Properties

Label 289.10.a.a.1.1
Level $289$
Weight $10$
Character 289.1
Self dual yes
Analytic conductor $148.845$
Analytic rank $1$
Dimension $5$
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] = [289,10,Mod(1,289)]
 
mf = mfinit([N,k,chi],0)
 
lf = mfeigenbasis(mf)
 
from sage.modular.dirichlet import DirichletCharacter
 
H = DirichletGroup(289, base_ring=CyclotomicField(2))
 
chi = DirichletCharacter(H, H._module([0]))
 
N = Newforms(chi, 10, names="a")
 
//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code
 
chi := DirichletCharacter("289.1");
 
S:= CuspForms(chi, 10);
 
N := Newforms(S);
 
Level: \( N \) \(=\) \( 289 = 17^{2} \)
Weight: \( k \) \(=\) \( 10 \)
Character orbit: \([\chi]\) \(=\) 289.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: \(148.845356651\)
Analytic rank: \(1\)
Dimension: \(5\)
Coefficient field: \(\mathbb{Q}[x]/(x^{5} - \cdots)\)
comment: defining polynomial
 
gp: f.mod \\ as an extension of the character field
 
Defining polynomial: \( x^{5} - 2x^{4} - 1596x^{3} + 5754x^{2} + 488987x - 2711704 \) Copy content Toggle raw display
Coefficient ring: \(\Z[a_1, a_2, a_3]\)
Coefficient ring index: \( 2^{2}\cdot 3 \)
Twist minimal: no (minimal twist has level 17)
Fricke sign: \(1\)
Sato-Tate group: $\mathrm{SU}(2)$

Embedding invariants

Embedding label 1.1
Root \(-35.0613\) of defining polynomial
Character \(\chi\) \(=\) 289.1

