e^(i*π*(13*17*19*23*29*31*37*41*43*47)^a*(1/2+1/3+1/5+1/7+1/11-b/(13*17*19*23*29*31*37*41*43*47)) ) (13*17*19*23*29*31*37*41*43*47)の指数aとbを変更することで2310以下の素数をたくさん求められる 0161132人目の素数さん2023/06/28(水) 00:13:16.64ID:27GX6rbZ (((11*13*17^2) mod 2)/2+((11*13*17^2) mod 3)/3+((11*13*17^2) mod 5)/5+((11*13*17^2) mod 7)/7) mod 1 = 89/210 (((19^3*13^2*17^2) mod 2)/2+((19^3*13^2*17^2) mod 3)/3+((19^3*13^2*17^2) mod 5)/5+((19^3*13^2*17^2) mod 7)/7+((19^3*13^2*17^2) mod 11)/11) mod 1 =2063/2310 (((19^3*13^2*17^2) mod 2)/2+((19^3*13^2*17^2) mod 3)/3+((19^3*13^2*17^2) mod 5)/5+((19^3*13^2*17^2) mod 7)/7+((19^3*13^2*17^2) mod 11)/11) mod 1 =1409/2310
e^(i*a*(1/b+1/c))=e^(i*a/b)*e^(i*a/c)=e^(i*(a mod b)/b)*e^(i*(a mod c)/c)
a*(1/b+1/c) ≠(a mod b)/b(a mod c)/c 0162132人目の素数さん2023/07/14(金) 12:02:09.00ID:1XN1Q0I4 p(n)がn番目の素数の時 e^(i*π*(1/p(1)+1/p(2))) -P(3)^2/(p(1)*p(2))<(1/p(1)+1/p(2)) <P(3)^2/(p(1)*p(2))を満たすとき(1/p(1)+1/p(2)) の分子は素数
そこで、「相異なる要素同士が互いに素である」という"関係"を 相異なる要素同士のなんらかの別の"関係"に置き換えることで、 自然数の集合Nの部分集合を(素数の集合の類似品として)作ることは可能か? 0170132人目の素数さん2023/09/07(木) 00:16:48.31ID:zJAgvXPW e^(i*2pi*(1/2+1/3+1/5+1/7-(floor((1/2+1/3+1/5+1/7)*11^3)+2/5)/11^3))=e^((23 i π)/139755) e^(i*2pi*(1/2+1/3+1/5+1/7-(floor((1/2+1/3+1/5+1/7)*11^3)+2/7)/11^3))=e^((47 i π)/139755) e^(i*2pi*(1/2+1/3+1/5+1/7-(floor((1/2+1/3+1/5+1/7)*11^3)+4/7)/11^3))=e^(-(13 i π)/139755)
e^(i*2pi*(1/2+((1/3+14130/(5*7*11*13*17))*3*5*7*11*13*17)/(3*5*7*11*13*17))) =e^(-(61 i π)/51051) e^(i*2pi*(1/2+((1/3+14131/(5*7*11*13*17))*3*5*7*11*13*17)/(3*5*7*11*13*17))) =e^(-(23 i π)/19635) e^(i*2pi*(1/2+((1/3+14132/(5*7*11*13*17))*3*5*7*11*13*17)/(3*5*7*11*13*17))) =e^(-(293 i π)/255255) e^(i*2pi*(1/2+((1/3+14133/(5*7*11*13*17))*3*5*7*11*13*17)/(3*5*7*11*13*17))) =e^(-(41 i π)/36465) e^(i*2pi*(1/2+((1/3+14134/(5*7*11*13*17))*3*5*7*11*13*17)/(3*5*7*11*13*17))) =e^(-(281 i π)/255255) e^(i*2pi*(1/2+((1/3+14135/(5*7*11*13*17))*3*5*7*11*13*17)/(3*5*7*11*13*17))) =e^(-(5 i π)/4641) e^(i*2pi*(1/2+((1/3+14136/(5*7*11*13*17))*3*5*7*11*13*17)/(3*5*7*11*13*17))) =e^(-(269 i π)/255255) e^(i*2pi*(1/2+((1/3+14137/(5*7*11*13*17))*3*5*7*11*13*17)/(3*5*7*11*13*17))) =e^(-(263 i π)/255255) e^(i*2pi*(1/2+((1/3+14138/(5*7*11*13*17))*3*5*7*11*13*17)/(3*5*7*11*13*17))) =e^(-(257 i π)/255255)
