Properties

Label 2.82.a.b.1.2
Level $2$
Weight $82$
Character 2.1
Self dual yes
Analytic conductor $83.100$
Analytic rank $0$
Dimension $4$
CM no
Inner twists $1$

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Show commands: Magma / Pari/GP / SageMath

Newspace parameters

Copy content comment:Compute space of new eigenforms
 
Copy content gp:[N,k,chi] = [2,82,Mod(1,2)] mf = mfinit([N,k,chi],0) lf = mfeigenbasis(mf)
 
Copy content magma://Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code chi := DirichletCharacter("2.1"); S:= CuspForms(chi, 82); N := Newforms(S);
 
Copy content sage:from sage.modular.dirichlet import DirichletCharacter H = DirichletGroup(2, base_ring=CyclotomicField(1)) chi = DirichletCharacter(H, H._module([])) N = Newforms(chi, 82, names="a")
 
Level: \( N \) \(=\) \( 2 \)
Weight: \( k \) \(=\) \( 82 \)
Character orbit: \([\chi]\) \(=\) 2.a (trivial)

Newform invariants

Copy content comment:select newform
 
Copy content sage:traces = [4] f = next(g for g in N if [g.coefficient(i+1).trace() for i in range(1)] == traces)
 
Copy content gp:f = lf[1] \\ Warning: the index may be different
 
Self dual: yes
Analytic conductor: \(83.1002571076\)
Analytic rank: \(0\)
Dimension: \(4\)
Coefficient field: \(\mathbb{Q}[x]/(x^{4} - \cdots)\)
Copy content comment:defining polynomial
 
Copy content gp:f.mod \\ as an extension of the character field
 
Defining polynomial: \( x^{4} - 2 x^{3} + \cdots + 15\!\cdots\!00 \) Copy content Toggle raw display
Coefficient ring: \(\Z[a_1, \ldots, a_{5}]\)
Coefficient ring index: \( 2^{45}\cdot 3^{15}\cdot 5^{5}\cdot 7^{2}\cdot 11 \)
Twist minimal: yes
Fricke sign: \(-1\)
Sato-Tate group: $\mathrm{SU}(2)$

Embedding invariants

Embedding label 1.2
Root \(4.77338e15\) of defining polynomial
Character \(\chi\) \(=\) 2.1

$q$-expansion

Copy content comment:q-expansion
 
Copy content sage:f.q_expansion() # note that sage often uses an isomorphic number field
 
Copy content gp:mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q+1.09951e12 q^{2} -1.09428e19 q^{3} +1.20893e24 q^{4} -1.35941e28 q^{5} -1.20318e31 q^{6} -2.01060e34 q^{7} +1.32923e36 q^{8} -3.23681e38 q^{9} -1.49469e40 q^{10} +1.34090e41 q^{11} -1.32291e43 q^{12} -1.41164e45 q^{13} -2.21068e46 q^{14} +1.48758e47 q^{15} +1.46150e48 q^{16} -6.93481e49 q^{17} -3.55891e50 q^{18} +2.85317e51 q^{19} -1.64343e52 q^{20} +2.20016e53 q^{21} +1.47434e53 q^{22} +1.73783e55 q^{23} -1.45455e55 q^{24} -2.28790e56 q^{25} -1.55212e57 q^{26} +8.39432e57 q^{27} -2.43067e58 q^{28} -1.94235e59 q^{29} +1.63561e59 q^{30} -8.81707e59 q^{31} +1.60694e60 q^{32} -1.46733e60 q^{33} -7.62490e61 q^{34} +2.73323e62 q^{35} -3.91306e62 q^{36} +2.77158e63 q^{37} +3.13710e63 q^{38} +1.54474e64 q^{39} -1.80697e64 q^{40} -2.02778e65 q^{41} +2.41911e65 q^{42} +2.10478e66 q^{43} +1.62105e65 q^{44} +4.40016e66 q^{45} +1.91077e67 q^{46} +2.81604e67 q^{47} -1.59930e67 q^{48} +1.20498e68 q^{49} -2.51558e68 q^{50} +7.58864e68 q^{51} -1.70657e69 q^{52} -7.63795e69 q^{53} +9.22966e69 q^{54} -1.82284e69 q^{55} -2.67255e70 q^{56} -3.12218e70 q^{57} -2.13564e71 q^{58} +4.52685e71 q^{59} +1.79837e71 q^{60} +4.55117e71 q^{61} -9.69447e71 q^{62} +6.50793e72 q^{63} +1.76685e72 q^{64} +1.91900e73 q^{65} -1.61334e72 q^{66} -1.17113e74 q^{67} -8.38367e73 q^{68} -1.90168e74 q^{69} +3.00522e74 q^{70} +7.88481e74 q^{71} -4.30246e74 q^{72} -5.80736e73 q^{73} +3.04738e75 q^{74} +2.50361e75 q^{75} +3.44927e75 q^{76} -2.69602e75 q^{77} +1.69846e76 q^{78} +7.16447e76 q^{79} -1.98678e76 q^{80} +5.16711e76 q^{81} -2.22957e77 q^{82} +4.36912e77 q^{83} +2.65984e77 q^{84} +9.42725e77 q^{85} +2.31423e78 q^{86} +2.12548e78 q^{87} +1.78236e77 q^{88} +1.73505e79 q^{89} +4.83802e78 q^{90} +2.83825e79 q^{91} +2.10091e79 q^{92} +9.64836e78 q^{93} +3.09627e79 q^{94} -3.87863e79 q^{95} -1.75844e79 q^{96} +4.37906e80 q^{97} +1.32489e80 q^{98} -4.34025e79 q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 4 q + 4398046511104 q^{2} - 71\!\cdots\!04 q^{3} + 48\!\cdots\!04 q^{4} + 24\!\cdots\!80 q^{5} - 78\!\cdots\!04 q^{6} + 18\!\cdots\!92 q^{7} + 53\!\cdots\!04 q^{8} + 10\!\cdots\!92 q^{9} + 27\!\cdots\!80 q^{10}+ \cdots + 23\!\cdots\!24 q^{99}+O(q^{100}) \) Copy content Toggle raw display