$q$-expansion

comment: q-expansion
 
sage: f.q_expansion() # note that sage often uses an isomorphic number field
 
gp: mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q-42.0613 q^{2} +256.773 q^{3} +1257.15 q^{4} -1407.25 q^{5} -10800.2 q^{6} +5138.64 q^{7} -31342.2 q^{8} +46249.6 q^{9} +O(q^{10})\) \(q-42.0613 q^{2} +256.773 q^{3} +1257.15 q^{4} -1407.25 q^{5} -10800.2 q^{6} +5138.64 q^{7} -31342.2 q^{8} +46249.6 q^{9} +59190.7 q^{10} -26560.4 q^{11} +322804. q^{12} +71402.0 q^{13} -216138. q^{14} -361344. q^{15} +674631. q^{16} -1.94532e6 q^{18} -548715. q^{19} -1.76913e6 q^{20} +1.31947e6 q^{21} +1.11716e6 q^{22} -1.15988e6 q^{23} -8.04785e6 q^{24} +27218.8 q^{25} -3.00326e6 q^{26} +6.82160e6 q^{27} +6.46007e6 q^{28} -1.44199e6 q^{29} +1.51986e7 q^{30} +6.05781e6 q^{31} -1.23287e7 q^{32} -6.82000e6 q^{33} -7.23134e6 q^{35} +5.81429e7 q^{36} +9.50334e6 q^{37} +2.30797e7 q^{38} +1.83341e7 q^{39} +4.41062e7 q^{40} -1.75776e7 q^{41} -5.54985e7 q^{42} -2.06503e7 q^{43} -3.33905e7 q^{44} -6.50846e7 q^{45} +4.87861e7 q^{46} +3.15997e7 q^{47} +1.73227e8 q^{48} -1.39480e7 q^{49} -1.14486e6 q^{50} +8.97634e7 q^{52} -1.02011e8 q^{53} -2.86925e8 q^{54} +3.73770e7 q^{55} -1.61056e8 q^{56} -1.40895e8 q^{57} +6.06520e7 q^{58} -5.95270e7 q^{59} -4.54265e8 q^{60} -5.34058e7 q^{61} -2.54799e8 q^{62} +2.37660e8 q^{63} +1.73149e8 q^{64} -1.00480e8 q^{65} +2.86858e8 q^{66} -6.45107e7 q^{67} -2.97827e8 q^{69} +3.04160e8 q^{70} +2.71132e8 q^{71} -1.44956e9 q^{72} -2.75443e8 q^{73} -3.99723e8 q^{74} +6.98908e6 q^{75} -6.89819e8 q^{76} -1.36484e8 q^{77} -7.71158e8 q^{78} +4.33372e8 q^{79} -9.49373e8 q^{80} +8.41275e8 q^{81} +7.39337e8 q^{82} +1.23703e8 q^{83} +1.65877e9 q^{84} +8.68579e8 q^{86} -3.70264e8 q^{87} +8.32461e8 q^{88} -8.87168e8 q^{89} +2.73755e9 q^{90} +3.66909e8 q^{91} -1.45815e9 q^{92} +1.55548e9 q^{93} -1.32912e9 q^{94} +7.72177e8 q^{95} -3.16568e9 q^{96} +4.41697e8 q^{97} +5.86670e8 q^{98} -1.22841e9 q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 5 q - 33 q^{2} + 236 q^{3} + 853 q^{4} - 1480 q^{5} - 7578 q^{6} + 13202 q^{7} - 42423 q^{8} + 10981 q^{9}+O(q^{10}) \) Copy content Toggle raw display \( 5 q - 33 q^{2} + 236 q^{3} + 853 q^{4} - 1480 q^{5} - 7578 q^{6} + 13202 q^{7} - 42423 q^{8} + 10981 q^{9} + 89328 q^{10} + 68036 q^{11} + 406010 q^{12} - 158862 q^{13} + 84700 q^{14} - 687324 q^{15} + 350225 q^{16} - 1911585 q^{18} - 370992 q^{19} - 1632640 q^{20} + 1783880 q^{21} - 122290 q^{22} - 1645870 q^{23} - 9678702 q^{24} + 3270239 q^{25} + 734846 q^{26} + 2998268 q^{27} - 183372 q^{28} - 3668616 q^{29} + 17048544 q^{30} + 7262362 q^{31} - 5605919 q^{32} - 11334900 q^{33} - 26503988 q^{35} + 49782133 q^{36} + 31420708 q^{37} + 18513700 q^{38} + 42449884 q^{39} + 53930464 q^{40} + 7996938 q^{41} - 44519496 q^{42} - 56908268 q^{43} - 43323054 q^{44} - 12799536 q^{45} + 32063472 q^{46} - 16903336 q^{47} + 102794498 q^{48} - 11784059 q^{49} + 85921093 q^{50} + 173619082 q^{52} - 83362982 q^{53} - 386329164 q^{54} + 6363364 q^{55} - 317409372 q^{56} - 136615904 q^{57} - 64577488 q^{58} - 37946604 q^{59} - 223158912 q^{60} + 77685452 q^{61} - 324855300 q^{62} + 191945278 q^{63} + 131623105 q^{64} + 40321288 q^{65} + 298037676 q^{66} - 304503600 q^{67} - 333409272 q^{69} - 122787392 q^{70} + 476602922 q^{71} - 1301701911 q^{72} + 289980486 q^{73} - 262289012 q^{74} + 153685772 q^{75} - 1031276084 q^{76} - 143385648 q^{77} - 691646196 q^{78} + 828240610 q^{79} - 912750944 q^{80} + 891328609 q^{81} + 1109615654 q^{82} + 194681148 q^{83} + 1541719592 q^{84} + 1164707144 q^{86} + 158149884 q^{87} + 1017979978 q^{88} + 376848106 q^{89} + 2240087472 q^{90} - 194543664 q^{91} - 2506713088 q^{92} + 3494835920 q^{93} - 2244811104 q^{94} - 1498679864 q^{95} - 2935047582 q^{96} - 692035246 q^{97} + 871744055 q^{98} - 2027106408 q^{99}+O(q^{100}) \) 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:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) −42.0613 −1.85887 −0.929433 0.368992i \(-0.879703\pi\)
−0.929433 + 0.368992i \(0.879703\pi\)
\(3\) 256.773 1.83022 0.915112 0.403199i \(-0.132102\pi\)
0.915112 + 0.403199i \(0.132102\pi\)
\(4\) 1257.15 2.45538
\(5\) −1407.25 −1.00694 −0.503472 0.864012i \(-0.667944\pi\)
−0.503472 + 0.864012i \(0.667944\pi\)
\(6\) −10800.2 −3.40214
\(7\) 5138.64 0.808923 0.404461 0.914555i \(-0.367459\pi\)
0.404461 + 0.914555i \(0.367459\pi\)
\(8\) −31342.2 −2.70536
\(9\) 46249.6 2.34972
\(10\) 59190.7 1.87177
\(11\) −26560.4 −0.546975 −0.273487 0.961876i \(-0.588177\pi\)
−0.273487 + 0.961876i \(0.588177\pi\)
\(12\) 322804. 4.49390
\(13\) 71402.0 0.693371 0.346685 0.937981i \(-0.387307\pi\)
0.346685 + 0.937981i \(0.387307\pi\)
\(14\) −216138. −1.50368
\(15\) −361344. −1.84293
\(16\) 674631. 2.57351
\(17\) 0 0
\(18\) −1.94532e6 −4.36782
\(19\) −548715. −0.965951 −0.482976 0.875634i \(-0.660444\pi\)
−0.482976 + 0.875634i \(0.660444\pi\)
\(20\) −1.76913e6 −2.47243
\(21\) 1.31947e6 1.48051
\(22\) 1.11716e6 1.01675
\(23\) −1.15988e6 −0.864247 −0.432124 0.901814i \(-0.642236\pi\)
−0.432124 + 0.901814i \(0.642236\pi\)
\(24\) −8.04785e6 −4.95141
\(25\) 27218.8 0.0139360
\(26\) −3.00326e6 −1.28888
\(27\) 6.82160e6 2.47030
\(28\) 6.46007e6 1.98621
\(29\) −1.44199e6 −0.378592 −0.189296 0.981920i \(-0.560620\pi\)
−0.189296 + 0.981920i \(0.560620\pi\)
\(30\) 1.51986e7 3.42577
\(31\) 6.05781e6 1.17812 0.589058 0.808091i \(-0.299499\pi\)
0.589058 + 0.808091i \(0.299499\pi\)
\(32\) −1.23287e7 −2.07846
\(33\) −6.82000e6 −1.00109
\(34\) 0 0
\(35\) −7.23134e6 −0.814540
\(36\) 5.81429e7 5.76947
\(37\) 9.50334e6 0.833621 0.416810 0.908993i \(-0.363148\pi\)
0.416810 + 0.908993i \(0.363148\pi\)
\(38\) 2.30797e7 1.79557
\(39\) 1.83341e7 1.26902
\(40\) 4.41062e7 2.72414
\(41\) −1.75776e7 −0.971476 −0.485738 0.874104i \(-0.661449\pi\)
−0.485738 + 0.874104i \(0.661449\pi\)
\(42\) −5.54985e7 −2.75207
\(43\) −2.06503e7 −0.921125 −0.460562 0.887627i \(-0.652352\pi\)
−0.460562 + 0.887627i \(0.652352\pi\)
\(44\) −3.33905e7 −1.34303
\(45\) −6.50846e7 −2.36604
\(46\) 4.87861e7 1.60652
\(47\) 3.15997e7 0.944587 0.472294 0.881441i \(-0.343426\pi\)
0.472294 + 0.881441i \(0.343426\pi\)
\(48\) 1.73227e8 4.71011
\(49\) −1.39480e7 −0.345644
\(50\) −1.14486e6 −0.0259052
\(51\) 0 0
\(52\) 8.97634e7 1.70249
\(53\) −1.02011e8 −1.77585 −0.887924 0.459990i \(-0.847853\pi\)
