Properties

Label 138.5.b.a.91.5
Level $138$
Weight $5$
Character 138.91
Analytic conductor $14.265$
Analytic rank $0$
Dimension $16$
CM no
Inner twists $2$

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Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms
 
[N,k,chi] = [138,5,Mod(91,138)]
 
mf = mfinit([N,k,chi],0)
 
lf = mfeigenbasis(mf)
 
from sage.modular.dirichlet import DirichletCharacter
 
H = DirichletGroup(138, base_ring=CyclotomicField(2))
 
chi = DirichletCharacter(H, H._module([0, 1]))
 
N = Newforms(chi, 5, names="a")
 
//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code
 
chi := DirichletCharacter("138.91");
 
S:= CuspForms(chi, 5);
 
N := Newforms(S);
 
Level: \( N \) \(=\) \( 138 = 2 \cdot 3 \cdot 23 \)
Weight: \( k \) \(=\) \( 5 \)
Character orbit: \([\chi]\) \(=\) 138.b (of order \(2\), degree \(1\), minimal)

Newform invariants

comment: select newform
 
sage: f = N[0] # Warning: the index may be different
 
gp: f = lf[1] \\ Warning: the index may be different
 
Self dual: no
Analytic conductor: \(14.2650549056\)
Analytic rank: \(0\)
Dimension: \(16\)
Coefficient field: \(\mathbb{Q}[x]/(x^{16} + \cdots)\)
comment: defining polynomial
 
gp: f.mod \\ as an extension of the character field
 
Defining polynomial: \( x^{16} + 1428 x^{14} - 600 x^{13} + 788282 x^{12} - 529464 x^{11} + 213396724 x^{10} + \cdots + 274129967370817 \) Copy content Toggle raw display
Coefficient ring: \(\Z[a_1, \ldots, a_{23}]\)
Coefficient ring index: \( 2^{22}\cdot 3^{4}\cdot 7^{2} \)
Twist minimal: yes
Sato-Tate group: $\mathrm{SU}(2)[C_{2}]$

Embedding invariants

Embedding label 91.5
Root \(-0.707107 + 22.2857i\) of defining polynomial
Character \(\chi\) \(=\) 138.91
Dual form 138.5.b.a.91.8

$q$-expansion

comment: q-expansion
 
sage: f.q_expansion() # note that sage often uses an isomorphic number field
 
gp: mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q-2.82843 q^{2} +5.19615 q^{3} +8.00000 q^{4} -34.5847i q^{5} -14.6969 q^{6} -81.5113i q^{7} -22.6274 q^{8} +27.0000 q^{9} +O(q^{10})\) \(q-2.82843 q^{2} +5.19615 q^{3} +8.00000 q^{4} -34.5847i q^{5} -14.6969 q^{6} -81.5113i q^{7} -22.6274 q^{8} +27.0000 q^{9} +97.8202i q^{10} +67.6260i q^{11} +41.5692 q^{12} -316.869 q^{13} +230.549i q^{14} -179.707i q^{15} +64.0000 q^{16} +44.6757i q^{17} -76.3675 q^{18} +468.905i q^{19} -276.677i q^{20} -423.545i q^{21} -191.275i q^{22} +(491.402 - 195.869i) q^{23} -117.576 q^{24} -571.099 q^{25} +896.240 q^{26} +140.296 q^{27} -652.091i q^{28} -228.778 q^{29} +508.289i q^{30} -1674.25 q^{31} -181.019 q^{32} +351.395i q^{33} -126.362i q^{34} -2819.04 q^{35} +216.000 q^{36} -736.035i q^{37} -1326.26i q^{38} -1646.50 q^{39} +782.562i q^{40} -299.061 q^{41} +1197.97i q^{42} -2677.63i q^{43} +541.008i q^{44} -933.786i q^{45} +(-1389.90 + 554.002i) q^{46} +3461.96 q^{47} +332.554 q^{48} -4243.10 q^{49} +1615.31 q^{50} +232.142i q^{51} -2534.95 q^{52} +142.983i q^{53} -396.817 q^{54} +2338.82 q^{55} +1844.39i q^{56} +2436.50i q^{57} +647.081 q^{58} -1697.68 q^{59} -1437.66i q^{60} -6286.88i q^{61} +4735.50 q^{62} -2200.81i q^{63} +512.000 q^{64} +10958.8i q^{65} -993.896i q^{66} +2566.64i q^{67} +357.406i q^{68} +(2553.40 - 1017.77i) q^{69} +7973.46 q^{70} +5395.67 q^{71} -610.940 q^{72} +1108.66 q^{73} +2081.82i q^{74} -2967.52 q^{75} +3751.24i q^{76} +5512.29 q^{77} +4657.00 q^{78} -4639.58i q^{79} -2213.42i q^{80} +729.000 q^{81} +845.873 q^{82} -12844.1i q^{83} -3388.36i q^{84} +1545.09 q^{85} +7573.49i q^{86} -1188.76 q^{87} -1530.20i q^{88} +3849.23i q^{89} +2641.15i q^{90} +25828.4i q^{91} +(3931.22 - 1566.95i) q^{92} -8699.67 q^{93} -9791.91 q^{94} +16216.9 q^{95} -940.604 q^{96} -940.980i q^{97} +12001.3 q^{98} +1825.90i q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 16 q + 128 q^{4} + 432 q^{9}+O(q^{10}) \) Copy content Toggle raw display \( 16 q + 128 q^{4} + 432 q^{9} - 208 q^{13} + 1024 q^{16} + 840 q^{23} + 1056 q^{25} + 1920 q^{26} + 3600 q^{29} + 224 q^{31} - 3264 q^{35} + 3456 q^{36} - 2016 q^{39} - 6144 q^{41} + 1280 q^{46} + 8880 q^{47} - 13888 q^{49} + 7296 q^{50} - 1664 q^{52} + 832 q^{55} + 2944 q^{58} - 18240 q^{59} + 8192 q^{64} + 10584 q^{69} + 19584 q^{70} - 30048 q^{71} + 9536 q^{73} - 4176 q^{75} + 14160 q^{77} + 6912 q^{78} + 11664 q^{81} - 19584 q^{82} - 32496 q^{85} - 8064 q^{87} + 6720 q^{92} - 11952 q^{93} - 21248 q^{94} - 20064 q^{95} + 21504 q^{98}+O(q^{100}) \) Copy content Toggle raw display

Display 100 coefficients 10 coefficients

Character values

We give the values of \(\chi\) on generators for \(\left(\mathbb{Z}/138\mathbb{Z}\right)^\times\).

\(n\) \(47\) \(97\)
\(\chi(n)\) \(1\) \(-1\)

Coefficient data

For each \(n\) we display the coefficients of the \(q\)-expansion \(a_n\), the Satake parameters \(\alpha_p\), and the Satake angles \(\theta_p = \textrm{Arg}(\alpha_p)\).