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:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) 1.09951e12 0.707107
\(3\) −1.09428e19 −0.519659 −0.259830 0.965654i \(-0.583666\pi\)
−0.259830 + 0.965654i \(0.583666\pi\)
\(4\) 1.20893e24 0.500000
\(5\) −1.35941e28 −0.668445 −0.334222 0.942494i \(-0.608474\pi\)
−0.334222 + 0.942494i \(0.608474\pi\)
\(6\) −1.20318e31 −0.367455
\(7\) −2.01060e34 −1.19359 −0.596795 0.802394i \(-0.703559\pi\)
−0.596795 + 0.802394i \(0.703559\pi\)
\(8\) 1.32923e36 0.353553
\(9\) −3.23681e38 −0.729954
\(10\) −1.49469e40 −0.472662
\(11\) 1.34090e41 0.0893292 0.0446646 0.999002i \(-0.485778\pi\)
0.0446646 + 0.999002i \(0.485778\pi\)
\(12\) −1.32291e43 −0.259830
\(13\) −1.41164e45 −1.08398 −0.541988 0.840386i \(-0.682328\pi\)
−0.541988 + 0.840386i \(0.682328\pi\)
\(14\) −2.21068e46 −0.843996
\(15\) 1.48758e47 0.347364
\(16\) 1.46150e48 0.250000
\(17\) −6.93481e49 −1.01825 −0.509123 0.860694i \(-0.670030\pi\)
−0.509123 + 0.860694i \(0.670030\pi\)
\(18\) −3.55891e50 −0.516156
\(19\) 2.85317e51 0.463241 0.231621 0.972806i \(-0.425597\pi\)
0.231621 + 0.972806i \(0.425597\pi\)
\(20\) −1.64343e52 −0.334222
\(21\) 2.20016e53 0.620260
\(22\) 1.47434e53 0.0631653
\(23\) 1.73783e55 1.23036 0.615178 0.788388i \(-0.289084\pi\)
0.615178 + 0.788388i \(0.289084\pi\)
\(24\) −1.45455e55 −0.183727
\(25\) −2.28790e56 −0.553181
\(26\) −1.55212e57 −0.766486
\(27\) 8.39432e57 0.898987
\(28\) −2.43067e58 −0.596795
\(29\) −1.94235e59 −1.15135 −0.575676 0.817678i \(-0.695261\pi\)
−0.575676 + 0.817678i \(0.695261\pi\)
\(30\) 1.63561e59 0.245623
\(31\) −8.81707e59 −0.350894 −0.175447 0.984489i \(-0.556137\pi\)
−0.175447 + 0.984489i \(0.556137\pi\)
\(32\) 1.60694e60 0.176777
\(33\) −1.46733e60 −0.0464207
\(34\) −7.62490e61 −0.720009
\(35\) 2.73323e62 0.797849
\(36\) −3.91306e62 −0.364977
\(37\) 2.77158e63 0.852231 0.426115 0.904669i \(-0.359882\pi\)
0.426115 + 0.904669i \(0.359882\pi\)
\(38\) 3.13710e63 0.327561
\(39\) 1.54474e64 0.563298
\(40\) −1.80697e64 −0.236331
\(41\) −2.02778e65 −0.975608 −0.487804 0.872953i \(-0.662202\pi\)
−0.487804 + 0.872953i \(0.662202\pi\)
\(42\) 2.41911e65 0.438590
\(43\) 2.10478e66 1.47141 0.735706 0.677301i \(-0.236851\pi\)
0.735706 + 0.677301i \(0.236851\pi\)
\(44\) 1.62105e65 0.0446646
\(45\) 4.40016e66 0.487934
\(46\) 1.91077e67 0.869993
\(47\) 2.81604e67 0.536631 0.268315 0.963331i \(-0.413533\pi\)
0.268315 + 0.963331i \(0.413533\pi\)
\(48\) −1.59930e67 −0.129915
\(49\) 1.20498e68 0.424657
\(50\) −2.51558e68 −0.391158
\(51\) 7.58864e68 0.529141
\(52\) −1.70657e69 −0.541988
\(53\) −7.63795e69 −1.12151 −0.560756 0.827981i \(-0.689490\pi\)
−0.560756 + 0.827981i \(0.689490\pi\)
\(54\) 9.22966e69 0.635680
\(55\) −1.82284e69 −0.0597116
\(56\) −2.67255e70 −0.421998
\(57\) −3.12218e70 −0.240728
\(58\) −2.13564e71 −0.814129
\(59\) 4.52685e71 0.863555 0.431778 0.901980i \(-0.357887\pi\)
0.431778 + 0.901980i \(0.357887\pi\)
\(60\) 1.79837e71 0.173682
\(61\) 4.55117e71 0.225043 0.112521 0.993649i \(-0.464107\pi\)
0.112521 + 0.993649i \(0.464107\pi\)
\(62\) −9.69447e71 −0.248119
\(63\) 6.50793e72 0.871266
\(64\) 1.76685e72 0.125000
\(65\) 1.91900e73 0.724578
\(66\) −1.61334e72 −0.0328244
\(67\) −1.17113e74 −1.29592 −0.647958 0.761676i \(-0.724377\pi\)
−0.647958 + 0.761676i \(0.724377\pi\)
\(68\) −8.38367e73 −0.509123
\(69\) −1.90168e74 −0.639366
\(70\) 3.00522e74 0.564165
\(71\) 7.88481e74 0.833351 0.416676 0.909055i \(-0.363195\pi\)
0.416676 + 0.909055i \(0.363195\pi\)
\(72\) −4.30246e74 −0.258078
\(73\) −5.80736e73 −0.0199252 −0.00996261 0.999950i \(-0.503171\pi\)
−0.00996261 + 0.999950i \(0.503171\pi\)
\(74\) 3.04738e75 0.602618
\(75\) 2.50361e75 0.287466
\(76\) 3.44927e75 0.231621
\(77\) −2.69602e75 −0.106622
\(78\) 1.69846e76 0.398312
\(79\) 7.16447e76 1.00297 0.501483 0.865167i \(-0.332788\pi\)
0.501483 + 0.865167i \(0.332788\pi\)
\(80\) −1.98678e76 −0.167111
\(81\) 5.16711e76 0.262788
\(82\) −2.22957e77 −0.689859
\(83\) 4.36912e77 0.827430 0.413715 0.910406i \(-0.364231\pi\)
0.413715 + 0.910406i \(0.364231\pi\)
\(84\) 2.65984e77 0.310130
\(85\) 9.42725e77 0.680642
\(86\) 2.31423e78 1.04044
\(87\) 2.12548e78 0.598311
\(88\) 1.78236e77 0.0315826
\(89\) 1.73505e79 1.94544 0.972720 0.231983i \(-0.0745213\pi\)
0.972720 + 0.231983i \(0.0745213\pi\)
\(90\) 4.83802e78 0.345022
\(91\) 2.83825e79 1.29382
\(92\) 2.10091e79 0.615178
\(93\) 9.64836e78 0.182345
\(94\) 3.09627e79 0.379455
\(95\) −3.87863e79 −0.309651
\(96\) −1.75844e79 −0.0918636
\(97\) 4.37906e80 1.50358 0.751788 0.659405i \(-0.229192\pi\)
0.751788 + 0.659405i \(0.229192\pi\)
\(98\) 1.32489e80 0.300278
\(99\) −4.34025e79 −0.0652062
\(100\) −2.76591e80 −0.276591
\(101\) 2.54574e81 1.70137 0.850683 0.525678i \(-0.176188\pi\)
0.850683 + 0.525678i \(0.176188\pi\)
\(102\) 8.34380e80 0.374159
\(103\) −4.16422e81 −1.25784 −0.628921 0.777469i \(-0.716503\pi\)
−0.628921 + 0.777469i \(0.716503\pi\)
\(104\) −1.87640e81 −0.383243
\(105\) −2.99093e81 −0.414610
\(106\) −8.39802e81 −0.793029
\(107\) −1.44636e82 −0.933753 −0.466877 0.884323i \(-0.654621\pi\)
−0.466877 + 0.884323i \(0.654621\pi\)
\(108\) 1.01481e82 0.449493
\(109\) −5.76944e82 −1.75938 −0.879692 0.475544i \(-0.842251\pi\)
−0.879692 + 0.475544i \(0.842251\pi\)
\(110\) −2.00423e81 −0.0422225
\(111\) −3.03289e82 −0.442869
\(112\) −2.93850e82 −0.298397
\(113\) 5.44775e82 0.385958 0.192979 0.981203i \(-0.438185\pi\)
0.192979 + 0.981203i \(0.438185\pi\)
\(114\) −3.43287e82 −0.170220
\(115\) −2.36243e83 −0.822426
\(116\) −2.34816e83 −0.575676
\(117\) 4.56922e83 0.791252
\(118\) 4.97733e83 0.610626
\(119\) 1.39431e84 1.21537
\(120\) 1.97733e83 0.122812
\(121\) −2.23526e84 −0.992020
\(122\) 5.00406e83 0.159129
\(123\) 2.21897e84 0.506984
\(124\) −1.06592e84 −0.175447
\(125\) 8.73260e84 1.03822
\(126\) 7.15555e84 0.616078
\(127\) 2.28875e85 1.43070 0.715350 0.698767i \(-0.246267\pi\)
0.715350 + 0.698767i \(0.246267\pi\)
\(128\) 1.94267e84 0.0883883
\(129\) −2.30322e85 −0.764632
\(130\) 2.10997e85 0.512354
\(131\) 4.18237e84 0.0744621 0.0372311 0.999307i \(-0.488146\pi\)
