Properties

Label 273.2.c.c.64.7
Level $273$
Weight $2$
Character 273.64
Analytic conductor $2.180$
Analytic rank $0$
Dimension $8$
CM no
Inner twists $2$

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Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms
 
[N,k,chi] = [273,2,Mod(64,273)]
 
mf = mfinit([N,k,chi],0)
 
lf = mfeigenbasis(mf)
 
from sage.modular.dirichlet import DirichletCharacter
 
H = DirichletGroup(273, base_ring=CyclotomicField(2))
 
chi = DirichletCharacter(H, H._module([0, 0, 1]))
 
N = Newforms(chi, 2, names="a")
 
//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code
 
chi := DirichletCharacter("273.64");
 
S:= CuspForms(chi, 2);
 
N := Newforms(S);
 
Level: \( N \) \(=\) \( 273 = 3 \cdot 7 \cdot 13 \)
Weight: \( k \) \(=\) \( 2 \)
Character orbit: \([\chi]\) \(=\) 273.c (of order \(2\), degree \(1\), minimal)

Newform invariants

comment: select newform
 
sage: f = N[0] # Warning: the index may be different
 
gp: f = lf[1] \\ Warning: the index may be different
 
Self dual: no
Analytic conductor: \(2.17991597518\)
Analytic rank: \(0\)
Dimension: \(8\)
Coefficient field: \(\mathbb{Q}[x]/(x^{8} + \cdots)\)
comment: defining polynomial
 
gp: f.mod \\ as an extension of the character field
 
Defining polynomial: \( x^{8} + 15x^{6} + 67x^{4} + 77x^{2} + 4 \) Copy content Toggle raw display
Coefficient ring: \(\Z[a_1, \ldots, a_{7}]\)
Coefficient ring index: \( 2 \)
Twist minimal: yes
Sato-Tate group: $\mathrm{SU}(2)[C_{2}]$

Embedding invariants

Embedding label 64.7
Root \(2.54814i\) of defining polynomial
Character \(\chi\) \(=\) 273.64
Dual form 273.2.c.c.64.2

$q$-expansion

comment: q-expansion
 
sage: f.q_expansion() # note that sage often uses an isomorphic number field
 
gp: mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q+2.54814i q^{2} -1.00000 q^{3} -4.49301 q^{4} +3.49301i q^{5} -2.54814i q^{6} +1.00000i q^{7} -6.35254i q^{8} +1.00000 q^{9} +O(q^{10})\) \(q+2.54814i q^{2} -1.00000 q^{3} -4.49301 q^{4} +3.49301i q^{5} -2.54814i q^{6} +1.00000i q^{7} -6.35254i q^{8} +1.00000 q^{9} -8.90068 q^{10} -0.708126i q^{11} +4.49301 q^{12} +(-3.25627 - 1.54814i) q^{13} -2.54814 q^{14} -3.49301i q^{15} +7.20114 q^{16} +7.09628 q^{17} +2.54814i q^{18} -0.311392i q^{19} -15.6942i q^{20} -1.00000i q^{21} +1.80440 q^{22} -7.88116 q^{23} +6.35254i q^{24} -7.20114 q^{25} +(3.94487 - 8.29742i) q^{26} -1.00000 q^{27} -4.49301i q^{28} +5.29742 q^{29} +8.90068 q^{30} +7.29742i q^{31} +5.64442i q^{32} +0.708126i q^{33} +18.0823i q^{34} -3.49301 q^{35} -4.49301 q^{36} +1.41625i q^{37} +0.793469 q^{38} +(3.25627 + 1.54814i) q^{39} +22.1895 q^{40} +11.8044i q^{41} +2.54814 q^{42} -3.29742 q^{43} +3.18162i q^{44} +3.49301i q^{45} -20.0823i q^{46} +6.11580i q^{47} -7.20114 q^{48} -1.00000 q^{49} -18.3495i q^{50} -7.09628 q^{51} +(14.6304 + 6.95581i) q^{52} -3.72764 q^{53} -2.54814i q^{54} +2.47349 q^{55} +6.35254 q^{56} +0.311392i q^{57} +13.4986i q^{58} -2.19560i q^{59} +15.6942i q^{60} +2.51253 q^{61} -18.5948 q^{62} +1.00000i q^{63} +0.0195182 q^{64} +(5.40767 - 11.3742i) q^{65} -1.80440 q^{66} -9.17858i q^{67} -31.8837 q^{68} +7.88116 q^{69} -8.90068i q^{70} +0.708126i q^{71} -6.35254i q^{72} +5.21511i q^{73} -3.60881 q^{74} +7.20114 q^{75} +1.39909i q^{76} +0.708126 q^{77} +(-3.94487 + 8.29742i) q^{78} -2.78489 q^{79} +25.1537i q^{80} +1.00000 q^{81} -30.0793 q^{82} -6.11580i q^{83} +4.49301i q^{84} +24.7874i q^{85} -8.40228i q^{86} -5.29742 q^{87} -4.49840 q^{88} +11.1018i q^{89} -8.90068 q^{90} +(1.54814 - 3.25627i) q^{91} +35.4102 q^{92} -7.29742i q^{93} -15.5839 q^{94} +1.08770 q^{95} -5.64442i q^{96} -7.79886i q^{97} -2.54814i q^{98} -0.708126i q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 8 q - 8 q^{3} - 14 q^{4} + 8 q^{9}+O(q^{10}) \) Copy content Toggle raw display \( 8 q - 8 q^{3} - 14 q^{4} + 8 q^{9} + 4 q^{10} + 14 q^{12} - 6 q^{13} - 2 q^{14} + 34 q^{16} + 20 q^{17} - 24 q^{22} - 6 q^{23} - 34 q^{25} + 28 q^{26} - 8 q^{27} - 18 q^{29} - 4 q^{30} - 6 q^{35} - 14 q^{36} + 36 q^{38} + 6 q^{39} - 8 q^{40} + 2 q^{42} + 34 q^{43} - 34 q^{48} - 8 q^{49} - 20 q^{51} + 18 q^{52} - 10 q^{53} + 16 q^{55} - 6 q^{56} - 20 q^{61} - 28 q^{62} - 18 q^{64} - 10 q^{65} + 24 q^{66} - 24 q^{68} + 6 q^{69} + 48 q^{74} + 34 q^{75} + 4 q^{77} - 28 q^{78} - 2 q^{79} + 8 q^{81} - 48 q^{82} + 18 q^{87} - 8 q^{88} + 4 q^{90} - 6 q^{91} + 56 q^{92} - 72 q^{94} - 78 q^{95}+O(q^{100}) \) Copy content Toggle raw display

Display 100 coefficients 10 coefficients

Character values

We give the values of \(\chi\) on generators for \(\left(\mathbb{Z}/273\mathbb{Z}\right)^\times\).

\(n\) \(92\) \(106\) \(157\)
\(\chi(n)\) \(1\) \(-1\) \(1\)

