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本帖最后由 愚工688 于 2023-2-18 10:47 编辑
我用下界计算式计算的偶数素数对下界值,相对误差都是比较小的:
重新把连续偶数的全部下界计算值的相对误差计算出来,以便大家观察一下素对下界计算值的相对误差是多么的稳定,
而区域下界值,infS(m)则是线性向上的(最大素数不变的区域内)
G(512942430) = 4123665;inf( 512942430 )≈ 4117250.7 , Δ≈-0.00156,infS(m) = 934480.35 , k(m)=
G(512942432) = 936995 ;inf( 512942432 )≈ 934480.4 , Δ≈-0.00268,infS(m) = 934480.35 , k(m)=
G(512942434) = 936375 ;inf( 512942434 )≈ 934480.4 , Δ≈-0.00202,infS(m) = 934480.36 , k(m)=
G(512942436) = 1873378;inf( 512942436 )≈ 1868960.7 , Δ≈-0.00236,infS(m) = 934480.36 , k(m)=
G(512942438) = 945310 ;inf( 512942438 )≈ 943919.6 , Δ≈-0.00147,infS(m) = 934480.37 , k(m)=
G(512942440) = 1249865;inf( 512942440 )≈ 1246322 , Δ≈-0.00283,infS(m) = 934480.37 , k(m)=
G(512942442) = 1924038;inf( 512942442 )≈ 1919644.2 , Δ≈-0.00228,infS(m) = 934480.37 , k(m)=
G(512942444) = 1123885;inf( 512942444 )≈ 1121376.5 , Δ≈-0.00223,infS(m) = 934480.38 , k(m)= 1.2
G(512942446) = 946224 ;inf( 512942446 )≈ 943213.8 , Δ≈-0.00318,infS(m) = 934480.38 , k(m)=
G(512942448) = 1873265;inf( 512942448 )≈ 1868960.8 , Δ≈-0.00230,infS(m) = 934480.38 , k(m)= 2
G(512942450) = 1248651;inf( 512942450 )≈ 1245973.9 , Δ≈-0.00214,infS(m) = 934480.39 , k(m)=
G(512942452) = 1040717;inf( 512942452 )≈ 1038311.6 , Δ≈-0.00231,infS(m) = 934480.39 , k(m)=
G(512942454) = 1872511;inf( 512942454 )≈ 1869669.2 , Δ≈-0.00175,infS(m) = 934480.40 , k(m)=
G(512942456) = 1021700;inf( 512942456 )≈ 1019433.2 , Δ≈-0.00222,infS(m) = 934480.40 , k(m)=
G(512942458) = 1182955;inf( 512942458 )≈ 1179194.1 , Δ≈-0.00318,infS(m) = 934480.40 , k(m)=
G(512942460) = 2541272;inf( 512942460 )≈ 2535666.1 , Δ≈-0.00221,infS(m) = 934480.41 , k(m)=
G(512942462) = 1000463;inf( 512942462 )≈ 998410.5 , Δ≈-0.00205,infS(m) = 934480.41 , k(m)=
G(512942464) = 935816 ;inf( 512942464 )≈ 934480.4 , Δ≈-0.00143,infS(m) = 934480.41 , k(m)= 1
G(512942466) = 1873688;inf( 512942466 )≈ 1868960.8 , Δ≈-0.00252,infS(m) = 934480.42 , k(m)= 2
G(512942468) = 992383 ;inf( 512942468 )≈ 990212.3 , Δ≈-0.00219,infS(m) = 934480.42 , k(m)=
G(512942470) = 1292323;inf( 512942470 )≈ 1290314.9 , Δ≈-0.00155,infS(m) = 934480.42 , k(m)=
G(512942472) = 2337741;inf( 512942472 )≈ 2332754.2 , Δ≈-0.00213,infS(m) = 934480.43 , k(m)=
G(512942474) = 1040295;inf( 512942474 )≈ 1038311.6 , Δ≈-0.00191,infS(m) = 934480.43 , k(m)=
G(512942476) = 936907 ;inf( 512942476 )≈ 934480.4 , Δ≈-0.00259,infS(m) = 934480.44 , k(m)= 1
G(512942478) = 1871987;inf( 512942478 )≈ 1868960.9 , Δ≈-0.00162,infS(m) = 934480.44 , k(m)= 2
