) )
142	141	oveq1d	\|- ( ( ( s e. RR /\ -. ( s mod ( 2 x. _pi ) ) = 0 ) /\ ( s mod _pi ) = 0 ) -> ( ( s / _pi ) x. _pi ) = ( ( ( 2 x. ( \|_ ` ( ( s / _pi ) / 2 ) ) ) + 1 ) x. _pi ) )
143	100 142	eqtrd	\|- ( ( ( s e. RR /\ -. ( s mod ( 2 x. _pi ) ) = 0 ) /\ ( s mod _pi ) = 0 ) -> s = ( ( ( 2 x. ( \|_ ` ( ( s / _pi ) / 2 ) ) ) + 1 ) x. _pi ) )
144	143	oveq2d	\|- ( ( ( s e. RR /\ -. ( s mod ( 2 x. _pi ) ) = 0 ) /\ ( s mod _pi ) = 0 ) -> ( k x. s ) = ( k x. ( ( ( 2 x. ( \|_ ` ( ( s / _pi ) / 2 ) ) ) + 1 ) x. _pi ) ) )
145	144	fveq2d	\|- ( ( ( s e. RR /\ -. ( s mod ( 2 x. _pi ) ) = 0 ) /\ ( s mod _pi ) = 0 ) -> ( cos ` ( k x. s ) ) = ( cos ` ( k x. ( ( ( 2 x. ( \|_ ` ( ( s / _pi ) / 2 ) ) ) + 1 ) x. _pi ) ) ) )
146	145	sumeq2sdv	\|- ( ( ( s e. RR /\ -. ( s mod ( 2 x. _pi ) ) = 0 ) /\ ( s mod _pi ) = 0 ) -> sum_ k e. ( 1 ... N ) ( cos ` ( k x. s ) ) = sum_ k e. ( 1 ... N ) ( cos ` ( k x. ( ( ( 2 x. ( \|_ ` ( ( s / _pi ) / 2 ) ) ) + 1 ) x. _pi ) ) ) )
147	146	oveq2d	\|- ( ( ( s e. RR /\ -. ( s mod ( 2 x. _pi ) ) = 0 ) /\ ( s mod _pi ) = 0 ) -> ( ( 1 / 2 ) + sum_ k e. ( 1 ... N ) ( cos ` ( k x. s ) ) ) = ( ( 1 / 2 ) + sum_ k e. ( 1 ... N ) ( cos ` ( k x. ( ( ( 2 x. ( \|_ ` ( ( s / _pi ) / 2 ) ) ) + 1 ) x. _pi ) ) ) ) )
148	147	oveq1d	\|- ( ( ( s e. RR /\ -. ( s mod ( 2 x. _pi ) ) = 0 ) /\ ( s mod _pi ) = 0 ) -> ( ( ( 1 / 2 ) + sum_ k e. ( 1 ... N ) ( cos ` ( k x. s ) ) ) / _pi ) = ( ( ( 1 / 2 ) + sum_ k e. ( 1 ... N ) ( cos ` ( k x. ( ( ( 2 x. ( \|_ ` ( ( s / _pi ) / 2 ) ) ) + 1 ) x. _pi ) ) ) ) / _pi ) )
149	148	adantlll	\|- ( ( ( ( ph /\ s e. RR ) /\ -. ( s mod ( 2 x. _pi ) ) = 0 ) /\ ( s mod _pi ) = 0 ) -> ( ( ( 1 / 2 ) + sum_ k e. ( 1 ... N ) ( cos ` ( k x. s ) ) ) / _pi ) = ( ( ( 1 / 2 ) + sum_ k e. ( 1 ... N ) ( cos ` ( k x. ( ( ( 2 x. ( \|_ ` ( ( s / _pi ) / 2 ) ) ) + 1 ) x. _pi ) ) ) ) / _pi ) )
150	2	ad2antrr	\|- ( ( ( ph /\ s e. RR ) /\ ( s mod _pi ) = 0 ) -> N e. NN )
151	17	a1i	\|- ( s e. RR -> _pi e. RR )
152	127 151 97	redivcld	\|- ( s e. RR -> ( s / _pi ) e. RR )
153	152	rehalfcld	\|- ( s e. RR -> ( ( s / _pi ) / 2 ) e. RR )