Coefficient data

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



Display \(a_p\) with \(p\) up to: 50 250 1000 (See \(a_n\) instead) (See \(a_n\) instead) (See \(a_n\) instead) Display \(a_n\) with \(n\) up to: 50 250 1000 (See only \(a_p\)) (See only \(a_p\)) (See only \(a_p\))
Significant digits:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) 2.54814i 1.80181i 0.434020 + 0.900903i \(0.357095\pi\)
−0.434020 + 0.900903i \(0.642905\pi\)
\(3\) −1.00000 −0.577350
\(4\) −4.49301 −2.24651
\(5\) 3.49301i 1.56212i 0.624454 + 0.781061i \(0.285321\pi\)
−0.624454 + 0.781061i \(0.714679\pi\)
\(6\) 2.54814i 1.04027i
\(7\) 1.00000i 0.377964i
\(8\) 6.35254i 2.24596i
\(9\) 1.00000 0.333333
\(10\) −8.90068 −2.81464
\(11\) 0.708126i 0.213508i −0.994285 0.106754i \(-0.965954\pi\)
0.994285 0.106754i \(-0.0340458\pi\)
\(12\) 4.49301 1.29702
\(13\) −3.25627 1.54814i −0.903126 0.429377i
\(14\) −2.54814 −0.681019
\(15\) 3.49301i 0.901892i
\(16\) 7.20114 1.80028
\(17\) 7.09628 1.72110 0.860550 0.509366i \(-0.170120\pi\)
0.860550 + 0.509366i \(0.170120\pi\)
\(18\) 2.54814i 0.600602i
\(19\) 0.311392i 0.0714382i −0.999362 0.0357191i \(-0.988628\pi\)
0.999362 0.0357191i \(-0.0113722\pi\)
\(20\) 15.6942i 3.50932i
\(21\) 1.00000i 0.218218i
\(22\) 1.80440 0.384700
\(23\) −7.88116 −1.64334 −0.821668 0.569966i \(-0.806956\pi\)
−0.821668 + 0.569966i \(0.806956\pi\)
\(24\) 6.35254i 1.29671i
\(25\) −7.20114 −1.44023
\(26\) 3.94487 8.29742i 0.773653 1.62726i
\(27\) −1.00000 −0.192450
\(28\) 4.49301i 0.849100i
\(29\) 5.29742 0.983706 0.491853 0.870678i \(-0.336320\pi\)
0.491853 + 0.870678i \(0.336320\pi\)
\(30\) 8.90068 1.62503
\(31\) 7.29742i 1.31065i 0.755345 + 0.655327i \(0.227469\pi\)
−0.755345 + 0.655327i \(0.772531\pi\)
\(32\) 5.64442i 0.997801i
\(33\) 0.708126i 0.123269i
\(34\) 18.0823i 3.10109i
\(35\) −3.49301 −0.590427
\(36\) −4.49301 −0.748835
\(37\) 1.41625i 0.232831i 0.993201 + 0.116415i \(0.0371403\pi\)
−0.993201 + 0.116415i \(0.962860\pi\)
\(38\) 0.793469 0.128718
\(39\) 3.25627 + 1.54814i 0.521420 + 0.247901i
\(40\) 22.1895 3.50847
\(41\) 11.8044i 1.84354i 0.387739 + 0.921769i \(0.373256\pi\)
−0.387739 + 0.921769i \(0.626744\pi\)
\(42\) 2.54814 0.393186
\(43\) −3.29742 −0.502851 −0.251426 0.967877i \(-0.580899\pi\)
−0.251426 + 0.967877i \(0.580899\pi\)
\(44\) 3.18162i 0.479647i
\(45\) 3.49301i 0.520708i
\(46\) 20.0823i 2.96097i
\(47\) 6.11580i 0.892081i 0.895013 + 0.446040i \(0.147166\pi\)
−0.895013 + 0.446040i \(0.852834\pi\)
\(48\) −7.20114 −1.03939
\(49\) −1.00000 −0.142857
\(50\) 18.3495i 2.59501i
\(51\) −7.09628 −0.993678
\(52\) 14.6304 + 6.95581i 2.02888 + 0.964597i
\(53\) −3.72764 −0.512031 −0.256016 0.966673i \(-0.582410\pi\)
−0.256016 + 0.966673i \(0.582410\pi\)
\(54\) 2.54814i 0.346758i
\(55\) 2.47349 0.333526
\(56\) 6.35254 0.848894
\(57\) 0.311392i 0.0412448i
\(58\) 13.4986i 1.77245i
\(59\) 2.19560i 0.285842i −0.989734 0.142921i \(-0.954350\pi\)
0.989734 0.142921i \(-0.0456495\pi\)
\(60\) 15.6942i 2.02611i
\(61\) 2.51253 0.321697 0.160848 0.986979i \(-0.448577\pi\)
0.160848 + 0.986979i \(0.448577\pi\)
\(62\) −18.5948 −2.36155
\(63\) 1.00000i 0.125988i
\(64\) 0.0195182 0.00243977
\(65\) 5.40767 11.3742i 0.670739 1.41079i
\(66\) −1.80440 −0.222107
\(67\) 9.17858i 1.12134i −0.828039 0.560671i \(-0.810543\pi\)
0.828039 0.560671i \(-0.189457\pi\)
\(68\) −31.8837 −3.86646
\(69\) 7.88116 0.948781
\(70\) 8.90068i 1.06384i
\(71\) 0.708126i 0.0840391i 0.999117 + 0.0420196i \(0.0133792\pi\)
−0.999117 + 0.0420196i \(0.986621\pi\)
\(72\) 6.35254i 0.748654i
\(73\) 5.21511i 0.610383i 0.952291 + 0.305191i \(0.0987205\pi\)
−0.952291 + 0.305191i \(0.901280\pi\)
\(74\) −3.60881 −0.419516
\(75\) 7.20114 0.831516
\(76\) 1.39909i 0.160486i
\(77\) 0.708126 0.0806985
\(78\) −3.94487 + 8.29742i −0.446669 + 0.939498i
\(79\) −2.78489 −0.313324 −0.156662 0.987652i \(-0.550073\pi\)
−0.156662 + 0.987652i \(0.550073\pi\)
\(80\) 25.1537i 2.81227i
\(81\) 1.00000 0.111111
\(82\) −30.0793 −3.32170
\(83\) 6.11580i 0.671296i −0.941988 0.335648i \(-0.891045\pi\)
0.941988 0.335648i \(-0.108955\pi\)
\(84\) 4.49301i 0.490228i
\(85\) 24.7874i 2.68857i
\(86\) 8.40228i 0.906041i
\(87\) −5.29742 −0.567943
\(88\) −4.49840 −0.479531
\(89\) 11.1018i 1.17679i 0.808573 + 0.588395i \(0.200240\pi\)
−0.808573 + 0.588395i \(0.799760\pi\)
\(90\) −8.90068 −0.938214
\(91\) 1.54814 3.25627i 0.162289 0.341349i
\(92\) 35.4102 3.69177
\(93\) 7.29742i 0.756707i
\(94\) −15.5839 −1.60736
\(95\) 1.08770 0.111595
\(96\) 5.64442i 0.576081i
\(97\) 7.79886i 0.791854i −0.918282 0.395927i \(-0.870423\pi\)
0.918282 0.395927i \(-0.129577\pi\)
\(98\) 2.54814i 0.257401i
\(99\) 0.708126i 0.0711694i
\(100\) 32.3548 3.23548
\(101\) 17.6911 1.76033 0.880166 0.474666i \(-0.157431\pi\)
0.880166 + 0.474666i \(0.157431\pi\)
\(102\) 18.0823i 1.79041i
\(103\) 5.52651 0.544543 0.272271 0.962221i \(-0.412225\pi\)
0.272271 + 0.962221i \(0.412225\pi\)
\(104\) −9.83462 + 20.6856i −0.964364 + 2.02839i
\(105\) 3.49301 0.340883
\(106\) 9.49856i 0.922581i
\(107\) 19.1786 1.85406 0.927032 0.374983i \(-0.122351\pi\)
0.927032 + 0.374983i \(0.122351\pi\)
\(108\) 4.49301 0.432340
\(109\) 3.20653i 0.307130i 0.988139 + 0.153565i \(0.0490754\pi\)
−0.988139 + 0.153565i \(0.950925\pi\)
\(110\) 6.30281i 0.600949i
\(111\) 1.41625i 0.134425i
\(112\) 7.20114i 0.680444i
\(113\) −5.29742 −0.498339 −0.249170 0.968460i \(-0.580158\pi\)
−0.249170 + 0.968460i \(0.580158\pi\)
\(114\) −0.793469 −0.0743152
\(115\) 27.5290i 2.56709i
\(116\) −23.8014 −2.20990
\(117\) −3.25627 1.54814i −0.301042 0.143126i
\(118\) 5.59468 0.515032
\(119\) 7.09628i 0.650515i
\(120\) −22.1895 −2.02562
\(121\) 10.4986 0.954414
\(122\) 6.40228i 0.579635i
\(123\) 11.8044i 1.06437i
\(124\) 32.7874i 2.94439i
\(125\) 7.68861i 0.687690i
\(126\) −2.54814 −0.227006
\(127\) −14.3028 −1.26917 −0.634585 0.772853i \(-0.718829\pi\)
−0.634585 + 0.772853i \(0.718829\pi\)
\(128\) 11.3386i 1.00220i
