Properties

Label 1.86.a.a.1.5
Level $1$
Weight $86$
Character 1.1
Self dual yes
Analytic conductor $45.755$
Analytic rank $1$
Dimension $6$
CM no
Inner twists $1$

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Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms
 
[N,k,chi] = [1,86,Mod(1,1)]
 
mf = mfinit([N,k,chi],0)
 
lf = mfeigenbasis(mf)
 
from sage.modular.dirichlet import DirichletCharacter
 
H = DirichletGroup(1, base_ring=CyclotomicField(1))
 
chi = DirichletCharacter(H, H._module([]))
 
N = Newforms(chi, 86, names="a")
 
//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code
 
chi := DirichletCharacter("1.1");
 
S:= CuspForms(chi, 86);
 
N := Newforms(S);
 
Level: \( N \) \(=\) \( 1 \)
Weight: \( k \) \(=\) \( 86 \)
Character orbit: \([\chi]\) \(=\) 1.a (trivial)

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: yes
Analytic conductor: \(45.7549576907\)
Analytic rank: \(1\)
Dimension: \(6\)
Coefficient field: \(\mathbb{Q}[x]/(x^{6} - \cdots)\)
comment: defining polynomial
 
gp: f.mod \\ as an extension of the character field
 
Defining polynomial: \( x^{6} - 3 x^{5} + \cdots - 17\!\cdots\!50 \) Copy content Toggle raw display
Coefficient ring: \(\Z[a_1, \ldots, a_{5}]\)
Coefficient ring index: \( 2^{65}\cdot 3^{23}\cdot 5^{6}\cdot 7^{3}\cdot 11\cdot 17^{2} \)
Twist minimal: yes
Fricke sign: \(1\)
Sato-Tate group: $\mathrm{SU}(2)$

Embedding invariants

Embedding label 1.5
Root \(8.03621e10\) of defining polynomial
Character \(\chi\) \(=\) 1.1

$q$-expansion

comment: q-expansion
 
sage: f.q_expansion() # note that sage often uses an isomorphic number field
 
gp: mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q+7.11528e12 q^{2} +1.40385e20 q^{3} +1.19416e25 q^{4} +1.39389e29 q^{5} +9.98881e32 q^{6} -1.69824e35 q^{7} -1.90292e38 q^{8} -1.62095e40 q^{9} +O(q^{10})\) \(q+7.11528e12 q^{2} +1.40385e20 q^{3} +1.19416e25 q^{4} +1.39389e29 q^{5} +9.98881e32 q^{6} -1.69824e35 q^{7} -1.90292e38 q^{8} -1.62095e40 q^{9} +9.91791e41 q^{10} -1.22442e44 q^{11} +1.67642e45 q^{12} -1.14869e47 q^{13} -1.20835e48 q^{14} +1.95682e49 q^{15} -1.81594e51 q^{16} -7.63802e51 q^{17} -1.15335e53 q^{18} +1.44057e54 q^{19} +1.66452e54 q^{20} -2.38408e55 q^{21} -8.71207e56 q^{22} -9.42435e57 q^{23} -2.67142e58 q^{24} -2.39065e59 q^{25} -8.17328e59 q^{26} -7.31787e60 q^{27} -2.02796e60 q^{28} +2.61757e62 q^{29} +1.39233e62 q^{30} +1.28619e63 q^{31} -5.55940e63 q^{32} -1.71890e64 q^{33} -5.43466e64 q^{34} -2.36716e64 q^{35} -1.93566e65 q^{36} +3.23546e66 q^{37} +1.02500e67 q^{38} -1.61260e67 q^{39} -2.65245e67 q^{40} -5.86119e68 q^{41} -1.69634e68 q^{42} +2.22405e69 q^{43} -1.46215e69 q^{44} -2.25942e69 q^{45} -6.70569e70 q^{46} -1.28917e71 q^{47} -2.54932e71 q^{48} -6.52452e71 q^{49} -1.70101e72 q^{50} -1.07227e72 q^{51} -1.37172e72 q^{52} -1.71828e73 q^{53} -5.20687e73 q^{54} -1.70670e73 q^{55} +3.23161e73 q^{56} +2.02235e74 q^{57} +1.86247e75 q^{58} +1.15535e75 q^{59} +2.33674e74 q^{60} -2.68706e75 q^{61} +9.15160e75 q^{62} +2.75276e75 q^{63} +3.06943e76 q^{64} -1.60115e76 q^{65} -1.22305e77 q^{66} -6.45785e77 q^{67} -9.12098e76 q^{68} -1.32304e78 q^{69} -1.68430e77 q^{70} +1.20251e78 q^{71} +3.08453e78 q^{72} +2.24741e79 q^{73} +2.30212e79 q^{74} -3.35612e79 q^{75} +1.72026e79 q^{76} +2.07936e79 q^{77} -1.14741e80 q^{78} +4.39089e80 q^{79} -2.53123e80 q^{80} -4.45118e80 q^{81} -4.17040e81 q^{82} -1.12159e81 q^{83} -2.84697e80 q^{84} -1.06466e81 q^{85} +1.58247e82 q^{86} +3.67468e82 q^{87} +2.32996e82 q^{88} -1.84370e82 q^{89} -1.60764e82 q^{90} +1.95076e82 q^{91} -1.12541e83 q^{92} +1.80562e83 q^{93} -9.17279e83 q^{94} +2.00799e83 q^{95} -7.80458e83 q^{96} +1.25383e84 q^{97} -4.64238e84 q^{98} +1.98472e84 q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 6 q - 3596910688800 q^{2} - 15\!\cdots\!00 q^{3}+ \cdots + 57\!\cdots\!38 q^{9}+O(q^{10}) \) Copy content Toggle raw display \( 6 q - 3596910688800 q^{2} - 15\!\cdots\!00 q^{3}+ \cdots + 14\!\cdots\!76 q^{99}+O(q^{100}) \) Copy content Toggle raw display