Display \(a_p\) with \(p\) up to: 50 250 1000 (See \(a_n\) instead) (See \(a_n\) instead) (See \(a_n\) instead) Display \(a_n\) with \(n\) up to: 50 250 1000 (See only \(a_p\)) (See only \(a_p\)) (See only \(a_p\))
Significant digits:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) −2.82843 −0.707107
\(3\) 5.19615 0.577350
\(4\) 8.00000 0.500000
\(5\) 34.5847i 1.38339i −0.722191 0.691693i \(-0.756865\pi\)
0.722191 0.691693i \(-0.243135\pi\)
\(6\) −14.6969 −0.408248
\(7\) 81.5113i 1.66350i −0.555153 0.831748i \(-0.687340\pi\)
0.555153 0.831748i \(-0.312660\pi\)
\(8\) −22.6274 −0.353553
\(9\) 27.0000 0.333333
\(10\) 97.8202i 0.978202i
\(11\) 67.6260i 0.558893i 0.960161 + 0.279446i \(0.0901509\pi\)
−0.960161 + 0.279446i \(0.909849\pi\)
\(12\) 41.5692 0.288675
\(13\) −316.869 −1.87496 −0.937482 0.348035i \(-0.886849\pi\)
−0.937482 + 0.348035i \(0.886849\pi\)
\(14\) 230.549i 1.17627i
\(15\) 179.707i 0.798699i
\(16\) 64.0000 0.250000
\(17\) 44.6757i 0.154587i 0.997008 + 0.0772936i \(0.0246279\pi\)
−0.997008 + 0.0772936i \(0.975372\pi\)
\(18\) −76.3675 −0.235702
\(19\) 468.905i 1.29891i 0.760402 + 0.649453i \(0.225002\pi\)
−0.760402 + 0.649453i \(0.774998\pi\)
\(20\) 276.677i 0.691693i
\(21\) 423.545i 0.960420i
\(22\) 191.275i 0.395197i
\(23\) 491.402 195.869i 0.928927 0.370263i
\(24\) −117.576 −0.204124
\(25\) −571.099 −0.913758
\(26\) 896.240 1.32580
\(27\) 140.296 0.192450
\(28\) 652.091i 0.831748i
\(29\) −228.778 −0.272030 −0.136015 0.990707i \(-0.543430\pi\)
−0.136015 + 0.990707i \(0.543430\pi\)
\(30\) 508.289i 0.564765i
\(31\) −1674.25 −1.74220 −0.871099 0.491108i \(-0.836592\pi\)
−0.871099 + 0.491108i \(0.836592\pi\)
\(32\) −181.019 −0.176777
\(33\) 351.395i 0.322677i
\(34\) 126.362i 0.109310i
\(35\) −2819.04 −2.30126
\(36\) 216.000 0.166667
\(37\) 736.035i 0.537644i −0.963190 0.268822i \(-0.913366\pi\)
0.963190 0.268822i \(-0.0866344\pi\)
\(38\) 1326.26i 0.918465i
\(39\) −1646.50 −1.08251
\(40\) 782.562i 0.489101i
\(41\) −299.061 −0.177907 −0.0889534 0.996036i \(-0.528352\pi\)
−0.0889534 + 0.996036i \(0.528352\pi\)
\(42\) 1197.97i 0.679120i
\(43\) 2677.63i 1.44815i −0.689721 0.724076i \(-0.742267\pi\)
0.689721 0.724076i \(-0.257733\pi\)
\(44\) 541.008i 0.279446i
\(45\) 933.786i 0.461129i
\(46\) −1389.90 + 554.002i −0.656851 + 0.261816i
\(47\) 3461.96 1.56721 0.783604 0.621261i \(-0.213379\pi\)
0.783604 + 0.621261i \(0.213379\pi\)
\(48\) 332.554 0.144338
\(49\) −4243.10 −1.76722
\(50\) 1615.31 0.646125
\(51\) 232.142i 0.0892510i
\(52\) −2534.95 −0.937482
\(53\) 142.983i 0.0509018i 0.999676 + 0.0254509i \(0.00810216\pi\)
−0.999676 + 0.0254509i \(0.991898\pi\)
\(54\) −396.817 −0.136083
\(55\) 2338.82 0.773165
\(56\) 1844.39i 0.588135i
\(57\) 2436.50i 0.749924i
\(58\) 647.081 0.192355
\(59\) −1697.68 −0.487700 −0.243850 0.969813i \(-0.578410\pi\)
−0.243850 + 0.969813i \(0.578410\pi\)
\(60\) 1437.66i 0.399349i
\(61\) 6286.88i 1.68957i −0.535107 0.844784i \(-0.679729\pi\)
0.535107 0.844784i \(-0.320271\pi\)
\(62\) 4735.50 1.23192
\(63\) 2200.81i 0.554499i
\(64\) 512.000 0.125000
\(65\) 10958.8i 2.59380i
\(66\) 993.896i 0.228167i
\(67\) 2566.64i 0.571761i 0.958265 + 0.285881i \(0.0922861\pi\)
−0.958265 + 0.285881i \(0.907714\pi\)
\(68\) 357.406i 0.0772936i
\(69\) 2553.40 1017.77i 0.536316 0.213771i
\(70\) 7973.46 1.62724
\(71\) 5395.67 1.07036 0.535178 0.844739i \(-0.320244\pi\)
0.535178 + 0.844739i \(0.320244\pi\)
\(72\) −610.940 −0.117851
\(73\) 1108.66 0.208042 0.104021 0.994575i \(-0.466829\pi\)
0.104021 + 0.994575i \(0.466829\pi\)
\(74\) 2081.82i 0.380172i
\(75\) −2967.52 −0.527559
\(76\) 3751.24i 0.649453i
\(77\) 5512.29 0.929716
\(78\) 4657.00 0.765450
\(79\) 4639.58i 0.743403i −0.928352 0.371701i \(-0.878775\pi\)
0.928352 0.371701i \(-0.121225\pi\)
\(80\) 2213.42i 0.345847i
\(81\) 729.000 0.111111
\(82\) 845.873 0.125799
\(83\) 12844.1i 1.86443i −0.361906 0.932214i \(-0.617874\pi\)
0.361906 0.932214i \(-0.382126\pi\)
\(84\) 3388.36i 0.480210i
\(85\) 1545.09 0.213854
\(86\) 7573.49i 1.02400i
\(87\) −1188.76 −0.157057
\(88\) 1530.20i 0.197598i
\(89\) 3849.23i 0.485953i 0.970032 + 0.242976i \(0.0781237\pi\)
−0.970032 + 0.242976i \(0.921876\pi\)
\(90\) 2641.15i 0.326067i
\(91\) 25828.4i 3.11899i
\(92\) 3931.22 1566.95i 0.464463 0.185132i
\(93\) −8699.67 −1.00586
\(94\) −9791.91 −1.10818
\(95\) 16216.9 1.79689
\(96\) −940.604 −0.102062
\(97\) 940.980i 0.100009i −0.998749 0.0500043i \(-0.984077\pi\)
0.998749 0.0500043i \(-0.0159235\pi\)
\(98\) 12001.3 1.24961
\(99\) 1825.90i 0.186298i
\(100\) −4568.79 −0.456879
\(101\) −1542.66 −0.151226 −0.0756132 0.997137i \(-0.524091\pi\)
−0.0756132 + 0.997137i \(0.524091\pi\)
\(102\) 656.596i 0.0631100i
\(103\) 12529.7i 1.18104i 0.807022 + 0.590521i \(0.201078\pi\)
−0.807022 + 0.590521i \(0.798922\pi\)
\(104\) 7169.92 0.662900
\(105\) −14648.2 −1.32863
\(106\) 404.418i 0.0359930i
\(107\) 13392.8i 1.16978i −0.811114 0.584889i \(-0.801138\pi\)
0.811114 0.584889i \(-0.198862\pi\)
\(108\) 1122.37 0.0962250
\(109\) 6720.92i 0.565687i −0.959166 0.282843i \(-0.908722\pi\)
0.959166 0.282843i \(-0.0912776\pi\)
\(110\) −6615.19 −0.546710
\(111\) 3824.55i 0.310409i
\(112\) 5216.73i 0.415874i
\(113\) 432.194i 0.0338472i −0.999857 0.0169236i \(-0.994613\pi\)
0.999857 0.0169236i \(-0.00538720\pi\)
\(114\) 6891.47i 0.530276i
\(115\) −6774.07 16995.0i −0.512217 1.28507i
\(116\) −1830.22 −0.136015
\(117\) −8555.46 −0.624988
\(118\) 4801.78 0.344856
\(119\) 3641.58 0.257155
\(120\) 4066.31i 0.282383i
\(121\) 10067.7 0.687639
\(122\) 17782.0i 1.19471i
\(123\) −1553.97 −0.102715
\(124\) −13394.0 −0.871099
\(125\) 1864.15i 0.119306i
\(126\) 6224.82i 0.392090i
\(127\) −27147.9 −1.68317 −0.841586 0.540123i \(-0.818378\pi\)
−0.841586 + 0.540123i \(0.818378\pi\)
\(128\) −1448.15 −0.0883883
\(129\) 13913.4i 0.836090i
\(130\) 30996.2i 1.83409i
\(131\) −24452.9 −1.42491 −0.712457 0.701716i \(-0.752417\pi\)