\(129\) 3.29742 0.290321
\(130\) 28.9830 + 13.7795i 2.54198 + 1.20854i
\(131\) 12.4023 1.08359 0.541796 0.840510i \(-0.317745\pi\)
0.541796 + 0.840510i \(0.317745\pi\)
\(132\) 3.18162i 0.276925i
\(133\) 0.311392 0.0270011
\(134\) 23.3883 2.02044
\(135\) 3.49301i 0.300631i
\(136\) 45.0794i 3.86553i
\(137\) 5.58390i 0.477065i 0.971135 + 0.238532i \(0.0766663\pi\)
−0.971135 + 0.238532i \(0.923334\pi\)
\(138\) 20.0823i 1.70952i
\(139\) −1.52651 −0.129476 −0.0647382 0.997902i \(-0.520621\pi\)
−0.0647382 + 0.997902i \(0.520621\pi\)
\(140\) 15.6942 1.32640
\(141\) 6.11580i 0.515043i
\(142\) −1.80440 −0.151422
\(143\) −1.09628 + 2.30585i −0.0916754 + 0.192825i
\(144\) 7.20114 0.600095
\(145\) 18.5039i 1.53667i
\(146\) −13.2888 −1.09979
\(147\) 1.00000 0.0824786
\(148\) 6.36324i 0.523055i
\(149\) 15.7765i 1.29246i −0.763144 0.646229i \(-0.776345\pi\)
0.763144 0.646229i \(-0.223655\pi\)
\(150\) 18.3495i 1.49823i
\(151\) 6.83251i 0.556021i −0.960578 0.278011i \(-0.910325\pi\)
0.960578 0.278011i \(-0.0896751\pi\)
\(152\) −1.97813 −0.160447
\(153\) 7.09628 0.573700
\(154\) 1.80440i 0.145403i
\(155\) −25.4900 −2.04740
\(156\) −14.6304 6.95581i −1.17137 0.556910i
\(157\) −12.1926 −0.973072 −0.486536 0.873661i \(-0.661740\pi\)
−0.486536 + 0.873661i \(0.661740\pi\)
\(158\) 7.09628i 0.564550i
\(159\) 3.72764 0.295621
\(160\) −19.7160 −1.55869
\(161\) 7.88116i 0.621123i
\(162\) 2.54814i 0.200201i
\(163\) 10.0390i 0.786318i −0.919470 0.393159i \(-0.871382\pi\)
0.919470 0.393159i \(-0.128618\pi\)
\(164\) 53.0373i 4.14152i
\(165\) −2.47349 −0.192561
\(166\) 15.5839 1.20955
\(167\) 24.7106i 1.91217i 0.293096 + 0.956083i \(0.405314\pi\)
−0.293096 + 0.956083i \(0.594686\pi\)
\(168\) −6.35254 −0.490109
\(169\) 8.20653 + 10.0823i 0.631272 + 0.775562i
\(170\) −63.1617 −4.84428
\(171\) 0.311392i 0.0238127i
\(172\) 14.8153 1.12966
\(173\) 10.4735 0.796285 0.398143 0.917324i \(-0.369655\pi\)
0.398143 + 0.917324i \(0.369655\pi\)
\(174\) 13.4986i 1.02332i
\(175\) 7.20114i 0.544355i
\(176\) 5.09932i 0.384375i
\(177\) 2.19560i 0.165031i
\(178\) −28.2890 −2.12035
\(179\) 11.2584 0.841491 0.420745 0.907179i \(-0.361769\pi\)
0.420745 + 0.907179i \(0.361769\pi\)
\(180\) 15.6942i 1.16977i
\(181\) −8.59484 −0.638849 −0.319425 0.947612i \(-0.603490\pi\)
−0.319425 + 0.947612i \(0.603490\pi\)
\(182\) 8.29742 + 3.94487i 0.615046 + 0.292414i
\(183\) −2.51253 −0.185732
\(184\) 50.0654i 3.69087i
\(185\) −4.94699 −0.363710
\(186\) 18.5948 1.36344
\(187\) 5.02506i 0.367469i
\(188\) 27.4784i 2.00406i
\(189\) 1.00000i 0.0727393i
\(190\) 2.77160i 0.201073i
\(191\) 4.98603 0.360776 0.180388 0.983596i \(-0.442265\pi\)
0.180388 + 0.983596i \(0.442265\pi\)
\(192\) −0.0195182 −0.00140860
\(193\) 6.98603i 0.502865i 0.967875 + 0.251433i \(0.0809017\pi\)
−0.967875 + 0.251433i \(0.919098\pi\)
\(194\) 19.8726 1.42677
\(195\) −5.40767 + 11.3742i −0.387251 + 0.814522i
\(196\) 4.49301 0.320929
\(197\) 21.8044i 1.55350i 0.629809 + 0.776750i \(0.283133\pi\)
−0.629809 + 0.776750i \(0.716867\pi\)
\(198\) 1.80440 0.128233
\(199\) 0.622783 0.0441479 0.0220740 0.999756i \(-0.492973\pi\)
0.0220740 + 0.999756i \(0.492973\pi\)
\(200\) 45.7456i 3.23470i
\(201\) 9.17858i 0.647407i
\(202\) 45.0794i 3.17178i
\(203\) 5.29742i 0.371806i
\(204\) 31.8837 2.23230
\(205\) −41.2329 −2.87983
\(206\) 14.0823i 0.981161i
\(207\) −7.88116 −0.547779
\(208\) −23.4488 11.1484i −1.62588 0.773000i
\(209\) −0.220505 −0.0152526
\(210\) 8.90068i 0.614205i
\(211\) 16.3547 1.12590 0.562951 0.826491i \(-0.309666\pi\)
0.562951 + 0.826491i \(0.309666\pi\)
\(212\) 16.7484 1.15028
\(213\) 0.708126i 0.0485200i
\(214\) 48.8697i 3.34066i
\(215\) 11.5179i 0.785516i
\(216\) 6.35254i 0.432236i
\(217\) −7.29742 −0.495381
\(218\) −8.17069 −0.553389
\(219\) 5.21511i 0.352405i
\(220\) −11.1134 −0.749268
\(221\) −23.1074 10.9860i −1.55437 0.739000i
\(222\) 3.60881 0.242207
\(223\) 8.71367i 0.583511i −0.956493 0.291755i \(-0.905761\pi\)
0.956493 0.291755i \(-0.0942393\pi\)
\(224\) −5.64442 −0.377133
\(225\) −7.20114 −0.480076
\(226\) 13.4986i 0.897911i
\(227\) 12.9440i 0.859120i −0.903038 0.429560i \(-0.858669\pi\)
0.903038 0.429560i \(-0.141331\pi\)
\(228\) 1.39909i 0.0926568i
\(229\) 19.6521i 1.29865i −0.760513 0.649323i \(-0.775052\pi\)
0.760513 0.649323i \(-0.224948\pi\)
\(230\) 70.1477 4.62541
\(231\) −0.708126 −0.0465913
\(232\) 33.6521i 2.20937i
\(233\) 3.72764 0.244206 0.122103 0.992517i \(-0.461036\pi\)
0.122103 + 0.992517i \(0.461036\pi\)
\(234\) 3.94487 8.29742i 0.257884 0.542419i
\(235\) −21.3626 −1.39354
\(236\) 9.86484i 0.642146i
\(237\) 2.78489 0.180898
\(238\) −18.0823 −1.17210
\(239\) 8.86165i 0.573212i −0.958048 0.286606i \(-0.907473\pi\)
0.958048 0.286606i \(-0.0925271\pi\)
\(240\) 25.1537i 1.62366i
\(241\) 10.0025i 0.644318i −0.946686 0.322159i \(-0.895591\pi\)
0.946686 0.322159i \(-0.104409\pi\)
\(242\) 26.7518i 1.71967i
\(243\) −1.00000 −0.0641500
\(244\) −11.2888 −0.722694
\(245\) 3.49301i 0.223160i
\(246\) 30.0793 1.91778
\(247\) −0.482078 + 1.01397i −0.0306739 + 0.0645176i
\(248\) 46.3572 2.94368
\(249\) 6.11580i 0.387573i
\(250\) 19.5916 1.23908
\(251\) 9.24557 0.583575 0.291788 0.956483i \(-0.405750\pi\)
0.291788 + 0.956483i \(0.405750\pi\)
\(252\) 4.49301i 0.283033i
\(253\) 5.58086i 0.350866i
\(254\) 36.4455i 2.28680i
\(255\) 24.7874i 1.55225i
\(256\) −28.8532 −1.80333
\(257\) −14.5516 −0.907702 −0.453851 0.891078i \(-0.649950\pi\)
−0.453851 + 0.891078i \(0.649950\pi\)
\(258\) 8.40228i 0.523103i
\(259\) −1.41625 −0.0880017
\(260\) −24.2967 + 51.1043i −1.50682 + 3.16936i
\(261\) 5.29742 0.327902
\(262\) 31.6027i 1.95242i
\(263\) −14.7137 −0.907284 −0.453642 0.891184i \(-0.649875\pi\)
−0.453642 + 0.891184i \(0.649875\pi\)
\(264\) 4.49840 0.276858
\(265\) 13.0207i 0.799856i
\(266\) 0.793469i 0.0486507i
\(267\) 11.1018i 0.679420i
\(268\) 41.2395i 2.51910i
\(269\) −12.0433 −0.734291 −0.367145 0.930164i \(-0.619665\pi\)
−0.367145 + 0.930164i \(0.619665\pi\)