Display 100 coefficients 10 coefficients

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:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) 7.11528e12 1.14398 0.571988 0.820262i \(-0.306172\pi\)
0.571988 + 0.820262i \(0.306172\pi\)
\(3\) 1.40385e20 0.740745 0.370372 0.928883i \(-0.379230\pi\)
0.370372 + 0.928883i \(0.379230\pi\)
\(4\) 1.19416e25 0.308682
\(5\) 1.39389e29 0.274159 0.137080 0.990560i \(-0.456228\pi\)
0.137080 + 0.990560i \(0.456228\pi\)
\(6\) 9.98881e32 0.847395
\(7\) −1.69824e35 −0.205747 −0.102873 0.994694i \(-0.532804\pi\)
−0.102873 + 0.994694i \(0.532804\pi\)
\(8\) −1.90292e38 −0.790852
\(9\) −1.62095e40 −0.451297
\(10\) 9.91791e41 0.313632
\(11\) −1.22442e44 −0.674125 −0.337063 0.941482i \(-0.609433\pi\)
−0.337063 + 0.941482i \(0.609433\pi\)
\(12\) 1.67642e45 0.228655
\(13\) −1.14869e47 −0.521930 −0.260965 0.965348i \(-0.584041\pi\)
−0.260965 + 0.965348i \(0.584041\pi\)
\(14\) −1.20835e48 −0.235369
\(15\) 1.95682e49 0.203082
\(16\) −1.81594e51 −1.21340
\(17\) −7.63802e51 −0.388062 −0.194031 0.980995i \(-0.562156\pi\)
−0.194031 + 0.980995i \(0.562156\pi\)
\(18\) −1.15335e53 −0.516273
\(19\) 1.44057e54 0.647896 0.323948 0.946075i \(-0.394990\pi\)
0.323948 + 0.946075i \(0.394990\pi\)
\(20\) 1.66452e54 0.0846281
\(21\) −2.38408e55 −0.152406
\(22\) −8.71207e56 −0.771183
\(23\) −9.42435e57 −1.26130 −0.630650 0.776067i \(-0.717212\pi\)
−0.630650 + 0.776067i \(0.717212\pi\)
\(24\) −2.67142e58 −0.585819
\(25\) −2.39065e59 −0.924837
\(26\) −8.17328e59 −0.597075
\(27\) −7.31787e60 −1.07504
\(28\) −2.02796e60 −0.0635103
\(29\) 2.61757e62 1.84494 0.922471 0.386067i \(-0.126167\pi\)
0.922471 + 0.386067i \(0.126167\pi\)
\(30\) 1.39233e62 0.232321
\(31\) 1.28619e63 0.532639 0.266320 0.963885i \(-0.414192\pi\)
0.266320 + 0.963885i \(0.414192\pi\)
\(32\) −5.55940e63 −0.597246
\(33\) −1.71890e64 −0.499355
\(34\) −5.43466e64 −0.443934
\(35\) −2.36716e64 −0.0564074
\(36\) −1.93566e65 −0.139307
\(37\) 3.23546e66 0.726713 0.363356 0.931650i \(-0.381631\pi\)
0.363356 + 0.931650i \(0.381631\pi\)
\(38\) 1.02500e67 0.741178
\(39\) −1.61260e67 −0.386617
\(40\) −2.65245e67 −0.216819
\(41\) −5.86119e68 −1.67754 −0.838768 0.544489i \(-0.816724\pi\)
−0.838768 + 0.544489i \(0.816724\pi\)
\(42\) −1.69634e68 −0.174349
\(43\) 2.22405e69 0.840883 0.420441 0.907320i \(-0.361875\pi\)
0.420441 + 0.907320i \(0.361875\pi\)
\(44\) −1.46215e69 −0.208090
\(45\) −2.25942e69 −0.123727
\(46\) −6.70569e70 −1.44290
\(47\) −1.28917e71 −1.11212 −0.556059 0.831143i \(-0.687687\pi\)
−0.556059 + 0.831143i \(0.687687\pi\)
\(48\) −2.54932e71 −0.898818
\(49\) −6.52452e71 −0.957668
\(50\) −1.70101e72 −1.05799
\(51\) −1.07227e72 −0.287455
\(52\) −1.37172e72 −0.161110
\(53\) −1.71828e73 −0.898195 −0.449097 0.893483i \(-0.648254\pi\)
−0.449097 + 0.893483i \(0.648254\pi\)
\(54\) −5.20687e73 −1.22982
\(55\) −1.70670e73 −0.184818
\(56\) 3.23161e73 0.162715
\(57\) 2.02235e74 0.479926
\(58\) 1.86247e75 2.11057
\(59\) 1.15535e75 0.633144 0.316572 0.948568i \(-0.397468\pi\)
0.316572 + 0.948568i \(0.397468\pi\)
\(60\) 2.33674e74 0.0626878
\(61\) −2.68706e75 −0.357075 −0.178538 0.983933i \(-0.557137\pi\)
−0.178538 + 0.983933i \(0.557137\pi\)
\(62\) 9.15160e75 0.609327
\(63\) 2.75276e75 0.0928529
\(64\) 3.06943e76 0.530162
\(65\) −1.60115e76 −0.143092
\(66\) −1.22305e77 −0.571250
\(67\) −6.45785e77 −1.59187 −0.795937 0.605380i \(-0.793021\pi\)
−0.795937 + 0.605380i \(0.793021\pi\)
\(68\) −9.12098e76 −0.119788
\(69\) −1.32304e78 −0.934301
\(70\) −1.68430e77 −0.0645287
\(71\) 1.20251e78 0.252121 0.126060 0.992023i \(-0.459767\pi\)
0.126060 + 0.992023i \(0.459767\pi\)
\(72\) 3.08453e78 0.356909
\(73\) 2.24741e79 1.44697 0.723486 0.690339i \(-0.242538\pi\)
0.723486 + 0.690339i \(0.242538\pi\)
\(74\) 2.30212e79 0.831342
\(75\) −3.35612e79 −0.685068
\(76\) 1.72026e79 0.199994
\(77\) 2.07936e79 0.138699
\(78\) −1.14741e80 −0.442280
\(79\) 4.39089e80 0.984921 0.492461 0.870335i \(-0.336098\pi\)
0.492461 + 0.870335i \(0.336098\pi\)
\(80\) −2.53123e80 −0.332664
\(81\) −4.45118e80 −0.345034
\(82\) −4.17040e81 −1.91906
\(83\) −1.12159e81 −0.308331 −0.154165 0.988045i \(-0.549269\pi\)
−0.154165 + 0.988045i \(0.549269\pi\)
\(84\) −2.84697e80 −0.0470449
\(85\) −1.06466e81 −0.106391
\(86\) 1.58247e82 0.961950
\(87\) 3.67468e82 1.36663
\(88\) 2.32996e82 0.533133
\(89\) −1.84370e82 −0.260984 −0.130492 0.991449i \(-0.541656\pi\)
−0.130492 + 0.991449i \(0.541656\pi\)
\(90\) −1.60764e82 −0.141541
\(91\) 1.95076e82 0.107385
\(92\) −1.12541e83 −0.389340
\(93\) 1.80562e83 0.394550
\(94\) −9.17279e83 −1.27224
\(95\) 2.00799e83 0.177627
\(96\) −7.80458e83 −0.442407
\(97\) 1.25383e84 0.457551 0.228775 0.973479i \(-0.426528\pi\)
0.228775 + 0.973479i \(0.426528\pi\)
\(98\) −4.64238e84 −1.09555
\(99\) 1.98472e84 0.304231
\(100\) −2.85480e84 −0.285480
\(101\) 2.18173e85 1.42936 0.714682 0.699450i \(-0.246571\pi\)
0.714682 + 0.699450i \(0.246571\pi\)
\(102\) −7.62947e84 −0.328842
\(103\) 6.05830e85 1.72492 0.862459 0.506127i \(-0.168923\pi\)
0.862459 + 0.506127i \(0.168923\pi\)
\(104\) 2.18587e85 0.412769
\(105\) −3.32315e84 −0.0417835
\(106\) −1.22261e86 −1.02751
\(107\) −2.90227e86 −1.63654 −0.818272 0.574831i \(-0.805068\pi\)
−0.818272 + 0.574831i \(0.805068\pi\)
\(108\) −8.73868e85 −0.331846
\(109\) 1.20378e86 0.308973 0.154487 0.987995i \(-0.450628\pi\)
0.154487 + 0.987995i \(0.450628\pi\)
\(110\) −1.21437e86 −0.211427
\(111\) 4.54211e86 0.538309
\(112\) 3.08391e86 0.249652
\(113\) −6.56433e86 −0.364214 −0.182107 0.983279i \(-0.558292\pi\)
−0.182107 + 0.983279i \(0.558292\pi\)
\(114\) 1.43896e87 0.549024
\(115\) −1.31365e87 −0.345797
\(116\) 3.12578e87 0.569500
\(117\) 1.86197e87 0.235545
\(118\) 8.22062e87 0.724302
\(119\) 1.29712e87 0.0798425
\(120\) −3.72366e87 −0.160608
\(121\) −1.79977e88 −0.545555
\(122\) −1.91192e88 −0.408486
\(123\) −8.22825e88 −1.24263
\(124\) 1.53591e88 0.164416
\(125\) −6.93542e88 −0.527712
\(126\) 1.95867e88 0.106221
\(127\) 8.74949e88 0.339097 0.169549 0.985522i \(-0.445769\pi\)
0.169549 + 0.985522i \(0.445769\pi\)
\(128\) 4.33467e89 1.20374
\(129\) 3.12224e89 0.622880