e^(i*2pi*(1/2+((1/3+14238/(5*7*11*13*17))*3*5*7*11*13*17)/(3*5*7*11*13*17))) =e^((49 i π)/36465) 14238が7を素因数にもつため分子が素数にならない e^(i*2pi*(1/2+((1/3+14239/(5*7*11*13*17))*3*5*7*11*13*17)/(3*5*7*11*13*17))) =e^((349 i π)/255255) e^(i*2pi*(1/2+((1/3+14240/(5*7*11*13*17))*3*5*7*11*13*17)/(3*5*7*11*13*17))) =e^((71 i π)/51051) 0178132人目の素数さん2023/09/16(土) 22:15:04.58ID:PJtUNqdO e^(i*2pi*(1/2+X1/(3*5))) cos(2pi*(1/2+((1/2+n/3)*(2*3))/(3*5)))>cos(2π*49/30)を満たすとき分子は素数 1/2 (15 m - 16)<n<5/2 (3 m - 1)
nが1/4 (105 m - 118)<n<1/4 (105 m - 29)をみたしかつ3または7の倍数でないとき分子が素数
e^(i*2pi*(1/2+(1/2+((1/2+n/3)*(2*3))/(3*5))*(2*3*5)/(3*5*7))) e^(i*2pi*(1/2+(1/2+((1/2-8/3)*(2*3))/(3*5))*(2*3*5)/(3*5*7)))=e^((83 i π)/105) e^(i*2pi*(1/2+(1/2+((1/2-10/3)*(2*3))/(3*5))*(2*3*5)/(3*5*7)))=e^((67 i π)/105) e^(i*2pi*(1/2+(1/2+((1/2-11/3)*(2*3))/(3*5))*(2*3*5)/(3*5*7)))=e^((59 i π)/105) e^(i*2pi*(1/2+(1/2+((1/2-13/3)*(2*3))/(3*5))*(2*3*5)/(3*5*7)))=e^((43 i π)/105) e^(i*2pi*(1/2+(1/2+((1/2-14/3)*(2*3))/(3*5))*(2*3*5)/(3*5*7)))=e^((35 i π)/105) ←非素数 e^(i*2pi*(1/2+(1/2+((1/2-16/3)*(2*3))/(3*5))*(2*3*5)/(3*5*7)))=e^((19 i π)/105) e^(i*2pi*(1/2+(1/2+((1/2-17/3)*(2*3))/(3*5))*(2*3*5)/(3*5*7)))=e^((11 i π)/105) e^(i*2pi*(1/2+(1/2+((1/2-19/3)*(2*3))/(3*5))*(2*3*5)/(3*5*7)))=e^((5 i π)/105) e^(i*2pi*(1/2+(1/2+((1/2-20/3)*(2*3))/(3*5))*(2*3*5)/(3*5*7)))=e^((-13 i π)/105) e^(i*2pi*(1/2+(1/2+((1/2-22/3)*(2*3))/(3*5))*(2*3*5)/(3*5*7)))=e^((-29 i π)/105) e^(i*2pi*(1/2+(1/2+((1/2-23/3)*(2*3))/(3*5))*(2*3*5)/(3*5*7)))=e^((-37 i π)/105) e^(i*2pi*(1/2+(1/2+((1/2-25/3)*(2*3))/(3*5))*(2*3*5)/(3*5*7)))=e^(-(53 i π)/105) e^(i*2pi*(1/2+(1/2+((1/2-26/3)*(2*3))/(3*5))*(2*3*5)/(3*5*7)))=e^(-(61 i π)/105) e^(i*2pi*(1/2+(1/2+((1/2-28/3)*(2*3))/(3*5))*(2*3*5)/(3*5*7)))=e^(-(77 i π)/105) ←非素数 0179132人目の素数さん2023/09/16(土) 23:51:32.96ID:PJtUNqdO e^(i*2pi*(1/2+(1/2+((1/2+(1/2+n/3)*(2*3)/(3*5))*(2*3*5))/(3*5*7))*(2*3*5*7)/(3*5*7*11))) 1/8 (1155 m - 809)<n<5/8 (231 m - 128)を満たしかつ3の倍数でないとき分子が素数(非素数が混じる