154	153	flcld	\|- ( s e. RR -> ( \|_ ` ( ( s / _pi ) / 2 ) ) e. ZZ )
155	154	ad2antlr	\|- ( ( ( ph /\ s e. RR ) /\ ( s mod _pi ) = 0 ) -> ( \|_ ` ( ( s / _pi ) / 2 ) ) e. ZZ )
156		eqid	\|- ( ( ( 2 x. ( \|_ ` ( ( s / _pi ) / 2 ) ) ) + 1 ) x. _pi ) = ( ( ( 2 x. ( \|_ ` ( ( s / _pi ) / 2 ) ) ) + 1 ) x. _pi )
157	150 155 156	dirkertrigeqlem3	\|- ( ( ( ph /\ s e. RR ) /\ ( s mod _pi ) = 0 ) -> ( ( ( 1 / 2 ) + sum_ k e. ( 1 ... N ) ( cos ` ( k x. ( ( ( 2 x. ( \|_ ` ( ( s / _pi ) / 2 ) ) ) + 1 ) x. _pi ) ) ) ) / _pi ) = ( ( sin ` ( ( N + ( 1 / 2 ) ) x. ( ( ( 2 x. ( \|_ ` ( ( s / _pi ) / 2 ) ) ) + 1 ) x. _pi ) ) ) / ( ( 2 x. _pi ) x. ( sin ` ( ( ( ( 2 x. ( \|_ ` ( ( s / _pi ) / 2 ) ) ) + 1 ) x. _pi ) / 2 ) ) ) ) )
158	157	adantlr	\|- ( ( ( ( ph /\ s e. RR ) /\ -. ( s mod ( 2 x. _pi ) ) = 0 ) /\ ( s mod _pi ) = 0 ) -> ( ( ( 1 / 2 ) + sum_ k e. ( 1 ... N ) ( cos ` ( k x. ( ( ( 2 x. ( \|_ ` ( ( s / _pi ) / 2 ) ) ) + 1 ) x. _pi ) ) ) ) / _pi ) = ( ( sin ` ( ( N + ( 1 / 2 ) ) x. ( ( ( 2 x. ( \|_ ` ( ( s / _pi ) / 2 ) ) ) + 1 ) x. _pi ) ) ) / ( ( 2 x. _pi ) x. ( sin ` ( ( ( ( 2 x. ( \|_ ` ( ( s / _pi ) / 2 ) ) ) + 1 ) x. _pi ) / 2 ) ) ) ) )
159	141	adantlll	\|- ( ( ( ( ph /\ s e. RR ) /\ -. ( s mod ( 2 x. _pi ) ) = 0 ) /\ ( s mod _pi ) = 0 ) -> ( s / _pi ) = ( ( 2 x. ( \|_ ` ( ( s / _pi ) / 2 ) ) ) + 1 ) )
160	159	eqcomd	\|- ( ( ( ( ph /\ s e. RR ) /\ -. ( s mod ( 2 x. _pi ) ) = 0 ) /\ ( s mod _pi ) = 0 ) -> ( ( 2 x. ( \|_ ` ( ( s / _pi ) / 2 ) ) ) + 1 ) = ( s / _pi ) )
161	160	oveq1d	\|- ( ( ( ( ph /\ s e. RR ) /\ -. ( s mod ( 2 x. _pi ) ) = 0 ) /\ ( s mod _pi ) = 0 ) -> ( ( ( 2 x. ( \|_ ` ( ( s / _pi ) / 2 ) ) ) + 1 ) x. _pi ) = ( ( s / _pi ) x. _pi ) )
162	161	oveq2d	\|- ( ( ( ( ph /\ s e. RR ) /\ -. ( s mod ( 2 x. _pi ) ) = 0 ) /\ ( s mod _pi ) = 0 ) -> ( ( N + ( 1 / 2 ) ) x. ( ( ( 2 x. ( \|_ ` ( ( s / _pi ) / 2 ) ) ) + 1 ) x. _pi ) ) = ( ( N + ( 1 / 2 ) ) x. ( ( s / _pi ) x. _pi ) ) )