−0.712457 + 0.701716i \(0.752417\pi\)
\(132\) 2811.16i 0.161338i
\(133\) 38221.1 2.16073
\(134\) 7259.54i 0.404296i
\(135\) 4852.09i 0.266233i
\(136\) 1010.90i 0.0546549i
\(137\) 24932.8i 1.32840i 0.747553 + 0.664202i \(0.231229\pi\)
−0.747553 + 0.664202i \(0.768771\pi\)
\(138\) −7222.11 + 2878.68i −0.379233 + 0.151159i
\(139\) 12421.6 0.642907 0.321454 0.946925i \(-0.395829\pi\)
0.321454 + 0.946925i \(0.395829\pi\)
\(140\) −22552.3 −1.15063
\(141\) 17988.9 0.904828
\(142\) −15261.2 −0.756856
\(143\) 21428.6i 1.04790i
\(144\) 1728.00 0.0833333
\(145\) 7912.20i 0.376323i
\(146\) −3135.75 −0.147108
\(147\) −22047.8 −1.02031
\(148\) 5888.28i 0.268822i
\(149\) 18427.2i 0.830017i 0.909817 + 0.415009i \(0.136221\pi\)
−0.909817 + 0.415009i \(0.863779\pi\)
\(150\) 8393.41 0.373040
\(151\) −2685.37 −0.117774 −0.0588871 0.998265i \(-0.518755\pi\)
−0.0588871 + 0.998265i \(0.518755\pi\)
\(152\) 10610.1i 0.459233i
\(153\) 1206.24i 0.0515291i
\(154\) −15591.1 −0.657409
\(155\) 57903.4i 2.41013i
\(156\) −13172.0 −0.541255
\(157\) 17500.0i 0.709966i −0.934873 0.354983i \(-0.884487\pi\)
0.934873 0.354983i \(-0.115513\pi\)
\(158\) 13122.7i 0.525665i
\(159\) 742.963i 0.0293882i
\(160\) 6260.49i 0.244550i
\(161\) −15965.6 40054.9i −0.615931 1.54527i
\(162\) −2061.92 −0.0785674
\(163\) −22049.3 −0.829890 −0.414945 0.909847i \(-0.636199\pi\)
−0.414945 + 0.909847i \(0.636199\pi\)
\(164\) −2392.49 −0.0889534
\(165\) 12152.9 0.446387
\(166\) 36328.5i 1.31835i
\(167\) −10720.9 −0.384412 −0.192206 0.981355i \(-0.561564\pi\)
−0.192206 + 0.981355i \(0.561564\pi\)
\(168\) 9583.74i 0.339560i
\(169\) 71844.8 2.51549
\(170\) −4370.19 −0.151218
\(171\) 12660.4i 0.432969i
\(172\) 21421.1i 0.724076i
\(173\) 45355.3 1.51543 0.757714 0.652586i \(-0.226316\pi\)
0.757714 + 0.652586i \(0.226316\pi\)
\(174\) 3362.33 0.111056
\(175\) 46551.0i 1.52003i
\(176\) 4328.07i 0.139723i
\(177\) −8821.43 −0.281574
\(178\) 10887.3i 0.343620i
\(179\) 11298.8 0.352635 0.176318 0.984333i \(-0.443581\pi\)
0.176318 + 0.984333i \(0.443581\pi\)
\(180\) 7470.29i 0.230564i
\(181\) 31946.7i 0.975143i −0.873083 0.487572i \(-0.837883\pi\)
0.873083 0.487572i \(-0.162117\pi\)
\(182\) 73053.7i 2.20546i
\(183\) 32667.6i 0.975473i
\(184\) −11119.2 + 4432.01i −0.328425 + 0.130908i
\(185\) −25455.5 −0.743770
\(186\) 24606.4 0.711249
\(187\) −3021.24 −0.0863977
\(188\) 27695.7 0.783604
\(189\) 11435.7i 0.320140i
\(190\) −45868.4 −1.27059
\(191\) 64795.8i 1.77615i −0.459697 0.888076i \(-0.652042\pi\)
0.459697 0.888076i \(-0.347958\pi\)
\(192\) 2660.43 0.0721688
\(193\) 20445.5 0.548888 0.274444 0.961603i \(-0.411506\pi\)
0.274444 + 0.961603i \(0.411506\pi\)
\(194\) 2661.49i 0.0707167i
\(195\) 56943.6i 1.49753i
\(196\) −33944.8 −0.883611
\(197\) −12604.0 −0.324771 −0.162386 0.986727i \(-0.551919\pi\)
−0.162386 + 0.986727i \(0.551919\pi\)
\(198\) 5164.43i 0.131732i
\(199\) 2430.87i 0.0613841i −0.999529 0.0306921i \(-0.990229\pi\)
0.999529 0.0306921i \(-0.00977112\pi\)
\(200\) 12922.5 0.323062
\(201\) 13336.6i 0.330107i
\(202\) 4363.30 0.106933
\(203\) 18648.0i 0.452522i
\(204\) 1857.13i 0.0446255i
\(205\) 10342.9i 0.246114i
\(206\) 35439.3i 0.835123i
\(207\) 13267.9 5288.47i 0.309642 0.123421i
\(208\) −20279.6 −0.468741
\(209\) −31710.2 −0.725949
\(210\) 41431.3 0.939485
\(211\) 45269.6 1.01681 0.508407 0.861117i \(-0.330234\pi\)
0.508407 + 0.861117i \(0.330234\pi\)
\(212\) 1143.87i 0.0254509i
\(213\) 28036.7 0.617970
\(214\) 37880.5i 0.827157i
\(215\) −92605.0 −2.00335
\(216\) −3174.54 −0.0680414
\(217\) 136471.i 2.89814i
\(218\) 19009.6i 0.400001i
\(219\) 5760.74 0.120113
\(220\) 18710.6 0.386582
\(221\) 14156.3i 0.289845i
\(222\) 10817.5i 0.219492i
\(223\) 415.977 0.00836488 0.00418244 0.999991i \(-0.498669\pi\)
0.00418244 + 0.999991i \(0.498669\pi\)
\(224\) 14755.1i 0.294067i
\(225\) −15419.7 −0.304586
\(226\) 1222.43i 0.0239336i
\(227\) 10839.9i 0.210364i 0.994453 + 0.105182i \(0.0335426\pi\)
−0.994453 + 0.105182i \(0.966457\pi\)
\(228\) 19492.0i 0.374962i
\(229\) 61204.6i 1.16711i 0.812072 + 0.583557i \(0.198339\pi\)
−0.812072 + 0.583557i \(0.801661\pi\)
\(230\) 19160.0 + 48069.1i 0.362192 + 0.908678i
\(231\) 28642.7 0.536772
\(232\) 5176.65 0.0961773
\(233\) 71733.3 1.32132 0.660662 0.750684i \(-0.270276\pi\)
0.660662 + 0.750684i \(0.270276\pi\)
\(234\) 24198.5 0.441933
\(235\) 119731.i 2.16805i
\(236\) −13581.5 −0.243850
\(237\) 24108.0i 0.429204i
\(238\) −10299.9 −0.181836
\(239\) −42013.5 −0.735517 −0.367759 0.929921i \(-0.619875\pi\)
−0.367759 + 0.929921i \(0.619875\pi\)
\(240\) 11501.3i 0.199675i
\(241\) 33051.7i 0.569062i −0.958667 0.284531i \(-0.908162\pi\)
0.958667 0.284531i \(-0.0918379\pi\)
\(242\) −28475.8 −0.486234
\(243\) 3788.00 0.0641500
\(244\) 50295.1i 0.844784i
\(245\) 146746.i 2.44475i
\(246\) 4395.29 0.0726302
\(247\) 148581.i 2.43540i
\(248\) 37884.0 0.615960
\(249\) 66739.6i 1.07643i
\(250\) 5272.61i 0.0843618i
\(251\) 55703.6i 0.884170i −0.896973 0.442085i \(-0.854239\pi\)
0.896973 0.442085i \(-0.145761\pi\)
\(252\) 17606.4i 0.277249i
\(253\) 13245.9 + 33231.6i 0.206937 + 0.519171i
\(254\) 76785.8 1.19018
\(255\) 8028.55 0.123469
\(256\) 4096.00 0.0625000
\(257\) 46826.6 0.708967 0.354484 0.935062i \(-0.384657\pi\)
0.354484 + 0.935062i \(0.384657\pi\)
\(258\) 39353.0i 0.591205i
\(259\) −59995.2 −0.894370
\(260\) 87670.4i 1.29690i
\(261\) −6177.00 −0.0906768
\(262\) 69163.3 1.00757
\(263\) 131665.i 1.90353i −0.306823 0.951767i \(-0.599266\pi\)
0.306823 0.951767i \(-0.400734\pi\)
\(264\) 7951.17i 0.114084i
\(265\) 4945.03 0.0704169
\(266\) −108106. −1.52786
\(267\) 20001.2i 0.280565i
\(268\) 20533.1i 0.285881i
\(269\) 16313.5 0.225445 0.112723 0.993626i \(-0.464043\pi\)
0.112723 + 0.993626i \(0.464043\pi\)
\(270\) 13723.8i 0.188255i
\(271\) 86263.7 1.17460 0.587299 0.809370i \(-0.300191\pi\)
0.587299 + 0.809370i \(0.300191\pi\)