\(270\) 8.90068 0.541678
\(271\) 7.38830i 0.448808i 0.974496 + 0.224404i \(0.0720434\pi\)
−0.974496 + 0.224404i \(0.927957\pi\)
\(272\) 51.1013 3.09847
\(273\) −1.54814 + 3.25627i −0.0936976 + 0.197078i
\(274\) −14.2286 −0.859578
\(275\) 5.09932i 0.307500i
\(276\) −35.4102 −2.13144
\(277\) 13.6997 0.823135 0.411567 0.911379i \(-0.364981\pi\)
0.411567 + 0.911379i \(0.364981\pi\)
\(278\) 3.88975i 0.233292i
\(279\) 7.29742i 0.436885i
\(280\) 22.1895i 1.32608i
\(281\) 4.62582i 0.275953i −0.990435 0.137977i \(-0.955940\pi\)
0.990435 0.137977i \(-0.0440599\pi\)
\(282\) 15.5839 0.928008
\(283\) 17.9721 1.06833 0.534164 0.845381i \(-0.320627\pi\)
0.534164 + 0.845381i \(0.320627\pi\)
\(284\) 3.18162i 0.188794i
\(285\) −1.08770 −0.0644295
\(286\) −5.87562 2.79347i −0.347433 0.165181i
\(287\) −11.8044 −0.696792
\(288\) 5.64442i 0.332600i
\(289\) 33.3572 1.96219
\(290\) −47.1506 −2.76878
\(291\) 7.79886i 0.457177i
\(292\) 23.4316i 1.37123i
\(293\) 6.87023i 0.401363i 0.979657 + 0.200682i \(0.0643156\pi\)
−0.979657 + 0.200682i \(0.935684\pi\)
\(294\) 2.54814i 0.148610i
\(295\) 7.66924 0.446521
\(296\) 8.99681 0.522929
\(297\) 0.708126i 0.0410897i
\(298\) 40.2006 2.32876
\(299\) 25.6632 + 12.2011i 1.48414 + 0.705610i
\(300\) −32.3548 −1.86801
\(301\) 3.29742i 0.190060i
\(302\) 17.4102 1.00184
\(303\) −17.6911 −1.01633
\(304\) 2.24238i 0.128609i
\(305\) 8.77630i 0.502530i
\(306\) 18.0823i 1.03370i
\(307\) 11.9202i 0.680322i −0.940367 0.340161i \(-0.889518\pi\)
0.940367 0.340161i \(-0.110482\pi\)
\(308\) −3.18162 −0.181290
\(309\) −5.52651 −0.314392
\(310\) 64.9520i 3.68903i
\(311\) −24.7874 −1.40556 −0.702782 0.711405i \(-0.748059\pi\)
−0.702782 + 0.711405i \(0.748059\pi\)
\(312\) 9.83462 20.6856i 0.556776 1.17109i
\(313\) −6.73304 −0.380574 −0.190287 0.981729i \(-0.560942\pi\)
−0.190287 + 0.981729i \(0.560942\pi\)
\(314\) 31.0683i 1.75329i
\(315\) −3.49301 −0.196809
\(316\) 12.5125 0.703885
\(317\) 19.1537i 1.07578i 0.843016 + 0.537889i \(0.180778\pi\)
−0.843016 + 0.537889i \(0.819222\pi\)
\(318\) 9.49856i 0.532653i
\(319\) 3.75124i 0.210029i
\(320\) 0.0681772i 0.00381122i
\(321\) −19.1786 −1.07044
\(322\) 20.0823 1.11914
\(323\) 2.20972i 0.122952i
\(324\) −4.49301 −0.249612
\(325\) 23.4488 + 11.1484i 1.30071 + 0.618400i
\(326\) 25.5809 1.41679
\(327\) 3.20653i 0.177322i
\(328\) 74.9880 4.14052
\(329\) −6.11580 −0.337175
\(330\) 6.30281i 0.346958i
\(331\) 23.5247i 1.29303i 0.762900 + 0.646516i \(0.223775\pi\)
−0.762900 + 0.646516i \(0.776225\pi\)
\(332\) 27.4784i 1.50807i
\(333\) 1.41625i 0.0776102i
\(334\) −62.9661 −3.44535
\(335\) 32.0609 1.75167
\(336\) 7.20114i 0.392854i
\(337\) 29.7258 1.61927 0.809634 0.586935i \(-0.199666\pi\)
0.809634 + 0.586935i \(0.199666\pi\)
\(338\) −25.6911 + 20.9114i −1.39741 + 1.13743i
\(339\) 5.29742 0.287716
\(340\) 111.370i 6.03989i
\(341\) 5.16749 0.279836
\(342\) 0.793469 0.0429059
\(343\) 1.00000i 0.0539949i
\(344\) 20.9470i 1.12939i
\(345\) 27.5290i 1.48211i
\(346\) 26.6879i 1.43475i
\(347\) −32.2036 −1.72878 −0.864391 0.502820i \(-0.832296\pi\)
−0.864391 + 0.502820i \(0.832296\pi\)
\(348\) 23.8014 1.27589
\(349\) 12.5752i 0.673133i 0.941660 + 0.336567i \(0.109266\pi\)
−0.941660 + 0.336567i \(0.890734\pi\)
\(350\) 18.3495 0.980822
\(351\) 3.25627 + 1.54814i 0.173807 + 0.0826336i
\(352\) 3.99696 0.213039
\(353\) 15.4132i 0.820363i −0.912004 0.410181i \(-0.865465\pi\)
0.912004 0.410181i \(-0.134535\pi\)
\(354\) −5.59468 −0.297354
\(355\) −2.47349 −0.131279
\(356\) 49.8806i 2.64367i
\(357\) 7.09628i 0.375575i
\(358\) 28.6879i 1.51620i
\(359\) 24.6910i 1.30314i −0.758589 0.651570i \(-0.774111\pi\)
0.758589 0.651570i \(-0.225889\pi\)
\(360\) 22.1895 1.16949
\(361\) 18.9030 0.994897
\(362\) 21.9008i 1.15108i
\(363\) −10.4986 −0.551031
\(364\) −6.95581 + 14.6304i −0.364583 + 0.766844i
\(365\) −18.2165 −0.953493
\(366\) 6.40228i 0.334652i
\(367\) 10.8758 0.567711 0.283855 0.958867i \(-0.408386\pi\)
0.283855 + 0.958867i \(0.408386\pi\)
\(368\) −56.7534 −2.95847
\(369\) 11.8044i 0.614513i
\(370\) 12.6056i 0.655335i
\(371\) 3.72764i 0.193530i
\(372\) 32.7874i 1.69995i
\(373\) −1.71906 −0.0890096 −0.0445048 0.999009i \(-0.514171\pi\)
−0.0445048 + 0.999009i \(0.514171\pi\)
\(374\) 12.8046 0.662108
\(375\) 7.68861i 0.397038i
\(376\) 38.8509 2.00358
\(377\) −17.2498 8.20114i −0.888410 0.422380i
\(378\) 2.54814 0.131062
\(379\) 12.0000i 0.616399i 0.951322 + 0.308199i \(0.0997264\pi\)
−0.951322 + 0.308199i \(0.900274\pi\)
\(380\) −4.88703 −0.250699
\(381\) 14.3028 0.732755
\(382\) 12.7051i 0.650049i
\(383\) 36.5528i 1.86776i 0.357588 + 0.933879i \(0.383599\pi\)
−0.357588 + 0.933879i \(0.616401\pi\)
\(384\) 11.3386i 0.578619i
\(385\) 2.47349i 0.126061i
\(386\) −17.8014 −0.906066
\(387\) −3.29742 −0.167617
\(388\) 35.0404i 1.77891i
\(389\) 36.1367 1.83220 0.916101 0.400948i \(-0.131319\pi\)
0.916101 + 0.400948i \(0.131319\pi\)
\(390\) −28.9830 13.7795i −1.46761 0.697752i
\(391\) −55.9269 −2.82835
\(392\) 6.35254i 0.320852i
\(393\) −12.4023 −0.625612
\(394\) −55.5607 −2.79911
\(395\) 9.72764i 0.489451i
\(396\) 3.18162i 0.159882i
\(397\) 24.3657i 1.22288i −0.791290 0.611441i \(-0.790590\pi\)
0.791290 0.611441i \(-0.209410\pi\)
\(398\) 1.58694i 0.0795461i
\(399\) −0.311392 −0.0155891
\(400\) −51.8564 −2.59282
\(401\) 3.76537i 0.188034i 0.995571 + 0.0940168i \(0.0299707\pi\)
−0.995571 + 0.0940168i \(0.970029\pi\)
\(402\) −23.3883 −1.16650
\(403\) 11.2974 23.7623i 0.562764 1.18369i
\(404\) −79.4864 −3.95460
\(405\) 3.49301i 0.173569i
\(406\) −13.4986 −0.669922
\(407\) 1.00289 0.0497112
\(408\) 45.0794i 2.23176i
\(409\) 31.3235i 1.54885i −0.632667 0.774424i \(-0.718040\pi\)
0.632667 0.774424i \(-0.281960\pi\)
\(410\) 105.067i 5.18890i
\(411\) 5.58390i 0.275433i
\(412\) −24.8307 −1.22332
\(413\) 2.19560 0.108038
\(414\) 20.0823i 0.986991i
\(415\) 21.3626 1.04865
\(416\) 8.73834 18.3797i 0.428433 0.901140i
\(417\) 1.52651 0.0747533
\(418\) 0.561877i 0.0274823i