163	162	fveq2d	\|- ( ( ( ( ph /\ s e. RR ) /\ -. ( s mod ( 2 x. _pi ) ) = 0 ) /\ ( s mod _pi ) = 0 ) -> ( sin ` ( ( N + ( 1 / 2 ) ) x. ( ( ( 2 x. ( \|_ ` ( ( s / _pi ) / 2 ) ) ) + 1 ) x. _pi ) ) ) = ( sin ` ( ( N + ( 1 / 2 ) ) x. ( ( s / _pi ) x. _pi ) ) ) )
164	161	fvoveq1d	\|- ( ( ( ( ph /\ s e. RR ) /\ -. ( s mod ( 2 x. _pi ) ) = 0 ) /\ ( s mod _pi ) = 0 ) -> ( sin ` ( ( ( ( 2 x. ( \|_ ` ( ( s / _pi ) / 2 ) ) ) + 1 ) x. _pi ) / 2 ) ) = ( sin ` ( ( ( s / _pi ) x. _pi ) / 2 ) ) )
165	164	oveq2d	\|- ( ( ( ( ph /\ s e. RR ) /\ -. ( s mod ( 2 x. _pi ) ) = 0 ) /\ ( s mod _pi ) = 0 ) -> ( ( 2 x. _pi ) x. ( sin ` ( ( ( ( 2 x. ( \|_ ` ( ( s / _pi ) / 2 ) ) ) + 1 ) x. _pi ) / 2 ) ) ) = ( ( 2 x. _pi ) x. ( sin ` ( ( ( s / _pi ) x. _pi ) / 2 ) ) ) )
166	163 165	oveq12d	\|- ( ( ( ( ph /\ s e. RR ) /\ -. ( s mod ( 2 x. _pi ) ) = 0 ) /\ ( s mod _pi ) = 0 ) -> ( ( sin ` ( ( N + ( 1 / 2 ) ) x. ( ( ( 2 x. ( \|_ ` ( ( s / _pi ) / 2 ) ) ) + 1 ) x. _pi ) ) ) / ( ( 2 x. _pi ) x. ( sin ` ( ( ( ( 2 x. ( \|_ ` ( ( s / _pi ) / 2 ) ) ) + 1 ) x. _pi ) / 2 ) ) ) ) = ( ( sin ` ( ( N + ( 1 / 2 ) ) x. ( ( s / _pi ) x. _pi ) ) ) / ( ( 2 x. _pi ) x. ( sin ` ( ( ( s / _pi ) x. _pi ) / 2 ) ) ) ) )
167	98	oveq2d	\|- ( s e. RR -> ( ( N + ( 1 / 2 ) ) x. ( ( s / _pi ) x. _pi ) ) = ( ( N + ( 1 / 2 ) ) x. s ) )
168	167	fveq2d	\|- ( s e. RR -> ( sin ` ( ( N + ( 1 / 2 ) ) x. ( ( s / _pi ) x. _pi ) ) ) = ( sin ` ( ( N + ( 1 / 2 ) ) x. s ) ) )
169	98	fvoveq1d	\|- ( s e. RR -> ( sin ` ( ( ( s / _pi ) x. _pi ) / 2 ) ) = ( sin ` ( s / 2 ) ) )
170	169	oveq2d	\|- ( s e. RR -> ( ( 2 x. _pi ) x. ( sin ` ( ( ( s / _pi ) x. _pi ) / 2 ) ) ) = ( ( 2 x. _pi ) x. ( sin ` ( s / 2 ) ) ) )
171	168 170	oveq12d	\|- ( s e. RR -> ( ( sin ` ( ( N + ( 1 / 2 ) ) x. ( ( s / _pi ) x. _pi ) ) ) / ( ( 2 x. _pi ) x. ( sin ` ( ( ( s / _pi ) x. _pi ) / 2 ) ) ) ) = ( ( sin ` ( ( N + ( 1 / 2 ) ) x. s ) ) / ( ( 2 x. _pi ) x. ( sin ` ( s / 2 ) ) ) ) )
172	171	adantl	\|- ( ( ph /\ s e. RR ) -> ( ( sin ` ( ( N + ( 1 / 2 ) ) x. ( ( s / _pi ) x. _pi ) ) ) / ( ( 2 x. _pi ) x. ( sin ` ( ( ( s / _pi ) x. _pi ) / 2 ) ) ) ) = ( ( sin ` ( ( N + ( 1 / 2 ) ) x. s ) ) / ( ( 2 x. _pi ) x. ( sin ` ( s / 2 ) ) ) ) )