e^(i*2pi*(1/2+(1/2+((1/2+(1/2-82/3)*(2*3)/(3*5))*(2*3*5))/(3*5*7))*(2*3*5*7)/(3*5*7*11))) =e^((137 i π)/1155) e^(i*2pi*(1/2+(1/2+((1/2+(1/2-83/3)*(2*3)/(3*5))*(2*3*5))/(3*5*7))*(2*3*5*7)/(3*5*7*11))) =e^((121 i π)/1155) ←非素数 e^(i*2pi*(1/2+(1/2+((1/2+(1/2-85/3)*(2*3)/(3*5))*(2*3*5))/(3*5*7))*(2*3*5*7)/(3*5*7*11))) =e^((89 i π)/1155) e^(i*2pi*(1/2+(1/2+((1/2+(1/2-86/3)*(2*3)/(3*5))*(2*3*5))/(3*5*7))*(2*3*5*7)/(3*5*7*11))) =e^((73 i π)/1155) e^(i*2pi*(1/2+(1/2+((1/2+(1/2-88/3)*(2*3)/(3*5))*(2*3*5))/(3*5*7))*(2*3*5*7)/(3*5*7*11))) =e^((41 i π)/1155) e^(i*2pi*(1/2+(1/2+((1/2+(1/2-89/3)*(2*3)/(3*5))*(2*3*5))/(3*5*7))*(2*3*5*7)/(3*5*7*11))) =e^((25 i π)/1155) ←非素数 e^(i*2pi*(1/2+(1/2+((1/2+(1/2-91/3)*(2*3)/(3*5))*(2*3*5))/(3*5*7))*(2*3*5*7)/(3*5*7*11))) =e^((-7 i π)/1155) e^(i*2pi*(1/2+(1/2+((1/2+(1/2-92/3)*(2*3)/(3*5))*(2*3*5))/(3*5*7))*(2*3*5*7)/(3*5*7*11))) =e^((-23 i π)/1155) e^(i*2pi*(1/2+(1/2+((1/2+(1/2-94/3)*(2*3)/(3*5))*(2*3*5))/(3*5*7))*(2*3*5*7)/(3*5*7*11))) =e^((-55 i π)/1155) e^(i*2pi*(1/2+(1/2+((1/2+(1/2-95/3)*(2*3)/(3*5))*(2*3*5))/(3*5*7))*(2*3*5*7)/(3*5*7*11))) =e^((-71 i π)/1155) e^(i*2pi*(1/2+(1/2+((1/2+(1/2-97/3)*(2*3)/(3*5))*(2*3*5))/(3*5*7))*(2*3*5*7)/(3*5*7*11))) =e^((-103 i π)/1155) e^(i*2pi*(1/2+(1/2+((1/2+(1/2-98/3)*(2*3)/(3*5))*(2*3*5))/(3*5*7))*(2*3*5*7)/(3*5*7*11))) =e^((-119 i π)/1155) ←非素数 e^(i*2pi*(1/2+(1/2+((1/2+(1/2-100/3)*(2*3)/(3*5))*(2*3*5))/(3*5*7))*(2*3*5*7)/(3*5*7*11)))=e^((-151 i π)/1155) e^(i*2pi*(1/2+(1/2+((1/2+(1/2-101/3)*(2*3)/(3*5))*(2*3*5))/(3*5*7))*(2*3*5*7)/(3*5*7*11)))=e^((-167 i π)/1155) 0180132人目の素数さん2023/09/17(日) 00:19:58.42ID:NvL18fxN e^(2 i π (2/13(2/11 (2/7 (2/5 (n/3 + 1/2) + 1/2) + 1/2) + 1/2)+1/2))
e^(2 i π (2/13(2/11 (2/7 (2/5 (-551/3 + 1/2) + 1/2) + 1/2) + 1/2)+1/2))=e^((281 i π)/15015) e^(2 i π (2/13(2/11 (2/7 (2/5 (-553/3 + 1/2) + 1/2) + 1/2) + 1/2)+1/2))=e^((217 i π)/15015) ←非素数 e^(2 i π (2/13(2/11 (2/7 (2/5 (-554/3 + 1/2) + 1/2) + 1/2) + 1/2)+1/2))=e^((185 i π)/15015) ←非素数 e^(2 i π (2/13(2/11 (2/7 (2/5 (-556/3 + 1/2) + 1/2) + 1/2) + 1/2)+1/2))=e^((121 i π)/15015) ←非素数 e^(2 i π (2/13(2/11 (2/7 (2/5 (-557/3 + 1/2) + 1/2) + 1/2) + 1/2)+1/2))=e^((89 i π)/15015) e^(2 i π (2/13(2/11 (2/7 (2/5 (-559/3 + 1/2) + 1/2) + 1/2) + 1/2)+1/2))=e^((25 i π)/15015) ←非素数 e^(2 i π (2/13(2/11 (2/7 (2/5 (-560/3 + 1/2) + 1/2) + 1/2) + 1/2)+1/2))=e^((-7 i π)/15015) e^(2 i π (2/13(2/11 (2/7 (2/5 (-562/3 + 1/2) + 1/2) + 1/2) + 1/2)+1/2))=e^((-71 i π)/15015) e^(2 i π (2/13(2/11 (2/7 (2/5 (-563/3 + 1/2) + 1/2) + 1/2) + 1/2)+1/2))=e^((-103 i π)/15015) e^(2 i π (2/13(2/11 (2/7 (2/5 (-565/3 + 1/2) + 1/2) + 1/2) + 1/2)+1/2))=e^((-167 i π)/15015) e^(2 i π (2/13(2/11 (2/7 (2/5 (-566/3 + 1/2) + 1/2) + 1/2) + 1/2)+1/2))=e^((-199 i π)/15015) e^(2 i π (2/13(2/11 (2/7 (2/5 (-568/3 + 1/2) + 1/2) + 1/2) + 1/2)+1/2))=e^((-263 i π)/15015) 0181132人目の素数さん2023/09/17(日) 00:45:26.83ID:NvL18fxN e^(2 i π (2/17(2/13(2/11 (2/7 (2/5 (n/3 + 1/2) + 1/2) + 1/2) + 1/2)+1/2)+1/2)) cos(2 π (2/17(2/13(2/11 (2/7 (2/5 (n/3 + 1/2) + 1/2) + 1/2) + 1/2)+1/2)+1/2)) >cos(2π*19^2/(210*11*13*17)) 1/32 (255255 m - 145721)<n<5/32 (51051 m - 29072)
e^(2 i π (2/17(2/13(2/11 (2/7 (2/5 (3433/3 + 1/2) + 1/2) + 1/2) + 1/2)+1/2)+1/2))=e^((283 i π)/255255) e^(2 i π (2/17(2/13(2/11 (2/7 (2/5 (-4546/3 + 1/2) + 1/2) + 1/2) + 1/2)+1/2)+1/2))=e^((137 i π)/255255) e^(2 i π (2/17(2/13(2/11 (2/7 (2/5 (3430/3 + 1/2) + 1/2) + 1/2) + 1/2)+1/2)+1/2))=e^((91 i π)/255255) e^(2 i π (2/17(2/13(2/11 (2/7 (2/5 (-4547/3 + 1/2) + 1/2) + 1/2) + 1/2)+1/2)+1/2))=e^((73 i π)/255255) e^(2 i π (2/17(2/13(2/11 (2/7 (2/5 (3428/3 + 1/2) + 1/2) + 1/2) + 1/2)+1/2)+1/2))=e^((-37 i π)/255255) e^(2 i π (2/17(2/13(2/11 (2/7 (2/5 (3427/3 + 1/2) + 1/2) + 1/2) + 1/2)+1/2)+1/2))=e^((-101 i π)/255255) e^(2 i π (2/17(2/13(2/11 (2/7 (2/5 (3425/3 + 1/2) + 1/2) + 1/2) + 1/2)+1/2)+1/2))=e^((-229 i π)/255255) 0182132人目の素数さん2023/09/17(日) 00:49:51.30ID:NvL18fxN 連続する素数の差分は2^nと2^(n-1)が交互に来る 73 +2^4=89 89+2^3=97 97+2^4=113 0183132人目の素数さん2023/09/25(月) 18:20:08.09ID:nXDkmK9h ~~~-y( -)^^) ブチュッ 0184132人目の素数さん2023/10/13(金) 01:05:43.32ID:mFgz5jJo e^(i*2pi*(1-((1-n/(2*3))*2*3 mod 6)/(2*3*5)))
e^(i*2pi*(1-(1-((1-n/(2*3))*2*3 mod 6)/(2*3*5))mod30/(2*3*5*7)))
e^(i*2pi*(1-(1-((1-5/(2*3))*2*3 mod 6)/(2*3*5))mod30/(2*3*5*7))) =e^((i π)*7/105) e^(i*2pi*(1-(1-((1-7/(2*3))*2*3 mod 6)/(2*3*5))mod30/(2*3*5*7))) =e^((i π)*5/105) e^(i*2pi*(1-(1-((1-11/(2*3))*2*3 mod 6)/(2*3*5))mod30/(2*3*5*7))) =e^((i π)*7/105) e^(i*2pi*(1-(1-((1-13/(2*3))*2*3 mod 6)/(2*3*5))mod30/(2*3*5*7))) =e^((i π)*5/105) e^(i*2pi*(1-(1-((1-17/(2*3))*2*3 mod 6)/(2*3*5))mod30/(2*3*5*7)))=e^((i π)*7/105) e^(i*2pi*(1-(1-((1-19/(2*3))*2*3 mod 6)/(2*3*5))mod30/(2*3*5*7)))=e^((i π)*5/105) e^(i*2pi*(1-(1-((1-23/(2*3))*2*3 mod 6)/(2*3*5))mod30/(2*3*5*7)))=e^((i π)*7/105) e^(i*2pi*(1-(1-((1-25/(2*3))*2*3 mod 