−0.887924 + 0.459990i \(0.847853\pi\)
\(54\) −2.86925e8 −4.59195
\(55\) 3.73770e7 0.550773
\(56\) −1.61056e8 −2.18842
\(57\) −1.40895e8 −1.76791
\(58\) 6.06520e7 0.703751
\(59\) −5.95270e7 −0.639558 −0.319779 0.947492i \(-0.603609\pi\)
−0.319779 + 0.947492i \(0.603609\pi\)
\(60\) −4.54265e8 −4.52510
\(61\) −5.34058e7 −0.493860 −0.246930 0.969033i \(-0.579422\pi\)
−0.246930 + 0.969033i \(0.579422\pi\)
\(62\) −2.54799e8 −2.18996
\(63\) 2.37660e8 1.90074
\(64\) 1.73149e8 1.29006
\(65\) −1.00480e8 −0.698185
\(66\) 2.86858e8 1.86089
\(67\) −6.45107e7 −0.391107 −0.195553 0.980693i \(-0.562650\pi\)
−0.195553 + 0.980693i \(0.562650\pi\)
\(68\) 0 0
\(69\) −2.97827e8 −1.58177
\(70\) 3.04160e8 1.51412
\(71\) 2.71132e8 1.26625 0.633123 0.774051i \(-0.281773\pi\)
0.633123 + 0.774051i \(0.281773\pi\)
\(72\) −1.44956e9 −6.35684
\(73\) −2.75443e8 −1.13522 −0.567609 0.823298i \(-0.692132\pi\)
−0.567609 + 0.823298i \(0.692132\pi\)
\(74\) −3.99723e8 −1.54959
\(75\) 6.98908e6 0.0255061
\(76\) −6.89819e8 −2.37178
\(77\) −1.36484e8 −0.442460
\(78\) −7.71158e8 −2.35895
\(79\) 4.33372e8 1.25181 0.625906 0.779898i \(-0.284729\pi\)
0.625906 + 0.779898i \(0.284729\pi\)
\(80\) −9.49373e8 −2.59138
\(81\) 8.41275e8 2.17148
\(82\) 7.39337e8 1.80584
\(83\) 1.23703e8 0.286106 0.143053 0.989715i \(-0.454308\pi\)
0.143053 + 0.989715i \(0.454308\pi\)
\(84\) 1.65877e9 3.63522
\(85\) 0 0
\(86\) 8.68579e8 1.71225
\(87\) −3.70264e8 −0.692908
\(88\) 8.32461e8 1.47976
\(89\) −8.87168e8 −1.49882 −0.749412 0.662104i \(-0.769664\pi\)
−0.749412 + 0.662104i \(0.769664\pi\)
\(90\) 2.73755e9 4.39815
\(91\) 3.66909e8 0.560883
\(92\) −1.45815e9 −2.12206
\(93\) 1.55548e9 2.15622
\(94\) −1.32912e9 −1.75586
\(95\) 7.72177e8 0.972659
\(96\) −3.16568e9 −3.80405
\(97\) 4.41697e8 0.506585 0.253292 0.967390i \(-0.418487\pi\)
0.253292 + 0.967390i \(0.418487\pi\)
\(98\) 5.86670e8 0.642506
\(99\) −1.22841e9 −1.28524
\(100\) 3.42183e7 0.0342183
\(101\) −1.14036e9 −1.09042 −0.545212 0.838298i \(-0.683551\pi\)
−0.545212 + 0.838298i \(0.683551\pi\)
\(102\) 0 0
\(103\) 8.49153e8 0.743393 0.371696 0.928354i \(-0.378776\pi\)
0.371696 + 0.928354i \(0.378776\pi\)
\(104\) −2.23790e9 −1.87582
\(105\) −1.85682e9 −1.49079
\(106\) 4.29072e9 3.30106
\(107\) −2.23234e9 −1.64639 −0.823196 0.567758i \(-0.807811\pi\)
−0.823196 + 0.567758i \(0.807811\pi\)
\(108\) 8.57581e9 6.06552
\(109\) −1.34014e9 −0.909352 −0.454676 0.890657i \(-0.650245\pi\)
−0.454676 + 0.890657i \(0.650245\pi\)
\(110\) −1.57213e9 −1.02381
\(111\) 2.44021e9 1.52571
\(112\) 3.46669e9 2.08177
\(113\) 2.00028e9 1.15408 0.577042 0.816715i \(-0.304207\pi\)
0.577042 + 0.816715i \(0.304207\pi\)
\(114\) 5.92624e9 3.28630
\(115\) 1.63224e9 0.870248
\(116\) −1.81280e9 −0.929586
\(117\) 3.30232e9 1.62923
\(118\) 2.50379e9 1.18885
\(119\) 0 0
\(120\) 1.13253e10 4.98579
\(121\) −1.65249e9 −0.700819
\(122\) 2.24632e9 0.918020
\(123\) −4.51346e9 −1.77802
\(124\) 7.61560e9 2.89272
\(125\) 2.71023e9 0.992911
\(126\) −9.99630e9 −3.53323
\(127\) −3.35970e9 −1.14600 −0.572999 0.819556i \(-0.694220\pi\)
−0.572999 + 0.819556i \(0.694220\pi\)
\(128\) −9.70602e8 −0.319592
\(129\) −5.30245e9 −1.68587
\(130\) 4.22633e9 1.29783
\(131\) 2.27481e8 0.0674876 0.0337438 0.999431i \(-0.489257\pi\)
0.0337438 + 0.999431i \(0.489257\pi\)
\(132\) −8.57380e9 −2.45805
\(133\) −2.81965e9 −0.781380
\(134\) 2.71341e9 0.727014
\(135\) −9.59967e9 −2.48745
\(136\) 0 0
\(137\) −3.72862e9 −0.904285 −0.452142 0.891946i \(-0.649340\pi\)
−0.452142 + 0.891946i \(0.649340\pi\)
\(138\) 1.25270e10 2.94029
\(139\) 8.72554e8 0.198256 0.0991279 0.995075i \(-0.468395\pi\)
0.0991279 + 0.995075i \(0.468395\pi\)
\(140\) −9.09091e9 −2.00001
\(141\) 8.11395e9 1.72881
\(142\) −1.14042e10 −2.35378
\(143\) −1.89647e9 −0.379256
\(144\) 3.12014e10 6.04705
\(145\) 2.02923e9 0.381220
\(146\) 1.15855e10 2.11022
\(147\) −3.58147e9 −0.632606
\(148\) 1.19472e10 2.04686
\(149\) 5.86193e9 0.974323 0.487161 0.873312i \(-0.338032\pi\)
0.487161 + 0.873312i \(0.338032\pi\)
\(150\) −2.93970e8 −0.0474124
\(151\) 1.01489e10 1.58864 0.794318 0.607502i \(-0.207828\pi\)
0.794318 + 0.607502i \(0.207828\pi\)
\(152\) 1.71979e10 2.61324
\(153\) 0 0
\(154\) 5.74071e9 0.822474
\(155\) −8.52483e9 −1.18630
\(156\) 2.30489e10 3.11594
\(157\) −5.31929e9 −0.698723 −0.349362 0.936988i \(-0.613601\pi\)
−0.349362 + 0.936988i \(0.613601\pi\)
\(158\) −1.82282e10 −2.32695
\(159\) −2.61937e10 −3.25020
\(160\) 1.73495e10 2.09289
\(161\) −5.96021e9 −0.699109
\(162\) −3.53851e10 −4.03648
\(163\) 1.08994e10 1.20937 0.604685 0.796465i \(-0.293299\pi\)
0.604685 + 0.796465i \(0.293299\pi\)
\(164\) −2.20978e10 −2.38534
\(165\) 9.59743e9 1.00804
\(166\) −5.20309e9 −0.531833
\(167\) 5.90585e9 0.587569 0.293784 0.955872i \(-0.405085\pi\)
0.293784 + 0.955872i \(0.405085\pi\)
\(168\) −4.13550e10 −4.00531
\(169\) −5.50625e9 −0.519237
\(170\) 0 0
\(171\) −2.53778e10 −2.26972
\(172\) −2.59606e10 −2.26171
\(173\) −1.33412e10 −1.13237 −0.566183 0.824280i \(-0.691580\pi\)
−0.566183 + 0.824280i \(0.691580\pi\)
\(174\) 1.55738e10 1.28802
\(175\) 1.39868e8 0.0112732
\(176\) −1.79185e10 −1.40765
\(177\) −1.52850e10 −1.17054
\(178\) 3.73154e10 2.78611
\(179\) 1.62530e10 1.18330 0.591651 0.806194i \(-0.298476\pi\)
0.591651 + 0.806194i \(0.298476\pi\)
\(180\) −8.18214e10 −5.80953
\(181\) 4.03320e9 0.279316 0.139658 0.990200i \(-0.455400\pi\)
0.139658 + 0.990200i \(0.455400\pi\)
\(182\) −1.54327e10 −1.04261
\(183\) −1.37132e10 −0.903875
\(184\) 3.63532e10 2.33810
\(185\) −1.33735e10 −0.839409
\(186\) −6.54257e10 −4.00812
\(187\) 0 0
\(188\) 3.97257e10 2.31932
\(189\) 3.50537e10 1.99828
\(190\) −3.24788e10 −1.80804
\(191\) −1.09015e10 −0.592700 −0.296350 0.955079i \(-0.595769\pi\)
−0.296350 + 0.955079i \(0.595769\pi\)
\(192\) 4.44601e10 2.36110
\(193\) −1.29615e10 −0.672428 −0.336214 0.941786i \(-0.609147\pi\)
−0.336214 + 0.941786i \(0.609147\pi\)
\(194\) −1.85784e10 −0.941673
\(195\) −2.58007e10 −1.27784
\(196\) −1.75348e10 −0.848687
\(197\) −7.15882e9 −0.338644 −0.169322 0.985561i \(-0.554158\pi\)
−0.169322 + 0.985561i \(0.554158\pi\)
\(198\) 5.16684e10 2.38909
\(199\) −3.03762e9 −0.137307 −0.0686537 0.997641i \(-0.521870\pi\)
−0.0686537 + 0.997641i \(0.521870\pi\)
\(200\) −8.53098e8 −0.0377020
\(201\) −1.65646e10 −0.715813
\(202\) 4.79650e10 2.02695
