4001prm

Description: 4001 is a prime number. (Contributed by Mario Carneiro, 3-Mar-2014) (Proof shortened by Mario Carneiro, 20-Apr-2015) (Proof shortened by AV, 16-Sep-2021)

		Ref	Expression
	Hypothesis	4001prm.1	\|- N = ; ; ; 4 0 0 1
	Assertion	4001prm	\|- N e. Prime

Proof

Step	Hyp	Ref	Expression
1		4001prm.1	\|- N = ; ; ; 4 0 0 1
2		5prm	\|- 5 e. Prime
3		8nn	\|- 8 e. NN
4	3	decnncl2	\|- ; 8 0 e. NN
5	4	decnncl2	\|- ; ; 8 0 0 e. NN
6		4nn0	\|- 4 e. NN0
7		0nn0	\|- 0 e. NN0
8	6 7	deccl	\|- ; 4 0 e. NN0
9	8 7	deccl	\|- ; ; 4 0 0 e. NN0
10	9 7	deccl	\|- ; ; ; 4 0 0 0 e. NN0
11	10	nn0cni	\|- ; ; ; 4 0 0 0 e. CC
12		ax-1cn	\|- 1 e. CC
13	12	addid2i	\|- ( 0 + 1 ) = 1
14		eqid	\|- ; ; ; 4 0 0 0 = ; ; ; 4 0 0 0
15	9 7 13 14	decsuc	\|- ( ; ; ; 4 0 0 0 + 1 ) = ; ; ; 4 0 0 1
16	1 15	eqtr4i	\|- N = ( ; ; ; 4 0 0 0 + 1 )
17	11 12 16	mvrraddi	\|- ( N - 1 ) = ; ; ; 4 0 0 0
18		5nn0	\|- 5 e. NN0
19		8nn0	\|- 8 e. NN0
20	19 7	deccl	\|- ; 8 0 e. NN0
21		eqid	\|- ; ; 8 0 0 = ; ; 8 0 0
22		eqid	\|- ; 8 0 = ; 8 0
23		8t5e40	\|- ( 8 x. 5 ) = ; 4 0
24		5cn	\|- 5 e. CC
25	24	mul02i	\|- ( 0 x. 5 ) = 0
26	18 19 7 22 23 25	decmul1	\|- ( ; 8 0 x. 5 ) = ; ; 4 0 0
27	18 20 7 21 26 25	decmul1	\|- ( ; ; 8 0 0 x. 5 ) = ; ; ; 4 0 0 0
28	17 27	eqtr4i	\|- ( N - 1 ) = ( ; ; 8 0 0 x. 5 )
29		1nn0	\|- 1 e. NN0
30	9 29	deccl	\|- ; ; ; 4 0 0 1 e. NN0
31	1 30	eqeltri	\|- N e. NN0
32	31	nn0cni	\|- N e. CC
33		npcan	\|- ( ( N e. CC /\ 1 e. CC ) -> ( ( N - 1 ) + 1 ) = N )
34	32 12 33	mp2an	\|- ( ( N - 1 ) + 1 ) = N
35	34	eqcomi	\|- N = ( ( N - 1 ) + 1 )
36		3nn0	\|- 3 e. NN0
37		2nn	\|- 2 e. NN
38	36 37	decnncl	\|- ; 3 2 e. NN
39		3nn	\|- 3 e. NN
40		2nn0	\|- 2 e. NN0
41	36 40	deccl	\|- ; 3 2 e. NN0
42	29 40	deccl	\|- ; 1 2 e. NN0
43		2p1e3	\|- ( 2 + 1 ) = 3
44	24	sqvali	\|- ( 5 ^ 2 ) = ( 5 x. 5 )
45		5t5e25	\|- ( 5 x. 5 ) = ; 2 5
46	44 45	eqtri	\|- ( 5 ^ 2 ) = ; 2 5
47		2cn	\|- 2 e. CC
48		5t2e10	\|- ( 5 x. 2 ) = ; 1 0
49	24 47 48	mulcomli	\|- ( 2 x. 5 ) = ; 1 0
50	47	addid2i	\|- ( 0 + 2 ) = 2
51	29 7 40 49 50	decaddi	\|- ( ( 2 x. 5 ) + 2 ) = ; 1 2
52	18 40 18 46 18 40 51 45	decmul1c	\|- ( ( 5 ^ 2 ) x. 5 ) = ; ; 1 2 5