0.0372311 + 0.999307i \(0.488146\pi\)
\(132\) −1.77389e84 −0.0232104
\(133\) −5.73659e85 −0.552920
\(134\) −1.28767e86 −0.916351
\(135\) −1.14113e86 −0.600923
\(136\) −9.21794e85 −0.360005
\(137\) −3.09640e86 −0.898824 −0.449412 0.893325i \(-0.648366\pi\)
−0.449412 + 0.893325i \(0.648366\pi\)
\(138\) −2.09092e86 −0.452100
\(139\) −2.04547e86 −0.330136 −0.165068 0.986282i \(-0.552784\pi\)
−0.165068 + 0.986282i \(0.552784\pi\)
\(140\) 3.30428e86 0.398925
\(141\) −3.08154e86 −0.278865
\(142\) 8.66944e86 0.589268
\(143\) −1.89288e86 −0.0968306
\(144\) −4.73060e86 −0.182489
\(145\) 2.64045e87 0.769616
\(146\) −6.38526e85 −0.0140893
\(147\) −1.31859e87 −0.220677
\(148\) 3.35063e87 0.426115
\(149\) −6.65863e87 −0.644675 −0.322338 0.946625i \(-0.604469\pi\)
−0.322338 + 0.946625i \(0.604469\pi\)
\(150\) 2.75275e87 0.203269
\(151\) 2.85938e88 1.61327 0.806633 0.591052i \(-0.201287\pi\)
0.806633 + 0.591052i \(0.201287\pi\)
\(152\) 3.79252e87 0.163780
\(153\) 2.24467e88 0.743274
\(154\) −2.96430e87 −0.0753934
\(155\) 1.19860e88 0.234553
\(156\) 1.86747e88 0.281649
\(157\) −1.25466e89 −1.46080 −0.730398 0.683022i \(-0.760665\pi\)
−0.730398 + 0.683022i \(0.760665\pi\)
\(158\) 7.87741e88 0.709205
\(159\) 8.35808e88 0.582804
\(160\) −2.18449e88 −0.118165
\(161\) −3.49409e89 −1.46854
\(162\) 5.68130e88 0.185819
\(163\) −4.72225e89 −1.20379 −0.601896 0.798575i \(-0.705588\pi\)
−0.601896 + 0.798575i \(0.705588\pi\)
\(164\) −2.45144e89 −0.487804
\(165\) 1.99470e88 0.0310297
\(166\) 4.80390e89 0.585081
\(167\) −1.94133e90 −1.85388 −0.926939 0.375211i \(-0.877570\pi\)
−0.926939 + 0.375211i \(0.877570\pi\)
\(168\) 2.92452e89 0.219295
\(169\) 2.96794e89 0.175002
\(170\) 1.03654e90 0.481287
\(171\) −9.23518e89 −0.338145
\(172\) 2.54452e90 0.735706
\(173\) 4.83196e90 1.10473 0.552365 0.833603i \(-0.313726\pi\)
0.552365 + 0.833603i \(0.313726\pi\)
\(174\) 2.33699e90 0.423070
\(175\) 4.60006e90 0.660272
\(176\) 1.95973e89 0.0223323
\(177\) −4.95366e90 −0.448754
\(178\) 1.90771e91 1.37563
\(179\) −2.64540e91 −1.52035 −0.760175 0.649719i \(-0.774887\pi\)
−0.760175 + 0.649719i \(0.774887\pi\)
\(180\) 5.31946e90 0.243967
\(181\) −1.53949e91 −0.564151 −0.282076 0.959392i \(-0.591023\pi\)
−0.282076 + 0.959392i \(0.591023\pi\)
\(182\) 3.12069e91 0.914870
\(183\) −4.98027e90 −0.116945
\(184\) 2.30998e91 0.434997
\(185\) −3.76771e91 −0.569669
\(186\) 1.06085e91 0.128937
\(187\) −9.29890e90 −0.0909591
\(188\) 3.40438e91 0.268315
\(189\) −1.68776e92 −1.07302
\(190\) −4.26460e91 −0.218956
\(191\) −2.24535e92 −0.932037 −0.466018 0.884775i \(-0.654312\pi\)
−0.466018 + 0.884775i \(0.654312\pi\)
\(192\) −1.93343e91 −0.0649574
\(193\) −4.62320e92 −1.25855 −0.629277 0.777181i \(-0.716649\pi\)
−0.629277 + 0.777181i \(0.716649\pi\)
\(194\) 4.81483e92 1.06319
\(195\) −2.09993e92 −0.376534
\(196\) 1.45673e92 0.212328
\(197\) 3.38177e92 0.401108 0.200554 0.979683i \(-0.435726\pi\)
0.200554 + 0.979683i \(0.435726\pi\)
\(198\) −4.77215e91 −0.0461078
\(199\) −3.93082e91 −0.0309694 −0.0154847 0.999880i \(-0.504929\pi\)
−0.0154847 + 0.999880i \(0.504929\pi\)
\(200\) −3.04115e92 −0.195579
\(201\) 1.28155e93 0.673435
\(202\) 2.79907e93 1.20305
\(203\) 3.90529e93 1.37424
\(204\) 9.17410e92 0.264571
\(205\) 2.75659e93 0.652140
\(206\) −4.57861e93 −0.889428
\(207\) −5.62504e93 −0.898104
\(208\) −2.06312e93 −0.270994
\(209\) 3.82582e92 0.0413810
\(210\) −3.28856e93 −0.293173
\(211\) 1.42673e94 1.04931 0.524654 0.851315i \(-0.324195\pi\)
0.524654 + 0.851315i \(0.324195\pi\)
\(212\) −9.23372e93 −0.560756
\(213\) −8.62821e93 −0.433059
\(214\) −1.59028e94 −0.660263
\(215\) −2.86126e94 −0.983557
\(216\) 1.11580e94 0.317840
\(217\) 1.77276e94 0.418823
\(218\) −6.34357e94 −1.24407
\(219\) 6.35490e92 0.0103543
\(220\) −2.20367e93 −0.0298558
\(221\) 9.78948e94 1.10375
\(222\) −3.33470e94 −0.313156
\(223\) 7.54258e93 0.0590436 0.0295218 0.999564i \(-0.490602\pi\)
0.0295218 + 0.999564i \(0.490602\pi\)
\(224\) −3.23091e94 −0.210999
\(225\) 7.40551e94 0.403797
\(226\) 5.98987e94 0.272914
\(227\) 1.56153e95 0.594981 0.297491 0.954725i \(-0.403850\pi\)
0.297491 + 0.954725i \(0.403850\pi\)
\(228\) −3.77448e94 −0.120364
\(229\) 1.76125e95 0.470419 0.235209 0.971945i \(-0.424422\pi\)
0.235209 + 0.971945i \(0.424422\pi\)
\(230\) −2.59752e95 −0.581543
\(231\) 2.95021e94 0.0554073
\(232\) −2.58182e95 −0.407065
\(233\) 1.18481e96 1.56940 0.784702 0.619873i \(-0.212816\pi\)
0.784702 + 0.619873i \(0.212816\pi\)
\(234\) 5.02391e95 0.559500
\(235\) −3.82816e95 −0.358708
\(236\) 5.47263e95 0.431778
\(237\) −7.83995e95 −0.521201
\(238\) 1.53306e96 0.859396
\(239\) −1.86426e96 −0.881844 −0.440922 0.897546i \(-0.645348\pi\)
−0.440922 + 0.897546i \(0.645348\pi\)
\(240\) 2.17410e95 0.0868409
\(241\) −3.70273e96 −1.24977 −0.624887 0.780715i \(-0.714855\pi\)
−0.624887 + 0.780715i \(0.714855\pi\)
\(242\) −2.45769e96 −0.701464
\(243\) −4.28769e96 −1.03555
\(244\) 5.50203e95 0.112521
\(245\) −1.63806e96 −0.283860
\(246\) 2.43978e96 0.358492
\(247\) −4.02766e96 −0.502142
\(248\) −1.17199e96 −0.124060
\(249\) −4.78105e96 −0.429982
\(250\) 9.60159e96 0.734130
\(251\) 1.76418e97 1.14751 0.573756 0.819026i \(-0.305486\pi\)
0.573756 + 0.819026i \(0.305486\pi\)
\(252\) 7.86761e96 0.435633
\(253\) 2.33027e96 0.109907
\(254\) 2.51651e97 1.01166
\(255\) −1.03161e97 −0.353702
\(256\) 2.13599e96 0.0625000
\(257\) 3.89420e97 0.973030 0.486515 0.873672i \(-0.338268\pi\)
0.486515 + 0.873672i \(0.338268\pi\)
\(258\) −2.53242e97 −0.540677
\(259\) −5.57253e97 −1.01721
\(260\) 2.31993e97 0.362289
\(261\) 6.28702e97 0.840435
\(262\) 4.59857e96 0.0526527
\(263\) −5.39423e97 −0.529324 −0.264662 0.964341i \(-0.585260\pi\)
−0.264662 + 0.964341i \(0.585260\pi\)
\(264\) −1.95041e96 −0.0164122
\(265\) 1.03831e98 0.749670
\(266\) −6.30745e97 −0.390974
\(267\) −1.89864e98 −1.01097
\(268\) −1.41581e98 −0.647958
\(269\) −1.52947e98 −0.601969 −0.300984 0.953629i \(-0.597315\pi\)
−0.300984 + 0.953629i \(0.597315\pi\)
\(270\) −1.25469e98 −0.424917
\(271\) 6.58423e98 1.91977 0.959885 0.280396i \(-0.0904657\pi\)
0.959885 + 0.280396i \(0.0904657\pi\)