\(130\) −1.13927e89 −0.163694
\(131\) 8.56820e89 0.888913 0.444457 0.895800i \(-0.353397\pi\)
0.444457 + 0.895800i \(0.353397\pi\)
\(132\) −2.05264e89 −0.154142
\(133\) −2.44643e89 −0.133303
\(134\) −4.59494e90 −1.82107
\(135\) −1.02003e90 −0.294733
\(136\) 1.45345e90 0.306900
\(137\) 7.75141e90 1.19883 0.599414 0.800439i \(-0.295400\pi\)
0.599414 + 0.800439i \(0.295400\pi\)
\(138\) −9.41380e90 −1.06882
\(139\) 7.88623e89 0.0658780 0.0329390 0.999457i \(-0.489513\pi\)
0.0329390 + 0.999457i \(0.489513\pi\)
\(140\) −2.82676e89 −0.0174119
\(141\) −1.80980e91 −0.823796
\(142\) 8.55619e90 0.288420
\(143\) 1.40648e91 0.351846
\(144\) 2.94355e91 0.547603
\(145\) 3.64860e91 0.505808
\(146\) 1.59909e92 1.65530
\(147\) −9.15947e91 −0.709388
\(148\) 3.86364e91 0.224323
\(149\) −2.75011e92 −1.19932 −0.599658 0.800256i \(-0.704697\pi\)
−0.599658 + 0.800256i \(0.704697\pi\)
\(150\) −2.38797e92 −0.783702
\(151\) −1.77295e92 −0.438709 −0.219354 0.975645i \(-0.570395\pi\)
−0.219354 + 0.975645i \(0.570395\pi\)
\(152\) −2.74128e92 −0.512390
\(153\) 1.23808e92 0.175131
\(154\) 1.47952e92 0.158668
\(155\) 1.79281e92 0.146028
\(156\) −1.92569e92 −0.119342
\(157\) 2.44253e93 1.15373 0.576865 0.816839i \(-0.304276\pi\)
0.576865 + 0.816839i \(0.304276\pi\)
\(158\) 3.12424e93 1.12673
\(159\) −2.41222e93 −0.665333
\(160\) −7.74919e92 −0.163741
\(161\) 1.60048e93 0.259508
\(162\) −3.16714e93 −0.394711
\(163\) 2.66045e93 0.255259 0.127630 0.991822i \(-0.459263\pi\)
0.127630 + 0.991822i \(0.459263\pi\)
\(164\) −6.99917e93 −0.517825
\(165\) −2.39596e93 −0.136903
\(166\) −7.98045e93 −0.352723
\(167\) 5.71794e93 0.195789 0.0978947 0.995197i \(-0.468789\pi\)
0.0978947 + 0.995197i \(0.468789\pi\)
\(168\) 4.53671e93 0.120530
\(169\) −3.52429e94 −0.727589
\(170\) −7.57532e93 −0.121709
\(171\) −2.33509e94 −0.292394
\(172\) 2.65586e94 0.259565
\(173\) 9.58895e92 0.00732507 0.00366253 0.999993i \(-0.498834\pi\)
0.00366253 + 0.999993i \(0.498834\pi\)
\(174\) 2.61464e95 1.56339
\(175\) 4.05990e94 0.190282
\(176\) 2.22347e95 0.817982
\(177\) 1.62194e95 0.468998
\(178\) −1.31184e95 −0.298560
\(179\) −8.97189e95 −1.60927 −0.804637 0.593766i \(-0.797640\pi\)
−0.804637 + 0.593766i \(0.797640\pi\)
\(180\) −2.69810e94 −0.0381924
\(181\) −1.50309e96 −1.68130 −0.840652 0.541575i \(-0.817828\pi\)
−0.840652 + 0.541575i \(0.817828\pi\)
\(182\) 1.38802e95 0.122846
\(183\) −3.77224e95 −0.264502
\(184\) 1.79337e96 0.997501
\(185\) 4.50988e95 0.199235
\(186\) 1.28475e96 0.451356
\(187\) 9.35213e95 0.261603
\(188\) −1.53947e96 −0.343291
\(189\) 1.24275e96 0.221186
\(190\) 1.42874e96 0.203201
\(191\) 3.57988e96 0.407334 0.203667 0.979040i \(-0.434714\pi\)
0.203667 + 0.979040i \(0.434714\pi\)
\(192\) 4.30903e96 0.392715
\(193\) −1.43204e97 −1.04657 −0.523286 0.852157i \(-0.675294\pi\)
−0.523286 + 0.852157i \(0.675294\pi\)
\(194\) 8.92133e96 0.523427
\(195\) −2.24779e96 −0.105995
\(196\) −7.79129e96 −0.295615
\(197\) −4.64164e96 −0.141859 −0.0709295 0.997481i \(-0.522597\pi\)
−0.0709295 + 0.997481i \(0.522597\pi\)
\(198\) 1.41218e97 0.348033
\(199\) −9.05700e97 −1.80189 −0.900945 0.433932i \(-0.857126\pi\)
−0.900945 + 0.433932i \(0.857126\pi\)
\(200\) 4.54920e97 0.731408
\(201\) −9.06587e97 −1.17917
\(202\) 1.55236e98 1.63516
\(203\) −4.44526e97 −0.379591
\(204\) −1.28045e97 −0.0887322
\(205\) −8.16985e97 −0.459912
\(206\) 4.31065e98 1.97327
\(207\) 1.52764e98 0.569221
\(208\) 2.08596e98 0.633308
\(209\) −1.76386e98 −0.436763
\(210\) −2.36451e97 −0.0477993
\(211\) −9.30008e98 −1.53632 −0.768161 0.640257i \(-0.778828\pi\)
−0.768161 + 0.640257i \(0.778828\pi\)
\(212\) −2.05190e98 −0.277256
\(213\) 1.68815e98 0.186757
\(214\) −2.06505e99 −1.87217
\(215\) 3.10008e98 0.230536
\(216\) 1.39253e99 0.850198
\(217\) −2.18426e98 −0.109589
\(218\) 8.56522e98 0.353458
\(219\) 3.15503e99 1.07184
\(220\) −2.03807e98 −0.0570499
\(221\) 8.77375e98 0.202541
\(222\) 3.23184e99 0.615813
\(223\) −9.40091e99 −1.47984 −0.739918 0.672698i \(-0.765135\pi\)
−0.739918 + 0.672698i \(0.765135\pi\)
\(224\) 9.44120e98 0.122881
\(225\) 3.87511e99 0.417376
\(226\) −4.67070e99 −0.416652
\(227\) 1.83130e100 1.35413 0.677067 0.735921i \(-0.263251\pi\)
0.677067 + 0.735921i \(0.263251\pi\)
\(228\) 2.41500e99 0.148144
\(229\) −1.74672e100 −0.889640 −0.444820 0.895620i \(-0.646732\pi\)
−0.444820 + 0.895620i \(0.646732\pi\)
\(230\) −9.34699e99 −0.395584
\(231\) 2.91911e99 0.102741
\(232\) −4.98100e100 −1.45907
\(233\) −2.22863e99 −0.0543764 −0.0271882 0.999630i \(-0.508655\pi\)
−0.0271882 + 0.999630i \(0.508655\pi\)
\(234\) 1.32485e100 0.269458
\(235\) −1.79696e100 −0.304898
\(236\) 1.37967e100 0.195440
\(237\) 6.16417e100 0.729575
\(238\) 9.22937e99 0.0913380
\(239\) 2.06280e101 1.70823 0.854115 0.520084i \(-0.174100\pi\)
0.854115 + 0.520084i \(0.174100\pi\)
\(240\) −3.55347e100 −0.246419
\(241\) 1.83892e100 0.106866 0.0534330 0.998571i \(-0.482984\pi\)
0.0534330 + 0.998571i \(0.482984\pi\)
\(242\) −1.28059e101 −0.624102
\(243\) 2.00352e101 0.819459
\(244\) −3.20877e100 −0.110223
\(245\) −9.09446e100 −0.262554
\(246\) −5.85463e101 −1.42153
\(247\) −1.65477e101 −0.338156
\(248\) −2.44751e101 −0.421239
\(249\) −1.57455e101 −0.228394
\(250\) −4.93474e101 −0.603690
\(251\) 1.14623e102 1.18342 0.591708 0.806153i \(-0.298454\pi\)
0.591708 + 0.806153i \(0.298454\pi\)
\(252\) 3.28723e100 0.0286620
\(253\) 1.15393e102 0.850274
\(254\) 6.22550e101 0.387919
\(255\) −1.49462e101 −0.0788086
\(256\) 1.89681e102 0.846887
\(257\) −3.42715e102 −1.29651 −0.648255 0.761424i \(-0.724501\pi\)
−0.648255 + 0.761424i \(0.724501\pi\)
\(258\) 2.22156e102 0.712560
\(259\) −5.49459e101 −0.149519
\(260\) −1.91203e101 −0.0441699
\(261\) −4.24294e102 −0.832617
\(262\) 6.09651e102 1.01690
\(263\) −3.14379e102 −0.445999 −0.222999 0.974819i \(-0.571585\pi\)
−0.222999 + 0.974819i \(0.571585\pi\)
\(264\) 3.27093e102 0.394916
\(265\) −2.39510e102 −0.246249
\(266\) −1.74070e102 −0.152495
\(267\) −2.58828e102 −0.193323
\(268\) −7.71167e102 −0.491383
\(269\) −2.58659e103 −1.40687 −0.703437 0.710757i \(-0.748352\pi\)
−0.703437 + 0.710757i \(0.748352\pi\)
\(270\) −7.25780e102 −0.337167