53	18 40 43 52	numexpp1	\|- ( 5 ^ 3 ) = ; ; 1 2 5
54		6nn0	\|- 6 e. NN0
55	29 54	deccl	\|- ; 1 6 e. NN0
56		eqid	\|- ; 1 2 = ; 1 2
57		eqid	\|- ; 1 6 = ; 1 6
58		7nn0	\|- 7 e. NN0
59		7cn	\|- 7 e. CC
60		7p1e8	\|- ( 7 + 1 ) = 8
61	59 12 60	addcomli	\|- ( 1 + 7 ) = 8
62	61 19	eqeltri	\|- ( 1 + 7 ) e. NN0
63		eqid	\|- ; 3 2 = ; 3 2
64		3t1e3	\|- ( 3 x. 1 ) = 3
65	64	oveq1i	\|- ( ( 3 x. 1 ) + 1 ) = ( 3 + 1 )
66		3p1e4	\|- ( 3 + 1 ) = 4
67	65 66	eqtri	\|- ( ( 3 x. 1 ) + 1 ) = 4
68		2t1e2	\|- ( 2 x. 1 ) = 2
69	68 61	oveq12i	\|- ( ( 2 x. 1 ) + ( 1 + 7 ) ) = ( 2 + 8 )
70		8cn	\|- 8 e. CC
71		8p2e10	\|- ( 8 + 2 ) = ; 1 0
72	70 47 71	addcomli	\|- ( 2 + 8 ) = ; 1 0
73	69 72	eqtri	\|- ( ( 2 x. 1 ) + ( 1 + 7 ) ) = ; 1 0
74	36 40 62 63 29 7 29 67 73	decrmac	\|- ( ( ; 3 2 x. 1 ) + ( 1 + 7 ) ) = ; 4 0
75		3t2e6	\|- ( 3 x. 2 ) = 6
76	75	oveq1i	\|- ( ( 3 x. 2 ) + 1 ) = ( 6 + 1 )
77		6p1e7	\|- ( 6 + 1 ) = 7
78	76 77	eqtri	\|- ( ( 3 x. 2 ) + 1 ) = 7
79		2t2e4	\|- ( 2 x. 2 ) = 4
80	79	oveq1i	\|- ( ( 2 x. 2 ) + 6 ) = ( 4 + 6 )
81		6cn	\|- 6 e. CC
82		4cn	\|- 4 e. CC
83		6p4e10	\|- ( 6 + 4 ) = ; 1 0
84	81 82 83	addcomli	\|- ( 4 + 6 ) = ; 1 0
85	80 84	eqtri	\|- ( ( 2 x. 2 ) + 6 ) = ; 1 0
86	36 40 54 63 40 7 29 78 85	decrmac	\|- ( ( ; 3 2 x. 2 ) + 6 ) = ; 7 0
87	29 40 29 54 56 57 41 7 58 74 86	decma2c	\|- ( ( ; 3 2 x. ; 1 2 ) + ; 1 6 ) = ; ; 4 0 0
88		5p1e6	\|- ( 5 + 1 ) = 6
89		3cn	\|- 3 e. CC
90		5t3e15	\|- ( 5 x. 3 ) = ; 1 5
91	24 89 90	mulcomli	\|- ( 3 x. 5 ) = ; 1 5
92	29 18 88 91	decsuc	\|- ( ( 3 x. 5 ) + 1 ) = ; 1 6
93	18 36 40 63 7 29 92 49	decmul1c	\|- ( ; 3 2 x. 5 ) = ; ; 1 6 0
94	41 42 18 53 7 55 87 93	decmul2c	\|- ( ; 3 2 x. ( 5 ^ 3 ) ) = ; ; ; 4 0 0 0
95	17 94	eqtr4i	\|- ( N - 1 ) = ( ; 3 2 x. ( 5 ^ 3 ) )
96		2lt10	\|- 2 < ; 1 0
97		1nn	\|- 1 e. NN
98		3lt10	\|- 3 < ; 1 0
99	97 40 36 98	declti	\|- 3 < ; 1 2
100	36 42 40 18 96 99	decltc	\|- ; 3 2 < ; ; 1 2 5
101	100 53	breqtrri	\|- ; 3 2 < ( 5 ^ 3 )
102	1	4001lem3	\|- ( ( 2 ^ ( N - 1 ) ) mod N ) = ( 1 mod N )
103	1	4001lem4	\|- ( ( ( 2 ^ ; ; 8 0 0 ) - 1 ) gcd N ) = 1
104	2 5 28 35 38 39 37 95 101 102 103	pockthi	\|- N e. Prime

Metamath Proof Explorer

Theorem 4001prm

Proof