\(272\) 2859.25i 0.0386468i
\(273\) 134208.i 1.80075i
\(274\) 70520.7i 0.939324i
\(275\) 38621.2i 0.510693i
\(276\) 20427.2 8142.13i 0.268158 0.106886i
\(277\) 98843.9 1.28822 0.644110 0.764933i \(-0.277228\pi\)
0.644110 + 0.764933i \(0.277228\pi\)
\(278\) −35133.6 −0.454604
\(279\) −45204.8 −0.580733
\(280\) 63787.6 0.813618
\(281\) 7858.32i 0.0995215i −0.998761 0.0497608i \(-0.984154\pi\)
0.998761 0.0497608i \(-0.0158459\pi\)
\(282\) −50880.2 −0.639810
\(283\) 100026.i 1.24894i 0.781049 + 0.624469i \(0.214685\pi\)
−0.781049 + 0.624469i \(0.785315\pi\)
\(284\) 43165.3 0.535178
\(285\) 84265.6 1.03743
\(286\) 60609.2i 0.740980i
\(287\) 24376.9i 0.295947i
\(288\) −4887.52 −0.0589256
\(289\) 81525.1 0.976103
\(290\) 22379.1i 0.266101i
\(291\) 4889.48i 0.0577400i
\(292\) 8869.25 0.104021
\(293\) 44942.9i 0.523511i −0.965134 0.261755i \(-0.915699\pi\)
0.965134 0.261755i \(-0.0843014\pi\)
\(294\) 62360.5 0.721465
\(295\) 58713.8i 0.674678i
\(296\) 16654.6i 0.190086i
\(297\) 9487.67i 0.107559i
\(298\) 52120.0i 0.586911i
\(299\) −155710. + 62064.8i −1.74170 + 0.694230i
\(300\) −23740.1 −0.263779
\(301\) −218257. −2.40899
\(302\) 7595.37 0.0832789
\(303\) −8015.90 −0.0873106
\(304\) 30009.9i 0.324727i
\(305\) −217430. −2.33733
\(306\) 3411.77i 0.0364366i
\(307\) −133001. −1.41116 −0.705581 0.708630i \(-0.749314\pi\)
−0.705581 + 0.708630i \(0.749314\pi\)
\(308\) 44098.3 0.464858
\(309\) 65106.1i 0.681875i
\(310\) 163776.i 1.70422i
\(311\) −38901.3 −0.402201 −0.201100 0.979571i \(-0.564452\pi\)
−0.201100 + 0.979571i \(0.564452\pi\)
\(312\) 37256.0 0.382725
\(313\) 157896.i 1.61169i 0.592126 + 0.805845i \(0.298289\pi\)
−0.592126 + 0.805845i \(0.701711\pi\)
\(314\) 49497.4i 0.502022i
\(315\) −76114.1 −0.767086
\(316\) 37116.6i 0.371701i
\(317\) 38917.3 0.387279 0.193640 0.981073i \(-0.437971\pi\)
0.193640 + 0.981073i \(0.437971\pi\)
\(318\) 2101.42i 0.0207806i
\(319\) 15471.3i 0.152036i
\(320\) 17707.3i 0.172923i
\(321\) 69590.9i 0.675371i
\(322\) 45157.4 + 113292.i 0.435529 + 1.09267i
\(323\) −20948.7 −0.200794
\(324\) 5832.00 0.0555556
\(325\) 180963. 1.71326
\(326\) 62364.9 0.586821
\(327\) 34922.9i 0.326599i
\(328\) 6766.99 0.0628996
\(329\) 282189.i 2.60705i
\(330\) −34373.5 −0.315643
\(331\) −120375. −1.09870 −0.549352 0.835591i \(-0.685125\pi\)
−0.549352 + 0.835591i \(0.685125\pi\)
\(332\) 102752.i 0.932214i
\(333\) 19873.0i 0.179215i
\(334\) 30323.2 0.271820
\(335\) 88766.3 0.790967
\(336\) 27106.9i 0.240105i
\(337\) 117125.i 1.03131i −0.856797 0.515655i \(-0.827549\pi\)
0.856797 0.515655i \(-0.172451\pi\)
\(338\) −203208. −1.77872
\(339\) 2245.75i 0.0195417i
\(340\) 12360.8 0.106927
\(341\) 113223.i 0.973702i
\(342\) 35809.1i 0.306155i
\(343\) 150152.i 1.27627i
\(344\) 60587.9i 0.511999i
\(345\) −35199.1 88308.5i −0.295729 0.741933i
\(346\) −128284. −1.07157
\(347\) −39837.5 −0.330851 −0.165426 0.986222i \(-0.552900\pi\)
−0.165426 + 0.986222i \(0.552900\pi\)
\(348\) −9510.11 −0.0785284
\(349\) −61183.9 −0.502327 −0.251163 0.967945i \(-0.580813\pi\)
−0.251163 + 0.967945i \(0.580813\pi\)
\(350\) 131666.i 1.07483i
\(351\) −44455.5 −0.360837
\(352\) 12241.6i 0.0987992i
\(353\) 14940.3 0.119898 0.0599488 0.998201i \(-0.480906\pi\)
0.0599488 + 0.998201i \(0.480906\pi\)
\(354\) 24950.8 0.199103
\(355\) 186607.i 1.48072i
\(356\) 30793.8i 0.242976i
\(357\) 18922.2 0.148469
\(358\) −31957.8 −0.249351
\(359\) 187105.i 1.45177i 0.687817 + 0.725884i \(0.258569\pi\)
−0.687817 + 0.725884i \(0.741431\pi\)
\(360\) 21129.2i 0.163034i
\(361\) −89551.0 −0.687157
\(362\) 90358.8i 0.689530i
\(363\) 52313.4 0.397008
\(364\) 206627.i 1.55950i
\(365\) 38342.5i 0.287802i
\(366\) 92397.9i 0.689763i
\(367\) 15335.7i 0.113860i 0.998378 + 0.0569299i \(0.0181311\pi\)
−0.998378 + 0.0569299i \(0.981869\pi\)
\(368\) 31449.8 12535.6i 0.232232 0.0925658i
\(369\) −8074.66 −0.0593023
\(370\) 71999.1 0.525925
\(371\) 11654.8 0.0846751
\(372\) −69597.4 −0.502929
\(373\) 89174.0i 0.640945i 0.947258 + 0.320472i \(0.103842\pi\)
−0.947258 + 0.320472i \(0.896158\pi\)
\(374\) 8545.36 0.0610924
\(375\) 9686.41i 0.0688811i
\(376\) −78335.3 −0.554092
\(377\) 72492.5 0.510047
\(378\) 32345.1i 0.226373i
\(379\) 208424.i 1.45100i −0.688221 0.725501i \(-0.741608\pi\)
0.688221 0.725501i \(-0.258392\pi\)
\(380\) 129735. 0.898445
\(381\) −141065. −0.971780
\(382\) 183270.i 1.25593i
\(383\) 119229.i 0.812804i 0.913694 + 0.406402i \(0.133217\pi\)
−0.913694 + 0.406402i \(0.866783\pi\)
\(384\) −7524.83 −0.0510310
\(385\) 190641.i 1.28616i
\(386\) −57828.7 −0.388122
\(387\) 72296.0i 0.482717i
\(388\) 7527.84i 0.0500043i
\(389\) 208451.i 1.37754i 0.724978 + 0.688772i \(0.241850\pi\)
−0.724978 + 0.688772i \(0.758150\pi\)
\(390\) 161061.i 1.05891i
\(391\) 8750.60 + 21953.8i 0.0572380 + 0.143600i
\(392\) 96010.3 0.624807
\(393\) −127061. −0.822674
\(394\) 35649.6 0.229648
\(395\) −160458. −1.02841
\(396\) 14607.2i 0.0931488i
\(397\) 1940.42 0.0123116 0.00615581 0.999981i \(-0.498041\pi\)
0.00615581 + 0.999981i \(0.498041\pi\)
\(398\) 6875.55i 0.0434051i
\(399\) 198603. 1.24750
\(400\) −36550.3 −0.228440
\(401\) 221336.i 1.37646i −0.725493 0.688230i \(-0.758388\pi\)
0.725493 0.688230i \(-0.241612\pi\)
\(402\) 37721.7i 0.233421i
\(403\) 530518. 3.26656
\(404\) −12341.3 −0.0756132
\(405\) 25212.2i 0.153710i
\(406\) 52744.4i 0.319981i
\(407\) 49775.1 0.300486
\(408\) 5252.77i 0.0315550i
\(409\) 153371. 0.916845 0.458423 0.888734i \(-0.348415\pi\)
0.458423 + 0.888734i \(0.348415\pi\)
\(410\) 29254.2i 0.174029i
\(411\) 129555.i 0.766954i
\(412\) 100237.i 0.590521i
\(413\) 138381.i 0.811288i
\(414\) −37527.2 + 14958.0i −0.218950 + 0.0872718i
\(415\) −444207. −2.57923
\(416\) 57359.4 0.331450
\(417\) 64544.6 0.371183
\(418\) 89690.0 0.513324
\(419\) 255314.i 1.45427i 0.686492 + 0.727137i \(0.259150\pi\)
−0.686492 + 0.727137i \(0.740850\pi\)