\(419\) −26.3572 −1.28763 −0.643816 0.765180i \(-0.722650\pi\)
−0.643816 + 0.765180i \(0.722650\pi\)
\(420\) −15.6942 −0.765796
\(421\) 22.5168i 1.09740i 0.836019 + 0.548700i \(0.184877\pi\)
−0.836019 + 0.548700i \(0.815123\pi\)
\(422\) 41.6739i 2.02866i
\(423\) 6.11580i 0.297360i
\(424\) 23.6800i 1.15000i
\(425\) −51.1013 −2.47878
\(426\) 1.80440 0.0874237
\(427\) 2.51253i 0.121590i
\(428\) −86.1696 −4.16517
\(429\) 1.09628 2.30585i 0.0529288 0.111327i
\(430\) 29.3493 1.41535
\(431\) 16.5374i 0.796580i 0.917259 + 0.398290i \(0.130396\pi\)
−0.917259 + 0.398290i \(0.869604\pi\)
\(432\) −7.20114 −0.346465
\(433\) 25.2720 1.21449 0.607247 0.794513i \(-0.292274\pi\)
0.607247 + 0.794513i \(0.292274\pi\)
\(434\) 18.5948i 0.892581i
\(435\) 18.5039i 0.887196i
\(436\) 14.4070i 0.689969i
\(437\) 2.45413i 0.117397i
\(438\) 13.2888 0.634965
\(439\) 5.52651 0.263766 0.131883 0.991265i \(-0.457898\pi\)
0.131883 + 0.991265i \(0.457898\pi\)
\(440\) 15.7130i 0.749087i
\(441\) −1.00000 −0.0476190
\(442\) 27.9939 58.8808i 1.33154 2.80067i
\(443\) −7.25838 −0.344856 −0.172428 0.985022i \(-0.555161\pi\)
−0.172428 + 0.985022i \(0.555161\pi\)
\(444\) 6.36324i 0.301986i
\(445\) −38.7788 −1.83829
\(446\) 22.2036 1.05137
\(447\) 15.7765i 0.746201i
\(448\) 0.0195182i 0.000922146i
\(449\) 24.1787i 1.14107i −0.821275 0.570533i \(-0.806737\pi\)
0.821275 0.570533i \(-0.193263\pi\)
\(450\) 18.3495i 0.865004i
\(451\) 8.35901 0.393610
\(452\) 23.8014 1.11952
\(453\) 6.83251i 0.321019i
\(454\) 32.9830 1.54797
\(455\) 11.3742 + 5.40767i 0.533230 + 0.253515i
\(456\) 1.97813 0.0926344
\(457\) 33.3991i 1.56234i −0.624316 0.781172i \(-0.714622\pi\)
0.624316 0.781172i \(-0.285378\pi\)
\(458\) 50.0762 2.33991
\(459\) −7.09628 −0.331226
\(460\) 123.688i 5.76699i
\(461\) 10.3882i 0.483824i 0.970298 + 0.241912i \(0.0777746\pi\)
−0.970298 + 0.241912i \(0.922225\pi\)
\(462\) 1.80440i 0.0839485i
\(463\) 23.9330i 1.11226i −0.831095 0.556131i \(-0.812285\pi\)
0.831095 0.556131i \(-0.187715\pi\)
\(464\) 38.1474 1.77095
\(465\) 25.4900 1.18207
\(466\) 9.49856i 0.440012i
\(467\) 8.84329 0.409219 0.204609 0.978844i \(-0.434408\pi\)
0.204609 + 0.978844i \(0.434408\pi\)
\(468\) 14.6304 + 6.95581i 0.676292 + 0.321532i
\(469\) 9.17858 0.423828
\(470\) 54.4348i 2.51089i
\(471\) 12.1926 0.561803
\(472\) −13.9476 −0.641991
\(473\) 2.33499i 0.107363i
\(474\) 7.09628i 0.325943i
\(475\) 2.24238i 0.102887i
\(476\) 31.8837i 1.46139i
\(477\) −3.72764 −0.170677
\(478\) 22.5807 1.03282
\(479\) 13.9623i 0.637953i 0.947763 + 0.318976i \(0.103339\pi\)
−0.947763 + 0.318976i \(0.896661\pi\)
\(480\) 19.7160 0.899909
\(481\) 2.19256 4.61170i 0.0999720 0.210275i
\(482\) 25.4878 1.16094
\(483\) 7.88116i 0.358605i
\(484\) −47.1702 −2.14410
\(485\) 27.2415 1.23697
\(486\) 2.54814i 0.115586i
\(487\) 2.41306i 0.109346i 0.998504 + 0.0546731i \(0.0174117\pi\)
−0.998504 + 0.0546731i \(0.982588\pi\)
\(488\) 15.9610i 0.722519i
\(489\) 10.0390i 0.453981i
\(490\) 8.90068 0.402092
\(491\) 9.15063 0.412962 0.206481 0.978451i \(-0.433799\pi\)
0.206481 + 0.978451i \(0.433799\pi\)
\(492\) 53.0373i 2.39111i
\(493\) 37.5919 1.69306
\(494\) −2.58375 1.22840i −0.116248 0.0552684i
\(495\) 2.47349 0.111175
\(496\) 52.5497i 2.35955i
\(497\) −0.708126 −0.0317638
\(498\) −15.5839 −0.698331
\(499\) 5.34927i 0.239466i −0.992806 0.119733i \(-0.961796\pi\)
0.992806 0.119733i \(-0.0382039\pi\)
\(500\) 34.5450i 1.54490i
\(501\) 24.7106i 1.10399i
\(502\) 23.5590i 1.05149i
\(503\) 35.1617 1.56778 0.783892 0.620897i \(-0.213232\pi\)
0.783892 + 0.620897i \(0.213232\pi\)
\(504\) 6.35254 0.282965
\(505\) 61.7953i 2.74985i
\(506\) −14.2208 −0.632192
\(507\) −8.20653 10.0823i −0.364465 0.447771i
\(508\) 64.2627 2.85120
\(509\) 18.4790i 0.819069i −0.912295 0.409534i \(-0.865691\pi\)
0.912295 0.409534i \(-0.134309\pi\)
\(510\) 63.1617 2.79685
\(511\) −5.21511 −0.230703
\(512\) 50.8449i 2.24705i
\(513\) 0.311392i 0.0137483i
\(514\) 37.0794i 1.63550i
\(515\) 19.3042i 0.850643i
\(516\) −14.8153 −0.652209
\(517\) 4.33076 0.190466
\(518\) 3.60881i 0.158562i
\(519\) −10.4735 −0.459735
\(520\) −72.2550 34.3525i −3.16859 1.50646i
\(521\) 12.1385 0.531798 0.265899 0.964001i \(-0.414331\pi\)
0.265899 + 0.964001i \(0.414331\pi\)
\(522\) 13.4986i 0.590816i
\(523\) −11.4205 −0.499383 −0.249691 0.968325i \(-0.580329\pi\)
−0.249691 + 0.968325i \(0.580329\pi\)
\(524\) −55.7236 −2.43430
\(525\) 7.20114i 0.314283i
\(526\) 37.4925i 1.63475i
\(527\) 51.7845i 2.25577i
\(528\) 5.09932i 0.221919i
\(529\) 39.1128 1.70055
\(530\) 33.1786 1.44119
\(531\) 2.19560i 0.0952807i
\(532\) −1.39909 −0.0606581
\(533\) 18.2749 38.4383i 0.791572 1.66495i
\(534\) 28.2890 1.22418
\(535\) 66.9910i 2.89628i
\(536\) −58.3073 −2.51849
\(537\) −11.2584 −0.485835
\(538\) 30.6879i 1.32305i
\(539\) 0.708126i 0.0305012i
\(540\) 15.6942i 0.675369i
\(541\) 16.3851i 0.704451i −0.935915 0.352226i \(-0.885425\pi\)
0.935915 0.352226i \(-0.114575\pi\)
\(542\) −18.8264 −0.808664
\(543\) 8.59484 0.368840
\(544\) 40.0544i 1.71732i
\(545\) −11.2005 −0.479775
\(546\) −8.29742 3.94487i −0.355097 0.168825i
\(547\) −19.4620 −0.832136 −0.416068 0.909333i \(-0.636592\pi\)
−0.416068 + 0.909333i \(0.636592\pi\)
\(548\) 25.0885i 1.07173i
\(549\) 2.51253 0.107232
\(550\) −12.9938 −0.554056
\(551\) 1.64957i 0.0702741i
\(552\) 50.0654i 2.13093i
\(553\) 2.78489i 0.118425i
\(554\) 34.9087i 1.48313i
\(555\) 4.94699 0.209988
\(556\) 6.85861 0.290870
\(557\) 38.5248i 1.63235i −0.577806 0.816174i \(-0.696091\pi\)
0.577806 0.816174i \(-0.303909\pi\)
\(558\) −18.5948 −0.787182
\(559\) 10.7373 + 5.10486i 0.454138 + 0.215913i
\(560\) −25.1537 −1.06294
\(561\) 5.02506i 0.212158i
\(562\) 11.7872 0.497215
\(563\) −13.7903 −0.581191 −0.290595 0.956846i \(-0.593853\pi\)
−0.290595 + 0.956846i \(0.593853\pi\)
\(564\) 27.4784i 1.15705i
\(565\) 18.5039i 0.778467i
\(566\) 45.7953i 1.92492i
\(567\) 1.00000i 0.0419961i
\(568\) 4.49840 0.188749