\(203\) −7.40986e9 −0.306251
\(204\) 0 0
\(205\) 2.47360e10 0.978222
\(206\) −3.57165e10 −1.38187
\(207\) −5.36440e10 −2.03074
\(208\) 4.81700e10 1.78440
\(209\) 1.45741e10 0.528351
\(210\) 7.81001e10 2.77118
\(211\) 3.30011e10 1.14619 0.573097 0.819488i \(-0.305742\pi\)
0.573097 + 0.819488i \(0.305742\pi\)
\(212\) −1.28244e11 −4.36038
\(213\) 6.96195e10 2.31752
\(214\) 9.38951e10 3.06042
\(215\) 2.90601e10 0.927521
\(216\) −2.13804e11 −6.68304
\(217\) 3.11289e10 0.953004
\(218\) 5.63682e10 1.69036
\(219\) −7.07266e10 −2.07771
\(220\) 4.69887e10 1.35236
\(221\) 0 0
\(222\) −1.02638e11 −2.83610
\(223\) −3.03057e10 −0.820640 −0.410320 0.911942i \(-0.634583\pi\)
−0.410320 + 0.911942i \(0.634583\pi\)
\(224\) −6.33526e10 −1.68131
\(225\) 1.25886e9 0.0327459
\(226\) −8.41343e10 −2.14529
\(227\) 4.49193e10 1.12284 0.561418 0.827532i \(-0.310256\pi\)
0.561418 + 0.827532i \(0.310256\pi\)
\(228\) −1.77127e11 −4.34089
\(229\) 4.68022e10 1.12462 0.562311 0.826926i \(-0.309913\pi\)
0.562311 + 0.826926i \(0.309913\pi\)
\(230\) −6.86541e10 −1.61767
\(231\) −3.50455e10 −0.809802
\(232\) 4.51951e10 1.02423
\(233\) 2.08143e10 0.462658 0.231329 0.972876i \(-0.425693\pi\)
0.231329 + 0.972876i \(0.425693\pi\)
\(234\) −1.38900e11 −3.02852
\(235\) −4.44685e10 −0.951146
\(236\) −7.48347e10 −1.57036
\(237\) 1.11279e11 2.29110
\(238\) 0 0
\(239\) 1.23779e9 0.0245390 0.0122695 0.999925i \(-0.496094\pi\)
0.0122695 + 0.999925i \(0.496094\pi\)
\(240\) −2.43774e11 −4.74282
\(241\) 3.29491e10 0.629167 0.314584 0.949230i \(-0.398135\pi\)
0.314584 + 0.949230i \(0.398135\pi\)
\(242\) 6.95061e10 1.30273
\(243\) 8.17474e10 1.50399
\(244\) −6.71394e10 −1.21262
\(245\) 1.96283e10 0.348044
\(246\) 1.89842e11 3.30510
\(247\) −3.91793e10 −0.669762
\(248\) −1.89865e11 −3.18722
\(249\) 3.17635e10 0.523638
\(250\) −1.13996e11 −1.84569
\(251\) −3.15140e10 −0.501154 −0.250577 0.968097i \(-0.580620\pi\)
−0.250577 + 0.968097i \(0.580620\pi\)
\(252\) 2.98776e11 4.66705
\(253\) 3.08069e10 0.472721
\(254\) 1.41313e11 2.13026
\(255\) 0 0
\(256\) −4.78276e10 −0.695983
\(257\) −7.36840e10 −1.05360 −0.526798 0.849991i \(-0.676607\pi\)
−0.526798 + 0.849991i \(0.676607\pi\)
\(258\) 2.23028e11 3.13380
\(259\) 4.88342e10 0.674335
\(260\) −1.26319e11 −1.71431
\(261\) −6.66914e10 −0.889585
\(262\) −9.56814e9 −0.125450
\(263\) −5.81832e10 −0.749888 −0.374944 0.927047i \(-0.622338\pi\)
−0.374944 + 0.927047i \(0.622338\pi\)
\(264\) 2.13754e11 2.70830
\(265\) 1.43555e11 1.78818
\(266\) 1.18598e11 1.45248
\(267\) −2.27801e11 −2.74318
\(268\) −8.10999e10 −0.960315
\(269\) −1.32703e11 −1.54523 −0.772617 0.634872i \(-0.781053\pi\)
−0.772617 + 0.634872i \(0.781053\pi\)
\(270\) 4.03775e11 4.62384
\(271\) −1.25505e11 −1.41351 −0.706757 0.707456i \(-0.749843\pi\)
−0.706757 + 0.707456i \(0.749843\pi\)
\(272\) 0 0
\(273\) 9.42126e10 1.02654
\(274\) 1.56831e11 1.68094
\(275\) −7.22943e8 −0.00762267
\(276\) −3.74414e11 −3.88384
\(277\) 1.08560e11 1.10792 0.553961 0.832542i \(-0.313116\pi\)
0.553961 + 0.832542i \(0.313116\pi\)
\(278\) −3.67008e10 −0.368531
\(279\) 2.80171e11 2.76825
\(280\) 2.26646e11 2.20362
\(281\) −1.21647e11 −1.16392 −0.581961 0.813216i \(-0.697714\pi\)
−0.581961 + 0.813216i \(0.697714\pi\)
\(282\) −3.41284e11 −3.21362
\(283\) −1.97694e11 −1.83212 −0.916060 0.401041i \(-0.868648\pi\)
−0.916060 + 0.401041i \(0.868648\pi\)
\(284\) 3.40855e11 3.10912
\(285\) 1.98275e11 1.78018
\(286\) 7.97678e10 0.704986
\(287\) −9.03249e10 −0.785849
\(288\) −5.70196e11 −4.88380
\(289\) 0 0
\(290\) −8.53523e10 −0.708637
\(291\) 1.13416e11 0.927164
\(292\) −3.46275e11 −2.78739
\(293\) −5.29206e10 −0.419489 −0.209745 0.977756i \(-0.567263\pi\)
−0.209745 + 0.977756i \(0.567263\pi\)
\(294\) 1.50641e11 1.17593
\(295\) 8.37692e10 0.643999
\(296\) −2.97856e11 −2.25524
\(297\) −1.81184e11 −1.35119
\(298\) −2.46561e11 −1.81113
\(299\) −8.28178e10 −0.599244
\(300\) 8.78635e9 0.0626272
\(301\) −1.06115e11 −0.745119
\(302\) −4.26878e11 −2.95306
\(303\) −2.92814e11 −1.99572
\(304\) −3.70180e11 −2.48589
\(305\) 7.51551e10 0.497290
\(306\) 0 0
\(307\) 6.66906e10 0.428491 0.214246 0.976780i \(-0.431271\pi\)
0.214246 + 0.976780i \(0.431271\pi\)
\(308\) −1.71582e11 −1.08641
\(309\) 2.18040e11 1.36058
\(310\) 3.58566e11 2.20516
\(311\) −2.16895e11 −1.31470 −0.657352 0.753584i \(-0.728324\pi\)
−0.657352 + 0.753584i \(0.728324\pi\)
\(312\) −5.74633e11 −3.43316
\(313\) −2.03438e11 −1.19807 −0.599034 0.800723i \(-0.704449\pi\)
−0.599034 + 0.800723i \(0.704449\pi\)
\(314\) 2.23736e11 1.29883
\(315\) −3.34446e11 −1.91394
\(316\) 5.44816e11 3.07368
\(317\) −2.27635e11 −1.26611 −0.633056 0.774106i \(-0.718200\pi\)
−0.633056 + 0.774106i \(0.718200\pi\)
\(318\) 1.10174e12 6.04169
\(319\) 3.82998e10 0.207080
\(320\) −2.43664e11 −1.29902
\(321\) −5.73205e11 −3.01327
\(322\) 2.50694e11 1.29955
\(323\) 0 0
\(324\) 1.05761e12 5.33180
\(325\) 1.94348e9 0.00966285
\(326\) −4.58444e11 −2.24806
\(327\) −3.44113e11 −1.66432
\(328\) 5.50921e11 2.62819
\(329\) 1.62379e11 0.764098
\(330\) −4.03680e11 −1.87381
\(331\) 1.97602e11 0.904828 0.452414 0.891808i \(-0.350563\pi\)
0.452414 + 0.891808i \(0.350563\pi\)
\(332\) 1.55513e11 0.702499
\(333\) 4.39526e11 1.95878
\(334\) −2.48408e11 −1.09221
\(335\) 9.07825e10 0.393822
\(336\) 8.90153e11 3.81011
\(337\) −4.61396e9 −0.0194867 −0.00974337 0.999953i \(-0.503101\pi\)
−0.00974337 + 0.999953i \(0.503101\pi\)
\(338\) 2.31600e11 0.965192
\(339\) 5.13618e11 2.11223
\(340\) 0 0
\(341\) −1.60898e11 −0.644399
\(342\) 1.06743e12 4.21910
\(343\) −2.79036e11 −1.08852
\(344\) 6.47226e11 2.49197
\(345\) 4.19115e11 1.59275
\(346\) 5.61148e11 2.10492
\(347\) 3.34855e11 1.23987 0.619933 0.784655i \(-0.287160\pi\)
0.619933 + 0.784655i \(0.287160\pi\)
\(348\) −4.65480e11 −1.70135
\(349\) −1.38047e11 −0.498095 −0.249048 0.968491i \(-0.580118\pi\)
−0.249048 + 0.968491i \(0.580118\pi\)
\(350\) −5.88303e9 −0.0209553
\(351\) 4.87076e11 1.71283
\(352\) 3.27454e11 1.13686
\(353\) 3.22524e11 1.10554 0.552771 0.833333i \(-0.313570\pi\)
0.552771 + 0.833333i \(0.313570\pi\)
\(354\) 6.42906e11 2.17587
\(355\) −3.81550e11 −1.27504
\(356\) −1.11531e12 −3.68018
\(357\) 0 0
\(358\) −6.83624e11 −2.19960
\(359\) 1.09669e11 0.348465 0.174232 0.984705i \(-0.444256\pi\)
0.174232 + 0.984705i \(0.444256\pi\)
\(360\) 2.03990e12 6.40098