\(272\) −1.01352e98 −0.254562
\(273\) −3.10585e98 −0.672347
\(274\) −3.40453e98 −0.635564
\(275\) −3.06786e97 −0.0494152
\(276\) −2.29899e98 −0.319683
\(277\) 3.36599e98 0.404280 0.202140 0.979357i \(-0.435210\pi\)
0.202140 + 0.979357i \(0.435210\pi\)
\(278\) −2.24901e98 −0.233441
\(279\) 2.85392e98 0.256136
\(280\) 3.63309e98 0.282082
\(281\) −3.06754e98 −0.206151 −0.103075 0.994674i \(-0.532868\pi\)
−0.103075 + 0.994674i \(0.532868\pi\)
\(282\) −3.38819e98 −0.197187
\(283\) 2.40864e99 1.21457 0.607284 0.794485i \(-0.292259\pi\)
0.607284 + 0.794485i \(0.292259\pi\)
\(284\) 9.53215e98 0.416676
\(285\) 4.24432e98 0.160913
\(286\) −2.08124e98 −0.0684696
\(287\) 4.07706e99 1.16448
\(288\) −5.20135e98 −0.129039
\(289\) 1.70814e98 0.0368266
\(290\) 2.90321e99 0.544201
\(291\) −4.79193e99 −0.781347
\(292\) −7.02067e97 −0.00996261
\(293\) −2.20050e99 −0.271883 −0.135942 0.990717i \(-0.543406\pi\)
−0.135942 + 0.990717i \(0.543406\pi\)
\(294\) −1.44980e99 −0.156042
\(295\) −6.15386e99 −0.577239
\(296\) 3.68406e99 0.301309
\(297\) 1.12560e99 0.0803057
\(298\) −7.32124e99 −0.455854
\(299\) −2.45320e100 −1.33368
\(300\) 3.02668e99 0.143733
\(301\) −4.23187e100 −1.75626
\(302\) 3.14393e100 1.14075
\(303\) −2.78576e100 −0.884131
\(304\) 4.16992e99 0.115810
\(305\) −6.18691e99 −0.150429
\(306\) 2.46804e100 0.525574
\(307\) 9.90809e100 1.84878 0.924391 0.381446i \(-0.124574\pi\)
0.924391 + 0.381446i \(0.124574\pi\)
\(308\) −3.25929e99 −0.0533112
\(309\) 4.55683e100 0.653649
\(310\) 1.31788e100 0.165854
\(311\) 6.14070e100 0.678301 0.339150 0.940732i \(-0.389860\pi\)
0.339150 + 0.940732i \(0.389860\pi\)
\(312\) 2.05331e100 0.199156
\(313\) −4.63035e100 −0.394520 −0.197260 0.980351i \(-0.563204\pi\)
−0.197260 + 0.980351i \(0.563204\pi\)
\(314\) −1.37951e101 −1.03294
\(315\) −8.84696e100 −0.582393
\(316\) 8.66131e100 0.501483
\(317\) 1.51283e101 0.770710 0.385355 0.922768i \(-0.374079\pi\)
0.385355 + 0.922768i \(0.374079\pi\)
\(318\) 9.18980e100 0.412105
\(319\) −2.60450e100 −0.102849
\(320\) −2.40187e100 −0.0835556
\(321\) 1.58272e101 0.485233
\(322\) −3.84179e101 −1.03842
\(323\) −1.97862e101 −0.471694
\(324\) 6.24666e100 0.131394
\(325\) 3.22971e101 0.599635
\(326\) −5.19217e101 −0.851209
\(327\) 6.31340e101 0.914280
\(328\) −2.69539e101 −0.344930
\(329\) −5.66193e101 −0.640517
\(330\) 2.19319e100 0.0219413
\(331\) −1.44712e102 −1.28077 −0.640384 0.768055i \(-0.721225\pi\)
−0.640384 + 0.768055i \(0.721225\pi\)
\(332\) 5.28194e101 0.413715
\(333\) −8.97107e101 −0.622089
\(334\) −2.13451e102 −1.31089
\(335\) 1.59205e102 0.866248
\(336\) 3.21554e101 0.155065
\(337\) 3.45224e102 1.47601 0.738007 0.674793i \(-0.235767\pi\)
0.738007 + 0.674793i \(0.235767\pi\)
\(338\) 3.26329e101 0.123745
\(339\) −5.96138e101 −0.200567
\(340\) 1.13969e102 0.340321
\(341\) −1.18228e101 −0.0313450
\(342\) −1.01542e102 −0.239105
\(343\) 3.28242e102 0.686724
\(344\) 2.79773e102 0.520222
\(345\) 2.58517e102 0.427381
\(346\) 5.31279e102 0.781162
\(347\) −2.75746e102 −0.360716 −0.180358 0.983601i \(-0.557726\pi\)
−0.180358 + 0.983601i \(0.557726\pi\)
\(348\) 2.56955e102 0.299156
\(349\) −2.00163e102 −0.207469 −0.103735 0.994605i \(-0.533079\pi\)
−0.103735 + 0.994605i \(0.533079\pi\)
\(350\) 5.05782e102 0.466883
\(351\) −1.18498e103 −0.974479
\(352\) 2.15475e101 0.0157913
\(353\) −9.19073e102 −0.600447 −0.300223 0.953869i \(-0.597061\pi\)
−0.300223 + 0.953869i \(0.597061\pi\)
\(354\) −5.44660e102 −0.317317
\(355\) −1.07187e103 −0.557049
\(356\) 2.09755e103 0.972720
\(357\) −1.52577e103 −0.631578
\(358\) −2.90865e103 −1.07505
\(359\) −1.16554e103 −0.384769 −0.192385 0.981320i \(-0.561622\pi\)
−0.192385 + 0.981320i \(0.561622\pi\)
\(360\) 5.84881e102 0.172511
\(361\) −2.97945e103 −0.785408
\(362\) −1.69269e103 −0.398915
\(363\) 2.44601e103 0.515513
\(364\) 3.43124e103 0.646911
\(365\) 7.89459e101 0.0133189
\(366\) −5.47586e102 −0.0826929
\(367\) 4.33470e103 0.586116 0.293058 0.956095i \(-0.405327\pi\)
0.293058 + 0.956095i \(0.405327\pi\)
\(368\) 2.53985e103 0.307589
\(369\) 6.56355e103 0.712149
\(370\) −4.14264e103 −0.402817
\(371\) 1.53569e104 1.33863
\(372\) 1.16642e103 0.0911726
\(373\) −1.07564e104 −0.754151 −0.377075 0.926183i \(-0.623070\pi\)
−0.377075 + 0.926183i \(0.623070\pi\)
\(374\) −1.02242e103 −0.0643178
\(375\) −9.55593e103 −0.539519
\(376\) 3.74316e103 0.189728
\(377\) 2.74191e104 1.24804
\(378\) −1.85572e104 −0.758741
\(379\) 3.00956e104 1.10564 0.552822 0.833299i \(-0.313551\pi\)
0.552822 + 0.833299i \(0.313551\pi\)
\(380\) −4.68898e103 −0.154826
\(381\) −2.50454e104 −0.743476
\(382\) −2.46879e104 −0.659050
\(383\) 2.43967e104 0.585843 0.292922 0.956136i \(-0.405372\pi\)
0.292922 + 0.956136i \(0.405372\pi\)
\(384\) −2.12583e103 −0.0459318
\(385\) 3.66500e103 0.0712712
\(386\) −5.08327e104 −0.889932
\(387\) −6.81277e104 −1.07406
\(388\) 5.29396e104 0.751788
\(389\) 9.77624e104 1.25087 0.625436 0.780275i \(-0.284921\pi\)
0.625436 + 0.780275i \(0.284921\pi\)
\(390\) −2.30890e104 −0.266249
\(391\) −1.20515e105 −1.25281
\(392\) 1.60169e104 0.150139
\(393\) −4.57670e103 −0.0386949
\(394\) 3.71829e104 0.283626
\(395\) −9.73945e104 −0.670428
\(396\) −5.24704e103 −0.0326031
\(397\) −2.87083e105 −1.61061 −0.805307 0.592858i \(-0.797999\pi\)
−0.805307 + 0.592858i \(0.797999\pi\)
\(398\) −4.32198e103 −0.0218987
\(399\) 6.27745e104 0.287330
\(400\) −3.34378e104 −0.138295
\(401\) 4.08222e105 1.52598 0.762992 0.646408i \(-0.223730\pi\)
0.762992 + 0.646408i \(0.223730\pi\)
\(402\) 1.40908e105 0.476190
\(403\) 1.24466e105 0.380360
\(404\) 3.07761e105 0.850683
\(405\) −7.02423e104 −0.175659
\(406\) 4.29391e105 0.971737
\(407\) 3.71641e104 0.0761290
\(408\) 1.00870e105 0.187080
\(409\) 5.01221e104 0.0841852 0.0420926 0.999114i \(-0.486598\pi\)
0.0420926 + 0.999114i \(0.486598\pi\)
\(410\) 3.03090e105 0.461133
\(411\) 3.38834e105 0.467082
\(412\) −5.03423e105 −0.628921
\(413\) −9.10170e105 −1.03073
\(414\) −6.18480e105 −0.635055
\(415\) −5.93943e105 −0.553091
\(416\) −2.26842e105 −0.191622
\(417\) 2.23832e105 0.171558
\(418\) 4.20654e104 0.0292608