\(271\) 2.55238e103 1.01333 0.506664 0.862143i \(-0.330878\pi\)
0.506664 + 0.862143i \(0.330878\pi\)
\(272\) 1.38702e103 0.470874
\(273\) 2.73858e102 0.0795451
\(274\) 5.51535e103 1.37143
\(275\) 2.92715e103 0.623456
\(276\) −1.57992e103 −0.288402
\(277\) 3.45051e103 0.540123 0.270062 0.962843i \(-0.412956\pi\)
0.270062 + 0.962843i \(0.412956\pi\)
\(278\) 5.61127e102 0.0753629
\(279\) −2.08485e103 −0.240379
\(280\) 4.50451e102 0.0446099
\(281\) −1.83487e104 −1.56166 −0.780832 0.624741i \(-0.785204\pi\)
−0.780832 + 0.624741i \(0.785204\pi\)
\(282\) −1.28773e104 −0.942403
\(283\) −5.24976e103 −0.330534 −0.165267 0.986249i \(-0.552849\pi\)
−0.165267 + 0.986249i \(0.552849\pi\)
\(284\) 1.43598e103 0.0778251
\(285\) 2.81893e103 0.131576
\(286\) 1.00075e104 0.402503
\(287\) 9.95372e103 0.345147
\(288\) 9.01149e103 0.269536
\(289\) −3.29060e104 −0.849408
\(290\) 2.59608e104 0.578633
\(291\) 1.76019e104 0.338928
\(292\) 2.68375e104 0.446654
\(293\) 8.07040e104 1.16150 0.580752 0.814080i \(-0.302758\pi\)
0.580752 + 0.814080i \(0.302758\pi\)
\(294\) −6.51722e104 −0.811523
\(295\) 1.61043e104 0.173582
\(296\) −6.15681e104 −0.574722
\(297\) 8.96014e104 0.724712
\(298\) −1.95678e105 −1.37199
\(299\) 1.08257e105 0.658310
\(300\) −4.00773e104 −0.211468
\(301\) −3.77698e104 −0.173009
\(302\) −1.26150e105 −0.501872
\(303\) 3.06283e105 1.05879
\(304\) −2.61599e105 −0.786156
\(305\) −3.74547e104 −0.0978956
\(306\) 8.80931e104 0.200346
\(307\) −8.52700e105 −1.68817 −0.844083 0.536212i \(-0.819855\pi\)
−0.844083 + 0.536212i \(0.819855\pi\)
\(308\) 2.48308e104 0.0428139
\(309\) 8.50497e105 1.27772
\(310\) 1.27563e105 0.167053
\(311\) −1.59550e105 −0.182214 −0.0911068 0.995841i \(-0.529040\pi\)
−0.0911068 + 0.995841i \(0.529040\pi\)
\(312\) 3.06864e105 0.305756
\(313\) 1.11133e106 0.966520 0.483260 0.875477i \(-0.339453\pi\)
0.483260 + 0.875477i \(0.339453\pi\)
\(314\) 1.73793e106 1.31984
\(315\) 3.83705e104 0.0254565
\(316\) 5.24341e105 0.304027
\(317\) −1.62917e106 −0.825939 −0.412969 0.910745i \(-0.635508\pi\)
−0.412969 + 0.910745i \(0.635508\pi\)
\(318\) −1.71636e106 −0.761125
\(319\) −3.20499e106 −1.24372
\(320\) 4.27844e105 0.145349
\(321\) −4.07437e106 −1.21226
\(322\) 1.13879e106 0.296871
\(323\) −1.10031e106 −0.251424
\(324\) −5.31540e105 −0.106506
\(325\) 2.74612e106 0.482700
\(326\) 1.89298e106 0.292011
\(327\) 1.68993e106 0.228870
\(328\) 1.11533e107 1.32668
\(329\) 2.18932e106 0.228815
\(330\) −1.70479e106 −0.156614
\(331\) −1.53912e106 −0.124332 −0.0621660 0.998066i \(-0.519801\pi\)
−0.0621660 + 0.998066i \(0.519801\pi\)
\(332\) −1.33936e106 −0.0951761
\(333\) −5.24451e106 −0.327963
\(334\) 4.06847e106 0.223978
\(335\) −9.00153e106 −0.436427
\(336\) 4.32936e106 0.184929
\(337\) 2.65042e107 0.997800 0.498900 0.866660i \(-0.333738\pi\)
0.498900 + 0.866660i \(0.333738\pi\)
\(338\) −2.50763e107 −0.832345
\(339\) −9.21536e106 −0.269789
\(340\) −1.27136e106 −0.0328410
\(341\) −1.57483e107 −0.359066
\(342\) −1.66148e107 −0.334491
\(343\) 2.26502e107 0.402784
\(344\) −4.23218e107 −0.665014
\(345\) −1.84417e107 −0.256148
\(346\) 6.82281e105 0.00837971
\(347\) 2.48808e107 0.270309 0.135155 0.990825i \(-0.456847\pi\)
0.135155 + 0.990825i \(0.456847\pi\)
\(348\) 4.38814e107 0.421854
\(349\) −2.04544e107 −0.174062 −0.0870312 0.996206i \(-0.527738\pi\)
−0.0870312 + 0.996206i \(0.527738\pi\)
\(350\) 2.88873e107 0.217678
\(351\) 8.40600e107 0.561096
\(352\) 6.80702e107 0.402619
\(353\) 6.16575e107 0.323267 0.161633 0.986851i \(-0.448324\pi\)
0.161633 + 0.986851i \(0.448324\pi\)
\(354\) 1.15406e108 0.536523
\(355\) 1.67617e107 0.0691213
\(356\) −2.20166e107 −0.0805611
\(357\) 1.82097e107 0.0591429
\(358\) −6.38375e108 −1.84097
\(359\) 3.89780e108 0.998402 0.499201 0.866486i \(-0.333627\pi\)
0.499201 + 0.866486i \(0.333627\pi\)
\(360\) 4.29949e107 0.0978500
\(361\) −2.86851e108 −0.580230
\(362\) −1.06949e109 −1.92337
\(363\) −2.52661e108 −0.404117
\(364\) 2.32951e107 0.0331479
\(365\) 3.13264e108 0.396701
\(366\) −2.68406e108 −0.302584
\(367\) 9.42672e108 0.946352 0.473176 0.880968i \(-0.343107\pi\)
0.473176 + 0.880968i \(0.343107\pi\)
\(368\) 1.71141e109 1.53046
\(369\) 9.50068e108 0.757067
\(370\) 3.20890e108 0.227920
\(371\) 2.91806e108 0.184801
\(372\) 2.15619e108 0.121790
\(373\) −3.21783e109 −1.62158 −0.810789 0.585339i \(-0.800961\pi\)
−0.810789 + 0.585339i \(0.800961\pi\)
\(374\) 6.65430e108 0.299267
\(375\) −9.73632e108 −0.390900
\(376\) 2.45318e109 0.879520
\(377\) −3.00678e109 −0.962930
\(378\) 8.84253e108 0.253032
\(379\) −2.43214e109 −0.622046 −0.311023 0.950402i \(-0.600672\pi\)
−0.311023 + 0.950402i \(0.600672\pi\)
\(380\) 2.39785e108 0.0548302
\(381\) 1.22830e109 0.251185
\(382\) 2.54718e109 0.465980
\(383\) −6.35016e109 −1.03953 −0.519765 0.854309i \(-0.673981\pi\)
−0.519765 + 0.854309i \(0.673981\pi\)
\(384\) 6.08524e109 0.891663
\(385\) 2.89840e108 0.0380257
\(386\) −1.01894e110 −1.19725
\(387\) −3.60507e109 −0.379488
\(388\) 1.49726e109 0.141238
\(389\) 3.92520e109 0.331897 0.165949 0.986134i \(-0.446931\pi\)
0.165949 + 0.986134i \(0.446931\pi\)
\(390\) −1.59936e109 −0.121255
\(391\) 7.19833e109 0.489463
\(392\) 1.24156e110 0.757373
\(393\) 1.20285e110 0.658458
\(394\) −3.30266e109 −0.162283
\(395\) 6.12042e109 0.270026
\(396\) 2.37006e109 0.0939105
\(397\) 4.42602e110 1.57549 0.787746 0.616000i \(-0.211248\pi\)
0.787746 + 0.616000i \(0.211248\pi\)
\(398\) −6.44431e110 −2.06132
\(399\) −3.43443e109 −0.0987431
\(400\) 4.34128e110 1.12219
\(401\) −5.98111e110 −1.39042 −0.695210 0.718806i \(-0.744689\pi\)
−0.695210 + 0.718806i \(0.744689\pi\)
\(402\) −6.45062e110 −1.34895
\(403\) −1.47744e110 −0.278000
\(404\) 2.60533e110 0.441219
\(405\) −6.20445e109 −0.0945943
\(406\) −3.16293e110 −0.434243
\(407\) −3.96156e110 −0.489895
\(408\) 2.04043e110 0.227334
\(409\) 1.51723e111 1.52339 0.761694 0.647937i \(-0.224368\pi\)
0.761694 + 0.647937i \(0.224368\pi\)
\(410\) −5.81308e110 −0.526129
\(411\) 1.08819e111 0.888026
\(412\) 7.23455e110 0.532451
\(413\) −1.96206e110 −0.130267
\(414\) 1.08696e111 0.651175
\(415\) −1.56338e110 −0.0845318
\(416\) 6.38605e110 0.311721