G(512942480) = 1272682;inf( 512942480 )≈ 1270404.8 , Δ≈-0.00179,infS(m) = 934480.44 , k(m)=
G(512942482) = 1046622;inf( 512942482 )≈ 1043949.5 , Δ≈-0.00255,infS(m) = 934480.45 , k(m)=
G(512942484) = 1874023;inf( 512942484 )≈ 1868960.9 , Δ≈-0.00270,infS(m) = 934480.45 , k(m)= 2
G(512942486) = 1140966;inf( 512942486 )≈ 1138628.5 , Δ≈-0.00205,infS(m) = 934480.45 , k(m)=
G(512942488) = 970900 ;inf( 512942488 )≈ 969090.8 , Δ≈-0.00186,infS(m) = 934480.46 , k(m)=
G(512942490) = 2589452;inf( 512942490 )≈ 2584090 , Δ≈-0.00207,infS(m) = 934480.46 , k(m)=
G(512942492) = 969182 ;inf( 512942492 )≈ 966703.9 , Δ≈-0.00256,infS(m) = 934480.46 , k(m)=
G(512942494) = 937120 ;inf( 512942494 )≈ 934480.5 , Δ≈-0.00282,infS(m) = 934480.47 , k(m)= 1
G(512942496) = 2220483;inf( 512942496 )≈ 2215064.8, Δ≈-0.00244,infS(m) = 934480.47 , k(m)=
G(512942498) = 937575 ;inf( 512942498 )≈ 935279.9 , Δ≈-0.00245,infS(m) = 934480.48 , k(m)=
G(512942500) = 1499286;inf( 512942500 )≈ 1495168.8, Δ≈-0.00275,infS(m) = 934480.48 , k(m)= 1.6
G(512942502) = 1873102;inf( 512942502 )≈ 1868961 , Δ≈-0.00221,infS(m) = 934480.48 , k(m)= 2
G(512942504) = 987663 ;inf( 512942504 )≈ 984971.8 , Δ≈-0.00272,infS(m) = 934480.49 , k(m)=
G(512942506) = 995430 ;inf( 512942506 )≈ 993047.9 , Δ≈-0.00239,infS(m) = 934480.49 , k(m)=
G(512942508) = 2042841;inf( 512942508 )≈ 2038866.5, Δ≈-0.00195,infS(m) = 934480.49 , k(m)=
G(512942510) = 1254049;inf( 512942510 )≈ 1251367.8, Δ≈-0.00214,infS(m) = 934480.50 , k(m)=
G(512942512) = 936506 ;inf( 512942512 )≈ 934480.5 , Δ≈-0.00216,infS(m) = 934480.50 , k(m)= 1
G(512942514) = 2246531;inf( 512942514 )≈ 2242753.2 , Δ≈-0.00168,infS(m) = 934480.50 , k(m)= 2.4
G(512942516) = 935956 ;inf( 512942516 )≈ 934661.3 , Δ≈-0.00138,infS(m) = 934480.51 , k(m)=
G(512942518) = 1039969;inf( 512942518 )≈ 1038311.7, Δ≈-0.00159,infS(m) = 934480.51 , k(m)=
G(512942520) = 2497917;inf( 512942520 )≈ 2491948.1, Δ≈-0.00239,infS(m) = 934480.52 , k(m)=
G(512942522) = 945553 ;inf( 512942522 )≈ 944587.6 , Δ≈-0.00102,infS(m) = 934480.52 , k(m)=
G(512942524) = 936428 ;inf( 512942524 )≈ 934480.5 , Δ≈-0.00208,infS(m) = 934480.52 , k(m)= 1
G(512942526) = 1896181;inf( 512942526 )≈ 1890969 , Δ≈-0.00275,infS(m) = 934480.53 , k(m)=
G(512942528) = 1151134;inf( 512942528 )≈ 1148727.3, Δ≈-0.00209,infS(m) = 934480.53 , k(m)=
G(512942530) = 1350407;inf( 512942530 )≈ 1347757.8, Δ≈-0.00196,infS(m) = 934480.53 , k(m)=
time start =13:52:55 ,time end =13:54:32 ,time use =
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