6)/(2*3*5))mod30/(2*3*5*7)))=e^((i π)*5/105) e^(i*2pi*(1-(1-((1-29/(2*3))*2*3 mod 6)/(2*3*5))mod30/(2*3*5*7)))=e^((i π)*7/105) 0185132人目の素数さん2023/10/22(日) 11:17:08.67ID:1rLOY4nu cos(2pi*(1-(1-(1-n/(2*3))*2*3)/(2*3)^5)) > cos(2pi*(25/(2*3)^5)) n = 7776 m, m element Z n = 27 (288 m + 1), m element Z n = 24 (324 m + 1), m element Z n = 18 (432 m + 1), m element Z n = 18 (432 m + 431), m element Z
e^(i*2pi*(1-(1-(1-27/(2*3))*2*3)/(2*3)^5))=e^(-(11 i π)/1944) e^(i*2pi*(1-(1-(1-24/(2*3))*2*3)/(2*3)^5))=e^(-(19 i π)/3888) e^(i*2pi*(1-(1-(1-18/(2*3))*2*3)/(2*3)^5)) =e^(-(13 i π)/3888) e^(i*2pi*(1-(1-(1-18*431/(2*3))*2*3)/(2*3)^5)) =e^((23 i π)/3888) 0186132人目の素数さん2023/10/22(日) 11:32:49.01ID:1rLOY4nu cos(2pi*(1-((n+1/(2*3))*2*3)/(2*3)^3)) > cos(2pi*(25/(2*3)^3))
n = 36 m, m element Z n = 4 (9 m + 8), m element Z n = 3 (12 m + 1), m element Z n = 3 (12 m + 11), m element Z n = 2 (18 m + 1), m element Z
e^(i*2pi*(1-((32+1/(2*3))*2*3)/(2*3)^3)) =e^((23 i π)/108) e^(i*2pi*(1-((3+1/(2*3))*2*3)/(2*3)^3)) =e^(-(19 i π)/108) e^(i*2pi*(1-((33+1/(2*3))*2*3)/(2*3)^3)) =e^((17 i π)/108) e^(i*2pi*(1-((2+1/(2*3))*2*3)/(2*3)^3)) =e^(-(13 i π)/108) 0187132人目の素数さん2023/10/22(日) 11:32:50.55ID:1rLOY4nu cos(2pi*(1-((n+1/(2*3))*2*3)/(2*3)^3)) > cos(2pi*(25/(2*3)^3))
n = 36 m, m element Z n = 4 (9 m + 8), m element Z n = 3 (12 m + 1), m element Z n = 3 (12 m + 11), m element Z n = 2 (18 m + 1), m element Z
e^(i*2pi*(1-((32+1/(2*3))*2*3)/(2*3)^3)) =e^((23 i π)/108) e^(i*2pi*(1-((3+1/(2*3))*2*3)/(2*3)^3)) =e^(-(19 i π)/108) e^(i*2pi*(1-((33+1/(2*3))*2*3)/(2*3)^3)) =e^((17 i π)/108) e^(i*2pi*(1-((2+1/(2*3))*2*3)/(2*3)^3)) =e^(-(13 i π)/108) 0188132人目の素数さん2023/10/22(日) 11:35:52.73ID:1rLOY4nu cos(2pi*(1-((n+1/(2*3*5))*2*3*5)/(2*3*5)^3)) > cos(2pi*(49/(2*3*5)^3))
n = 900 m, m element Z n = 900 m + 1, m element Z n = 900 m + 899, m element Z
e^(i*2pi*(1-((1+1/(2*3*5))*2*3*5)/(2*3*5)^3)) =e^(-(31 i π)/13500) e^(i*2pi*(1-((899+1/(2*3*5))*2*3*5)/(2*3*5)^3)) =e^((29 i π)/13500) 0189132人目の素数さん2023/10/22(日) 11:39:45.17ID:1rLOY4nu cos(2pi*(1-((n/7+1/(2*3*5))*2*3*5*7)/(2*3*5*7)^6)) > cos(2pi*(121/(2*3*5*7)^6))
n = 2858870700000 m, m element Z n = 4 (714717675000 m + 714717674999), m element Z n = 3 (952956900000 m + 1), m element Z n = 3 (952956900000 m + 1), m element Z n = 2 (1429435350000 m + 1), m element Z