\(419\) −3.00211e105 −0.189565 −0.0947825 0.995498i \(-0.530216\pi\)
−0.0947825 + 0.995498i \(0.530216\pi\)
\(420\) −3.61581e105 −0.207305
\(421\) −1.76425e106 −0.918621 −0.459310 0.888276i \(-0.651903\pi\)
−0.459310 + 0.888276i \(0.651903\pi\)
\(422\) 1.56871e106 0.741973
\(423\) −9.11499e105 −0.391716
\(424\) −1.01526e106 −0.396515
\(425\) 1.58662e106 0.563275
\(426\) −9.48681e105 −0.306219
\(427\) −9.15058e105 −0.268609
\(428\) −1.74854e106 −0.466877
\(429\) 2.07134e105 0.0503189
\(430\) −3.14599e106 −0.695480
\(431\) 8.04943e106 1.61970 0.809852 0.586635i \(-0.199548\pi\)
0.809852 + 0.586635i \(0.199548\pi\)
\(432\) 1.22683e106 0.224747
\(433\) 1.01833e107 1.69875 0.849376 0.527788i \(-0.176978\pi\)
0.849376 + 0.527788i \(0.176978\pi\)
\(434\) 1.94917e106 0.296153
\(435\) −2.88940e106 −0.399938
\(436\) −6.97483e106 −0.879692
\(437\) 4.95834e106 0.569952
\(438\) 6.98728e104 0.00732161
\(439\) −7.01037e105 −0.0669773 −0.0334887 0.999439i \(-0.510662\pi\)
−0.0334887 + 0.999439i \(0.510662\pi\)
\(440\) −2.42297e105 −0.0211112
\(441\) −3.90029e106 −0.309980
\(442\) 1.07636e107 0.780472
\(443\) 1.59443e107 1.05500 0.527501 0.849554i \(-0.323129\pi\)
0.527501 + 0.849554i \(0.323129\pi\)
\(444\) −3.66654e106 −0.221435
\(445\) −2.35865e107 −1.30042
\(446\) 8.29316e105 0.0417502
\(447\) 7.28642e106 0.335012
\(448\) −3.55242e106 −0.149199
\(449\) −2.12994e107 −0.817316 −0.408658 0.912688i \(-0.634003\pi\)
−0.408658 + 0.912688i \(0.634003\pi\)
\(450\) 8.14245e106 0.285528
\(451\) −2.71906e106 −0.0871503
\(452\) 6.58593e106 0.192979
\(453\) −3.12897e107 −0.838349
\(454\) 1.71692e107 0.420715
\(455\) −3.85835e107 −0.864849
\(456\) −4.15008e106 −0.0851100
\(457\) 4.95978e107 0.930800 0.465400 0.885100i \(-0.345910\pi\)
0.465400 + 0.885100i \(0.345910\pi\)
\(458\) 1.93652e107 0.332636
\(459\) −5.82130e107 −0.915390
\(460\) −2.85600e107 −0.411213
\(461\) −3.15964e107 −0.416629 −0.208315 0.978062i \(-0.566798\pi\)
−0.208315 + 0.978062i \(0.566798\pi\)
\(462\) 3.24379e106 0.0391789
\(463\) −3.81465e107 −0.422109 −0.211054 0.977474i \(-0.567690\pi\)
−0.211054 + 0.977474i \(0.567690\pi\)
\(464\) −2.83875e107 −0.287838
\(465\) −1.31161e107 −0.121888
\(466\) 1.30272e108 1.10974
\(467\) −1.99161e107 −0.155550 −0.0777749 0.996971i \(-0.524782\pi\)
−0.0777749 + 0.996971i \(0.524782\pi\)
\(468\) 5.52385e107 0.395626
\(469\) 2.35468e108 1.54679
\(470\) −4.20910e107 −0.253645
\(471\) 1.37295e108 0.759116
\(472\) 6.01722e107 0.305313
\(473\) 2.82230e107 0.131440
\(474\) −8.62012e107 −0.368545
\(475\) −6.52779e107 −0.256256
\(476\) 1.68562e108 0.607685
\(477\) 2.47226e108 0.818653
\(478\) −2.04978e108 −0.623558
\(479\) 1.93862e108 0.541880 0.270940 0.962596i \(-0.412665\pi\)
0.270940 + 0.962596i \(0.412665\pi\)
\(480\) 2.39045e107 0.0614058
\(481\) −3.91248e108 −0.923797
\(482\) −4.07119e108 −0.883723
\(483\) 3.82352e108 0.763141
\(484\) −2.70226e108 −0.496010
\(485\) −5.95294e108 −1.00506
\(486\) −4.71437e108 −0.732242
\(487\) −9.56980e108 −1.36766 −0.683832 0.729639i \(-0.739688\pi\)
−0.683832 + 0.729639i \(0.739688\pi\)
\(488\) 6.04954e107 0.0795646
\(489\) 5.16748e108 0.625561
\(490\) −1.80107e108 −0.200719
\(491\) −5.92115e107 −0.0607583 −0.0303791 0.999538i \(-0.509671\pi\)
−0.0303791 + 0.999538i \(0.509671\pi\)
\(492\) 2.68257e108 0.253492
\(493\) 1.34698e109 1.17236
\(494\) −4.42846e108 −0.355068
\(495\) 5.90018e107 0.0435868
\(496\) −1.28862e108 −0.0877234
\(497\) −1.58532e109 −0.994679
\(498\) −5.25682e108 −0.304043
\(499\) 2.91358e109 1.55366 0.776828 0.629713i \(-0.216828\pi\)
0.776828 + 0.629713i \(0.216828\pi\)
\(500\) 1.05571e109 0.519108
\(501\) 2.12436e109 0.963385
\(502\) 1.93974e109 0.811414
\(503\) −1.57775e109 −0.608885 −0.304442 0.952531i \(-0.598470\pi\)
−0.304442 + 0.952531i \(0.598470\pi\)
\(504\) 8.65053e108 0.308039
\(505\) −3.46070e109 −1.13727
\(506\) 2.56215e108 0.0777158
\(507\) −3.24777e108 −0.0909417
\(508\) 2.76693e109 0.715350
\(509\) −2.64024e109 −0.630336 −0.315168 0.949036i \(-0.602061\pi\)
−0.315168 + 0.949036i \(0.602061\pi\)
\(510\) −1.13426e109 −0.250105
\(511\) 1.16763e108 0.0237825
\(512\) 2.34854e108 0.0441942
\(513\) 2.39505e109 0.416448
\(514\) 4.28171e109 0.688036
\(515\) 5.66088e109 0.840798
\(516\) −2.78443e109 −0.382316
\(517\) 3.77603e108 0.0479368
\(518\) −6.12707e109 −0.719279
\(519\) −5.28753e109 −0.574083
\(520\) 2.55079e109 0.256177
\(521\) −1.27624e110 −1.18579 −0.592893 0.805282i \(-0.702014\pi\)
−0.592893 + 0.805282i \(0.702014\pi\)
\(522\) 6.91265e109 0.594277
\(523\) −1.70175e110 −1.35387 −0.676934 0.736044i \(-0.736692\pi\)
−0.676934 + 0.736044i \(0.736692\pi\)
\(524\) 5.05618e108 0.0372311
\(525\) −5.03377e109 −0.343116
\(526\) −5.93101e109 −0.374288
\(527\) 6.11447e109 0.357296
\(528\) −2.14450e108 −0.0116052
\(529\) 1.02501e110 0.513777
\(530\) 1.14164e110 0.530096
\(531\) −1.46526e110 −0.630356
\(532\) −6.93511e109 −0.276460
\(533\) 2.86251e110 1.05754
\(534\) −2.08758e110 −0.714861
\(535\) 1.96619e110 0.624162
\(536\) −1.55670e110 −0.458175
\(537\) 2.89481e110 0.790064
\(538\) −1.68167e110 −0.425656
\(539\) 1.61576e109 0.0379343
\(540\) −1.37955e110 −0.300462
\(541\) 1.50504e110 0.304129 0.152064 0.988371i \(-0.451408\pi\)
0.152064 + 0.988371i \(0.451408\pi\)
\(542\) 7.23944e110 1.35748
\(543\) 1.68464e110 0.293166
\(544\) −1.11438e110 −0.180002
\(545\) 7.84304e110 1.17605
\(546\) −3.41492e110 −0.475421
\(547\) 8.07682e110 1.04413 0.522064 0.852907i \(-0.325162\pi\)
0.522064 + 0.852907i \(0.325162\pi\)
\(548\) −3.74332e110 −0.449412
\(549\) −1.47313e110 −0.164271
\(550\) −3.37314e109 −0.0349418
\(551\) −5.54186e110 −0.533354
\(552\) −2.52777e110 −0.226050
\(553\) −1.44049e111 −1.19713
\(554\) 3.70095e110 0.285869
\(555\) 4.12294e110 0.296034
\(556\) −2.47282e110 −0.165068
\(557\) −2.30434e111 −1.43024 −0.715122 0.698999i \(-0.753629\pi\)
−0.715122 + 0.698999i \(0.753629\pi\)
\(558\) 3.13792e110 0.181116
\(559\) −2.97120e111 −1.59497
\(560\) 3.99462e110 0.199462
\(561\) 1.01756e110 0.0472678
\(562\) −3.37280e110 −0.145770
\(563\) 1.46911e111 0.590832 0.295416 0.955369i \(-0.404542\pi\)
0.295416 + 0.955369i \(0.404542\pi\)