173	172	ad2antrr	\|- ( ( ( ( ph /\ s e. RR ) /\ -. ( s mod ( 2 x. _pi ) ) = 0 ) /\ ( s mod _pi ) = 0 ) -> ( ( sin ` ( ( N + ( 1 / 2 ) ) x. ( ( s / _pi ) x. _pi ) ) ) / ( ( 2 x. _pi ) x. ( sin ` ( ( ( s / _pi ) x. _pi ) / 2 ) ) ) ) = ( ( sin ` ( ( N + ( 1 / 2 ) ) x. s ) ) / ( ( 2 x. _pi ) x. ( sin ` ( s / 2 ) ) ) ) )
174	166 173	eqtrd	\|- ( ( ( ( ph /\ s e. RR ) /\ -. ( s mod ( 2 x. _pi ) ) = 0 ) /\ ( s mod _pi ) = 0 ) -> ( ( sin ` ( ( N + ( 1 / 2 ) ) x. ( ( ( 2 x. ( \|_ ` ( ( s / _pi ) / 2 ) ) ) + 1 ) x. _pi ) ) ) / ( ( 2 x. _pi ) x. ( sin ` ( ( ( ( 2 x. ( \|_ ` ( ( s / _pi ) / 2 ) ) ) + 1 ) x. _pi ) / 2 ) ) ) ) = ( ( sin ` ( ( N + ( 1 / 2 ) ) x. s ) ) / ( ( 2 x. _pi ) x. ( sin ` ( s / 2 ) ) ) ) )
175	149 158 174	3eqtrrd	\|- ( ( ( ( ph /\ s e. RR ) /\ -. ( s mod ( 2 x. _pi ) ) = 0 ) /\ ( s mod _pi ) = 0 ) -> ( ( sin ` ( ( N + ( 1 / 2 ) ) x. s ) ) / ( ( 2 x. _pi ) x. ( sin ` ( s / 2 ) ) ) ) = ( ( ( 1 / 2 ) + sum_ k e. ( 1 ... N ) ( cos ` ( k x. s ) ) ) / _pi ) )
176		simplr	\|- ( ( ( ph /\ s e. RR ) /\ -. ( s mod _pi ) = 0 ) -> s e. RR )
177		simpr	\|- ( ( ( ph /\ s e. RR ) /\ -. ( s mod _pi ) = 0 ) -> -. ( s mod _pi ) = 0 )
178	176 41 103	sylancl	\|- ( ( ( ph /\ s e. RR ) /\ -. ( s mod _pi ) = 0 ) -> ( ( s mod _pi ) = 0 <-> ( s / _pi ) e. ZZ ) )
179	177 178	mtbid	\|- ( ( ( ph /\ s e. RR ) /\ -. ( s mod _pi ) = 0 ) -> -. ( s / _pi ) e. ZZ )
180	176	recnd	\|- ( ( ( ph /\ s e. RR ) /\ -. ( s mod _pi ) = 0 ) -> s e. CC )
181		sineq0	\|- ( s e. CC -> ( ( sin ` s ) = 0 <-> ( s / _pi ) e. ZZ ) )
182	180 181	syl	\|- ( ( ( ph /\ s e. RR ) /\ -. ( s mod _pi ) = 0 ) -> ( ( sin ` s ) = 0 <-> ( s / _pi ) e. ZZ ) )
183	179 182	mtbird	\|- ( ( ( ph /\ s e. RR ) /\ -. ( s mod _pi ) = 0 ) -> -. ( sin ` s ) = 0 )
184	183	neqned	\|- ( ( ( ph /\ s e. RR ) /\ -. ( s mod _pi ) = 0 ) -> ( sin ` s ) =/= 0 )
185	2	ad2antrr	\|- ( ( ( ph /\ s e. RR ) /\ -. ( s mod _pi ) = 0 ) -> N e. NN )
186	176 184 185	dirkertrigeqlem2	\|- ( ( ( ph /\ s e. RR ) /\ -. ( s mod _pi ) = 0 ) -> ( ( ( 1 / 2 ) + sum_ k e. ( 1 ... N ) ( cos ` ( k x. s ) ) ) / _pi ) = ( ( sin ` ( ( N + ( 1 / 2 ) ) x. s ) ) / ( ( 2 x. _pi ) x. ( sin ` ( s / 2 ) ) ) ) )