e^(i*2pi*(1-((4*714717674999/7+1/(2*3*5))*2*3*5*7)/(2*3*5*7)^6))=e^((113 i π)/42883060500000) 0190132人目の素数さん2023/10/22(日) 11:45:27.21ID:1rLOY4nu e^(i*2pi*(1-((3/7+1/(2*3*5))*2*3*5*7)/(2*3*5*7)^6))=e^(-(97 i π)/42883060500000) e^(i*2pi*(1-((2/7+1/(2*3*5))*2*3*5*7)/(2*3*5*7)^6))=e^(-(67 i π)/42883060500000)
n = 2170570215498300000 m, m element Z n = 2 (1085285107749150000 m + 1085285107749149999), m element Z n = 2170570215498300000 m + 1, m element Z n = 2170570215498300000 m + 2170570215498299999, m element Z
e^(i*2pi*(1-((2*1085285107749149999/(11*3)+1/(2*5*7))*2*3*5*7*11)/(2*3*5*7*11)^6))=e^((107 i π)/75969957542440500000) e^(i*2pi*(1-((1/(11*3)+1/(2*5*7))*2*3*5*7*11)/(2*3*5*7*11)^6))=e^(-(103 i π)/75969957542440500000) e^(i*2pi*(1-((2170570215498299999/(11*3)+1/(2*5*7))*2*3*5*7*11)/(2*3*5*7*11)^6))=e^((37 i π)/75969957542440500000) 0191132人目の素数さん2023/10/22(日) 11:53:39.86ID:1rLOY4nu cos(2pi*(1-((n/(13*11)+1/(2*5*7*3))*2*3*5*7*11*13)/(2*3*5*7*11*13)^7)) > cos(2pi*(289/(2*3*5*7*11*13)^7))
n = 104874047791504330586247000000 m, m element Z n = 2 (52437023895752165293123500000 m + 52437023895752165293123499999), m element Z n = 104874047791504330586247000000 m + 104874047791504330586246999999, m element Z
e^(i*2pi*(1-((52437023895752165293123499999/(13*11)+1/(2*5*7*3))*2*3*5*7*11*13)/(2*3*5*7*11*13)^7)) =e^((277 i π)/11011775018107954711555935000000) e^(i*2pi*(1-((104874047791504330586246999999/(13*11)+1/(2*5*7*3))*2*3*5*7*11*13)/(2*3*5*7*11*13)^7)) =e^((67 i π)/11011775018107954711555935000000) 0192132人目の素数さん2023/10/22(日) 11:58:27.77ID:1rLOY4nu cos(2pi*(1-((n/(13*11)^2+1/(2*5*7*3))*2*3*5*7*11^2*13^2)/(2*3*5*7*11*13)^7)) > cos(2pi*(289/(2*3*5*7*11*13)^7))
n = 98 (1070143344811268679451500000 m + 1070143344811268679451499999), m element Z n = 104874047791504330586247000000 m + 104874047791504330586246999903, m element Z
e^(i*2pi*(1-((98*1070143344811268679451499999/(13*11)^2+1/(2*5*7*3))*2*3*5*7*11^2*13^2)/(2*3*5*7*11*13)^7)) =e^((131 i π)/11011775018107954711555935000000) e^(i*2pi*(1-((104874047791504330586246999903/(13*11)^2+1/(2*5*7*3))*2*3*5*7*11^2*13^2)/(2*3*5*7*11*13)^7)) =e^(-(79 i π)/11011775018107954711555935000000) 0193132人目の素数さん2023/10/22(日) 14:24:28.92ID:1rLOY4nu cos(2pi*(1-((n/(13*11*17*19)^11+1/(2*5*7*3))*2*3*5*7*(11*13*17*19)^11)/(2*3*5*7*11*13*17*19)^7)) > cos(2pi*(23^2/(2*3*5*7*11*13*17*19)^7))