\(361\) −2.16000e10 −0.0669378
\(362\) −1.69642e11 −0.519212
\(363\) −4.24316e11 −1.28266
\(364\) 4.61262e11 1.37718
\(365\) 3.87617e11 1.14310
\(366\) 5.76795e11 1.68018
\(367\) −1.91239e11 −0.550273 −0.275137 0.961405i \(-0.588723\pi\)
−0.275137 + 0.961405i \(0.588723\pi\)
\(368\) −7.82492e11 −2.22415
\(369\) −8.12957e11 −2.28270
\(370\) 5.62509e11 1.56035
\(371\) −5.24198e11 −1.43652
\(372\) 1.95548e12 5.29433
\(373\) 1.18077e11 0.315846 0.157923 0.987451i \(-0.449520\pi\)
0.157923 + 0.987451i \(0.449520\pi\)
\(374\) 0 0
\(375\) 6.95914e11 1.81725
\(376\) −9.90403e11 −2.55545
\(377\) −1.02961e11 −0.262504
\(378\) −1.47441e12 −3.71453
\(379\) 1.76959e11 0.440551 0.220276 0.975438i \(-0.429304\pi\)
0.220276 + 0.975438i \(0.429304\pi\)
\(380\) 9.70746e11 2.38825
\(381\) −8.62682e11 −2.09743
\(382\) 4.58530e11 1.10175
\(383\) 1.29043e11 0.306436 0.153218 0.988192i \(-0.451036\pi\)
0.153218 + 0.988192i \(0.451036\pi\)
\(384\) −2.49225e11 −0.584926
\(385\) 1.92067e11 0.445533
\(386\) 5.45176e11 1.24995
\(387\) −9.55069e11 −2.16439
\(388\) 5.55282e11 1.24386
\(389\) 6.86269e10 0.151957 0.0759785 0.997109i \(-0.475792\pi\)
0.0759785 + 0.997109i \(0.475792\pi\)
\(390\) 1.08521e12 2.37533
\(391\) 0 0
\(392\) 4.37160e11 0.935090
\(393\) 5.84110e10 0.123517
\(394\) 3.01110e11 0.629494
\(395\) −6.09862e11 −1.26051
\(396\) −1.54430e12 −3.15575
\(397\) −7.83412e11 −1.58283 −0.791413 0.611282i \(-0.790654\pi\)
−0.791413 + 0.611282i \(0.790654\pi\)
\(398\) 1.27766e11 0.255236
\(399\) −7.24011e11 −1.43010
\(400\) 1.83627e10 0.0358646
\(401\) −1.06747e11 −0.206161 −0.103080 0.994673i \(-0.532870\pi\)
−0.103080 + 0.994673i \(0.532870\pi\)
\(402\) 6.96730e11 1.33060
\(403\) 4.32540e11 0.816871
\(404\) −1.43361e12 −2.67741
\(405\) −1.18388e12 −2.18656
\(406\) 3.11669e11 0.569280
\(407\) −2.52412e11 −0.455969
\(408\) 0 0
\(409\) −1.08641e12 −1.91973 −0.959863 0.280469i \(-0.909510\pi\)
−0.959863 + 0.280469i \(0.909510\pi\)
\(410\) −1.04043e12 −1.81838
\(411\) −9.57410e11 −1.65504
\(412\) 1.06752e12 1.82531
\(413\) −3.05888e11 −0.517353
\(414\) 2.25634e12 3.77488
\(415\) −1.74080e11 −0.288093
\(416\) −8.80292e11 −1.44114
\(417\) 2.24049e11 0.362853
\(418\) −6.13005e11 −0.982134
\(419\) −6.48628e11 −1.02809 −0.514047 0.857762i \(-0.671854\pi\)
−0.514047 + 0.857762i \(0.671854\pi\)
\(420\) −2.33430e12 −3.66046
\(421\) −8.74376e11 −1.35653 −0.678264 0.734818i \(-0.737267\pi\)
−0.678264 + 0.734818i \(0.737267\pi\)
\(422\) −1.38807e12 −2.13062
\(423\) 1.46147e12 2.21952
\(424\) 3.19725e12 4.80430
\(425\) 0 0
\(426\) −2.92829e12 −4.30795
\(427\) −2.74433e11 −0.399495
\(428\) −2.80640e12 −4.04252
\(429\) −4.86962e11 −0.694124
\(430\) −1.22231e12 −1.72414
\(431\) −2.93756e10 −0.0410052 −0.0205026 0.999790i \(-0.506527\pi\)
−0.0205026 + 0.999790i \(0.506527\pi\)
\(432\) 4.60206e12 6.35734
\(433\) −1.33717e12 −1.82806 −0.914029 0.405648i \(-0.867046\pi\)
−0.914029 + 0.405648i \(0.867046\pi\)
\(434\) −1.30932e12 −1.77151
\(435\) 5.21053e11 0.697719
\(436\) −1.68477e12 −2.23280
\(437\) 6.36443e11 0.834821
\(438\) 2.97485e12 3.86218
\(439\) −7.90604e11 −1.01594 −0.507971 0.861374i \(-0.669604\pi\)
−0.507971 + 0.861374i \(0.669604\pi\)
\(440\) −1.17148e12 −1.49004
\(441\) −6.45089e11 −0.812168
\(442\) 0 0
\(443\) 1.18811e12 1.46569 0.732843 0.680398i \(-0.238193\pi\)
0.732843 + 0.680398i \(0.238193\pi\)
\(444\) 3.06772e12 3.74621
\(445\) 1.24846e12 1.50923
\(446\) 1.27470e12 1.52546
\(447\) 1.50519e12 1.78323
\(448\) 8.89751e11 1.04356
\(449\) −6.04411e11 −0.701817 −0.350909 0.936410i \(-0.614127\pi\)
−0.350909 + 0.936410i \(0.614127\pi\)
\(450\) −5.29493e10 −0.0608701
\(451\) 4.66868e11 0.531373
\(452\) 2.51466e12 2.83371
\(453\) 2.60598e12 2.90756
\(454\) −1.88936e12 −2.08720
\(455\) −5.16332e11 −0.564778
\(456\) 4.41597e12 4.78282
\(457\) −9.65513e11 −1.03546 −0.517732 0.855543i \(-0.673224\pi\)
−0.517732 + 0.855543i \(0.673224\pi\)
\(458\) −1.96856e12 −2.09052
\(459\) 0 0
\(460\) 2.05198e12 2.13679
\(461\) 5.15082e10 0.0531156 0.0265578 0.999647i \(-0.491545\pi\)
0.0265578 + 0.999647i \(0.491545\pi\)
\(462\) 1.47406e12 1.50531
\(463\) −7.66043e11 −0.774709 −0.387355 0.921931i \(-0.626611\pi\)
−0.387355 + 0.921931i \(0.626611\pi\)
\(464\) −9.72811e11 −0.974310
\(465\) −2.18895e12 −2.17119
\(466\) −8.75477e11 −0.860019
\(467\) −1.55842e12 −1.51621 −0.758104 0.652133i \(-0.773874\pi\)
−0.758104 + 0.652133i \(0.773874\pi\)
\(468\) 4.15152e12 4.00038
\(469\) −3.31497e11 −0.316375
\(470\) 1.87041e12 1.76805
\(471\) −1.36585e12 −1.27882
\(472\) 1.86571e12 1.73023
\(473\) 5.48480e11 0.503832
\(474\) −4.68052e12 −4.25885
\(475\) −1.49354e10 −0.0134615
\(476\) 0 0
\(477\) −4.71797e12 −4.17275
\(478\) −5.20632e10 −0.0456147
\(479\) −1.36399e12 −1.18386 −0.591931 0.805989i \(-0.701634\pi\)
−0.591931 + 0.805989i \(0.701634\pi\)
\(480\) 4.45489e12 3.83046
\(481\) 6.78558e11 0.578008
\(482\) −1.38588e12 −1.16954
\(483\) −1.53042e12 −1.27953
\(484\) −2.07744e12 −1.72078
\(485\) −6.21577e11 −0.510102
\(486\) −3.43841e12 −2.79572
\(487\) 9.00584e11 0.725511 0.362755 0.931884i \(-0.381836\pi\)
0.362755 + 0.931884i \(0.381836\pi\)
\(488\) 1.67386e12 1.33607
\(489\) 2.79868e12 2.21342
\(490\) −8.25590e11 −0.646967
\(491\) 2.39477e12 1.85950 0.929751 0.368189i \(-0.120022\pi\)
0.929751 + 0.368189i \(0.120022\pi\)
\(492\) −5.67412e12 −4.36572
\(493\) 0 0
\(494\) 1.64793e12 1.24500
\(495\) 1.72867e12 1.29416
\(496\) 4.08679e12 3.03190
\(497\) 1.39325e12 1.02430
\(498\) −1.33602e12 −0.973373
\(499\) 1.19891e12 0.865637 0.432819 0.901481i \(-0.357519\pi\)
0.432819 + 0.901481i \(0.357519\pi\)
\(500\) 3.40717e12 2.43797
\(501\) 1.51647e12 1.07538
\(502\) 1.32552e12 0.931579
\(503\) 3.61742e11 0.251967 0.125983 0.992032i \(-0.459791\pi\)
0.125983 + 0.992032i \(0.459791\pi\)
\(504\) −7.44879e12 −5.14219
\(505\) 1.60477e12 1.09800
\(506\) −1.29578e12 −0.878725
\(507\) −1.41386e12 −0.950321
\(508\) −4.22366e12 −2.81386
\(509\) 1.61404e12 1.06582 0.532910 0.846172i \(-0.321098\pi\)
0.532910 + 0.846172i \(0.321098\pi\)
\(510\) 0 0
\(511\) −1.41541e12 −0.918304
\(512\) 2.50864e12 1.61333
\(513\) −3.74311e12 −2.38619
\(514\) 3.09924e12 1.95849
\(515\) −1.19497e12 −0.748555
\(516\) −6.66600e12 −4.13944
\(517\) −8.39299e11 −0.516665
\(518\) −2.05403e12 −1.25350
\(519\) −3.42566e12 −2.07248
\(520\) 3.14927e12 1.88884