\(417\) 1.10711e110 0.0487988
\(418\) −1.25503e111 −0.499647
\(419\) −9.81295e109 −0.0352942 −0.0176471 0.999844i \(-0.505618\pi\)
−0.0176471 + 0.999844i \(0.505618\pi\)
\(420\) −3.96836e109 −0.0128978
\(421\) −3.89451e111 −1.14410 −0.572050 0.820219i \(-0.693852\pi\)
−0.572050 + 0.820219i \(0.693852\pi\)
\(422\) −6.61726e111 −1.75752
\(423\) 2.08968e111 0.501896
\(424\) 3.26975e111 0.710339
\(425\) 1.82598e111 0.358894
\(426\) 1.20116e111 0.213646
\(427\) 4.56328e110 0.0734670
\(428\) −3.46576e111 −0.505171
\(429\) 1.97450e111 0.260628
\(430\) 2.20580e111 0.263728
\(431\) −6.94740e111 −0.752556 −0.376278 0.926507i \(-0.622796\pi\)
−0.376278 + 0.926507i \(0.622796\pi\)
\(432\) 1.32888e112 1.30445
\(433\) −1.04259e112 −0.927641 −0.463820 0.885929i \(-0.653522\pi\)
−0.463820 + 0.885929i \(0.653522\pi\)
\(434\) −1.55416e111 −0.125367
\(435\) 5.12210e111 0.374675
\(436\) 1.43750e111 0.0953744
\(437\) −1.35764e112 −0.817191
\(438\) 2.24489e112 1.22616
\(439\) 1.97852e112 0.980839 0.490419 0.871487i \(-0.336844\pi\)
0.490419 + 0.871487i \(0.336844\pi\)
\(440\) 3.24771e111 0.146163
\(441\) 1.05759e112 0.432193
\(442\) 6.24277e111 0.231702
\(443\) −3.30999e112 −1.11601 −0.558005 0.829837i \(-0.688433\pi\)
−0.558005 + 0.829837i \(0.688433\pi\)
\(444\) 5.42399e111 0.166166
\(445\) −2.56991e111 −0.0715513
\(446\) −6.68901e112 −1.69290
\(447\) −3.86075e112 −0.888387
\(448\) −5.21263e111 −0.109079
\(449\) −5.05111e112 −0.961429 −0.480715 0.876877i \(-0.659623\pi\)
−0.480715 + 0.876877i \(0.659623\pi\)
\(450\) 2.75725e112 0.477468
\(451\) 7.17655e112 1.13087
\(452\) −7.83882e111 −0.112426
\(453\) −2.48896e112 −0.324971
\(454\) 1.30302e113 1.54910
\(455\) 2.71915e111 0.0294407
\(456\) −3.84835e112 −0.379550
\(457\) 2.17418e113 1.95370 0.976848 0.213935i \(-0.0686282\pi\)
0.976848 + 0.213935i \(0.0686282\pi\)
\(458\) −1.24284e113 −1.01773
\(459\) 5.58941e112 0.417183
\(460\) −1.56870e112 −0.106741
\(461\) 7.45280e112 0.462413 0.231206 0.972905i \(-0.425733\pi\)
0.231206 + 0.972905i \(0.425733\pi\)
\(462\) 2.07703e112 0.117533
\(463\) 6.80695e112 0.351367 0.175683 0.984447i \(-0.443787\pi\)
0.175683 + 0.984447i \(0.443787\pi\)
\(464\) −4.75335e113 −2.23865
\(465\) 2.51684e112 0.108170
\(466\) −1.58573e112 −0.0622054
\(467\) −2.22210e113 −0.795785 −0.397893 0.917432i \(-0.630258\pi\)
−0.397893 + 0.917432i \(0.630258\pi\)
\(468\) 2.22349e112 0.0727086
\(469\) 1.09670e113 0.327523
\(470\) −1.27859e113 −0.348796
\(471\) 3.42895e113 0.854620
\(472\) −2.19853e113 −0.500723
\(473\) −2.72317e113 −0.566860
\(474\) 4.38598e113 0.834617
\(475\) −3.44389e113 −0.599198
\(476\) 1.54896e112 0.0246459
\(477\) 2.78525e113 0.405353
\(478\) 1.46774e114 1.95417
\(479\) −7.32431e113 −0.892293 −0.446146 0.894960i \(-0.647204\pi\)
−0.446146 + 0.894960i \(0.647204\pi\)
\(480\) −1.08787e113 −0.121290
\(481\) −3.71656e113 −0.379293
\(482\) 1.30845e113 0.122252
\(483\) 2.24684e113 0.192229
\(484\) −2.14920e113 −0.168403
\(485\) 1.74770e113 0.125442
\(486\) 1.42556e114 0.937441
\(487\) −1.19786e114 −0.721814 −0.360907 0.932602i \(-0.617533\pi\)
−0.360907 + 0.932602i \(0.617533\pi\)
\(488\) 5.11325e113 0.282393
\(489\) 3.73488e113 0.189082
\(490\) −6.47096e113 −0.300355
\(491\) −2.53284e113 −0.107806 −0.0539032 0.998546i \(-0.517166\pi\)
−0.0539032 + 0.998546i \(0.517166\pi\)
\(492\) −9.82581e113 −0.383576
\(493\) −1.99930e114 −0.715952
\(494\) −1.17742e114 −0.386843
\(495\) 2.76648e113 0.0834077
\(496\) −2.33565e114 −0.646303
\(497\) −2.04215e113 −0.0518730
\(498\) −1.12034e114 −0.261278
\(499\) 3.94124e113 0.0844033 0.0422017 0.999109i \(-0.486563\pi\)
0.0422017 + 0.999109i \(0.486563\pi\)
\(500\) −8.28197e113 −0.162895
\(501\) 8.02715e113 0.145030
\(502\) 8.15572e114 1.35380
\(503\) 1.14379e115 1.74464 0.872319 0.488938i \(-0.162616\pi\)
0.872319 + 0.488938i \(0.162616\pi\)
\(504\) −5.23827e113 −0.0734328
\(505\) 3.04109e114 0.391874
\(506\) 8.21056e114 0.972693
\(507\) −4.94759e114 −0.538958
\(508\) 1.04482e114 0.104673
\(509\) −1.59810e115 −1.47265 −0.736324 0.676629i \(-0.763440\pi\)
−0.736324 + 0.676629i \(0.763440\pi\)
\(510\) −1.06346e114 −0.0901551
\(511\) −3.81664e114 −0.297710
\(512\) −3.27260e114 −0.234920
\(513\) −1.05419e115 −0.696515
\(514\) −2.43851e115 −1.48318
\(515\) 8.44460e114 0.472903
\(516\) 3.72844e114 0.192272
\(517\) 1.57848e115 0.749707
\(518\) −3.90956e114 −0.171046
\(519\) 1.34615e113 0.00542601
\(520\) 3.04686e114 0.113165
\(521\) 2.23432e115 0.764789 0.382395 0.923999i \(-0.375100\pi\)
0.382395 + 0.923999i \(0.375100\pi\)
\(522\) −3.01897e115 −0.952494
\(523\) 2.90809e115 0.845835 0.422917 0.906168i \(-0.361006\pi\)
0.422917 + 0.906168i \(0.361006\pi\)
\(524\) 1.02318e115 0.274391
\(525\) 5.69950e114 0.140950
\(526\) −2.23689e115 −0.510212
\(527\) −9.82395e114 −0.206697
\(528\) 3.12143e115 0.605916
\(529\) 3.29885e115 0.590877
\(530\) −1.70418e115 −0.281703
\(531\) −1.87276e115 −0.285736
\(532\) −2.92142e114 −0.0411481
\(533\) 6.73271e115 0.875556
\(534\) −1.84163e115 −0.221157
\(535\) −4.04545e115 −0.448674
\(536\) 1.22887e116 1.25894
\(537\) −1.25952e116 −1.19206
\(538\) −1.84043e116 −1.60943
\(539\) 7.98874e115 0.645588
\(540\) −1.21808e115 −0.0909786
\(541\) −5.34213e115 −0.368834 −0.184417 0.982848i \(-0.559040\pi\)
−0.184417 + 0.982848i \(0.559040\pi\)
\(542\) 1.81609e116 1.15922
\(543\) −2.11012e116 −1.24542
\(544\) 4.24628e115 0.231769
\(545\) 1.67794e115 0.0847079
\(546\) 1.94858e115 0.0909977
\(547\) −3.54102e116 −1.52991 −0.764956 0.644082i \(-0.777239\pi\)
−0.764956 + 0.644082i \(0.777239\pi\)
\(548\) 9.25639e115 0.370057
\(549\) 4.35559e115 0.161147
\(550\) 2.08275e116 0.713219
\(551\) 3.77078e116 1.19533
\(552\) 2.51763e116 0.738894
\(553\) −7.45680e115 −0.202644
\(554\) 2.45513e116 0.617888
\(555\) 6.33121e115 0.147582
\(556\) 9.41738e114 0.0203353
\(557\) 3.05895e115 0.0611965 0.0305983 0.999532i \(-0.490259\pi\)
0.0305983 + 0.999532i \(0.490259\pi\)
\(558\) −1.48343e116 −0.274987
\(559\) −2.55476e116 −0.438882
\(560\) 4.29863e115 0.0684446
\(561\) 1.31290e116 0.193781
\(562\) −1.30556e117 −1.78651
\(563\) −4.60778e116 −0.584636 −0.292318 0.956321i \(-0.594427\pi\)