n = 399 (96407937365467087673718025140163334691000000 m + 28140716575350032665769627724873739650774217), m element Z n = 8 (4808345876102670997726686503865646317713625000 m + 1403518239195582879205260182778077765082364073), m element Z n = 5 (7693353401764273596362698406185034108341800000 m + 2245629182712932606728416292444924424131782517), m element Z n = 2 (19233383504410683990906746015462585270854500000 m + 5614072956782331516821040731112311060329456291), m element Z n = 38466767008821367981813492030925170541709000000 m + 11228145913564663033642081462224622120658912581, m element Z
e^(i*2pi*(1-((8*1403518239195582879205260182778077765082364073/(13*11*17*19)^11+1/(2*5*7*3))*2*3*5*7*(11*13*17*19)^11)/(2*3*5*7*11*13*17*19)^7)) =e^(-(229 i π)/4039010535926243638090416663247142906879445000000) e^(i*2pi*(1-((5*2245629182712932606728416292444924424131782517/(13*11*17*19)^11+1/(2*5*7*3))*2*3*5*7*(11*13*17*19)^11)/(2*3*5*7*11*13*17*19)^7)) =e^(-(439 i π)/4039010535926243638090416663247142906879445000000) e^(i*2pi*(1-((2*5614072956782331516821040731112311060329456291/(13*11*17*19)^11+1/(2*5*7*3))*2*3*5*7*(11*13*17*19)^11)/(2*3*5*7*11*13*17*19)^7)) =e^((191 i π)/4039010535926243638090416663247142906879445000000) e^(i*2pi*(1-((11228145913564663033642081462224622120658912581/(13*11*17*19)^11+1/(2*5*7*3))*2*3*5*7*(11*13*17*19)^11)/(2*3*5*7*11*13*17*19)^7)) =e^((401 i π)/4039010535926243638090416663247142906879445000000) 0194132人目の素数さん2023/10/22(日) 14:35:28.61ID:1rLOY4nu cos(2pi*(1-((n/(13*11*17*19*23)^11+1/(2*5*7*3))*2*3*5*7*(11*13*17*19*23)^11)/(2*3*5*7*11*13*17*19*23)^7)) > cos(2pi*(29^2/(2*3*5*7*11*13*17*19*23)^7))
n = 864 (151588688860480401830821308882900152330122196839031250 m + 57736288309081718076562795675036302431140590123061457), m element Z n = 350 (374207506215585906233798888213787804609215937339780000 m + 142526151711561726909000729894946758001444199618071711), m element Z n = 69 (1898154017035580683794632041664141037872834464767000000 m + 722958740565892817654351528452628482616021302410508679), m element Z n = 15 (8731508478363671145455307391655048774215038537928200000 m + 3325610206603106961210017030882091020033697991088339923), m element Z n = 4 (32743156793863766795457402718706432903306394517230750000 m + 12471038274761651104537563865807841325126367466581274711), m element Z