\(420\) −117185. −0.664316
\(421\) 86647.5i 0.488868i −0.969666 0.244434i \(-0.921398\pi\)
0.969666 0.244434i \(-0.0786022\pi\)
\(422\) −128042. −0.718997
\(423\) 93473.0 0.522403
\(424\) 3235.34i 0.0179965i
\(425\) 25514.3i 0.141255i
\(426\) −79299.8 −0.436971
\(427\) −512452. −2.81059
\(428\) 107142.i 0.584889i
\(429\) 111346.i 0.605007i
\(430\) 261926. 1.41658
\(431\) 331914.i 1.78678i 0.449282 + 0.893390i \(0.351680\pi\)
−0.449282 + 0.893390i \(0.648320\pi\)
\(432\) 8978.95 0.0481125
\(433\) 14258.0i 0.0760470i −0.999277 0.0380235i \(-0.987894\pi\)
0.999277 0.0380235i \(-0.0121062\pi\)
\(434\) 385997.i 2.04929i
\(435\) 41113.0i 0.217270i
\(436\) 53767.4i 0.282843i
\(437\) 91844.1 + 230421.i 0.480937 + 1.20659i
\(438\) −16293.8 −0.0849328
\(439\) −65318.9 −0.338930 −0.169465 0.985536i \(-0.554204\pi\)
−0.169465 + 0.985536i \(0.554204\pi\)
\(440\) −52921.5 −0.273355
\(441\) −114564. −0.589074
\(442\) 40040.2i 0.204952i
\(443\) 303676. 1.54740 0.773700 0.633553i \(-0.218404\pi\)
0.773700 + 0.633553i \(0.218404\pi\)
\(444\) 30596.4i 0.155205i
\(445\) 133124. 0.672260
\(446\) −1176.56 −0.00591486
\(447\) 95750.6i 0.479211i
\(448\) 41733.8i 0.207937i
\(449\) 296049. 1.46849 0.734246 0.678884i \(-0.237536\pi\)
0.734246 + 0.678884i \(0.237536\pi\)
\(450\) 43613.4 0.215375
\(451\) 20224.3i 0.0994309i
\(452\) 3457.55i 0.0169236i
\(453\) −13953.6 −0.0679970
\(454\) 30659.8i 0.148750i
\(455\) 893266. 4.31478
\(456\) 55131.8i 0.265138i
\(457\) 114510.i 0.548289i 0.961689 + 0.274144i \(0.0883946\pi\)
−0.961689 + 0.274144i \(0.911605\pi\)
\(458\) 173113.i 0.825274i
\(459\) 6267.83i 0.0297503i
\(460\) −54192.6 135960.i −0.256108 0.642533i
\(461\) 69910.9 0.328960 0.164480 0.986380i \(-0.447405\pi\)
0.164480 + 0.986380i \(0.447405\pi\)
\(462\) −81013.8 −0.379555
\(463\) −133673. −0.623564 −0.311782 0.950154i \(-0.600926\pi\)
−0.311782 + 0.950154i \(0.600926\pi\)
\(464\) −14641.8 −0.0680076
\(465\) 300875.i 1.39149i
\(466\) −202893. −0.934317
\(467\) 19129.4i 0.0877139i −0.999038 0.0438570i \(-0.986035\pi\)
0.999038 0.0438570i \(-0.0139646\pi\)
\(468\) −68443.7 −0.312494
\(469\) 209210. 0.951123
\(470\) 338650.i 1.53305i
\(471\) 90932.5i 0.409899i
\(472\) 38414.2 0.172428
\(473\) 181078. 0.809361
\(474\) 68187.6i 0.303493i
\(475\) 267791.i 1.18689i
\(476\) 29132.6 0.128578
\(477\) 3860.55i 0.0169673i
\(478\) 118832. 0.520089
\(479\) 193492.i 0.843318i 0.906754 + 0.421659i \(0.138552\pi\)
−0.906754 + 0.421659i \(0.861448\pi\)
\(480\) 32530.5i 0.141191i
\(481\) 233227.i 1.00806i
\(482\) 93484.3i 0.402388i
\(483\) −82959.5 208131.i −0.355608 0.892160i
\(484\) 80541.8 0.343819
\(485\) −32543.5 −0.138350
\(486\) −10714.1 −0.0453609
\(487\) 330551. 1.39374 0.696868 0.717200i \(-0.254576\pi\)
0.696868 + 0.717200i \(0.254576\pi\)
\(488\) 142256.i 0.597353i
\(489\) −114572. −0.479137
\(490\) 415061.i 1.72870i
\(491\) −4576.09 −0.0189816 −0.00949078 0.999955i \(-0.503021\pi\)
−0.00949078 + 0.999955i \(0.503021\pi\)
\(492\) −12431.8 −0.0513573
\(493\) 10220.8i 0.0420524i
\(494\) 420252.i 1.72209i
\(495\) 63148.2 0.257722
\(496\) −107152. −0.435549
\(497\) 439808.i 1.78053i
\(498\) 188768.i 0.761150i
\(499\) −256326. −1.02942 −0.514708 0.857366i \(-0.672100\pi\)
−0.514708 + 0.857366i \(0.672100\pi\)
\(500\) 14913.2i 0.0596528i
\(501\) −55707.2 −0.221940
\(502\) 157553.i 0.625202i
\(503\) 376177.i 1.48681i −0.668840 0.743407i \(-0.733209\pi\)
0.668840 0.743407i \(-0.266791\pi\)
\(504\) 49798.6i 0.196045i
\(505\) 53352.4i 0.209205i
\(506\) −37464.9 93993.1i −0.146327 0.367109i
\(507\) 373317. 1.45232
\(508\) −217183. −0.841586
\(509\) −183323. −0.707588 −0.353794 0.935323i \(-0.615109\pi\)
−0.353794 + 0.935323i \(0.615109\pi\)
\(510\) −22708.2 −0.0873055
\(511\) 90368.0i 0.346077i
\(512\) −11585.2 −0.0441942
\(513\) 65785.6i 0.249975i
\(514\) −132446. −0.501316
\(515\) 433335. 1.63384
\(516\) 111307.i 0.418045i
\(517\) 234119.i 0.875901i
\(518\) 169692. 0.632415
\(519\) 235673. 0.874933
\(520\) 247969.i 0.917046i
\(521\) 366081.i 1.34866i 0.738430 + 0.674330i \(0.235567\pi\)
−0.738430 + 0.674330i \(0.764433\pi\)
\(522\) 17471.2 0.0641182
\(523\) 236643.i 0.865148i 0.901598 + 0.432574i \(0.142395\pi\)
−0.901598 + 0.432574i \(0.857605\pi\)
\(524\) −195623. −0.712457
\(525\) 241886.i 0.877592i
\(526\) 372406.i 1.34600i
\(527\) 74798.4i 0.269322i
\(528\) 22489.3i 0.0806692i
\(529\) 203112. 192501.i 0.725810 0.687895i
\(530\) −13986.7 −0.0497923
\(531\) −45837.5 −0.162567
\(532\) 305769. 1.08036
\(533\) 94763.2 0.333569
\(534\) 56571.9i 0.198389i
\(535\) −463185. −1.61825
\(536\) 58076.4i 0.202148i
\(537\) 58710.3 0.203594
\(538\) −46141.4 −0.159414
\(539\) 286944.i 0.987687i
\(540\) 38816.8i 0.133116i
\(541\) −386905. −1.32194 −0.660968 0.750414i \(-0.729854\pi\)
−0.660968 + 0.750414i \(0.729854\pi\)
\(542\) −243991. −0.830567
\(543\) 166000.i 0.562999i
\(544\) 8087.17i 0.0273274i
\(545\) −232441. −0.782563
\(546\) 379598.i 1.27332i
\(547\) 5255.98 0.0175663 0.00878313 0.999961i \(-0.497204\pi\)
0.00878313 + 0.999961i \(0.497204\pi\)
\(548\) 199463.i 0.664202i
\(549\) 169746.i 0.563189i
\(550\) 109237.i 0.361114i
\(551\) 107275.i 0.353342i
\(552\) −57776.9 + 23029.4i −0.189616 + 0.0755796i
\(553\) −378178. −1.23665
\(554\) −279573. −0.910910
\(555\) −132271. −0.429416
\(556\) 99372.9 0.321454
\(557\) 148246.i 0.477830i 0.971040 + 0.238915i \(0.0767918\pi\)
−0.971040 + 0.238915i \(0.923208\pi\)
\(558\) 127858. 0.410640
\(559\) 848458.i 2.71523i
\(560\) −180419. −0.575315
\(561\) −15698.8 −0.0498817
\(562\) 22226.7i 0.0703723i
\(563\) 468399.i 1.47774i −0.673846 0.738872i \(-0.735359\pi\)
0.673846 0.738872i \(-0.264641\pi\)
\(564\) 143911. 0.452414
\(565\) −14947.3 −0.0468237
\(566\) 282917.i 0.883133i
\(567\) 59421.8i 0.184833i
\(568\) −122090. −0.378428
\(569\) 287885.i 0.889191i 0.895731 + 0.444595i \(0.146653\pi\)
