Metamath Proof Explorer

Theorem sin5tlem4

Description: Lemma 4 for quintupled angle sine calculation: expanding lemma 3 result to difference of polynomials. (Contributed by Ender Ting, 17-Apr-2026)

Ref Expression
Assertion sin5tlem4 N M N 2 = 1 M 2 4 N 3 3 N 2 M N = 8 M 5 16 M 3 + 8 M - 6 M 6 M 3

Proof

Step Hyp Ref Expression
1 sin5tlem3 N M N 2 = 1 M 2 4 N 3 3 N 2 M N = 4 1 - 2 M 2 + M 4 3 1 M 2 2 M
2 4cn 4
3 2 a1i M 4
4 1cnd M 1
5 2cnd M 2
6 sqcl M M 2
7 5 6 mulcld M 2 M 2
8 4 7 subcld M 1 2 M 2
9 id M M
10 4nn0 4 0
11 10 a1i M 4 0
12 9 11 expcld M M 4
13 8 12 addcld M 1 - 2 M 2 + M 4
14 3 13 mulcld M 4 1 - 2 M 2 + M 4
15 3cn 3
16 15 a1i M 3
17 4 6 subcld M 1 M 2
18 16 17 mulcld M 3 1 M 2
19 5 9 mulcld M 2 M
20 14 18 19 subdird M 4 1 - 2 M 2 + M 4 3 1 M 2 2 M = 4 1 - 2 M 2 + M 4 2 M 3 1 M 2 2 M
21 3 13 5 9 mul4d M 4 1 - 2 M 2 + M 4 2 M = 4 2 1 - 2 M 2 + M 4 M
22 4t2e8 4 2 = 8
23 22 a1i M 4 2 = 8
24 23 oveq1d M 4 2 1 - 2 M 2 + M 4 M = 8 1 - 2 M 2 + M 4 M
25 4 12 7 addsubd M 1 + M 4 - 2 M 2 = 1 - 2 M 2 + M 4
26 25 eqcomd M 1 - 2 M 2 + M 4 = 1 + M 4 - 2 M 2
27 26 oveq1d M 1 - 2 M 2 + M 4 M = 1 + M 4 - 2 M 2 M
28 4 12 addcld M 1 + M 4
29 28 7 9 subdird M 1 + M 4 - 2 M 2 M = 1 + M 4 M 2 M 2 M
30 5nn0 5 0
31 30 a1i M 5 0
32 9 31 expcld M M 5
33 mullid M 1 M = M
34 9 11 expp1d M M 4 + 1 = M 4 M
35 4p1e5 4 + 1 = 5
36 35 a1i M 4 + 1 = 5
37 36 oveq2d M M 4 + 1 = M 5
38 34 37 eqtr3d M M 4 M = M 5
39 33 38 oveq12d M 1 M + M 4 M = M + M 5
40 4 9 12 39 joinlmuladdmuld M 1 + M 4 M = M + M 5
41 9 32 40 comraddd M 1 + M 4 M = M 5 + M
42 5 6 9 mulassd M 2 M 2 M = 2 M 2 M
43 2nn0 2 0
44 43 a1i M 2 0
45 9 44 expp1d M M 2 + 1 = M 2 M
46 2p1e3 2 + 1 = 3
47 46 a1i M 2 + 1 = 3
48 47 oveq2d M M 2 + 1 = M 3
49 45 48 eqtr3d M M 2 M = M 3
50 49 oveq2d M 2 M 2 M = 2 M 3
51 42 50 eqtrd M 2 M 2 M = 2 M 3
52 41 51 oveq12d M 1 + M 4 M 2 M 2 M = M 5 + M - 2 M 3
53 27 29 52 3eqtrd M 1 - 2 M 2 + M 4 M = M 5 + M - 2 M 3
54 53 oveq2d M 8 1 - 2 M 2 + M 4 M = 8 M 5 + M - 2 M 3
55 8cn 8
56 55 a1i M 8
57 32 9 addcld M M 5 + M
58 3nn0 3 0
59 58 a1i M 3 0
60 9 59 expcld M M 3
61 5 60 mulcld M 2 M 3
62 56 57 61 subdid M 8 M 5 + M - 2 M 3 = 8 M 5 + M 8 2 M 3
63 56 5 60 mulassd M 8 2 M 3 = 8 2 M 3
64 63 eqcomd M 8 2 M 3 = 8 2 M 3
65 64 oveq2d M 8 M 5 + M 8 2 M 3 = 8 M 5 + M 8 2 M 3
66 54 62 65 3eqtrd M 8 1 - 2 M 2 + M 4 M = 8 M 5 + M 8 2 M 3
67 56 32 9 adddid M 8 M 5 + M = 8 M 5 + 8 M
68 8t2e16 8 2 = 16
69 68 a1i M 8 2 = 16
70 69 oveq1d M 8 2 M 3 = 16 M 3
71 67 70 oveq12d M 8 M 5 + M 8 2 M 3 = 8 M 5 + 8 M - 16 M 3
72 24 66 71 3eqtrd M 4 2 1 - 2 M 2 + M 4 M = 8 M 5 + 8 M - 16 M 3
73 56 32 mulcld M 8 M 5
74 56 9 mulcld M 8 M
75 1nn0 1 0
76 6nn0 6 0
77 75 76 deccl 16 0
78 77 nn0cni 16
79 78 a1i M 16
80 79 60 mulcld M 16 M 3
81 73 74 80 addsubd M 8 M 5 + 8 M - 16 M 3 = 8 M 5 - 16 M 3 + 8 M
82 21 72 81 3eqtrd M 4 1 - 2 M 2 + M 4 2 M = 8 M 5 - 16 M 3 + 8 M
83 16 17 5 9 mul4d M 3 1 M 2 2 M = 3 2 1 M 2 M
84 3t2e6 3 2 = 6
85 84 a1i M 3 2 = 6
86 4 6 9 subdird M 1 M 2 M = 1 M M 2 M
87 33 49 oveq12d M 1 M M 2 M = M M 3
88 86 87 eqtrd M 1 M 2 M = M M 3
89 85 88 oveq12d M 3 2 1 M 2 M = 6 M M 3
90 6cn 6
91 90 a1i M 6
92 91 9 60 subdid M 6 M M 3 = 6 M 6 M 3
93 83 89 92 3eqtrd M 3 1 M 2 2 M = 6 M 6 M 3
94 82 93 oveq12d M 4 1 - 2 M 2 + M 4 2 M 3 1 M 2 2 M = 8 M 5 16 M 3 + 8 M - 6 M 6 M 3
95 20 94 eqtrd M 4 1 - 2 M 2 + M 4 3 1 M 2 2 M = 8 M 5 16 M 3 + 8 M - 6 M 6 M 3
96 95 3ad2ant2 N M N 2 = 1 M 2 4 1 - 2 M 2 + M 4 3 1 M 2 2 M = 8 M 5 16 M 3 + 8 M - 6 M 6 M 3
97 1 96 eqtrd N M N 2 = 1 M 2 4 N 3 3 N 2 M N = 8 M 5 16 M 3 + 8 M - 6 M 6 M 3