\(564\) −3.72536e110 −0.139433
\(565\) −7.40573e110 −0.257992
\(566\) 2.64833e111 0.858830
\(567\) −1.03890e111 −0.313661
\(568\) 1.04807e111 0.294634
\(569\) 3.59914e111 0.942219 0.471109 0.882075i \(-0.343854\pi\)
0.471109 + 0.882075i \(0.343854\pi\)
\(570\) 4.66668e110 0.113783
\(571\) −1.14530e110 −0.0260110 −0.0130055 0.999915i \(-0.504140\pi\)
−0.0130055 + 0.999915i \(0.504140\pi\)
\(572\) −2.28835e110 −0.0484153
\(573\) 2.45705e111 0.484342
\(574\) 4.48278e111 0.823409
\(575\) −3.97600e111 −0.680610
\(576\) −5.71895e110 −0.0912443
\(577\) 5.30900e111 0.789573 0.394787 0.918773i \(-0.370819\pi\)
0.394787 + 0.918773i \(0.370819\pi\)
\(578\) 1.87812e110 0.0260403
\(579\) 5.05909e111 0.654019
\(580\) 3.19211e111 0.384808
\(581\) −8.78455e111 −0.987612
\(582\) −5.26878e111 −0.552496
\(583\) −1.02417e111 −0.100184
\(584\) −7.71931e109 −0.00704463
\(585\) −6.21145e111 −0.528909
\(586\) −2.41947e111 −0.192250
\(587\) 1.25086e112 0.927614 0.463807 0.885936i \(-0.346483\pi\)
0.463807 + 0.885936i \(0.346483\pi\)
\(588\) −1.59407e111 −0.110338
\(589\) −2.51566e111 −0.162548
\(590\) −6.76624e111 −0.408170
\(591\) −3.70061e111 −0.208440
\(592\) 4.05066e111 0.213058
\(593\) 2.05837e112 1.01113 0.505566 0.862788i \(-0.331284\pi\)
0.505566 + 0.862788i \(0.331284\pi\)
\(594\) 1.23761e111 0.0567847
\(595\) −1.89544e112 −0.812407
\(596\) −8.04979e111 −0.322338
\(597\) 4.30143e110 0.0160936
\(598\) −2.69733e112 −0.943051
\(599\) −1.41395e112 −0.462005 −0.231002 0.972953i \(-0.574200\pi\)
−0.231002 + 0.972953i \(0.574200\pi\)
\(600\) 3.32787e111 0.101635
\(601\) −1.18747e112 −0.339007 −0.169503 0.985530i \(-0.554216\pi\)
−0.169503 + 0.985530i \(0.554216\pi\)
\(602\) −4.65299e112 −1.24186
\(603\) 3.79074e112 0.945959
\(604\) 3.45678e112 0.806633
\(605\) 3.03864e112 0.663111
\(606\) −3.06297e112 −0.625175
\(607\) 3.10494e112 0.592804 0.296402 0.955063i \(-0.404213\pi\)
0.296402 + 0.955063i \(0.404213\pi\)
\(608\) 4.58487e111 0.0818902
\(609\) −4.27349e112 −0.714138
\(610\) −6.80258e111 −0.106369
\(611\) −3.97525e112 −0.581694
\(612\) 2.71363e112 0.371637
\(613\) 1.07051e113 1.37228 0.686139 0.727471i \(-0.259304\pi\)
0.686139 + 0.727471i \(0.259304\pi\)
\(614\) 1.08941e113 1.30729
\(615\) −3.01649e112 −0.338891
\(616\) −3.58362e111 −0.0376967
\(617\) 4.81319e112 0.474115 0.237057 0.971496i \(-0.423817\pi\)
0.237057 + 0.971496i \(0.423817\pi\)
\(618\) 5.01029e112 0.462200
\(619\) −2.44135e111 −0.0210940 −0.0105470 0.999944i \(-0.503357\pi\)
−0.0105470 + 0.999944i \(0.503357\pi\)
\(620\) 1.44902e112 0.117277
\(621\) 1.45879e113 1.10607
\(622\) 6.75177e112 0.479631
\(623\) −3.48850e113 −2.32206
\(624\) 2.25764e112 0.140824
\(625\) −2.40864e112 −0.140809
\(626\) −5.09113e112 −0.278968
\(627\) −4.18653e111 −0.0215040
\(628\) −1.51679e113 −0.730398
\(629\) −1.92204e113 −0.867781
\(630\) −9.72733e112 −0.411814
\(631\) 1.17093e113 0.464882 0.232441 0.972610i \(-0.425329\pi\)
0.232441 + 0.972610i \(0.425329\pi\)
\(632\) 9.52321e112 0.354602
\(633\) −1.56125e113 −0.545283
\(634\) 1.66338e113 0.544974
\(635\) −3.11136e113 −0.956344
\(636\) 1.01043e113 0.291402
\(637\) −1.70100e113 −0.460318
\(638\) −2.86368e112 −0.0727255
\(639\) −2.55216e113 −0.608308
\(640\) −2.64089e112 −0.0590827
\(641\) 9.00250e112 0.189066 0.0945329 0.995522i \(-0.469864\pi\)
0.0945329 + 0.995522i \(0.469864\pi\)
\(642\) 1.74022e113 0.343112
\(643\) 5.32112e113 0.985050 0.492525 0.870298i \(-0.336074\pi\)
0.492525 + 0.870298i \(0.336074\pi\)
\(644\) −4.22410e113 −0.734271
\(645\) 3.13103e113 0.511115
\(646\) −2.17552e113 −0.333538
\(647\) 8.89947e113 1.28157 0.640783 0.767722i \(-0.278610\pi\)
0.640783 + 0.767722i \(0.278610\pi\)
\(648\) 6.86827e112 0.0929094
\(649\) 6.07007e112 0.0771407
\(650\) 3.55110e113 0.424006
\(651\) −1.93990e113 −0.217645
\(652\) −5.70885e113 −0.601896
\(653\) 1.74265e114 1.72673 0.863367 0.504577i \(-0.168351\pi\)
0.863367 + 0.504577i \(0.168351\pi\)
\(654\) 6.94166e113 0.646494
\(655\) −5.68557e112 −0.0497738
\(656\) −2.96361e113 −0.243902
\(657\) 1.87973e112 0.0145445
\(658\) −6.22536e113 −0.452914
\(659\) −4.23044e113 −0.289418 −0.144709 0.989474i \(-0.546225\pi\)
−0.144709 + 0.989474i \(0.546225\pi\)
\(660\) 2.41144e112 0.0155148
\(661\) 7.44154e113 0.450302 0.225151 0.974324i \(-0.427712\pi\)
0.225151 + 0.974324i \(0.427712\pi\)
\(662\) −1.59112e114 −0.905640
\(663\) −1.07125e114 −0.573576
\(664\) 5.80756e113 0.292541
\(665\) 7.79838e113 0.369597
\(666\) −9.86380e113 −0.439884
\(667\) −3.37548e114 −1.41657
\(668\) −2.34692e114 −0.926939
\(669\) −8.25372e112 −0.0306826
\(670\) 1.75048e114 0.612530
\(671\) 6.10267e112 0.0201029
\(672\) 3.53553e113 0.109648
\(673\) 6.37304e114 1.86096 0.930478 0.366347i \(-0.119392\pi\)
0.930478 + 0.366347i \(0.119392\pi\)
\(674\) 3.79578e114 1.04370
\(675\) −1.92054e114 −0.497303
\(676\) 3.58802e113 0.0875012
\(677\) −5.60315e114 −1.28704 −0.643519 0.765430i \(-0.722526\pi\)
−0.643519 + 0.765430i \(0.722526\pi\)
\(678\) −6.55461e113 −0.141822
\(679\) −8.80454e114 −1.79465
\(680\) 1.25310e114 0.240643
\(681\) −1.70876e114 −0.309188
\(682\) −1.29993e113 −0.0221643
\(683\) 1.37058e114 0.220224 0.110112 0.993919i \(-0.464879\pi\)
0.110112 + 0.993919i \(0.464879\pi\)
\(684\) −1.11646e114 −0.169072
\(685\) 4.20928e114 0.600814
\(686\) 3.60906e114 0.485587
\(687\) −1.92731e114 −0.244458
\(688\) 3.07614e114 0.367853
\(689\) 1.07821e115 1.21569
\(690\) 2.84242e114 0.302204
\(691\) −5.10818e114 −0.512159 −0.256080 0.966656i \(-0.582431\pi\)
−0.256080 + 0.966656i \(0.582431\pi\)
\(692\) 5.84148e114 0.552365
\(693\) 8.72650e113 0.0778295
\(694\) −3.03186e114 −0.255065
\(695\) 2.78063e114 0.220678
\(696\) 2.82525e114 0.211535
\(697\) 1.40623e115 0.993410
\(698\) −2.20082e114 −0.146703
\(699\) −1.29652e115 −0.815556
\(700\) 5.56113e114 0.330136
\(701\) 1.73691e115 0.973189 0.486595 0.873628i \(-0.338239\pi\)
0.486595 + 0.873628i \(0.338239\pi\)
\(702\) −1.30290e115 −0.689061
\(703\) 7.90779e114 0.394788
\(704\) 2.36917e113 0.0111661
\(705\) 4.18908e114 0.186406
\(706\) −1.01053e115 −0.424580