−0.895731 + 0.444595i \(0.853347\pi\)
\(570\) −238339. −0.733577
\(571\) 563564.i 1.72851i −0.503056 0.864254i \(-0.667791\pi\)
0.503056 0.864254i \(-0.332209\pi\)
\(572\) 171429.i 0.523952i
\(573\) 336689.i 1.02546i
\(574\) 68948.3i 0.209266i
\(575\) −280639. + 111861.i −0.848815 + 0.338331i
\(576\) 13824.0 0.0416667
\(577\) −385391. −1.15758 −0.578788 0.815478i \(-0.696474\pi\)
−0.578788 + 0.815478i \(0.696474\pi\)
\(578\) −230588. −0.690209
\(579\) 106238. 0.316901
\(580\) 63297.6i 0.188162i
\(581\) −1.04694e6 −3.10147
\(582\) 13829.5i 0.0408283i
\(583\) −9669.39 −0.0284487
\(584\) −25086.0 −0.0735539
\(585\) 295888.i 0.864600i
\(586\) 127118.i 0.370178i
\(587\) 473689. 1.37473 0.687365 0.726312i \(-0.258767\pi\)
0.687365 + 0.726312i \(0.258767\pi\)
\(588\) −176382. −0.510153
\(589\) 785065.i 2.26295i
\(590\) 166068.i 0.477069i
\(591\) −65492.5 −0.187507
\(592\) 47106.3i 0.134411i
\(593\) −41779.3 −0.118810 −0.0594048 0.998234i \(-0.518920\pi\)
−0.0594048 + 0.998234i \(0.518920\pi\)
\(594\) 26835.2i 0.0760557i
\(595\) 125943.i 0.355745i
\(596\) 147418.i 0.415009i
\(597\) 12631.2i 0.0354402i
\(598\) 440415. 175546.i 1.23157 0.490894i
\(599\) 84704.2 0.236076 0.118038 0.993009i \(-0.462340\pi\)
0.118038 + 0.993009i \(0.462340\pi\)
\(600\) 67147.2 0.186520
\(601\) −555826. −1.53883 −0.769414 0.638750i \(-0.779452\pi\)
−0.769414 + 0.638750i \(0.779452\pi\)
\(602\) 617325. 1.70342
\(603\) 69299.2i 0.190587i
\(604\) −21483.0 −0.0588871
\(605\) 348189.i 0.951270i
\(606\) 22672.4 0.0617379
\(607\) 212157. 0.575810 0.287905 0.957659i \(-0.407041\pi\)
0.287905 + 0.957659i \(0.407041\pi\)
\(608\) 84880.9i 0.229616i
\(609\) 96897.7i 0.261264i
\(610\) 614984. 1.65274
\(611\) −1.09699e6 −2.93846
\(612\) 9649.96i 0.0257645i
\(613\) 94405.1i 0.251232i −0.992079 0.125616i \(-0.959909\pi\)
0.992079 0.125616i \(-0.0400907\pi\)
\(614\) 376182. 0.997842
\(615\) 53743.5i 0.142094i
\(616\) −124729. −0.328704
\(617\) 174142.i 0.457438i 0.973493 + 0.228719i \(0.0734537\pi\)
−0.973493 + 0.228719i \(0.926546\pi\)
\(618\) 184148.i 0.482159i
\(619\) 136471.i 0.356171i 0.984015 + 0.178086i \(0.0569904\pi\)
−0.984015 + 0.178086i \(0.943010\pi\)
\(620\) 463228.i 1.20507i
\(621\) 68941.8 27479.7i 0.178772 0.0712572i
\(622\) 110029. 0.284399
\(623\) 313756. 0.808381
\(624\) −105376. −0.270628
\(625\) −421408. −1.07880
\(626\) 446596.i 1.13964i
\(627\) −164771. −0.419127
\(628\) 140000.i 0.354983i
\(629\) 32882.9 0.0831130
\(630\) 215283. 0.542412
\(631\) 159317.i 0.400132i −0.979782 0.200066i \(-0.935884\pi\)
0.979782 0.200066i \(-0.0641156\pi\)
\(632\) 104982.i 0.262833i
\(633\) 235228. 0.587058
\(634\) −110075. −0.273848
\(635\) 938901.i 2.32848i
\(636\) 5943.70i 0.0146941i
\(637\) 1.34451e6 3.31347
\(638\) 43759.5i 0.107506i
\(639\) 145683. 0.356785
\(640\) 50083.9i 0.122275i
\(641\) 278560.i 0.677958i 0.940794 + 0.338979i \(0.110082\pi\)
−0.940794 + 0.338979i \(0.889918\pi\)
\(642\) 196833.i 0.477559i
\(643\) 611844.i 1.47985i −0.672687 0.739927i \(-0.734860\pi\)
0.672687 0.739927i \(-0.265140\pi\)
\(644\) −127724. 320439.i −0.307966 0.772633i
\(645\) −481190. −1.15664
\(646\) 59251.8 0.141983
\(647\) −549943. −1.31374 −0.656870 0.754004i \(-0.728120\pi\)
−0.656870 + 0.754004i \(0.728120\pi\)
\(648\) −16495.4 −0.0392837
\(649\) 114808.i 0.272572i
\(650\) −511842. −1.21146
\(651\) 709122.i 1.67324i
\(652\) −176395. −0.414945
\(653\) −192358. −0.451111 −0.225556 0.974230i \(-0.572420\pi\)
−0.225556 + 0.974230i \(0.572420\pi\)
\(654\) 98777.0i 0.230941i
\(655\) 845697.i 1.97121i
\(656\) −19139.9 −0.0444767
\(657\) 29933.7 0.0693473
\(658\) 798151.i 1.84346i
\(659\) 494216.i 1.13801i −0.822334 0.569005i \(-0.807328\pi\)
0.822334 0.569005i \(-0.192672\pi\)
\(660\) 97223.1 0.223193
\(661\) 117269.i 0.268399i 0.990954 + 0.134199i \(0.0428463\pi\)
−0.990954 + 0.134199i \(0.957154\pi\)
\(662\) 340472. 0.776901
\(663\) 73558.5i 0.167342i
\(664\) 290628.i 0.659175i
\(665\) 1.32186e6i 2.98912i
\(666\) 56209.2i 0.126724i
\(667\) −112422. + 44810.5i −0.252696 + 0.100723i
\(668\) −85766.9 −0.192206
\(669\) 2161.48 0.00482946
\(670\) −251069. −0.559298
\(671\) 425157. 0.944288
\(672\) 76669.9i 0.169780i
\(673\) 22739.7 0.0502059 0.0251029 0.999685i \(-0.492009\pi\)
0.0251029 + 0.999685i \(0.492009\pi\)
\(674\) 331279.i 0.729246i
\(675\) −80123.0 −0.175853
\(676\) 574759. 1.25774
\(677\) 384761.i 0.839488i 0.907643 + 0.419744i \(0.137880\pi\)
−0.907643 + 0.419744i \(0.862120\pi\)
\(678\) 6351.93i 0.0138180i
\(679\) −76700.6 −0.166364
\(680\) −34961.5 −0.0756088
\(681\) 56325.6i 0.121454i
\(682\) 320243.i 0.688511i
\(683\) −197744. −0.423898 −0.211949 0.977281i \(-0.567981\pi\)
−0.211949 + 0.977281i \(0.567981\pi\)
\(684\) 101284.i 0.216484i
\(685\) 862293. 1.83770
\(686\) 424694.i 0.902459i
\(687\) 318028.i 0.673833i
\(688\) 171368.i 0.362038i
\(689\) 45306.9i 0.0954391i
\(690\) 99558.1 + 249774.i 0.209112 + 0.524626i
\(691\) 515275. 1.07915 0.539576 0.841937i \(-0.318585\pi\)
0.539576 + 0.841937i \(0.318585\pi\)
\(692\) 362842. 0.757714
\(693\) 148832. 0.309905
\(694\) 112677. 0.233947
\(695\) 429597.i 0.889390i
\(696\) 26898.6 0.0555280
\(697\) 13360.8i 0.0275021i
\(698\) 173054. 0.355199
\(699\) 372737. 0.762867
\(700\) 372408.i 0.760017i
\(701\) 359121.i 0.730811i −0.930848 0.365406i \(-0.880930\pi\)
0.930848 0.365406i \(-0.119070\pi\)
\(702\) 125739. 0.255150
\(703\) 345131. 0.698350
\(704\) 34624.5i 0.0698616i
\(705\) 622139.i 1.25173i
\(706\) −42257.6 −0.0847804
\(707\) 125744.i 0.251565i
\(708\) −70571.4 −0.140787
\(709\) 25288.2i 0.0503066i −0.999684 0.0251533i \(-0.991993\pi\)
0.999684 0.0251533i \(-0.00800739\pi\)
\(710\) 527805.i 1.04702i
\(711\) 125269.i 0.247801i
\(712\) 87098.2i 0.171810i
\(713\) −822731. + 327934.i −1.61837 + 0.645072i
\(714\) −53520.0 −0.104983
\(715\) −741100. −1.44966
\(716\) 90390.3 0.176318
\(717\) −218309. −0.424651