\(521\) 2.86199e12 1.70176 0.850881 0.525358i \(-0.176069\pi\)
0.850881 + 0.525358i \(0.176069\pi\)
\(522\) 2.80513e12 1.65362
\(523\) 1.01799e12 0.594957 0.297479 0.954728i \(-0.403854\pi\)
0.297479 + 0.954728i \(0.403854\pi\)
\(524\) 2.85979e11 0.165708
\(525\) 3.59143e10 0.0206325
\(526\) 2.44726e12 1.39394
\(527\) 0 0
\(528\) −4.60099e12 −2.57631
\(529\) −4.55830e11 −0.253077
\(530\) −6.03810e12 −3.32399
\(531\) −2.75310e12 −1.50278
\(532\) −3.54473e12 −1.91859
\(533\) −1.25508e12 −0.673593
\(534\) 9.58161e12 5.09921
\(535\) 3.14145e12 1.65782
\(536\) 2.02191e12 1.05808
\(537\) 4.17335e12 2.16571
\(538\) 5.58165e12 2.87238
\(539\) 3.70464e11 0.189058
\(540\) −1.20683e13 −6.10764
\(541\) 1.10637e12 0.555283 0.277642 0.960685i \(-0.410447\pi\)
0.277642 + 0.960685i \(0.410447\pi\)
\(542\) 5.27892e12 2.62753
\(543\) 1.03562e12 0.511212
\(544\) 0 0
\(545\) 1.88591e12 0.915666
\(546\) −3.96271e12 −1.90820
\(547\) 1.37273e12 0.655605 0.327803 0.944746i \(-0.393692\pi\)
0.327803 + 0.944746i \(0.393692\pi\)
\(548\) −4.68745e12 −2.22036
\(549\) −2.47000e12 −1.16044
\(550\) 3.04079e10 0.0141695
\(551\) 7.91240e11 0.365701
\(552\) 9.33454e12 4.27924
\(553\) 2.22695e12 1.01262
\(554\) −4.56616e12 −2.05948
\(555\) −3.43397e12 −1.53631
\(556\) 1.09694e12 0.486793
\(557\) −2.29710e12 −1.01119 −0.505594 0.862771i \(-0.668727\pi\)
−0.505594 + 0.862771i \(0.668727\pi\)
\(558\) −1.17844e13 −5.14580
\(559\) −1.47447e12 −0.638681
\(560\) −4.87849e12 −2.09623
\(561\) 0 0
\(562\) 5.11665e12 2.16358
\(563\) −1.84812e11 −0.0775250 −0.0387625 0.999248i \(-0.512342\pi\)
−0.0387625 + 0.999248i \(0.512342\pi\)
\(564\) 1.02005e13 4.24488
\(565\) −2.81488e12 −1.16210
\(566\) 8.31526e12 3.40566
\(567\) 4.32301e12 1.75656
\(568\) −8.49788e12 −3.42565
\(569\) −2.10912e11 −0.0843523 −0.0421761 0.999110i \(-0.513429\pi\)
−0.0421761 + 0.999110i \(0.513429\pi\)
\(570\) −8.33969e12 −3.30912
\(571\) −2.37391e12 −0.934548 −0.467274 0.884112i \(-0.654764\pi\)
−0.467274 + 0.884112i \(0.654764\pi\)
\(572\) −2.38415e12 −0.931219
\(573\) −2.79921e12 −1.08477
\(574\) 3.79919e12 1.46079
\(575\) −3.15706e10 −0.0120442
\(576\) 8.00808e12 3.03129
\(577\) 1.71792e12 0.645225 0.322613 0.946531i \(-0.395439\pi\)
0.322613 + 0.946531i \(0.395439\pi\)
\(578\) 0 0
\(579\) −3.32816e12 −1.23070
\(580\) 2.55106e12 0.936041
\(581\) 6.35663e11 0.231438
\(582\) −4.77043e12 −1.72347
\(583\) 2.70945e12 0.971344
\(584\) 8.63301e12 3.07117
\(585\) −4.64717e12 −1.64054
\(586\) 2.22591e12 0.779774
\(587\) 2.32455e12 0.808103 0.404052 0.914736i \(-0.367602\pi\)
0.404052 + 0.914736i \(0.367602\pi\)
\(588\) −4.50246e12 −1.55329
\(589\) −3.32401e12 −1.13800
\(590\) −3.52344e12 −1.19711
\(591\) −1.83820e12 −0.619795
\(592\) 6.41125e12 2.14533
\(593\) 2.36534e12 0.785503 0.392751 0.919645i \(-0.371523\pi\)
0.392751 + 0.919645i \(0.371523\pi\)
\(594\) 7.62085e12 2.51168
\(595\) 0 0
\(596\) 7.36936e12 2.39233
\(597\) −7.79979e11 −0.251303
\(598\) 3.48343e12 1.11391
\(599\) 1.14807e12 0.364375 0.182188 0.983264i \(-0.441682\pi\)
0.182188 + 0.983264i \(0.441682\pi\)
\(600\) −2.19053e11 −0.0690031
\(601\) 3.38041e12 1.05690 0.528451 0.848964i \(-0.322773\pi\)
0.528451 + 0.848964i \(0.322773\pi\)
\(602\) 4.46332e12 1.38508
\(603\) −2.98359e12 −0.918992
\(604\) 1.27588e13 3.90071
\(605\) 2.32547e12 0.705685
\(606\) 1.23161e13 3.70978
\(607\) −2.57549e12 −0.770036 −0.385018 0.922909i \(-0.625805\pi\)
−0.385018 + 0.922909i \(0.625805\pi\)
\(608\) 6.76492e12 2.00769
\(609\) −1.90266e12 −0.560509
\(610\) −3.16112e12 −0.924395
\(611\) 2.25628e12 0.654949
\(612\) 0 0
\(613\) −1.91477e12 −0.547701 −0.273851 0.961772i \(-0.588297\pi\)
−0.273851 + 0.961772i \(0.588297\pi\)
\(614\) −2.80509e12 −0.796507
\(615\) 6.35155e12 1.79037
\(616\) 4.27772e12 1.19701
\(617\) −5.24069e12 −1.45581 −0.727907 0.685676i \(-0.759507\pi\)
−0.727907 + 0.685676i \(0.759507\pi\)
\(618\) −9.17105e12 −2.52913
\(619\) 5.64576e10 0.0154566 0.00772831 0.999970i \(-0.497540\pi\)
0.00772831 + 0.999970i \(0.497540\pi\)
\(620\) −1.07170e13 −2.91281
\(621\) −7.91224e12 −2.13495
\(622\) 9.12290e12 2.44386
\(623\) −4.55884e12 −1.21243
\(624\) 1.23688e13 3.26585
\(625\) −3.86712e12 −1.01374
\(626\) 8.55685e12 2.22705
\(627\) 3.74223e12 0.967001
\(628\) −6.68717e12 −1.71563
\(629\) 0 0
\(630\) 1.40673e13 3.55776
\(631\) 3.44629e12 0.865405 0.432703 0.901537i \(-0.357560\pi\)
0.432703 + 0.901537i \(0.357560\pi\)
\(632\) −1.35828e13 −3.38660
\(633\) 8.47382e12 2.09779
\(634\) 9.57462e12 2.35353
\(635\) 4.72793e12 1.15396
\(636\) −3.29296e13 −7.98048
\(637\) −9.95914e11 −0.239659
\(638\) −1.61094e12 −0.384934
\(639\) 1.25398e13 2.97533
\(640\) 1.36588e12 0.321811
\(641\) 5.50971e12 1.28904 0.644522 0.764586i \(-0.277057\pi\)
0.644522 + 0.764586i \(0.277057\pi\)
\(642\) 2.41098e13 5.60126
\(643\) −5.98753e11 −0.138133 −0.0690667 0.997612i \(-0.522002\pi\)
−0.0690667 + 0.997612i \(0.522002\pi\)
\(644\) −7.49291e12 −1.71658
\(645\) 7.46186e12 1.69757
\(646\) 0 0
\(647\) −2.84687e12 −0.638701 −0.319351 0.947637i \(-0.603465\pi\)
−0.319351 + 0.947637i \(0.603465\pi\)
\(648\) −2.63674e13 −5.87462
\(649\) 1.58106e12 0.349822
\(650\) −8.17454e10 −0.0179619
\(651\) 7.99307e12 1.74421
\(652\) 1.37023e13 2.96946
\(653\) 1.82215e12 0.392170 0.196085 0.980587i \(-0.437177\pi\)
0.196085 + 0.980587i \(0.437177\pi\)
\(654\) 1.44739e13 3.09374
\(655\) −3.20122e11 −0.0679562
\(656\) −1.18584e13 −2.50011
\(657\) −1.27392e13 −2.66745
\(658\) −6.82989e12 −1.42036
\(659\) −3.55378e12 −0.734017 −0.367008 0.930218i \(-0.619618\pi\)
−0.367008 + 0.930218i \(0.619618\pi\)
\(660\) 1.20655e13 2.47512
\(661\) 4.80541e12 0.979093 0.489546 0.871977i \(-0.337162\pi\)
0.489546 + 0.871977i \(0.337162\pi\)
\(662\) −8.31141e12 −1.68195
\(663\) 0 0
\(664\) −3.87711e12 −0.774019
\(665\) 3.96794e12 0.786806
\(666\) −1.84870e13 −3.64110
\(667\) 1.67253e12 0.327197
\(668\) 7.42457e12 1.44270
\(669\) −7.78170e12 −1.50196
\(670\) −3.81843e12 −0.732063
\(671\) 1.41848e12 0.270129
\(672\) −1.62673e13 −3.07718
\(673\) −5.10315e12 −0.958894 −0.479447 0.877571i \(-0.659163\pi\)
−0.479447 + 0.877571i \(0.659163\pi\)
\(674\) 1.94069e11 0.0362232
\(675\) 1.85676e11 0.0344262
\(676\) −6.92221e12 −1.27492
\(677\) −2.66255e12 −0.487134 −0.243567 0.969884i \(-0.578318\pi\)
−0.243567 + 0.969884i \(0.578318\pi\)