\(569\) −5.29742 −0.222079 −0.111040 0.993816i \(-0.535418\pi\)
−0.111040 + 0.993816i \(0.535418\pi\)
\(570\) 2.77160i 0.116090i
\(571\) −27.7928 −1.16309 −0.581546 0.813514i \(-0.697552\pi\)
−0.581546 + 0.813514i \(0.697552\pi\)
\(572\) 4.92559 10.3602i 0.205949 0.433182i
\(573\) −4.98603 −0.208294
\(574\) 30.0793i 1.25548i
\(575\) 56.7534 2.36678
\(576\) 0.0195182 0.000813256
\(577\) 18.7333i 0.779879i 0.920840 + 0.389940i \(0.127504\pi\)
−0.920840 + 0.389940i \(0.872496\pi\)
\(578\) 84.9987i 3.53548i
\(579\) 6.98603i 0.290329i
\(580\) 83.1385i 3.45214i
\(581\) 6.11580 0.253726
\(582\) −19.8726 −0.823745
\(583\) 2.63964i 0.109323i
\(584\) 33.1292 1.37090
\(585\) 5.40767 11.3742i 0.223580 0.470264i
\(586\) −17.5063 −0.723179
\(587\) 8.93721i 0.368878i 0.982844 + 0.184439i \(0.0590469\pi\)
−0.982844 + 0.184439i \(0.940953\pi\)
\(588\) −4.49301 −0.185289
\(589\) 2.27236 0.0936308
\(590\) 19.5423i 0.804544i
\(591\) 21.8044i 0.896913i
\(592\) 10.1986i 0.419161i
\(593\) 10.9655i 0.450298i −0.974324 0.225149i \(-0.927713\pi\)
0.974324 0.225149i \(-0.0722869\pi\)
\(594\) −1.80440 −0.0740356
\(595\) −24.7874 −1.01618
\(596\) 70.8838i 2.90351i
\(597\) −0.622783 −0.0254888
\(598\) −31.0902 + 65.3933i −1.27137 + 2.67413i
\(599\) 32.2663 1.31836 0.659182 0.751983i \(-0.270903\pi\)
0.659182 + 0.751983i \(0.270903\pi\)
\(600\) 45.7456i 1.86755i
\(601\) −19.2999 −0.787260 −0.393630 0.919269i \(-0.628781\pi\)
−0.393630 + 0.919269i \(0.628781\pi\)
\(602\) 8.40228 0.342451
\(603\) 9.17858i 0.373781i
\(604\) 30.6985i 1.24911i
\(605\) 36.6716i 1.49091i
\(606\) 45.0794i 1.83123i
\(607\) 31.6632 1.28517 0.642584 0.766215i \(-0.277862\pi\)
0.642584 + 0.766215i \(0.277862\pi\)
\(608\) 1.75762 0.0712811
\(609\) 5.29742i 0.214662i
\(610\) −22.3632 −0.905461
\(611\) 9.46810 19.9147i 0.383038 0.805661i
\(612\) −31.8837 −1.28882
\(613\) 3.23478i 0.130652i 0.997864 + 0.0653259i \(0.0208087\pi\)
−0.997864 + 0.0653259i \(0.979191\pi\)
\(614\) 30.3743 1.22581
\(615\) 41.2329 1.66267
\(616\) 4.49840i 0.181246i
\(617\) 11.1365i 0.448339i −0.974550 0.224169i \(-0.928033\pi\)
0.974550 0.224169i \(-0.0719669\pi\)
\(618\) 14.0823i 0.566473i
\(619\) 6.82643i 0.274377i 0.990545 + 0.137189i \(0.0438067\pi\)
−0.990545 + 0.137189i \(0.956193\pi\)
\(620\) 114.527 4.59951
\(621\) 7.88116 0.316260
\(622\) 63.1617i 2.53255i
\(623\) −11.1018 −0.444785
\(624\) 23.4488 + 11.1484i 0.938704 + 0.446292i
\(625\) −9.14929 −0.365972
\(626\) 17.1567i 0.685720i
\(627\) 0.220505 0.00880611
\(628\) 54.7813 2.18601
\(629\) 10.0501i 0.400725i
\(630\) 8.90068i 0.354612i
\(631\) 18.9689i 0.755138i −0.925981 0.377569i \(-0.876760\pi\)
0.925981 0.377569i \(-0.123240\pi\)
\(632\) 17.6911i 0.703715i
\(633\) −16.3547 −0.650039
\(634\) −48.8062 −1.93834
\(635\) 49.9599i 1.98260i
\(636\) −16.7484 −0.664115
\(637\) 3.25627 + 1.54814i 0.129018 + 0.0613395i
\(638\) 9.55868 0.378432
\(639\) 0.708126i 0.0280130i
\(640\) −39.6058 −1.56556
\(641\) −8.45413 −0.333918 −0.166959 0.985964i \(-0.553395\pi\)
−0.166959 + 0.985964i \(0.553395\pi\)
\(642\) 48.8697i 1.92873i
\(643\) 37.4102i 1.47531i −0.675176 0.737657i \(-0.735932\pi\)
0.675176 0.737657i \(-0.264068\pi\)
\(644\) 35.4102i 1.39536i
\(645\) 11.5179i 0.453518i
\(646\) 5.63068 0.221536
\(647\) −17.2627 −0.678668 −0.339334 0.940666i \(-0.610202\pi\)
−0.339334 + 0.940666i \(0.610202\pi\)
\(648\) 6.35254i 0.249551i
\(649\) −1.55476 −0.0610296
\(650\) −28.4076 + 59.7509i −1.11424 + 2.34362i
\(651\) 7.29742 0.286008
\(652\) 45.1055i 1.76647i
\(653\) 27.2456 1.06620 0.533101 0.846052i \(-0.321027\pi\)
0.533101 + 0.846052i \(0.321027\pi\)
\(654\) 8.17069 0.319499
\(655\) 43.3213i 1.69270i
\(656\) 85.0052i 3.31889i
\(657\) 5.21511i 0.203461i
\(658\) 15.5839i 0.607524i
\(659\) −36.0458 −1.40414 −0.702072 0.712106i \(-0.747742\pi\)
−0.702072 + 0.712106i \(0.747742\pi\)
\(660\) 11.1134 0.432590
\(661\) 25.3626i 0.986489i −0.869891 0.493245i \(-0.835811\pi\)
0.869891 0.493245i \(-0.164189\pi\)
\(662\) −59.9441 −2.32979
\(663\) 23.1074 + 10.9860i 0.897416 + 0.426662i
\(664\) −38.8509 −1.50771
\(665\) 1.08770i 0.0421790i
\(666\) −3.60881 −0.139839
\(667\) −41.7498 −1.61656
\(668\) 111.025i 4.29569i
\(669\) 8.71367i 0.336890i
\(670\) 81.6957i 3.15618i
\(671\) 1.77919i 0.0686849i
\(672\) 5.64442 0.217738
\(673\) −40.7355 −1.57024 −0.785120 0.619344i \(-0.787399\pi\)
−0.785120 + 0.619344i \(0.787399\pi\)
\(674\) 75.7455i 2.91761i
\(675\) 7.20114 0.277172
\(676\) −36.8720 45.2999i −1.41816 1.74230i
\(677\) −38.7333 −1.48864 −0.744322 0.667821i \(-0.767227\pi\)
−0.744322 + 0.667821i \(0.767227\pi\)
\(678\) 13.4986i 0.518409i
\(679\) 7.79886 0.299293
\(680\) 157.463 6.03843
\(681\) 12.9440i 0.496013i
\(682\) 13.1675i 0.504209i
\(683\) 32.0682i 1.22705i −0.789673 0.613527i \(-0.789750\pi\)
0.789673 0.613527i \(-0.210250\pi\)
\(684\) 1.39909i 0.0534954i
\(685\) −19.5046 −0.745234
\(686\) 2.54814 0.0972884
\(687\) 19.6521i 0.749774i
\(688\) −23.7452 −0.905276
\(689\) 12.1382 + 5.77091i 0.462429 + 0.219854i
\(690\) −70.1477 −2.67048
\(691\) 14.4259i 0.548786i 0.961618 + 0.274393i \(0.0884769\pi\)
−0.961618 + 0.274393i \(0.911523\pi\)
\(692\) −47.0575 −1.78886
\(693\) 0.708126 0.0268995
\(694\) 82.0594i 3.11493i
\(695\) 5.33210i 0.202258i
\(696\) 33.6521i 1.27558i
\(697\) 83.7673i 3.17291i
\(698\) −32.0433 −1.21286
\(699\) −3.72764 −0.140992
\(700\) 32.3548i 1.22290i
\(701\) 11.0490 0.417314 0.208657 0.977989i \(-0.433091\pi\)
0.208657 + 0.977989i \(0.433091\pi\)
\(702\) −3.94487 + 8.29742i −0.148890 + 0.313166i
\(703\) 0.441009 0.0166330
\(704\) 0.0138213i 0.000520911i
\(705\) 21.3626 0.804560
\(706\) 39.2750 1.47813
\(707\) 17.6911i 0.665343i
\(708\) 9.86484i 0.370743i
\(709\) 19.8293i 0.744706i 0.928091 + 0.372353i \(0.121449\pi\)
−0.928091 + 0.372353i \(0.878551\pi\)
\(710\) 6.30281i 0.236540i
\(711\) −2.78489 −0.104441
\(712\) 70.5248 2.64303
\(713\) 57.5122i 2.15385i
\(714\) 18.0823 0.676713