\(718\) 529214.i 1.02655i
\(719\) 401185. 0.776045 0.388022 0.921650i \(-0.373158\pi\)
0.388022 + 0.921650i \(0.373158\pi\)
\(720\) 59762.3i 0.115282i
\(721\) 1.02131e6 1.96466
\(722\) 253288. 0.485893
\(723\) 171742.i 0.328548i
\(724\) 255573.i 0.487572i
\(725\) 130655. 0.248570
\(726\) −147965. −0.280727
\(727\) 20759.7i 0.0392782i −0.999807 0.0196391i \(-0.993748\pi\)
0.999807 0.0196391i \(-0.00625172\pi\)
\(728\) 584430.i 1.10273i
\(729\) 19683.0 0.0370370
\(730\) 108449.i 0.203507i
\(731\) 119625. 0.223866
\(732\) 261341.i 0.487736i
\(733\) 70627.4i 0.131451i 0.997838 + 0.0657257i \(0.0209362\pi\)
−0.997838 + 0.0657257i \(0.979064\pi\)
\(734\) 43375.8i 0.0805110i
\(735\) 762515.i 1.41148i
\(736\) −88953.3 + 35456.1i −0.164213 + 0.0654539i
\(737\) −173571. −0.319553
\(738\) 22838.6 0.0419330
\(739\) −194006. −0.355243 −0.177621 0.984099i \(-0.556840\pi\)
−0.177621 + 0.984099i \(0.556840\pi\)
\(740\) −203644. −0.371885
\(741\) 772052.i 1.40608i
\(742\) −32964.6 −0.0598743
\(743\) 679406.i 1.23070i 0.788254 + 0.615350i \(0.210985\pi\)
−0.788254 + 0.615350i \(0.789015\pi\)
\(744\) 196851. 0.355625
\(745\) 637299. 1.14823
\(746\) 252222.i 0.453216i
\(747\) 346789.i 0.621476i
\(748\) −24169.9 −0.0431989
\(749\) −1.09166e6 −1.94592
\(750\) 27397.3i 0.0487063i
\(751\) 169607.i 0.300722i 0.988631 + 0.150361i \(0.0480435\pi\)
−0.988631 + 0.150361i \(0.951956\pi\)
\(752\) 221566. 0.391802
\(753\) 289444.i 0.510475i
\(754\) −205040. −0.360658
\(755\) 92872.6i 0.162927i
\(756\) 91485.8i 0.160070i
\(757\) 952503.i 1.66217i −0.556147 0.831084i \(-0.687721\pi\)
0.556147 0.831084i \(-0.312279\pi\)
\(758\) 589511.i 1.02601i
\(759\) 68827.5 + 172676.i 0.119475 + 0.299743i
\(760\) −366947. −0.635296
\(761\) −332609. −0.574335 −0.287167 0.957880i \(-0.592714\pi\)
−0.287167 + 0.957880i \(0.592714\pi\)
\(762\) 398991. 0.687152
\(763\) −547831. −0.941018
\(764\) 518366.i 0.888076i
\(765\) 41717.6 0.0712846
\(766\) 337232.i 0.574739i
\(767\) 537943. 0.914420
\(768\) 21283.4 0.0360844
\(769\) 481757.i 0.814658i 0.913281 + 0.407329i \(0.133540\pi\)
−0.913281 + 0.407329i \(0.866460\pi\)
\(770\) 539213.i 0.909450i
\(771\) 243318. 0.409322
\(772\) 163564. 0.274444
\(773\) 516049.i 0.863638i 0.901960 + 0.431819i \(0.142128\pi\)
−0.901960 + 0.431819i \(0.857872\pi\)
\(774\) 204484.i 0.341332i
\(775\) 956164. 1.59195
\(776\) 21292.0i 0.0353584i
\(777\) −311744. −0.516365
\(778\) 589589.i 0.974070i
\(779\) 140231.i 0.231084i
\(780\) 455549.i 0.748765i
\(781\) 364888.i 0.598215i
\(782\) −24750.4 62094.6i −0.0404733 0.101541i
\(783\) −32096.6 −0.0523523
\(784\) −271558. −0.441805
\(785\) −605230. −0.982158
\(786\) 359383. 0.581718
\(787\) 48857.7i 0.0788831i 0.999222 + 0.0394415i \(0.0125579\pi\)
−0.999222 + 0.0394415i \(0.987442\pi\)
\(788\) −100832. −0.162386
\(789\) 684154.i 1.09901i
\(790\) 453844. 0.727198
\(791\) −35228.7 −0.0563046
\(792\) 41315.5i 0.0658662i
\(793\) 1.99212e6i 3.16788i
\(794\) −5488.35 −0.00870564
\(795\) 25695.1 0.0406552
\(796\) 19447.0i 0.0306921i
\(797\) 67546.8i 0.106338i 0.998586 + 0.0531690i \(0.0169322\pi\)
−0.998586 + 0.0531690i \(0.983068\pi\)
\(798\) −561733. −0.882113
\(799\) 154666.i 0.242270i
\(800\) 103380. 0.161531
\(801\) 103929.i 0.161984i
\(802\) 626033.i 0.973304i
\(803\) 74974.0i 0.116273i
\(804\) 106693.i 0.165053i
\(805\) −1.38528e6 + 552163.i −2.13770 + 0.852071i
\(806\) −1.50053e6 −2.30980
\(807\) 84767.2 0.130161
\(808\) 34906.4 0.0534666
\(809\) 853381. 1.30391 0.651953 0.758260i \(-0.273950\pi\)
0.651953 + 0.758260i \(0.273950\pi\)
\(810\) 71310.9i 0.108689i
\(811\) −584283. −0.888344 −0.444172 0.895942i \(-0.646502\pi\)
−0.444172 + 0.895942i \(0.646502\pi\)
\(812\) 149184.i 0.226261i
\(813\) 448239. 0.678155
\(814\) −140785. −0.212475
\(815\) 762569.i 1.14806i
\(816\) 14857.1i 0.0223127i
\(817\) 1.25556e6 1.88101
\(818\) −433798. −0.648307
\(819\) 697367.i 1.03966i
\(820\) 82743.5i 0.123057i
\(821\) −681669. −1.01132 −0.505658 0.862734i \(-0.668750\pi\)
−0.505658 + 0.862734i \(0.668750\pi\)
\(822\) 366436.i 0.542319i
\(823\) 830671. 1.22639 0.613196 0.789931i \(-0.289884\pi\)
0.613196 + 0.789931i \(0.289884\pi\)
\(824\) 283514.i 0.417562i
\(825\) 200681.i 0.294849i
\(826\) 391399.i 0.573667i
\(827\) 164064.i 0.239885i −0.992781 0.119942i \(-0.961729\pi\)
0.992781 0.119942i \(-0.0382710\pi\)
\(828\) 106143. 42307.7i 0.154821 0.0617105i
\(829\) −11061.6 −0.0160956 −0.00804780 0.999968i \(-0.502562\pi\)
−0.00804780 + 0.999968i \(0.502562\pi\)
\(830\) 1.25641e6 1.82379
\(831\) 513608. 0.743755
\(832\) −162237. −0.234370
\(833\) 189563.i 0.273190i
\(834\) −182560. −0.262466
\(835\) 370777.i 0.531790i
\(836\) −253682. −0.362975
\(837\) −234891. −0.335286
\(838\) 722137.i 1.02833i
\(839\) 1.01500e6i 1.44192i −0.692978 0.720959i \(-0.743702\pi\)
0.692978 0.720959i \(-0.256298\pi\)
\(840\) 331450. 0.469742
\(841\) −654942. −0.925999
\(842\) 245076.i 0.345682i
\(843\) 40833.0i 0.0574588i
\(844\) 362157. 0.508407
\(845\) 2.48473e6i 3.47989i
\(846\) −264382. −0.369394
\(847\) 820633.i 1.14388i
\(848\) 9150.93i 0.0127255i
\(849\) 519752.i 0.721075i
\(850\) 72165.2i 0.0998826i
\(851\) −144167. 361689.i −0.199070 0.499432i
\(852\) 224294. 0.308985
\(853\) −694837. −0.954960 −0.477480 0.878643i \(-0.658450\pi\)
−0.477480 + 0.878643i \(0.658450\pi\)
\(854\) 1.44943e6 1.98739
\(855\) 437857. 0.598963
\(856\) 303044.i 0.413579i
\(857\) 816252. 1.11138 0.555690 0.831389i \(-0.312454\pi\)
0.555690 + 0.831389i \(0.312454\pi\)
\(858\) 314935.i 0.427805i
\(859\) −568625. −0.770619 −0.385309 0.922787i \(-0.625905\pi\)
−0.385309 + 0.922787i \(0.625905\pi\)
\(860\) −740840. −1.00168
\(861\) 126666.i 0.170865i
\(862\) 938795.i 1.26344i
\(863\) 1.05589e6 1.41774 0.708870 0.705339i \(-0.249205\pi\)
0.708870 + 0.705339i \(0.249205\pi\)
\(864\) −25396.3 −0.0340207
\(865\) 1.56860e6i 2.09642i