\(678\) −2.16035e13 −3.92636
\(679\) 2.26972e12 0.409788
\(680\) 0 0
\(681\) 1.15341e13 2.05504
\(682\) 6.76757e12 1.19785
\(683\) 3.15981e12 0.555607 0.277804 0.960638i \(-0.410394\pi\)
0.277804 + 0.960638i \(0.410394\pi\)
\(684\) −3.19039e13 −5.57302
\(685\) 5.24708e12 0.910564
\(686\) 1.17366e13 2.02342
\(687\) 1.20176e13 2.05831
\(688\) −1.39313e13 −2.37053
\(689\) −7.28380e12 −1.23132
\(690\) −1.76286e13 −2.96071
\(691\) 7.41599e12 1.23742 0.618711 0.785619i \(-0.287655\pi\)
0.618711 + 0.785619i \(0.287655\pi\)
\(692\) −1.67719e13 −2.78039
\(693\) −6.31234e12 −1.03966
\(694\) −1.40845e13 −2.30474
\(695\) −1.22790e12 −0.199632
\(696\) 1.16049e13 1.87456
\(697\) 0 0
\(698\) 5.80644e12 0.925892
\(699\) 5.34456e12 0.846768
\(700\) 1.75836e11 0.0276800
\(701\) −9.39002e12 −1.46871 −0.734354 0.678767i \(-0.762515\pi\)
−0.734354 + 0.678767i \(0.762515\pi\)
\(702\) −2.04871e13 −3.18392
\(703\) −5.21462e12 −0.805237
\(704\) −4.59891e12 −0.705631
\(705\) −1.14183e13 −1.74081
\(706\) −1.35658e13 −2.05505
\(707\) −5.85989e12 −0.882069
\(708\) −1.92156e13 −2.87411
\(709\) −4.58730e11 −0.0681788 −0.0340894 0.999419i \(-0.510853\pi\)
−0.0340894 + 0.999419i \(0.510853\pi\)
\(710\) 1.60485e13 2.37013
\(711\) 2.00433e13 2.94141
\(712\) 2.78058e13 4.05485
\(713\) −7.02633e12 −1.01818
\(714\) 0 0
\(715\) 2.66880e12 0.381890
\(716\) 2.04326e13 2.90546
\(717\) 3.17832e11 0.0449119
\(718\) −4.61282e12 −0.647749
\(719\) −4.10035e12 −0.572191 −0.286096 0.958201i \(-0.592357\pi\)
−0.286096 + 0.958201i \(0.592357\pi\)
\(720\) −4.39081e13 −6.08904
\(721\) 4.36349e12 0.601347
\(722\) 9.08525e11 0.124428
\(723\) 8.46044e12 1.15152
\(724\) 5.07036e12 0.685828
\(725\) −3.92493e10 −0.00527607
\(726\) 1.78473e13 2.38428
\(727\) 3.64967e12 0.484561 0.242280 0.970206i \(-0.422105\pi\)
0.242280 + 0.970206i \(0.422105\pi\)
\(728\) −1.14997e13 −1.51739
\(729\) 4.43176e12 0.581169
\(730\) −1.63037e13 −2.12487
\(731\) 0 0
\(732\) −1.72396e13 −2.21936
\(733\) −2.77480e11 −0.0355029 −0.0177514 0.999842i \(-0.505651\pi\)
−0.0177514 + 0.999842i \(0.505651\pi\)
\(734\) 8.04375e12 1.02288
\(735\) 5.04001e12 0.636999
\(736\) 1.42998e13 1.79630
\(737\) 1.71343e12 0.213925
\(738\) 3.41940e13 4.24323
\(739\) 1.15877e13 1.42922 0.714608 0.699525i \(-0.246605\pi\)
0.714608 + 0.699525i \(0.246605\pi\)
\(740\) −1.68126e13 −2.06107
\(741\) −1.00602e13 −1.22582
\(742\) 2.20485e13 2.67031
\(743\) −4.79681e12 −0.577434 −0.288717 0.957414i \(-0.593229\pi\)
−0.288717 + 0.957414i \(0.593229\pi\)
\(744\) −4.87523e13 −5.83333
\(745\) −8.24919e12 −0.981088
\(746\) −4.96648e12 −0.587116
\(747\) 5.72119e12 0.672270
\(748\) 0 0
\(749\) −1.14712e13 −1.33180
\(750\) −2.92711e13 −3.37802
\(751\) 2.32776e12 0.267029 0.133515 0.991047i \(-0.457374\pi\)
0.133515 + 0.991047i \(0.457374\pi\)
\(752\) 2.13181e13 2.43091
\(753\) −8.09196e12 −0.917225
\(754\) 4.33067e12 0.487960
\(755\) −1.42821e13 −1.59967
\(756\) 4.40680e13 4.90654
\(757\) −6.01494e12 −0.665732 −0.332866 0.942974i \(-0.608016\pi\)
−0.332866 + 0.942974i \(0.608016\pi\)
\(758\) −7.44314e12 −0.818926
\(759\) 7.91039e12 0.865187
\(760\) −2.42017e13 −2.63139
\(761\) −1.12427e13 −1.21518 −0.607589 0.794252i \(-0.707863\pi\)
−0.607589 + 0.794252i \(0.707863\pi\)
\(762\) 3.62855e13 3.89885
\(763\) −6.88651e12 −0.735595
\(764\) −1.37048e13 −1.45530
\(765\) 0 0
\(766\) −5.42772e12 −0.569623
\(767\) −4.25035e12 −0.443451
\(768\) −1.22809e13 −1.27381
\(769\) 1.35036e13 1.39246 0.696230 0.717819i \(-0.254860\pi\)
0.696230 + 0.717819i \(0.254860\pi\)
\(770\) −8.07860e12 −0.828185
\(771\) −1.89201e13 −1.92832
\(772\) −1.62946e13 −1.65107
\(773\) 2.43055e12 0.244848 0.122424 0.992478i \(-0.460933\pi\)
0.122424 + 0.992478i \(0.460933\pi\)
\(774\) 4.01715e13 4.02331
\(775\) 1.64886e11 0.0164183
\(776\) −1.38438e13 −1.37049
\(777\) 1.25393e13 1.23418
\(778\) −2.88654e12 −0.282468
\(779\) 9.64508e12 0.938399
\(780\) −3.24354e13 −3.13757
\(781\) −7.20137e12 −0.692605
\(782\) 0 0
\(783\) −9.83667e12 −0.935234
\(784\) −9.40974e12 −0.889519
\(785\) 7.48555e12 0.703575
\(786\) −2.45684e12 −0.229602
\(787\) 3.78714e12 0.351905 0.175953 0.984399i \(-0.443699\pi\)
0.175953 + 0.984399i \(0.443699\pi\)
\(788\) −8.99975e12 −0.831501
\(789\) −1.49399e13 −1.37246
\(790\) 2.56516e13 2.34311
\(791\) 1.02787e13 0.933565
\(792\) 3.85010e13 3.47703
\(793\) −3.81328e12 −0.342428
\(794\) 3.29514e13 2.94226
\(795\) 3.68611e13 3.27277
\(796\) −3.81875e12 −0.337142
\(797\) 2.23878e12 0.196539 0.0982694 0.995160i \(-0.468669\pi\)
0.0982694 + 0.995160i \(0.468669\pi\)
\(798\) 3.04528e13 2.65837
\(799\) 0 0
\(800\) −3.35572e11 −0.0289655
\(801\) −4.10311e13 −3.52182
\(802\) 4.48992e12 0.383225
\(803\) 7.31588e12 0.620936
\(804\) −2.08243e13 −1.75759
\(805\) 8.38749e12 0.703964
\(806\) −1.81932e13 −1.51845
\(807\) −3.40745e13 −2.82813
\(808\) 3.57414e13 2.94999
\(809\) 6.77107e12 0.555762 0.277881 0.960615i \(-0.410368\pi\)
0.277881 + 0.960615i \(0.410368\pi\)
\(810\) 4.97956e13 4.06451
\(811\) −1.26099e13 −1.02357 −0.511785 0.859113i \(-0.671016\pi\)
−0.511785 + 0.859113i \(0.671016\pi\)
\(812\) −9.31534e12 −0.751964
\(813\) −3.22264e13 −2.58705
\(814\) 1.06168e13 0.847586
\(815\) −1.53382e13 −1.21777
\(816\) 0 0
\(817\) 1.13311e13 0.889762
\(818\) 4.56959e13 3.56851
\(819\) 1.69694e13 1.31792
\(820\) 3.10970e13 2.40191
\(821\) −1.40858e13 −1.08203 −0.541013 0.841014i \(-0.681959\pi\)
−0.541013 + 0.841014i \(0.681959\pi\)
\(822\) 4.02699e13 3.07650
\(823\) 1.62081e13 1.23150 0.615748 0.787943i \(-0.288854\pi\)
0.615748 + 0.787943i \(0.288854\pi\)
\(824\) −2.66143e13 −2.01114
\(825\) −1.85633e11 −0.0139512
\(826\) 1.28661e13 0.961690
\(827\) −8.84797e12 −0.657762 −0.328881 0.944371i \(-0.606671\pi\)
−0.328881 + 0.944371i \(0.606671\pi\)
\(828\) −6.74388e13 −4.98624
\(829\) 9.64554e12 0.709302 0.354651 0.934999i \(-0.384600\pi\)
0.354651 + 0.934999i \(0.384600\pi\)
\(830\) 7.32203e12 0.535526
\(831\) 2.78752e13 2.02775
\(832\) 1.23632e13 0.894491
\(833\) 0 0
\(834\) −9.42379e12 −0.674494
\(835\) −8.31099e12 −0.591649
\(836\) 1.83219e13 1.29730
\(837\) 4.13239e13 2.91030
\(838\) 2.72822e13 1.91109
\(839\) −1.77288e13 −1.23524 −0.617618 0.786478i \(-0.711902\pi\)
−0.617618 + 0.786478i \(0.711902\pi\)
\(840\) 5.81967e13 4.03312
\(841\) −1.24278e13 −0.856668
\(842\) 3.67774e13 2.52160