\(715\) −8.05436 3.82931i −0.301216 0.143208i
\(716\) −50.5841 −1.89041
\(717\) 8.86165i 0.330944i
\(718\) 62.9160 2.34800
\(719\) −3.21261 −0.119810 −0.0599050 0.998204i \(-0.519080\pi\)
−0.0599050 + 0.998204i \(0.519080\pi\)
\(720\) 25.1537i 0.937422i
\(721\) 5.52651i 0.205818i
\(722\) 48.1676i 1.79261i
\(723\) 10.0025i 0.371997i
\(724\) 38.6167 1.43518
\(725\) −38.1474 −1.41676
\(726\) 26.7518i 0.992852i
\(727\) −13.3493 −0.495097 −0.247548 0.968876i \(-0.579625\pi\)
−0.247548 + 0.968876i \(0.579625\pi\)
\(728\) −20.6856 9.83462i −0.766658 0.364495i
\(729\) 1.00000 0.0370370
\(730\) 46.4181i 1.71801i
\(731\) −23.3994 −0.865458
\(732\) 11.2888 0.417247
\(733\) 17.4185i 0.643365i 0.946848 + 0.321683i \(0.104248\pi\)
−0.946848 + 0.321683i \(0.895752\pi\)
\(734\) 27.7130i 1.02290i
\(735\) 3.49301i 0.128842i
\(736\) 44.4846i 1.63972i
\(737\) −6.49960 −0.239416
\(738\) −30.0793 −1.10723
\(739\) 1.80137i 0.0662643i 0.999451 + 0.0331322i \(0.0105482\pi\)
−0.999451 + 0.0331322i \(0.989452\pi\)
\(740\) 22.2269 0.817077
\(741\) 0.482078 1.01397i 0.0177096 0.0372493i
\(742\) 9.49856 0.348703
\(743\) 3.86484i 0.141787i 0.997484 + 0.0708936i \(0.0225851\pi\)
−0.997484 + 0.0708936i \(0.977415\pi\)
\(744\) −46.3572 −1.69954
\(745\) 55.1074 2.01898
\(746\) 4.38041i 0.160378i
\(747\) 6.11580i 0.223765i
\(748\) 22.5777i 0.825521i
\(749\) 19.1786i 0.700770i
\(750\) −19.5916 −0.715386
\(751\) 29.8923 1.09078 0.545392 0.838181i \(-0.316381\pi\)
0.545392 + 0.838181i \(0.316381\pi\)
\(752\) 44.0407i 1.60600i
\(753\) −9.24557 −0.336927
\(754\) 20.8976 43.9549i 0.761047 1.60074i
\(755\) 23.8660 0.868574
\(756\) 4.49301i 0.163409i
\(757\) −38.8933 −1.41360 −0.706800 0.707413i \(-0.749862\pi\)
−0.706800 + 0.707413i \(0.749862\pi\)
\(758\) −30.5777 −1.11063
\(759\) 5.58086i 0.202572i
\(760\) 6.90963i 0.250639i
\(761\) 8.33630i 0.302191i 0.988519 + 0.151095i \(0.0482800\pi\)
−0.988519 + 0.151095i \(0.951720\pi\)
\(762\) 36.4455i 1.32028i
\(763\) −3.20653 −0.116084
\(764\) −22.4023 −0.810486
\(765\) 24.7874i 0.896190i
\(766\) −93.1415 −3.36534
\(767\) −3.39909 + 7.14944i −0.122734 + 0.258151i
\(768\) 28.8532 1.04115
\(769\) 17.0811i 0.615962i 0.951393 + 0.307981i \(0.0996533\pi\)
−0.951393 + 0.307981i \(0.900347\pi\)
\(770\) −6.30281 −0.227137
\(771\) 14.5516 0.524062
\(772\) 31.3883i 1.12969i
\(773\) 16.0532i 0.577392i −0.957421 0.288696i \(-0.906778\pi\)
0.957421 0.288696i \(-0.0932217\pi\)
\(774\) 8.40228i 0.302014i
\(775\) 52.5497i 1.88764i
\(776\) −49.5426 −1.77848
\(777\) 1.41625 0.0508078
\(778\) 92.0812i 3.30127i
\(779\) 3.67579 0.131699
\(780\) 24.2967 51.1043i 0.869963 1.82983i
\(781\) 0.501443 0.0179430
\(782\) 142.510i 5.09613i
\(783\) −5.29742 −0.189314
\(784\) −7.20114 −0.257184
\(785\) 42.5888i 1.52006i
\(786\) 31.6027i 1.12723i
\(787\) 17.5654i 0.626140i 0.949730 + 0.313070i \(0.101357\pi\)
−0.949730 + 0.313070i \(0.898643\pi\)
\(788\) 97.9675i 3.48995i
\(789\) 14.7137 0.523821
\(790\) 24.7874 0.881896
\(791\) 5.29742i 0.188354i
\(792\) −4.49840 −0.159844
\(793\) −8.18147 3.88975i −0.290532 0.138129i
\(794\) 62.0873 2.20340
\(795\) 13.0207i 0.461797i
\(796\) −2.79817 −0.0991786
\(797\) −26.0934 −0.924275 −0.462138 0.886808i \(-0.652917\pi\)
−0.462138 + 0.886808i \(0.652917\pi\)
\(798\) 0.793469i 0.0280885i
\(799\) 43.3994i 1.53536i
\(800\) 40.6462i 1.43706i
\(801\) 11.1018i 0.392264i
\(802\) −9.59468 −0.338800
\(803\) 3.69296 0.130322
\(804\) 41.2395i 1.45440i
\(805\) 27.5290 0.970270
\(806\) 60.5497 + 28.7874i 2.13277 + 1.01399i
\(807\) 12.0433 0.423943
\(808\) 112.384i 3.95364i
\(809\) −6.30030 −0.221507 −0.110753 0.993848i \(-0.535326\pi\)
−0.110753 + 0.993848i \(0.535326\pi\)
\(810\) −8.90068 −0.312738
\(811\) 1.16749i 0.0409963i 0.999790 + 0.0204981i \(0.00652522\pi\)
−0.999790 + 0.0204981i \(0.993475\pi\)
\(812\) 23.8014i 0.835264i
\(813\) 7.38830i 0.259119i
\(814\) 2.55549i 0.0895700i
\(815\) 35.0665 1.22833
\(816\) −51.1013 −1.78890
\(817\) 1.02679i 0.0359228i
\(818\) 79.8167 2.79072
\(819\) 1.54814 3.25627i 0.0540964 0.113783i
\(820\) 185.260 6.46956
\(821\) 17.9518i 0.626524i −0.949667 0.313262i \(-0.898578\pi\)
0.949667 0.313262i \(-0.101422\pi\)
\(822\) 14.2286 0.496278
\(823\) −5.66501 −0.197470 −0.0987349 0.995114i \(-0.531480\pi\)
−0.0987349 + 0.995114i \(0.531480\pi\)
\(824\) 35.1074i 1.22302i
\(825\) 5.09932i 0.177535i
\(826\) 5.59468i 0.194664i
\(827\) 11.6942i 0.406646i 0.979112 + 0.203323i \(0.0651741\pi\)
−0.979112 + 0.203323i \(0.934826\pi\)
\(828\) 35.4102 1.23059
\(829\) −30.8024 −1.06981 −0.534906 0.844912i \(-0.679653\pi\)
−0.534906 + 0.844912i \(0.679653\pi\)
\(830\) 54.4348i 1.88946i
\(831\) −13.6997 −0.475237
\(832\) −0.0635563 0.0302168i −0.00220342 0.00104758i
\(833\) −7.09628 −0.245871
\(834\) 3.88975i 0.134691i
\(835\) −86.3146 −2.98704
\(836\) 0.990731 0.0342651
\(837\) 7.29742i 0.252236i
\(838\) 67.1617i 2.32006i
\(839\) 8.80760i 0.304072i −0.988375 0.152036i \(-0.951417\pi\)
0.988375 0.152036i \(-0.0485830\pi\)
\(840\) 22.1895i 0.765611i
\(841\) −0.937367 −0.0323230
\(842\) −57.3758 −1.97730
\(843\) 4.62582i 0.159322i
\(844\) −73.4817 −2.52934
\(845\) −35.2176 + 28.6655i −1.21152 + 0.986124i
\(846\) −15.5839 −0.535786
\(847\) 10.4986i 0.360735i
\(848\) −26.8433 −0.921802
\(849\) −17.9721 −0.616799
\(850\) 130.213i 4.46628i
\(851\) 11.1617i 0.382619i
\(852\) 3.18162i 0.109001i
\(853\) 14.4109i 0.493419i −0.969090 0.246709i \(-0.920651\pi\)
0.969090 0.246709i \(-0.0793493\pi\)
\(854\) −6.40228 −0.219081
\(855\) 1.08770 0.0371984
\(856\) 121.833i 4.16416i
\(857\) −28.9646 −0.989413 −0.494706 0.869060i \(-0.664724\pi\)
−0.494706 + 0.869060i \(0.664724\pi\)
\(858\) 5.87562 + 2.79347i 0.200590 + 0.0953675i
\(859\) 6.67291 0.227677 0.113838 0.993499i \(-0.463685\pi\)
0.113838 + 0.993499i \(0.463685\pi\)
\(860\) 51.7502i 1.76467i
\(861\) 11.8044 0.402293
\(862\) −42.1397 −1.43528
\(863\) 18.7300i 0.637577i 0.947826 + 0.318788i \(0.103276\pi\)