−0.292318 + 0.956321i \(0.594427\pi\)
\(564\) −2.16119e116 −0.254291
\(565\) −9.14995e115 −0.0998526
\(566\) −3.73535e116 −0.378123
\(567\) 7.55918e115 0.0709896
\(568\) −2.28827e116 −0.199390
\(569\) 1.23047e116 0.0994944 0.0497472 0.998762i \(-0.484158\pi\)
0.0497472 + 0.998762i \(0.484158\pi\)
\(570\) 2.00575e116 0.150520
\(571\) 2.42347e117 1.68812 0.844058 0.536252i \(-0.180160\pi\)
0.844058 + 0.536252i \(0.180160\pi\)
\(572\) 1.67956e116 0.108608
\(573\) 5.02563e116 0.301730
\(574\) 7.08235e116 0.394840
\(575\) 2.25303e117 1.16650
\(576\) −4.97538e116 −0.239260
\(577\) −6.46795e116 −0.288931 −0.144466 0.989510i \(-0.546146\pi\)
−0.144466 + 0.989510i \(0.546146\pi\)
\(578\) −2.34135e117 −0.971702
\(579\) −2.01037e117 −0.775243
\(580\) 4.35699e116 0.156134
\(581\) 1.90474e116 0.0634380
\(582\) 1.25242e117 0.387726
\(583\) 2.10390e117 0.605496
\(584\) −4.27663e117 −1.14434
\(585\) 2.59539e116 0.0645770
\(586\) 5.74231e117 1.32873
\(587\) −5.14572e117 −1.10746 −0.553728 0.832697i \(-0.686795\pi\)
−0.553728 + 0.832697i \(0.686795\pi\)
\(588\) −1.09378e117 −0.218975
\(589\) 1.85284e117 0.345095
\(590\) 1.14586e117 0.198574
\(591\) −6.51619e116 −0.105081
\(592\) −5.87541e117 −0.881791
\(593\) −6.08050e117 −0.849406 −0.424703 0.905333i \(-0.639621\pi\)
−0.424703 + 0.905333i \(0.639621\pi\)
\(594\) 6.37539e117 0.829054
\(595\) 1.80804e116 0.0218896
\(596\) −3.28406e117 −0.370207
\(597\) −1.27147e118 −1.33474
\(598\) 7.70278e117 0.753091
\(599\) 6.95061e116 0.0632970 0.0316485 0.999499i \(-0.489924\pi\)
0.0316485 + 0.999499i \(0.489924\pi\)
\(600\) 6.38641e117 0.541787
\(601\) 2.34715e118 1.85514 0.927568 0.373653i \(-0.121895\pi\)
0.927568 + 0.373653i \(0.121895\pi\)
\(602\) −2.68742e117 −0.197918
\(603\) 1.04678e118 0.718408
\(604\) −2.11718e117 −0.135421
\(605\) −2.50868e117 −0.149569
\(606\) 2.17929e118 1.21124
\(607\) −2.09245e118 −1.08426 −0.542132 0.840293i \(-0.682383\pi\)
−0.542132 + 0.840293i \(0.682383\pi\)
\(608\) −8.00868e117 −0.386954
\(609\) −6.24049e117 −0.281180
\(610\) −2.66501e117 −0.111990
\(611\) 1.48086e118 0.580447
\(612\) 1.47846e117 0.0540599
\(613\) −5.75862e117 −0.196448 −0.0982241 0.995164i \(-0.531316\pi\)
−0.0982241 + 0.995164i \(0.531316\pi\)
\(614\) −6.06720e118 −1.93122
\(615\) −1.14693e118 −0.340678
\(616\) −3.95684e117 −0.109690
\(617\) −1.99942e118 −0.517350 −0.258675 0.965964i \(-0.583286\pi\)
−0.258675 + 0.965964i \(0.583286\pi\)
\(618\) 6.05152e118 1.46169
\(619\) −7.65592e118 −1.72641 −0.863207 0.504850i \(-0.831548\pi\)
−0.863207 + 0.504850i \(0.831548\pi\)
\(620\) 2.14089e117 0.0450762
\(621\) 6.89662e118 1.35595
\(622\) −1.13524e118 −0.208448
\(623\) 3.13104e117 0.0536966
\(624\) 2.92839e118 0.469120
\(625\) 5.21296e118 0.780159
\(626\) 7.90746e118 1.10568
\(627\) −2.47620e118 −0.323530
\(628\) 2.91676e118 0.356136
\(629\) −2.47125e118 −0.282010
\(630\) 2.73017e117 0.0291216
\(631\) 1.51690e119 1.51255 0.756276 0.654253i \(-0.227017\pi\)
0.756276 + 0.654253i \(0.227017\pi\)
\(632\) −8.35550e118 −0.778927
\(633\) −1.30560e119 −1.13802
\(634\) −1.15920e119 −0.944855
\(635\) 1.21958e118 0.0929668
\(636\) −2.88057e118 −0.205376
\(637\) 7.49468e118 0.499836
\(638\) −2.28044e119 −1.42279
\(639\) −1.94921e118 −0.113781
\(640\) 6.04205e118 0.330016
\(641\) 2.94751e119 1.50657 0.753284 0.657695i \(-0.228468\pi\)
0.753284 + 0.657695i \(0.228468\pi\)
\(642\) −2.89903e119 −1.38680
\(643\) 1.77154e119 0.793202 0.396601 0.917991i \(-0.370190\pi\)
0.396601 + 0.917991i \(0.370190\pi\)
\(644\) 1.91122e118 0.0801055
\(645\) 4.35206e118 0.170768
\(646\) −7.82900e118 −0.287623
\(647\) −1.81550e119 −0.624547 −0.312274 0.949992i \(-0.601091\pi\)
−0.312274 + 0.949992i \(0.601091\pi\)
\(648\) 8.47022e118 0.272871
\(649\) −1.41463e119 −0.426818
\(650\) 1.95394e119 0.552197
\(651\) −3.06639e118 −0.0811773
\(652\) 3.17699e118 0.0787939
\(653\) −2.82590e119 −0.656669 −0.328335 0.944562i \(-0.606487\pi\)
−0.328335 + 0.944562i \(0.606487\pi\)
\(654\) 1.20243e119 0.261822
\(655\) 1.19431e119 0.243704
\(656\) 1.06436e120 2.03552
\(657\) −3.64293e119 −0.653015
\(658\) 1.55776e119 0.261758
\(659\) 1.13945e119 0.179500 0.0897500 0.995964i \(-0.471393\pi\)
0.0897500 + 0.995964i \(0.471393\pi\)
\(660\) −2.86115e118 −0.0422594
\(661\) 8.81386e118 0.122069 0.0610343 0.998136i \(-0.480560\pi\)
0.0610343 + 0.998136i \(0.480560\pi\)
\(662\) −1.09513e119 −0.142233
\(663\) 1.23171e119 0.150031
\(664\) 2.13430e119 0.243844
\(665\) −3.41006e118 −0.0365461
\(666\) −3.73162e119 −0.375182
\(667\) −2.46688e120 −2.32702
\(668\) 6.82810e118 0.0604367
\(669\) −1.31975e120 −1.09618
\(670\) −6.40484e119 −0.499262
\(671\) 3.29009e119 0.240713
\(672\) 1.32541e119 0.0910238
\(673\) −1.45790e119 −0.0939910 −0.0469955 0.998895i \(-0.514965\pi\)
−0.0469955 + 0.998895i \(0.514965\pi\)
\(674\) 1.88585e120 1.14146
\(675\) 1.74945e120 0.994237
\(676\) −4.20855e119 −0.224594
\(677\) 2.68461e120 1.34544 0.672718 0.739899i \(-0.265127\pi\)
0.672718 + 0.739899i \(0.265127\pi\)
\(678\) −6.55698e119 −0.308633
\(679\) −2.12930e119 −0.0941395
\(680\) 2.02595e119 0.0841395
\(681\) 2.57088e120 1.00307
\(682\) −1.12054e120 −0.410763
\(683\) 7.62763e118 0.0262730 0.0131365 0.999914i \(-0.495818\pi\)
0.0131365 + 0.999914i \(0.495818\pi\)
\(684\) −2.78845e119 −0.0902566
\(685\) 1.08046e120 0.328670
\(686\) 1.61162e120 0.460775
\(687\) −2.45214e120 −0.658997
\(688\) −4.03875e120 −1.02033
\(689\) 1.97378e120 0.468795
\(690\) −1.31218e120 −0.293027
\(691\) −5.17922e120 −1.08755 −0.543773 0.839232i \(-0.683005\pi\)
−0.543773 + 0.839232i \(0.683005\pi\)
\(692\) 1.14507e118 0.00226112
\(693\) −3.37053e119 −0.0625945
\(694\) 1.77033e120 0.309227
\(695\) 1.09925e119 0.0180611
\(696\) −6.99260e120 −1.08080
\(697\) 4.47679e120 0.650989
\(698\) −1.45538e120 −0.199123
\(699\) −3.12867e119 −0.0402791
\(700\) 4.84815e119 0.0587366
\(701\) 4.03989e120 0.460631 0.230316 0.973116i \(-0.426024\pi\)
0.230316 + 0.973116i \(0.426024\pi\)
\(702\) 5.98110e120 0.641880
\(703\) 4.66090e120 0.470835
\(704\) −3.75826e120 −0.357395
\(705\) −2.52267e120 −0.225851
\(706\) 4.38710e120 0.369809