\(866\) 40327.6i 0.0537734i
\(867\) 423617. 0.563553
\(868\) 1.09176e6i 1.44907i
\(869\) 313756. 0.415483
\(870\) 116285.i 0.153633i
\(871\) 813287.i 1.07203i
\(872\) 152077.i 0.200000i
\(873\) 25406.5i 0.0333362i
\(874\) −259774. 651729.i −0.340074 0.853187i
\(875\) −151949. −0.198464
\(876\) 46086.0 0.0600565
\(877\) 194231. 0.252533 0.126267 0.991996i \(-0.459701\pi\)
0.126267 + 0.991996i \(0.459701\pi\)
\(878\) 184750. 0.239660
\(879\) 233530.i 0.302249i
\(880\) 149685. 0.193291
\(881\) 529510.i 0.682217i −0.940024 0.341109i \(-0.889198\pi\)
0.940024 0.341109i \(-0.110802\pi\)
\(882\) 324035. 0.416538
\(883\) 892558. 1.14476 0.572381 0.819988i \(-0.306020\pi\)
0.572381 + 0.819988i \(0.306020\pi\)
\(884\) 113251.i 0.144923i
\(885\) 305086.i 0.389525i
\(886\) −858924. −1.09418
\(887\) 938546. 1.19291 0.596456 0.802646i \(-0.296575\pi\)
0.596456 + 0.802646i \(0.296575\pi\)
\(888\) 86539.7i 0.109746i
\(889\) 2.21286e6i 2.79995i
\(890\) −376533. −0.475360
\(891\) 49299.4i 0.0620992i
\(892\) 3327.82 0.00418244
\(893\) 1.62333e6i 2.03566i
\(894\) 270824.i 0.338853i
\(895\) 390765.i 0.487831i
\(896\) 118041.i 0.147034i
\(897\) −809093. + 322498.i −1.00557 + 0.400814i
\(898\) −837354. −1.03838
\(899\) 383031. 0.473931
\(900\) −123357. −0.152293
\(901\) −6387.88 −0.00786878
\(902\) 57203.1i 0.0703082i
\(903\) −1.13410e6 −1.39083
\(904\) 9779.44i 0.0119668i
\(905\) −1.10486e6 −1.34900
\(906\) 39466.7 0.0480811
\(907\) 854017.i 1.03813i 0.854735 + 0.519065i \(0.173720\pi\)
−0.854735 + 0.519065i \(0.826280\pi\)
\(908\) 86718.9i 0.105182i
\(909\) −41651.8 −0.0504088
\(910\) −2.52654e6 −3.05101
\(911\) 739645.i 0.891224i −0.895226 0.445612i \(-0.852986\pi\)
0.895226 0.445612i \(-0.147014\pi\)
\(912\) 155936.i 0.187481i
\(913\) 868592. 1.04202
\(914\) 323882.i 0.387699i
\(915\) −1.12980e6 −1.34946
\(916\) 489637.i 0.583557i
\(917\) 1.99319e6i 2.37034i
\(918\) 17728.1i 0.0210367i
\(919\) 777357.i 0.920427i −0.887808 0.460213i \(-0.847773\pi\)
0.887808 0.460213i \(-0.152227\pi\)
\(920\) 153280. + 384553.i 0.181096 + 0.454339i
\(921\) −691091. −0.814734
\(922\) −197738. −0.232610
\(923\) −1.70972e6 −2.00688
\(924\) 229142. 0.268386
\(925\) 420349.i 0.491277i
\(926\) 378084. 0.440926
\(927\) 338301.i 0.393681i
\(928\) 41413.2 0.0480886
\(929\) 1.28666e6 1.49084 0.745422 0.666592i \(-0.232248\pi\)
0.745422 + 0.666592i \(0.232248\pi\)
\(930\) 851003.i 0.983933i
\(931\) 1.98961e6i 2.29545i
\(932\) 573867. 0.660662
\(933\) −202137. −0.232211
\(934\) 54106.2i 0.0620231i
\(935\) 104489.i 0.119521i
\(936\) 193588. 0.220967
\(937\) 713777.i 0.812987i −0.913654 0.406493i \(-0.866751\pi\)
0.913654 0.406493i \(-0.133249\pi\)
\(938\) −591735. −0.672546
\(939\) 820450.i 0.930510i
\(940\) 957846.i 1.08403i
\(941\) 1.38256e6i 1.56137i 0.624927 + 0.780683i \(0.285129\pi\)
−0.624927 + 0.780683i \(0.714871\pi\)
\(942\) 257196.i 0.289843i
\(943\) −146959. + 58576.9i −0.165262 + 0.0658723i
\(944\) −108652. −0.121925
\(945\) −395501. −0.442877
\(946\) −512165. −0.572305
\(947\) −610787. −0.681067 −0.340533 0.940232i \(-0.610608\pi\)
−0.340533 + 0.940232i \(0.610608\pi\)
\(948\) 192864.i 0.214602i
\(949\) −351298. −0.390071
\(950\) 757428.i 0.839255i
\(951\) 202220. 0.223596
\(952\) −82399.5 −0.0909182
\(953\) 746406.i 0.821843i −0.911671 0.410922i \(-0.865207\pi\)
0.911671 0.410922i \(-0.134793\pi\)
\(954\) 10919.3i 0.0119977i
\(955\) −2.24094e6 −2.45710
\(956\) −336108. −0.367759
\(957\) 80391.4i 0.0877780i
\(958\) 547277.i 0.596316i
\(959\) 2.03231e6 2.20980
\(960\) 92010.1i 0.0998373i
\(961\) 1.87960e6 2.03525
\(962\) 659664.i 0.712809i
\(963\) 361605.i 0.389926i
\(964\) 264414.i 0.284531i
\(965\) 707102.i 0.759324i
\(966\) 234645. + 588684.i 0.251453 + 0.630853i
\(967\) 110775. 0.118464 0.0592322 0.998244i \(-0.481135\pi\)
0.0592322 + 0.998244i \(0.481135\pi\)
\(968\) −227806. −0.243117
\(969\) −108852. −0.115929
\(970\) 92046.9 0.0978286
\(971\) 1.13722e6i 1.20616i 0.797681 + 0.603080i \(0.206060\pi\)
−0.797681 + 0.603080i \(0.793940\pi\)
\(972\) 30304.0 0.0320750
\(973\) 1.01250e6i 1.06947i
\(974\) −934939. −0.985520
\(975\) 940313. 0.989153
\(976\) 402361.i 0.422392i
\(977\) 343214.i 0.359564i 0.983706 + 0.179782i \(0.0575392\pi\)
−0.983706 + 0.179782i \(0.942461\pi\)
\(978\) 324058. 0.338801
\(979\) −260308. −0.271595
\(980\) 1.17397e6i 1.22237i
\(981\) 181465.i 0.188562i
\(982\) 12943.1 0.0134220
\(983\) 1.41908e6i 1.46859i 0.678832 + 0.734293i \(0.262486\pi\)
−0.678832 + 0.734293i \(0.737514\pi\)
\(984\) 35162.3 0.0363151
\(985\) 435906.i 0.449284i
\(986\) 28908.8i 0.0297356i
\(987\) 1.46630e6i 1.50518i
\(988\) 1.18865e6i 1.21770i
\(989\) −524465. 1.31579e6i −0.536197 1.34523i
\(990\) −178610. −0.182237
\(991\) 147325. 0.150013 0.0750065 0.997183i \(-0.476102\pi\)
0.0750065 + 0.997183i \(0.476102\pi\)
\(992\) 303072. 0.307980
\(993\) −625487. −0.634337
\(994\) 1.24396e6i 1.25903i
\(995\) −84070.9 −0.0849180
\(996\) 533917.i 0.538214i
\(997\) −289452. −0.291196 −0.145598 0.989344i \(-0.546511\pi\)
−0.145598 + 0.989344i \(0.546511\pi\)
\(998\) 724998. 0.727907
\(999\) 103263.i 0.103470i
Display \(a_p\) with \(p\) up to: 50 250 1000 (See \(a_n\) instead) (See \(a_n\) instead) (See \(a_n\) instead) Display \(a_n\) with \(n\) up to: 50 250 1000 (See only \(a_p\)) (See only \(a_p\)) (See only \(a_p\))

Twists

       By twisting character
Char Parity Ord Type Twist Min Dim
1.1 even 1 trivial 138.5.b.a.91.5 16
3.2 odd 2 414.5.b.b.91.16 16
4.3 odd 2 1104.5.c.a.1057.1 16
23.22 odd 2 inner 138.5.b.a.91.8 yes 16
69.68 even 2 414.5.b.b.91.9 16
92.91 even 2 1104.5.c.a.1057.8 16
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
138.5.b.a.91.5 16 1.1 even 1 trivial
138.5.b.a.91.8 yes 16 23.22 odd 2 inner
414.5.b.b.91.9 16 69.68 even 2
414.5.b.b.91.16 16 3.2 odd 2
1104.5.c.a.1057.1 16 4.3 odd 2
1104.5.c.a.1057.8 16 92.91 even 2