\(707\) −5.11846e115 −2.03073
\(708\) −5.98860e114 −0.224377
\(709\) 6.35739e112 0.00224961 0.00112480 0.999999i \(-0.499642\pi\)
0.00112480 + 0.999999i \(0.499642\pi\)
\(710\) −1.17853e115 −0.393893
\(711\) −2.31900e115 −0.732120
\(712\) 2.30628e115 0.687817
\(713\) −1.53226e115 −0.431724
\(714\) −1.67760e115 −0.446593
\(715\) 2.57320e114 0.0647259
\(716\) −3.19809e115 −0.760175
\(717\) 2.04003e115 0.458258
\(718\) −1.28152e115 −0.272073
\(719\) −1.34275e115 −0.269447 −0.134724 0.990883i \(-0.543015\pi\)
−0.134724 + 0.990883i \(0.543015\pi\)
\(720\) 6.43084e114 0.121984
\(721\) 8.37258e115 1.50135
\(722\) −3.27594e115 −0.555367
\(723\) 4.05183e115 0.649456
\(724\) −1.86113e115 −0.282076
\(725\) 4.44391e115 0.636907
\(726\) 2.68941e115 0.364522
\(727\) 6.40980e115 0.821677 0.410838 0.911708i \(-0.365236\pi\)
0.410838 + 0.911708i \(0.365236\pi\)
\(728\) 3.77268e115 0.457435
\(729\) 2.40071e115 0.275344
\(730\) 8.68020e113 0.00941789
\(731\) −1.45962e116 −1.49826
\(732\) −6.02077e114 −0.0584727
\(733\) 1.13204e116 1.04028 0.520142 0.854080i \(-0.325879\pi\)
0.520142 + 0.854080i \(0.325879\pi\)
\(734\) 4.76605e115 0.414447
\(735\) 1.79250e115 0.147510
\(736\) 2.79259e115 0.217498
\(737\) −1.57037e115 −0.115763
\(738\) 7.21670e115 0.503566
\(739\) −1.93579e116 −1.27867 −0.639334 0.768929i \(-0.720790\pi\)
−0.639334 + 0.768929i \(0.720790\pi\)
\(740\) −4.55488e115 −0.284835
\(741\) 4.40740e115 0.260943
\(742\) 1.68851e116 0.946552
\(743\) −2.79056e116 −1.48130 −0.740652 0.671889i \(-0.765483\pi\)
−0.740652 + 0.671889i \(0.765483\pi\)
\(744\) 1.28249e115 0.0644687
\(745\) 9.05182e115 0.430930
\(746\) −1.18268e116 −0.533265
\(747\) −1.41420e116 −0.603986
\(748\) −1.12417e115 −0.0454796
\(749\) 2.90804e116 1.11452
\(750\) −1.05069e116 −0.381497
\(751\) −3.90954e116 −1.34496 −0.672479 0.740117i \(-0.734770\pi\)
−0.672479 + 0.740117i \(0.734770\pi\)
\(752\) 4.11565e115 0.134158
\(753\) −1.93051e116 −0.596315
\(754\) 3.01476e116 0.882496
\(755\) −3.88708e116 −1.07838
\(756\) −2.04038e116 −0.536511
\(757\) 3.79330e116 0.945441 0.472720 0.881212i \(-0.343272\pi\)
0.472720 + 0.881212i \(0.343272\pi\)
\(758\) 3.30905e116 0.781809
\(759\) −2.54997e115 −0.0571140
\(760\) −5.15559e115 −0.109478
\(761\) −4.01135e116 −0.807628 −0.403814 0.914841i \(-0.632316\pi\)
−0.403814 + 0.914841i \(0.632316\pi\)
\(762\) −2.75377e116 −0.525717
\(763\) 1.16000e117 2.09998
\(764\) −2.71446e116 −0.466018
\(765\) −3.05142e116 −0.496837
\(766\) 2.68245e116 0.414254
\(767\) −6.39031e116 −0.936072
\(768\) −2.33737e115 −0.0324787
\(769\) 1.43282e117 1.88875 0.944377 0.328865i \(-0.106666\pi\)
0.944377 + 0.328865i \(0.106666\pi\)
\(770\) 4.02971e115 0.0503963
\(771\) −4.26135e116 −0.505644
\(772\) −5.58911e116 −0.629277
\(773\) 1.34053e117 1.43222 0.716108 0.697989i \(-0.245922\pi\)
0.716108 + 0.697989i \(0.245922\pi\)
\(774\) −7.49072e116 −0.759477
\(775\) 2.01726e116 0.194108
\(776\) 5.82077e116 0.531595
\(777\) 6.09793e116 0.528605
\(778\) 1.07491e117 0.884500
\(779\) −5.78562e116 −0.451942
\(780\) −2.53866e116 −0.188267
\(781\) 1.05728e116 0.0744426
\(782\) −1.32508e117 −0.885868
\(783\) −1.63047e117 −1.03505
\(784\) 1.76108e116 0.106164
\(785\) 1.70560e117 0.976461
\(786\) −5.03213e115 −0.0273614
\(787\) 1.37146e117 0.708282 0.354141 0.935192i \(-0.384773\pi\)
0.354141 + 0.935192i \(0.384773\pi\)
\(788\) 4.08831e116 0.200554
\(789\) 5.90281e116 0.275068
\(790\) −1.07086e117 −0.474064
\(791\) −1.09533e117 −0.460676
\(792\) −5.76918e115 −0.0230539
\(793\) −6.42463e116 −0.243941
\(794\) −3.15651e117 −1.13888
\(795\) −1.13621e117 −0.389573
\(796\) −4.75207e115 −0.0154847
\(797\) −4.66086e117 −1.44346 −0.721729 0.692176i \(-0.756652\pi\)
−0.721729 + 0.692176i \(0.756652\pi\)
\(798\) 6.90213e116 0.203173
\(799\) −1.95287e117 −0.546423
\(800\) −3.67652e116 −0.0977896
\(801\) −5.61604e117 −1.42008
\(802\) 4.48845e117 1.07903
\(803\) −7.78711e114 −0.00177990
\(804\) 1.54930e117 0.336717
\(805\) 4.74990e117 0.981639
\(806\) 1.36851e117 0.268955
\(807\) 1.67367e117 0.312819
\(808\) 3.38387e117 0.601524
\(809\) 3.96055e117 0.669638 0.334819 0.942282i \(-0.391325\pi\)
0.334819 + 0.942282i \(0.391325\pi\)
\(810\) −7.72322e116 −0.124210
\(811\) 6.26152e117 0.957933 0.478967 0.877833i \(-0.341012\pi\)
0.478967 + 0.877833i \(0.341012\pi\)
\(812\) 4.72120e117 0.687122
\(813\) −7.20501e117 −0.997626
\(814\) 4.08624e116 0.0538314
\(815\) 6.41948e117 0.804668
\(816\) 1.10908e117 0.132285
\(817\) 6.00530e117 0.681618
\(818\) 5.51099e116 0.0595279
\(819\) −9.18688e117 −0.944431
\(820\) 3.33252e117 0.326070
\(821\) −1.02610e118 −0.955630 −0.477815 0.878460i \(-0.658571\pi\)
−0.477815 + 0.878460i \(0.658571\pi\)
\(822\) 3.72552e117 0.330277
\(823\) 9.96741e117 0.841180 0.420590 0.907251i \(-0.361823\pi\)
0.420590 + 0.907251i \(0.361823\pi\)
\(824\) −5.53520e117 −0.444714
\(825\) 3.35710e116 0.0256791
\(826\) −1.00074e118 −0.728837
\(827\) −1.74802e118 −1.21220 −0.606100 0.795388i \(-0.707267\pi\)
−0.606100 + 0.795388i \(0.707267\pi\)
\(828\) −6.80026e117 −0.449052
\(829\) 1.57176e118 0.988386 0.494193 0.869352i \(-0.335464\pi\)
0.494193 + 0.869352i \(0.335464\pi\)
\(830\) −6.53047e117 −0.391095
\(831\) −3.68334e117 −0.210088
\(832\) −2.49416e117 −0.135497
\(833\) −8.35630e117 −0.432406
\(834\) 2.46106e117 0.121310
\(835\) 2.63906e118 1.23922
\(836\) 4.62514e116 0.0206905
\(837\) −7.40133e117 −0.315449
\(838\) −3.30085e117 −0.134043
\(839\) −3.67456e118 −1.42183 −0.710913 0.703280i \(-0.751718\pi\)
−0.710913 + 0.703280i \(0.751718\pi\)
\(840\) −3.97563e117 −0.146587
\(841\) 9.26701e117 0.325613
\(842\) −1.93982e118 −0.649563
\(843\) 3.35676e117 0.107128
\(844\) 1.72481e118 0.524654
\(845\) −4.03466e117 −0.116980
\(846\) −1.00220e118 −0.276985
\(847\) 4.49421e118 1.18407
\(848\) −1.11629e118 −0.280378
\(849\) −2.63574e118 −0.631162
\(850\) 1.74450e118 0.398296
\(851\) 4.81654e118 1.04855
\(852\) −1.04309e118 −0.216529
\(853\) 6.01295e118 1.19029 0.595144 0.803619i \(-0.297095\pi\)
0.595144 + 0.803619i \(0.297095\pi\)
\(854\) −1.00612e118 −0.189935
\(855\) 1.25544e118 0.226031