\(707\) −3.70511e120 −0.294087
\(708\) 1.93685e120 0.144771
\(709\) 1.03782e121 0.730559 0.365279 0.930898i \(-0.380973\pi\)
0.365279 + 0.930898i \(0.380973\pi\)
\(710\) 1.19264e120 0.0790732
\(711\) −7.11741e120 −0.444492
\(712\) 3.50840e120 0.206400
\(713\) −1.21215e121 −0.671818
\(714\) 1.29567e120 0.0676581
\(715\) 1.96048e120 0.0964619
\(716\) −1.07138e121 −0.496754
\(717\) 2.89587e121 1.26536
\(718\) 2.77339e121 1.14215
\(719\) −2.67902e121 −1.03992 −0.519958 0.854192i \(-0.674052\pi\)
−0.519958 + 0.854192i \(0.674052\pi\)
\(720\) 4.10299e120 0.150130
\(721\) −1.02885e121 −0.354896
\(722\) −2.04103e121 −0.663770
\(723\) 2.58158e120 0.0791604
\(724\) −1.79493e121 −0.518988
\(725\) −6.25767e121 −1.70627
\(726\) −1.79776e121 −0.462301
\(727\) 5.01652e120 0.121672 0.0608359 0.998148i \(-0.480623\pi\)
0.0608359 + 0.998148i \(0.480623\pi\)
\(728\) −3.71213e120 −0.0849258
\(729\) 4.41140e121 0.952044
\(730\) 2.22896e121 0.453817
\(731\) −1.69873e121 −0.326315
\(732\) −4.50464e120 −0.0816469
\(733\) 3.32847e121 0.569280 0.284640 0.958634i \(-0.408126\pi\)
0.284640 + 0.958634i \(0.408126\pi\)
\(734\) 6.70737e121 1.08260
\(735\) −1.27673e121 −0.194485
\(736\) 5.23937e121 0.753307
\(737\) 7.90710e121 1.07312
\(738\) 6.76000e121 0.866067
\(739\) −5.03362e121 −0.608824 −0.304412 0.952540i \(-0.598460\pi\)
−0.304412 + 0.952540i \(0.598460\pi\)
\(740\) 5.38549e120 0.0615003
\(741\) −2.32306e121 −0.250488
\(742\) 2.07628e121 0.211408
\(743\) −1.10466e122 −1.06219 −0.531096 0.847312i \(-0.678220\pi\)
−0.531096 + 0.847312i \(0.678220\pi\)
\(744\) −3.43595e121 −0.312030
\(745\) −3.83335e121 −0.328804
\(746\) −2.28958e122 −1.85505
\(747\) 1.81805e121 0.139149
\(748\) 1.11679e121 0.0807520
\(749\) 4.92876e121 0.336713
\(750\) −6.92766e121 −0.447180
\(751\) −1.64280e122 −1.00205 −0.501023 0.865434i \(-0.667043\pi\)
−0.501023 + 0.865434i \(0.667043\pi\)
\(752\) 2.34106e122 1.34944
\(753\) 1.60913e122 0.876609
\(754\) −2.13941e122 −1.10157
\(755\) −2.47130e121 −0.120276
\(756\) 1.48404e121 0.0682761
\(757\) 3.36710e122 1.46447 0.732237 0.681050i \(-0.238476\pi\)
0.732237 + 0.681050i \(0.238476\pi\)
\(758\) −1.73054e122 −0.711606
\(759\) 1.61996e122 0.629836
\(760\) −3.82104e121 −0.140477
\(761\) 1.12323e122 0.390498 0.195249 0.980754i \(-0.437448\pi\)
0.195249 + 0.980754i \(0.437448\pi\)
\(762\) 8.73970e121 0.287349
\(763\) −2.04431e121 −0.0635702
\(764\) 4.27493e121 0.125737
\(765\) 1.72575e121 0.0480139
\(766\) −4.51832e122 −1.18920
\(767\) −1.32714e122 −0.330457
\(768\) 2.66285e122 0.627327
\(769\) 6.90046e122 1.53819 0.769093 0.639137i \(-0.220708\pi\)
0.769093 + 0.639137i \(0.220708\pi\)
\(770\) 2.06229e121 0.0435004
\(771\) −4.81122e122 −0.960383
\(772\) −1.71008e122 −0.323058
\(773\) 6.33678e122 1.13303 0.566513 0.824053i \(-0.308292\pi\)
0.566513 + 0.824053i \(0.308292\pi\)
\(774\) −2.56511e122 −0.434125
\(775\) −3.07483e122 −0.492604
\(776\) −2.38593e122 −0.361855
\(777\) −7.71361e121 −0.110755
\(778\) 2.79289e122 0.379683
\(779\) −8.44344e122 −1.08687
\(780\) −2.68421e121 −0.0327186
\(781\) −1.47237e122 −0.169961
\(782\) 5.12182e122 0.559934
\(783\) −1.91550e123 −1.98339
\(784\) 1.18482e123 1.16203
\(785\) 3.40461e122 0.316306
\(786\) 8.55861e122 0.753260
\(787\) −5.78520e122 −0.482383 −0.241192 0.970477i \(-0.577538\pi\)
−0.241192 + 0.970477i \(0.577538\pi\)
\(788\) −5.54284e121 −0.0437893
\(789\) −4.41342e122 −0.330371
\(790\) 4.35485e122 0.308903
\(791\) 1.11478e122 0.0749358
\(792\) −3.77675e122 −0.240601
\(793\) 3.08661e122 0.186368
\(794\) 3.14923e123 1.80233
\(795\) −3.36237e122 −0.182407
\(796\) −1.08155e123 −0.556211
\(797\) 3.16392e123 1.54258 0.771290 0.636484i \(-0.219612\pi\)
0.771290 + 0.636484i \(0.219612\pi\)
\(798\) −2.44369e122 −0.112960
\(799\) 9.84670e122 0.431571
\(800\) 1.32905e123 0.552355
\(801\) 2.98854e122 0.117781
\(802\) −4.25573e123 −1.59061
\(803\) −2.75177e123 −0.975441
\(804\) −1.08261e123 −0.363989
\(805\) 2.23090e122 0.0711466
\(806\) −1.05124e123 −0.318026
\(807\) −3.63119e123 −1.04213
\(808\) −4.15165e123 −1.13041
\(809\) 3.81973e122 0.0986781 0.0493390 0.998782i \(-0.484289\pi\)
0.0493390 + 0.998782i \(0.484289\pi\)
\(810\) −4.41464e122 −0.108214
\(811\) 3.48486e123 0.810585 0.405292 0.914187i \(-0.367170\pi\)
0.405292 + 0.914187i \(0.367170\pi\)
\(812\) −5.30833e122 −0.117173
\(813\) 3.58317e123 0.750618
\(814\) −2.81876e123 −0.560429
\(815\) 3.70837e122 0.0699818
\(816\) 1.94717e123 0.348797
\(817\) 3.20390e123 0.544805
\(818\) 1.07955e124 1.74272
\(819\) −3.16208e122 −0.0484627
\(820\) −9.75607e122 −0.141967
\(821\) 7.55967e123 1.04453 0.522263 0.852785i \(-0.325088\pi\)
0.522263 + 0.852785i \(0.325088\pi\)
\(822\) 7.74274e123 1.01588
\(823\) −1.18964e124 −1.48225 −0.741127 0.671365i \(-0.765708\pi\)
−0.741127 + 0.671365i \(0.765708\pi\)
\(824\) −1.15284e124 −1.36415
\(825\) 4.10929e123 0.461822
\(826\) −1.39606e123 −0.149023
\(827\) −7.43241e123 −0.753608 −0.376804 0.926293i \(-0.622977\pi\)
−0.376804 + 0.926293i \(0.622977\pi\)
\(828\) 1.82424e123 0.175708
\(829\) 2.81405e122 0.0257492 0.0128746 0.999917i \(-0.495902\pi\)
0.0128746 + 0.999917i \(0.495902\pi\)
\(830\) −1.11239e123 −0.0967023
\(831\) 4.84401e123 0.400093
\(832\) −3.52583e123 −0.276707
\(833\) 4.98344e123 0.371635
\(834\) 7.87741e122 0.0558247
\(835\) 7.97017e122 0.0536775
\(836\) −2.10632e123 −0.134821
\(837\) −9.41218e123 −0.572609
\(838\) −6.98219e122 −0.0403758
\(839\) −1.60603e124 −0.882818 −0.441409 0.897306i \(-0.645521\pi\)
−0.441409 + 0.897306i \(0.645521\pi\)
\(840\) 6.32367e122 0.0330445
\(841\) 4.83871e124 2.40381
\(842\) −2.77105e124 −1.30882
\(843\) −2.57589e124 −1.15679
\(844\) −1.11057e124 −0.474235
\(845\) −4.91247e123 −0.199476
\(846\) 1.48686e124 0.574157
\(847\) 3.05644e123 0.112246
\(848\) 3.12031e124 1.08987
\(849\) −7.36989e123 −0.244841
\(850\) 1.29924e124 0.410567
\(851\) −3.04921e124 −0.916603
\(852\) 2.01591e123 0.0576486
\(853\) 5.85095e124 1.59182 0.795908 0.605418i \(-0.206994\pi\)
0.795908 + 0.605418i \(0.206994\pi\)
\(854\) 3.24690e123 0.0840446
\(855\) −3.25485e123 −0.0801625
\(856\) 5.52278e124 1.29426