−0.947826 + 0.318788i \(0.896724\pi\)
\(864\) 5.64442i 0.192027i
\(865\) 36.5841i 1.24390i
\(866\) 64.3965i 2.18828i
\(867\) −33.3572 −1.13287
\(868\) 32.7874 1.11288
\(869\) 1.97205i 0.0668973i
\(870\) 47.1506 1.59856
\(871\) −14.2097 + 29.8879i −0.481478 + 1.01271i
\(872\) 20.3696 0.689803
\(873\) 7.79886i 0.263951i
\(874\) −6.25346 −0.211527
\(875\) 7.68861 0.259922
\(876\) 23.4316i 0.791679i
\(877\) 46.3743i 1.56595i −0.622053 0.782975i \(-0.713701\pi\)
0.622053 0.782975i \(-0.286299\pi\)
\(878\) 14.0823i 0.475255i
\(879\) 6.87023i 0.231727i
\(880\) 17.8120 0.600442
\(881\) 31.0963 1.04766 0.523830 0.851823i \(-0.324503\pi\)
0.523830 + 0.851823i \(0.324503\pi\)
\(882\) 2.54814i 0.0858003i
\(883\) 31.9119 1.07392 0.536961 0.843607i \(-0.319572\pi\)
0.536961 + 0.843607i \(0.319572\pi\)
\(884\) 103.822 + 49.3604i 3.49190 + 1.66017i
\(885\) −7.66924 −0.257799
\(886\) 18.4954i 0.621364i
\(887\) 6.43023 0.215906 0.107953 0.994156i \(-0.465570\pi\)
0.107953 + 0.994156i \(0.465570\pi\)
\(888\) −8.99681 −0.301913
\(889\) 14.3028i 0.479701i
\(890\) 98.8138i 3.31225i
\(891\) 0.708126i 0.0237231i
\(892\) 39.1506i 1.31086i
\(893\) 1.90441 0.0637286
\(894\) −40.2006 −1.34451
\(895\) 39.3257i 1.31451i
\(896\) −11.3386 −0.378795
\(897\) −25.6632 12.2011i −0.856868 0.407384i
\(898\) 61.6108 2.05598
\(899\) 38.6575i 1.28930i
\(900\) 32.3548 1.07849
\(901\) −26.4524 −0.881257
\(902\) 21.2999i 0.709210i
\(903\) 3.29742i 0.109731i
\(904\) 33.6521i 1.11925i
\(905\) 30.0219i 0.997961i
\(906\) −17.4102 −0.578414
\(907\) 39.7541 1.32001 0.660006 0.751260i \(-0.270554\pi\)
0.660006 + 0.751260i \(0.270554\pi\)
\(908\) 58.1573i 1.93002i
\(909\) 17.6911 0.586777
\(910\) −13.7795 + 28.9830i −0.456786 + 0.960777i
\(911\) −20.4652 −0.678043 −0.339021 0.940779i \(-0.610096\pi\)
−0.339021 + 0.940779i \(0.610096\pi\)
\(912\) 2.24238i 0.0742525i
\(913\) −4.33076 −0.143327
\(914\) 85.1055 2.81504
\(915\) 8.77630i 0.290136i
\(916\) 88.2970i 2.91742i
\(917\) 12.4023i 0.409559i
\(918\) 18.0823i 0.596805i
\(919\) 40.2749 1.32855 0.664273 0.747490i \(-0.268741\pi\)
0.664273 + 0.747490i \(0.268741\pi\)
\(920\) −174.879 −5.76560
\(921\) 11.9202i 0.392784i
\(922\) −26.4705 −0.871758
\(923\) 1.09628 2.30585i 0.0360844 0.0758979i
\(924\) 3.18162 0.104668
\(925\) 10.1986i 0.335329i
\(926\) 60.9847 2.00408
\(927\) 5.52651 0.181514
\(928\) 29.9008i 0.981543i
\(929\) 4.19124i 0.137510i 0.997634 + 0.0687551i \(0.0219027\pi\)
−0.997634 + 0.0687551i \(0.978097\pi\)
\(930\) 64.9520i 2.12986i
\(931\) 0.311392i 0.0102055i
\(932\) −16.7484 −0.548611
\(933\) 24.7874 0.811503
\(934\) 22.5339i 0.737333i
\(935\) 17.5526 0.574032
\(936\) −9.83462 + 20.6856i −0.321455 + 0.676129i
\(937\) 23.8446 0.778970 0.389485 0.921033i \(-0.372653\pi\)
0.389485 + 0.921033i \(0.372653\pi\)
\(938\) 23.3883i 0.763655i
\(939\) 6.73304 0.219724
\(940\) 95.9822 3.13060
\(941\) 5.24456i 0.170968i −0.996340 0.0854839i \(-0.972756\pi\)
0.996340 0.0854839i \(-0.0272436\pi\)
\(942\) 31.0683i 1.01226i
\(943\) 93.0325i 3.02955i
\(944\) 15.8108i 0.514597i
\(945\) 3.49301 0.113628
\(946\) −5.94988 −0.193447
\(947\) 10.4486i 0.339533i −0.985484 0.169767i \(-0.945699\pi\)
0.985484 0.169767i \(-0.0543014\pi\)
\(948\) −12.5125 −0.406388
\(949\) 8.07372 16.9818i 0.262084 0.551252i
\(950\) −5.71388 −0.185383
\(951\) 19.1537i 0.621100i
\(952\) 45.0794 1.46103
\(953\) −39.4169 −1.27684 −0.638420 0.769689i \(-0.720411\pi\)
−0.638420 + 0.769689i \(0.720411\pi\)
\(954\) 9.49856i 0.307527i
\(955\) 17.4163i 0.563577i
\(956\) 39.8155i 1.28773i
\(957\) 3.75124i 0.121260i
\(958\) −35.5778 −1.14947
\(959\) −5.58390 −0.180314
\(960\) 0.0681772i 0.00220041i
\(961\) −22.2523 −0.717816
\(962\) 11.7512 + 5.58694i 0.378875 + 0.180130i
\(963\) 19.1786 0.618021
\(964\) 44.9414i 1.44746i
\(965\) −24.4023 −0.785537
\(966\) −20.0823 −0.646138
\(967\) 20.5558i 0.661030i −0.943801 0.330515i \(-0.892778\pi\)
0.943801 0.330515i \(-0.107222\pi\)
\(968\) 66.6925i 2.14358i
\(969\) 2.20972i 0.0709865i
\(970\) 69.4152i 2.22879i
\(971\) 22.8325 0.732730 0.366365 0.930471i \(-0.380602\pi\)
0.366365 + 0.930471i \(0.380602\pi\)
\(972\) 4.49301 0.144113
\(973\) 1.52651i 0.0489375i
\(974\) −6.14882 −0.197021
\(975\) −23.4488 11.1484i −0.750963 0.357033i
\(976\) 18.0931 0.579146
\(977\) 2.49417i 0.0797957i −0.999204 0.0398978i \(-0.987297\pi\)
0.999204 0.0398978i \(-0.0127032\pi\)
\(978\) −25.5809 −0.817986
\(979\) 7.86149 0.251254
\(980\) 15.6942i 0.501331i
\(981\) 3.20653i 0.102377i
\(982\) 23.3171i 0.744078i
\(983\) 9.95119i 0.317394i −0.987327 0.158697i \(-0.949271\pi\)
0.987327 0.158697i \(-0.0507292\pi\)
\(984\) −74.9880 −2.39053
\(985\) −76.1631 −2.42676
\(986\) 95.7895i 3.05056i
\(987\) 6.11580 0.194668
\(988\) 2.16598 4.55580i 0.0689090 0.144939i
\(989\) 25.9875 0.826354
\(990\) 6.30281i 0.200316i
\(991\) −1.08096 −0.0343378 −0.0171689 0.999853i \(-0.505465\pi\)
−0.0171689 + 0.999853i \(0.505465\pi\)
\(992\) −41.1897 −1.30777
\(993\) 23.5247i 0.746532i
\(994\) 1.80440i 0.0572322i
\(995\) 2.17539i 0.0689645i
\(996\) 27.4784i 0.870685i
\(997\) −25.3129 −0.801666 −0.400833 0.916151i \(-0.631279\pi\)
−0.400833 + 0.916151i \(0.631279\pi\)
\(998\) 13.6307 0.431472
\(999\) 1.41625i 0.0448083i
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 273.2.c.c.64.7 yes 8
3.2 odd 2 819.2.c.d.64.2 8
4.3 odd 2 4368.2.h.q.337.7 8
7.6 odd 2 1911.2.c.l.883.7 8
13.5 odd 4 3549.2.a.x.1.4 4
13.8 odd 4 3549.2.a.v.1.1 4
13.12 even 2 inner 273.2.c.c.64.2 8
39.38 odd 2 819.2.c.d.64.7 8
52.51 odd 2 4368.2.h.q.337.2 8
91.90 odd 2 1911.2.c.l.883.2 8
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
273.2.c.c.64.2 8 13.12 even 2 inner
273.2.c.c.64.7 yes 8 1.1 even 1 trivial
819.2.c.d.64.2 8 3.2 odd 2
819.2.c.d.64.7 8 39.38 odd 2
1911.2.c.l.883.2 8 91.90 odd 2
1911.2.c.l.883.7 8 7.6 odd 2
3549.2.a.v.1.1 4 13.8 odd 4
3549.2.a.x.1.4 4 13.5 odd 4
4368.2.h.q.337.2 8 52.51 odd 2
4368.2.h.q.337.7 8 4.3 odd 2