187	186	eqcomd	\|- ( ( ( ph /\ s e. RR ) /\ -. ( s mod _pi ) = 0 ) -> ( ( sin ` ( ( N + ( 1 / 2 ) ) x. s ) ) / ( ( 2 x. _pi ) x. ( sin ` ( s / 2 ) ) ) ) = ( ( ( 1 / 2 ) + sum_ k e. ( 1 ... N ) ( cos ` ( k x. s ) ) ) / _pi ) )
188	187	adantlr	\|- ( ( ( ( ph /\ s e. RR ) /\ -. ( s mod ( 2 x. _pi ) ) = 0 ) /\ -. ( s mod _pi ) = 0 ) -> ( ( sin ` ( ( N + ( 1 / 2 ) ) x. s ) ) / ( ( 2 x. _pi ) x. ( sin ` ( s / 2 ) ) ) ) = ( ( ( 1 / 2 ) + sum_ k e. ( 1 ... N ) ( cos ` ( k x. s ) ) ) / _pi ) )
189	175 188	pm2.61dan	\|- ( ( ( ph /\ s e. RR ) /\ -. ( s mod ( 2 x. _pi ) ) = 0 ) -> ( ( sin ` ( ( N + ( 1 / 2 ) ) x. s ) ) / ( ( 2 x. _pi ) x. ( sin ` ( s / 2 ) ) ) ) = ( ( ( 1 / 2 ) + sum_ k e. ( 1 ... N ) ( cos ` ( k x. s ) ) ) / _pi ) )
190	95 189	eqtr2d	\|- ( ( ( ph /\ s e. RR ) /\ -. ( s mod ( 2 x. _pi ) ) = 0 ) -> ( ( ( 1 / 2 ) + sum_ k e. ( 1 ... N ) ( cos ` ( k x. s ) ) ) / _pi ) = if ( ( s mod ( 2 x. _pi ) ) = 0 , ( ( ( 2 x. N ) + 1 ) / ( 2 x. _pi ) ) , ( ( sin ` ( ( N + ( 1 / 2 ) ) x. s ) ) / ( ( 2 x. _pi ) x. ( sin ` ( s / 2 ) ) ) ) ) )
191	93 190	pm2.61dan	\|- ( ( ph /\ s e. RR ) -> ( ( ( 1 / 2 ) + sum_ k e. ( 1 ... N ) ( cos ` ( k x. s ) ) ) / _pi ) = if ( ( s mod ( 2 x. _pi ) ) = 0 , ( ( ( 2 x. N ) + 1 ) / ( 2 x. _pi ) ) , ( ( sin ` ( ( N + ( 1 / 2 ) ) x. s ) ) / ( ( 2 x. _pi ) x. ( sin ` ( s / 2 ) ) ) ) ) )
192	191	mpteq2dva	\|- ( ph -> ( s e. RR \|-> ( ( ( 1 / 2 ) + sum_ k e. ( 1 ... N ) ( cos ` ( k x. s ) ) ) / _pi ) ) = ( s e. RR \|-> if ( ( s mod ( 2 x. _pi ) ) = 0 , ( ( ( 2 x. N ) + 1 ) / ( 2 x. _pi ) ) , ( ( sin ` ( ( N + ( 1 / 2 ) ) x. s ) ) / ( ( 2 x. _pi ) x. ( sin ` ( s / 2 ) ) ) ) ) ) )
193	4 192	eqtr2id	\|- ( ph -> ( s e. RR \|-> if ( ( s mod ( 2 x. _pi ) ) = 0 , ( ( ( 2 x. N ) + 1 ) / ( 2 x. _pi ) ) , ( ( sin ` ( ( N + ( 1 / 2 ) ) x. s ) ) / ( ( 2 x. _pi ) x. ( sin ` ( s / 2 ) ) ) ) ) ) = H )
194	5 7 193	3eqtrd	\|- ( ph -> F = H )

Metamath Proof Explorer

Theorem dirkertrigeq

Proof