\(857\) −2.43950e124 −0.544022 −0.272011 0.962294i \(-0.587689\pi\)
−0.272011 + 0.962294i \(0.587689\pi\)
\(858\) 1.40491e124 0.298152
\(859\) −1.00229e124 −0.202433 −0.101217 0.994864i \(-0.532274\pi\)
−0.101217 + 0.994864i \(0.532274\pi\)
\(860\) 3.70198e123 0.0711623
\(861\) 1.39736e124 0.255666
\(862\) −4.94327e124 −0.860906
\(863\) −8.20747e124 −1.36066 −0.680331 0.732905i \(-0.738164\pi\)
−0.680331 + 0.732905i \(0.738164\pi\)
\(864\) 4.06830e124 0.642064
\(865\) 1.33659e122 0.00200824
\(866\) −7.41835e124 −1.06120
\(867\) −4.61952e124 −0.629194
\(868\) −2.60835e123 −0.0338281
\(869\) −5.37629e124 −0.663960
\(870\) 3.64452e124 0.428619
\(871\) 7.41809e124 0.830846
\(872\) −2.29069e124 −0.244352
\(873\) −2.03239e124 −0.206491
\(874\) −9.65999e124 −0.934848
\(875\) 1.17780e124 0.108575
\(876\) 3.76760e124 0.330857
\(877\) 1.18022e124 0.0987368 0.0493684 0.998781i \(-0.484279\pi\)
0.0493684 + 0.998781i \(0.484279\pi\)
\(878\) 1.40777e125 1.12206
\(879\) 1.13297e125 0.860379
\(880\) 3.09928e124 0.224257
\(881\) 9.93103e124 0.684728 0.342364 0.939567i \(-0.388772\pi\)
0.342364 + 0.939567i \(0.388772\pi\)
\(882\) 7.52505e124 0.494418
\(883\) −4.38150e123 −0.0274342 −0.0137171 0.999906i \(-0.504366\pi\)
−0.0137171 + 0.999906i \(0.504366\pi\)
\(884\) 1.04772e124 0.0625208
\(885\) 2.26081e124 0.128580
\(886\) −2.35515e125 −1.27669
\(887\) 1.62296e125 0.838597 0.419298 0.907849i \(-0.362276\pi\)
0.419298 + 0.907849i \(0.362276\pi\)
\(888\) −8.64326e124 −0.425722
\(889\) −1.48587e124 −0.0697682
\(890\) −1.82856e124 −0.0818530
\(891\) 5.45010e124 0.232596
\(892\) −1.12261e125 −0.456798
\(893\) −1.85713e125 −0.720537
\(894\) −2.74703e125 −1.01629
\(895\) −1.25058e125 −0.441198
\(896\) −7.36132e124 −0.247665
\(897\) 1.51977e125 0.487640
\(898\) −3.59401e125 −1.09985
\(899\) 3.36669e125 0.982689
\(900\) 4.62749e124 0.128836
\(901\) 1.31243e125 0.348556
\(902\) 5.10631e125 1.29369
\(903\) −5.30233e124 −0.128155
\(904\) 1.24914e125 0.288039
\(905\) −2.09515e125 −0.460946
\(906\) −1.77097e125 −0.371759
\(907\) 1.62229e125 0.324951 0.162476 0.986713i \(-0.448052\pi\)
0.162476 + 0.986713i \(0.448052\pi\)
\(908\) 2.18686e125 0.417997
\(909\) −3.53647e125 −0.645068
\(910\) 1.93475e124 0.0336795
\(911\) −6.69682e125 −1.11260 −0.556298 0.830983i \(-0.687779\pi\)
−0.556298 + 0.830983i \(0.687779\pi\)
\(912\) −3.67247e125 −0.582341
\(913\) 1.37330e125 0.207853
\(914\) 1.54699e126 2.23498
\(915\) −5.25809e124 −0.0725156
\(916\) −2.08585e125 −0.274616
\(917\) −1.45509e125 −0.182891
\(918\) 3.97702e125 0.477247
\(919\) 1.25762e126 1.44092 0.720458 0.693498i \(-0.243931\pi\)
0.720458 + 0.693498i \(0.243931\pi\)
\(920\) 2.49977e125 0.273474
\(921\) −1.19707e126 −1.25050
\(922\) 5.30287e125 0.528989
\(923\) −1.38132e125 −0.131589
\(924\) 3.48588e124 0.0317142
\(925\) −7.73484e125 −0.672091
\(926\) 4.84334e125 0.401955
\(927\) −9.82019e125 −0.778451
\(928\) −1.45521e126 −1.10188
\(929\) −3.95718e125 −0.286232 −0.143116 0.989706i \(-0.545712\pi\)
−0.143116 + 0.989706i \(0.545712\pi\)
\(930\) 1.79080e125 0.123743
\(931\) −9.39901e125 −0.620470
\(932\) −2.66133e124 −0.0167850
\(933\) −2.23985e125 −0.134974
\(934\) −1.58108e126 −0.910359
\(935\) 1.30358e125 0.0717208
\(936\) −3.54318e125 −0.186281
\(937\) 2.28071e126 1.14588 0.572938 0.819599i \(-0.305804\pi\)
0.572938 + 0.819599i \(0.305804\pi\)
\(938\) 7.80331e125 0.374678
\(939\) 1.56015e126 0.715944
\(940\) −2.14585e125 −0.0941164
\(941\) −1.01451e126 −0.425303 −0.212652 0.977128i \(-0.568210\pi\)
−0.212652 + 0.977128i \(0.568210\pi\)
\(942\) 2.43979e126 0.977665
\(943\) 5.52379e126 2.11588
\(944\) −2.09805e126 −0.768255
\(945\) 1.73226e125 0.0606403
\(946\) −1.93761e126 −0.648475
\(947\) 4.90614e126 1.56988 0.784940 0.619572i \(-0.212694\pi\)
0.784940 + 0.619572i \(0.212694\pi\)
\(948\) 7.36098e125 0.225207
\(949\) −2.58158e126 −0.755218
\(950\) −2.45042e126 −0.685469
\(951\) −2.28712e126 −0.611810
\(952\) −2.46831e125 −0.0631436
\(953\) −2.22780e126 −0.545040 −0.272520 0.962150i \(-0.587857\pi\)
−0.272520 + 0.962150i \(0.587857\pi\)
\(954\) 1.98178e126 0.463714
\(955\) 4.98996e125 0.111674
\(956\) 2.46330e126 0.527300
\(957\) −4.49934e126 −0.921280
\(958\) −5.21145e126 −1.02076
\(959\) −1.31638e126 −0.246655
\(960\) 6.00631e125 0.107666
\(961\) −4.17673e126 −0.716295
\(962\) −2.64443e126 −0.433902
\(963\) 4.70443e126 0.738567
\(964\) 2.19596e125 0.0329876
\(965\) −1.99610e126 −0.286928
\(966\) 1.59869e126 0.219906
\(967\) 7.99613e126 1.05258 0.526290 0.850305i \(-0.323583\pi\)
0.526290 + 0.850305i \(0.323583\pi\)
\(968\) 3.42481e126 0.431453
\(969\) −1.54467e126 −0.186241
\(970\) 1.24354e126 0.143503
\(971\) 3.94162e126 0.435369 0.217685 0.976019i \(-0.430150\pi\)
0.217685 + 0.976019i \(0.430150\pi\)
\(972\) 2.39251e126 0.252952
\(973\) −1.33927e125 −0.0135542
\(974\) −8.52311e126 −0.825738
\(975\) 3.85515e126 0.357557
\(976\) 4.87955e126 0.433274
\(977\) −1.42908e126 −0.121489 −0.0607444 0.998153i \(-0.519347\pi\)
−0.0607444 + 0.998153i \(0.519347\pi\)
\(978\) 2.65747e126 0.216305
\(979\) 2.25746e126 0.175936
\(980\) −1.08602e126 −0.0810456
\(981\) −1.95126e126 −0.139439
\(982\) −1.80219e126 −0.123328
\(983\) −8.05184e126 −0.527680 −0.263840 0.964566i \(-0.584989\pi\)
−0.263840 + 0.964566i \(0.584989\pi\)
\(984\) 1.56577e127 0.982733
\(985\) −6.46994e125 −0.0388920
\(986\) −1.42256e127 −0.819033
\(987\) 3.07349e126 0.169493
\(988\) −1.97605e126 −0.104383
\(989\) −2.09602e127 −1.06061
\(990\) 1.96843e126 0.0954165
\(991\) 3.77893e127 1.75484 0.877421 0.479720i \(-0.159262\pi\)
0.877421 + 0.479720i \(0.159262\pi\)
\(992\) −7.15044e126 −0.318117
\(993\) −2.16070e126 −0.0920982
\(994\) −1.45305e126 −0.0593415
\(995\) −1.26245e127 −0.494005
\(996\) −1.88026e126 −0.0705012
\(997\) −3.94225e127 −1.41645 −0.708223 0.705989i \(-0.750503\pi\)
−0.708223 + 0.705989i \(0.750503\pi\)
\(998\) 2.80430e126 0.0965554
\(999\) −2.36767e127 −0.781246
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 1.86.a.a.1.5 6
3.2 odd 2 9.86.a.a.1.2 6
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
1.86.a.a.1.5 6 1.1 even 1 trivial
9.86.a.a.1.2 6 3.2 odd 2