e^(i*2pi*(1-((864*57736288309081718076562795675036302431140590123061457/(13*11*17*19*23)^11+1/(2*5*7*3))*2*3*5*7*(11*13*17*19*23)^11)/(2*3*5*7*11*13*17*19*23)^7)) =e^(-(83 i π)/13752125853422782054092109141856701819388685697236915000000) e^(i*2pi*(1-((350*142526151711561726909000729894946758001444199618071711/(13*11*17*19*23)^11+1/(2*5*7*3))*2*3*5*7*(11*13*17*19*23)^11)/(2*3*5*7*11*13*17*19*23)^7)) =e^(-(503 i π)/13752125853422782054092109141856701819388685697236915000000) e^(i*2pi*(1-((69*722958740565892817654351528452628482616021302410508679/(13*11*17*19*23)^11+1/(2*5*7*3))*2*3*5*7*(11*13*17*19*23)^11)/(2*3*5*7*11*13*17*19*23)^7)) =e^(-(31 i π)/597918515366207915395309093124204426929942856401605000000) e^(i*2pi*(1-((15*3325610206603106961210017030882091020033697991088339923/(13*11*17*19*23)^11+1/(2*5*7*3))*2*3*5*7*(11*13*17*19*23)^11)/(2*3*5*7*11*13*17*19*23)^7)) =e^((547 i π)/13752125853422782054092109141856701819388685697236915000000) 0195132人目の素数さん2023/10/22(日) 14:35:44.04ID:1rLOY4nu e^(i*2pi*(1-((4*12471038274761651104537563865807841325126367466581274711/(13*11*17*19*23)^11+1/(2*5*7*3))*2*3*5*7*(11*13*17*19*23)^11)/(2*3*5*7*11*13*17*19*23)^7)) =e^((757 i π)/13752125853422782054092109141856701819388685697236915000000) P(k)がk番目の素数の時 cos(2pi*(1-((n/(11からP(k)の積)^11+1/(2*5*7*3))*2*3*5*7*(11からP(k)の積)^11)/(2からP(k)の積)^7)) > cos(2pi*(P(k+1)^2/(2からP(k)の積)^7)) をみたす整数nがあるとき e^(i*2pi*(1-((n/(11からP(k)の積)^11+1/(2*5*7*3))*2*3*5*7*(11からP(k)の積)^11)/(2からP(k)の積)^7)) の指数の分子はP(k+1)^2未満の素数 0196132人目の素数さん2023/10/29(日) 11:38:33.16ID:MYhVftt0 私からの挑戦状 君は、無事、素数の謎が解けるか
e^(i*2pi*(1-(((2*44100+1)/2^3-1/(3*5*7))*210*2^2)/(2*3*5*7)^3))=e^(-(97 i π)/4630500) e^(i*2pi*(1-(((2*44100+1)/2^4-1/(3*5*7))*105*2^4)/(2*3*5*7)^3))=e^(-(89 i π)/4630500) e^(i*2pi*(1-(((2*44100+1)/2^5-1/(3*5*7))*105*2^5)/(2*3*5*7)^3))=e^(-(73 i π)/4630500) e^(i*2pi*(1-(((2*44100+1)/2^6-1/(3*5*7))*105*2^6)/(2*3*5*7)^3))=e^(-(41 i π)/4630500) e^(i*2pi*(1-(((2*44100+1)/2^7-1/(3*5*7))*105*2^7)/(2*3*5*7)^3))=e^((23 i π)/4630500)