\(843\) −3.12358e13 −2.13024
\(844\) 4.14876e13 2.81434
\(845\) 7.74865e12 0.522843
\(846\) −6.14714e13 −4.12579
\(847\) −8.49157e12 −0.566908
\(848\) −6.88198e13 −4.57017
\(849\) −5.07625e13 −3.35319
\(850\) 0 0
\(851\) −1.10227e13 −0.720454
\(852\) 8.75225e13 5.69039
\(853\) −1.82317e13 −1.17911 −0.589557 0.807727i \(-0.700697\pi\)
−0.589557 + 0.807727i \(0.700697\pi\)
\(854\) 1.15430e13 0.742607
\(855\) 3.57129e13 2.28548
\(856\) 6.99664e13 4.45408
\(857\) 4.46174e12 0.282547 0.141273 0.989971i \(-0.454880\pi\)
0.141273 + 0.989971i \(0.454880\pi\)
\(858\) 2.04823e13 1.29028
\(859\) 2.49571e13 1.56395 0.781977 0.623307i \(-0.214211\pi\)
0.781977 + 0.623307i \(0.214211\pi\)
\(860\) 3.65330e13 2.27742
\(861\) −2.31930e13 −1.43828
\(862\) 1.23558e12 0.0762231
\(863\) −4.92247e12 −0.302089 −0.151044 0.988527i \(-0.548264\pi\)
−0.151044 + 0.988527i \(0.548264\pi\)
\(864\) −8.41013e13 −5.13441
\(865\) 1.87743e13 1.14023
\(866\) 5.62430e13 3.39812
\(867\) 0 0
\(868\) 3.91338e13 2.33999
\(869\) −1.15105e13 −0.684710
\(870\) −2.19162e13 −1.29697
\(871\) −4.60619e12 −0.271182
\(872\) 4.20030e13 2.46012
\(873\) 2.04283e13 1.19033
\(874\) −2.67696e13 −1.55182
\(875\) 1.39269e13 0.803188
\(876\) −8.89143e13 −5.10156
\(877\) 1.68831e13 0.963725 0.481863 0.876247i \(-0.339960\pi\)
0.481863 + 0.876247i \(0.339960\pi\)
\(878\) 3.32539e13 1.88850
\(879\) −1.35886e13 −0.767760
\(880\) 2.52157e13 1.41742
\(881\) 1.26880e13 0.709583 0.354792 0.934945i \(-0.384552\pi\)
0.354792 + 0.934945i \(0.384552\pi\)
\(882\) 2.71333e13 1.50971
\(883\) −2.65648e13 −1.47056 −0.735281 0.677762i \(-0.762950\pi\)
−0.735281 + 0.677762i \(0.762950\pi\)
\(884\) 0 0
\(885\) 2.15097e13 1.17866
\(886\) −4.99736e13 −2.72451
\(887\) 5.71289e11 0.0309885 0.0154942 0.999880i \(-0.495068\pi\)
0.0154942 + 0.999880i \(0.495068\pi\)
\(888\) −7.64814e13 −4.12760
\(889\) −1.72643e13 −0.927023
\(890\) −5.25120e13 −2.80546
\(891\) −2.23446e13 −1.18774
\(892\) −3.80990e13 −2.01498
\(893\) −1.73392e13 −0.912425
\(894\) −6.33103e13 −3.31478
\(895\) −2.28720e13 −1.19152
\(896\) −4.98757e12 −0.258525
\(897\) −2.12654e13 −1.09675
\(898\) 2.54223e13 1.30458
\(899\) −8.73529e12 −0.446025
\(900\) 1.58258e12 0.0804035
\(901\) 0 0
\(902\) −1.96371e13 −0.987751
\(903\) −2.72474e13 −1.36374
\(904\) −6.26931e13 −3.12221
\(905\) −5.67571e12 −0.281256
\(906\) −1.09611e14 −5.40477
\(907\) −3.29210e12 −0.161525 −0.0807625 0.996733i \(-0.525736\pi\)
−0.0807625 + 0.996733i \(0.525736\pi\)
\(908\) 5.64705e13 2.75699
\(909\) −5.27411e13 −2.56219
\(910\) 2.17176e13 1.04985
\(911\) 1.27945e13 0.615445 0.307723 0.951476i \(-0.400433\pi\)
0.307723 + 0.951476i \(0.400433\pi\)
\(912\) −9.50524e13 −4.54974
\(913\) −3.28559e12 −0.156493
\(914\) 4.06107e13 1.92479
\(915\) 1.92978e13 0.910152
\(916\) 5.88376e13 2.76137
\(917\) 1.16894e12 0.0545922
\(918\) 0 0
\(919\) −3.16626e13 −1.46429 −0.732146 0.681148i \(-0.761481\pi\)
−0.732146 + 0.681148i \(0.761481\pi\)
\(920\) −5.11579e13 −2.35433
\(921\) 1.71244e13 0.784235
\(922\) −2.16650e12 −0.0987348
\(923\) 1.93594e13 0.877979
\(924\) −4.40577e13 −1.98837
\(925\) 2.58670e11 0.0116174
\(926\) 3.22208e13 1.44008
\(927\) 3.92730e13 1.74677
\(928\) 1.77778e13 0.786887
\(929\) 1.31826e13 0.580673 0.290336 0.956925i \(-0.406233\pi\)
0.290336 + 0.956925i \(0.406233\pi\)
\(930\) 9.20701e13 4.03595
\(931\) 7.65346e12 0.333875
\(932\) 2.61668e13 1.13600
\(933\) −5.56929e13 −2.40620
\(934\) 6.55493e13 2.81843
\(935\) 0 0
\(936\) −1.03502e14 −4.40765
\(937\) −2.06204e13 −0.873916 −0.436958 0.899482i \(-0.643944\pi\)
−0.436958 + 0.899482i \(0.643944\pi\)
\(938\) 1.39432e13 0.588099
\(939\) −5.22374e13 −2.19273
\(940\) −5.59038e13 −2.33543
\(941\) −2.43975e13 −1.01436 −0.507180 0.861840i \(-0.669312\pi\)
−0.507180 + 0.861840i \(0.669312\pi\)
\(942\) 5.74495e13 2.37715
\(943\) 2.03879e13 0.839596
\(944\) −4.01588e13 −1.64591
\(945\) −4.93293e13 −2.01216
\(946\) −2.30698e13 −0.936556
\(947\) 4.10278e13 1.65769 0.828845 0.559478i \(-0.188998\pi\)
0.828845 + 0.559478i \(0.188998\pi\)
\(948\) 1.39894e14 5.62552
\(949\) −1.96672e13 −0.787128
\(950\) 6.28202e11 0.0250232
\(951\) −5.84506e13 −2.31727
\(952\) 0 0
\(953\) 4.09880e13 1.60968 0.804839 0.593494i \(-0.202252\pi\)
0.804839 + 0.593494i \(0.202252\pi\)
\(954\) 1.98444e14 7.75659
\(955\) 1.53410e13 0.596815
\(956\) 1.55610e12 0.0602527
\(957\) 9.83437e12 0.379003
\(958\) 5.73711e13 2.20064
\(959\) −1.91600e13 −0.731496
\(960\) −6.25663e13 −2.37750
\(961\) 1.02574e13 0.387956
\(962\) −2.85410e13 −1.07444
\(963\) −1.03245e14 −3.86856
\(964\) 4.14221e13 1.54485
\(965\) 1.82400e13 0.677098
\(966\) 6.43716e13 2.37847
\(967\) −4.45707e12 −0.163919 −0.0819597 0.996636i \(-0.526118\pi\)
−0.0819597 + 0.996636i \(0.526118\pi\)
\(968\) 5.17928e13 1.89596
\(969\) 0 0
\(970\) 2.61444e13 0.948211
\(971\) 3.69975e13 1.33563 0.667815 0.744327i \(-0.267230\pi\)
0.667815 + 0.744327i \(0.267230\pi\)
\(972\) 1.02769e14 3.69288
\(973\) 4.48374e12 0.160374
\(974\) −3.78797e13 −1.34863
\(975\) 4.99034e11 0.0176852
\(976\) −3.60292e13 −1.27096
\(977\) 4.72608e13 1.65949 0.829746 0.558141i \(-0.188485\pi\)
0.829746 + 0.558141i \(0.188485\pi\)
\(978\) −1.17716e14 −4.11445
\(979\) 2.35635e13 0.819819
\(980\) 2.46758e13 0.854581
\(981\) −6.19811e13 −2.13673
\(982\) −1.00727e14 −3.45656
\(983\) 1.37629e13 0.470130 0.235065 0.971980i \(-0.424470\pi\)
0.235065 + 0.971980i \(0.424470\pi\)
\(984\) 1.41462e14 4.81018
\(985\) 1.00742e13 0.340996
\(986\) 0 0
\(987\) 4.16947e13 1.39847
\(988\) −4.92545e13 −1.64452
\(989\) 2.39519e13 0.796080
\(990\) −7.27102e13 −2.40568
\(991\) 3.34745e13 1.10251 0.551255 0.834337i \(-0.314149\pi\)
0.551255 + 0.834337i \(0.314149\pi\)
\(992\) −7.46847e13 −2.44866
\(993\) 5.07390e13 1.65604
\(994\) −5.86020e13 −1.90403
\(995\) 4.27468e12 0.138261
\(996\) 3.99317e13 1.28573
\(997\) 4.78709e13 1.53442 0.767209 0.641398i \(-0.221645\pi\)
0.767209 + 0.641398i \(0.221645\pi\)
\(998\) −5.04279e13 −1.60910
\(999\) 6.48280e13 2.05929
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 289.10.a.a.1.1 5
17.16 even 2 17.10.a.a.1.1 5
51.50 odd 2 153.10.a.c.1.5 5
68.67 odd 2 272.10.a.f.1.5 5
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
17.10.a.a.1.1 5 17.16 even 2
153.10.a.c.1.5 5 51.50 odd 2
272.10.a.f.1.5 5 68.67 odd 2
289.10.a.a.1.1 5 1.1 even 1 trivial