\(856\) −1.92254e118 −0.330132
\(857\) −1.07846e119 −1.76636 −0.883180 0.469034i \(-0.844602\pi\)
−0.883180 + 0.469034i \(0.844602\pi\)
\(858\) 2.27746e117 0.0355809
\(859\) 1.18938e119 1.77254 0.886272 0.463165i \(-0.153286\pi\)
0.886272 + 0.463165i \(0.153286\pi\)
\(860\) −3.45905e118 −0.491779
\(861\) −4.46146e118 −0.605131
\(862\) 8.85044e118 1.14530
\(863\) 7.58328e117 0.0936310 0.0468155 0.998904i \(-0.485093\pi\)
0.0468155 + 0.998904i \(0.485093\pi\)
\(864\) 1.34892e118 0.158920
\(865\) −6.56862e118 −0.738451
\(866\) 1.11967e119 1.20120
\(867\) −1.86919e117 −0.0191373
\(868\) 2.14313e118 0.209412
\(869\) 9.60685e117 0.0895942
\(870\) −3.17693e118 −0.282799
\(871\) 1.65322e119 1.40474
\(872\) −7.66890e118 −0.622036
\(873\) −1.41742e119 −1.09754
\(874\) 5.45175e118 0.403017
\(875\) −1.75578e119 −1.23920
\(876\) 7.68260e116 0.00517716
\(877\) −2.19337e119 −1.41133 −0.705665 0.708546i \(-0.749352\pi\)
−0.705665 + 0.708546i \(0.749352\pi\)
\(878\) −7.70798e117 −0.0473601
\(879\) 2.40797e118 0.141287
\(880\) −2.66408e117 −0.0149279
\(881\) −3.17174e118 −0.169736 −0.0848680 0.996392i \(-0.527047\pi\)
−0.0848680 + 0.996392i \(0.527047\pi\)
\(882\) −4.28841e118 −0.219189
\(883\) −1.42439e119 −0.695375 −0.347688 0.937610i \(-0.613033\pi\)
−0.347688 + 0.937610i \(0.613033\pi\)
\(884\) 1.18348e119 0.551877
\(885\) 6.73406e118 0.299968
\(886\) 1.75309e119 0.745999
\(887\) 1.77457e119 0.721417 0.360709 0.932679i \(-0.382535\pi\)
0.360709 + 0.932679i \(0.382535\pi\)
\(888\) −4.03140e118 −0.156578
\(889\) −4.60177e119 −1.70767
\(890\) −2.59337e119 −0.919535
\(891\) 6.92859e117 0.0234746
\(892\) 9.11842e117 0.0295218
\(893\) 8.03465e118 0.248589
\(894\) 8.01151e118 0.236889
\(895\) 3.59619e119 1.01627
\(896\) −3.90593e118 −0.105499
\(897\) 2.68450e119 0.693057
\(898\) −2.34189e119 −0.577930
\(899\) 1.71258e119 0.404002
\(900\) 8.95272e118 0.201899
\(901\) 5.29677e119 1.14198
\(902\) −2.98964e118 −0.0616246
\(903\) 4.63086e119 0.912658
\(904\) 7.24130e118 0.136457
\(905\) 2.09280e119 0.377104
\(906\) −3.44034e119 −0.592802
\(907\) 9.48113e119 1.56230 0.781151 0.624342i \(-0.214633\pi\)
0.781151 + 0.624342i \(0.214633\pi\)
\(908\) 1.88777e119 0.297491
\(909\) −8.24007e119 −1.24192
\(910\) −4.24230e119 −0.611540
\(911\) −4.96720e119 −0.684885 −0.342443 0.939539i \(-0.611254\pi\)
−0.342443 + 0.939539i \(0.611254\pi\)
\(912\) −4.56307e118 −0.0601819
\(913\) 5.85856e118 0.0739136
\(914\) 5.45334e119 0.658175
\(915\) 6.77023e118 0.0781716
\(916\) 2.12922e119 0.235209
\(917\) −8.40908e118 −0.0888772
\(918\) −6.40059e119 −0.647279
\(919\) −8.81023e119 −0.852529 −0.426265 0.904599i \(-0.640171\pi\)
−0.426265 + 0.904599i \(0.640171\pi\)
\(920\) −3.14021e119 −0.290771
\(921\) −1.08422e120 −0.960737
\(922\) −3.47406e119 −0.294601
\(923\) −1.11305e120 −0.903332
\(924\) 3.56658e118 0.0277037
\(925\) −6.34110e119 −0.471438
\(926\) −4.19425e119 −0.298476
\(927\) 1.34788e120 0.918167
\(928\) −3.12123e119 −0.203532
\(929\) 1.56217e120 0.975195 0.487597 0.873069i \(-0.337873\pi\)
0.487597 + 0.873069i \(0.337873\pi\)
\(930\) −1.44213e119 −0.0861876
\(931\) 3.43801e119 0.196719
\(932\) 1.43235e120 0.784702
\(933\) −6.71966e119 −0.352485
\(934\) −2.18979e119 −0.109990
\(935\) 1.26410e119 0.0608012
\(936\) 6.07354e119 0.279750
\(937\) −2.78813e120 −1.22987 −0.614936 0.788577i \(-0.710818\pi\)
−0.614936 + 0.788577i \(0.710818\pi\)
\(938\) 2.58900e120 1.09375
\(939\) 5.06692e119 0.205016
\(940\) −4.62796e119 −0.179354
\(941\) 3.84851e120 1.42861 0.714303 0.699836i \(-0.246744\pi\)
0.714303 + 0.699836i \(0.246744\pi\)
\(942\) 1.50957e120 0.536776
\(943\) −3.52395e120 −1.20035
\(944\) 6.61601e119 0.215889
\(945\) 2.29436e120 0.717256
\(946\) 3.10315e119 0.0929421
\(947\) −2.79617e120 −0.802397 −0.401199 0.915991i \(-0.631406\pi\)
−0.401199 + 0.915991i \(0.631406\pi\)
\(948\) −9.47792e119 −0.260601
\(949\) 8.19793e118 0.0215985
\(950\) −7.17738e119 −0.181201
\(951\) −1.65547e120 −0.400507
\(952\) 1.85336e120 0.429698
\(953\) −7.39437e119 −0.164301 −0.0821503 0.996620i \(-0.526179\pi\)
−0.0821503 + 0.996620i \(0.526179\pi\)
\(954\) 2.71828e120 0.578875
\(955\) 3.05236e120 0.623015
\(956\) −2.25375e120 −0.440922
\(957\) 2.85006e119 0.0534466
\(958\) 2.13153e120 0.383167
\(959\) 6.22563e120 1.07283
\(960\) 2.62833e119 0.0434204
\(961\) −5.53649e120 −0.876874
\(962\) −4.30182e120 −0.653223
\(963\) 4.68158e120 0.681597
\(964\) −4.47632e120 −0.624887
\(965\) 6.28483e120 0.841274
\(966\) 4.20401e120 0.539622
\(967\) −1.12670e121 −1.38687 −0.693436 0.720518i \(-0.743904\pi\)
−0.693436 + 0.720518i \(0.743904\pi\)
\(968\) −2.97117e120 −0.350732
\(969\) 2.16517e120 0.245120
\(970\) −6.54533e120 −0.710683
\(971\) −9.85982e120 −1.02681 −0.513405 0.858146i \(-0.671616\pi\)
−0.513405 + 0.858146i \(0.671616\pi\)
\(972\) −5.18350e120 −0.517773
\(973\) 4.11262e120 0.394047
\(974\) −1.05221e121 −0.967085
\(975\) −3.53421e120 −0.311606
\(976\) 6.65154e119 0.0562606
\(977\) 1.04037e120 0.0844225 0.0422112 0.999109i \(-0.486560\pi\)
0.0422112 + 0.999109i \(0.486560\pi\)
\(978\) 5.68170e120 0.442339
\(979\) 2.32654e120 0.173785
\(980\) −1.98030e120 −0.141930
\(981\) 1.86746e121 1.28427
\(982\) −6.51037e119 −0.0429626
\(983\) −1.54435e121 −0.977975 −0.488987 0.872291i \(-0.662634\pi\)
−0.488987 + 0.872291i \(0.662634\pi\)
\(984\) 2.94952e120 0.179246
\(985\) −4.59721e120 −0.268119
\(986\) 1.48102e121 0.828985
\(987\) 6.19575e120 0.332851
\(988\) −4.86915e120 −0.251071
\(989\) 3.65776e121 1.81036
\(990\) 6.48731e119 0.0308205
\(991\) −1.83844e121 −0.838431 −0.419215 0.907887i \(-0.637695\pi\)
−0.419215 + 0.907887i \(0.637695\pi\)
\(992\) −1.41685e120 −0.0620298
\(993\) 1.58356e121 0.665563
\(994\) −1.74308e121 −0.703345
\(995\) 5.34360e119 0.0207014
\(996\) −5.77994e120 −0.214991
\(997\) 9.76494e120 0.348751 0.174376 0.984679i \(-0.444209\pi\)
0.174376 + 0.984679i \(0.444209\pi\)
\(998\) 3.20351e121 1.09860
\(999\) 2.32655e121 0.766144
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 2.82.a.b.1.2 4
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
2.82.a.b.1.2 4 1.1 even 1 trivial