Properties

Label 169.4.a.l.1.4
Level $169$
Weight $4$
Character 169.1
Self dual yes
Analytic conductor $9.971$
Analytic rank $0$
Dimension $9$
CM no
Inner twists $1$

Related objects

Downloads

Learn more

Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms
 
[N,k,chi] = [169,4,Mod(1,169)]
 
mf = mfinit([N,k,chi],0)
 
lf = mfeigenbasis(mf)
 
from sage.modular.dirichlet import DirichletCharacter
 
H = DirichletGroup(169, base_ring=CyclotomicField(2))
 
chi = DirichletCharacter(H, H._module([0]))
 
N = Newforms(chi, 4, names="a")
 
//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code
 
chi := DirichletCharacter("169.1");
 
S:= CuspForms(chi, 4);
 
N := Newforms(S);
 
Level: \( N \) \(=\) \( 169 = 13^{2} \)
Weight: \( k \) \(=\) \( 4 \)
Character orbit: \([\chi]\) \(=\) 169.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: \(9.97132279097\)
Analytic rank: \(0\)
Dimension: \(9\)
Coefficient field: \(\mathbb{Q}[x]/(x^{9} - \cdots)\)
comment: defining polynomial
 
gp: f.mod \\ as an extension of the character field
 
Defining polynomial: \( x^{9} - 4x^{8} - 46x^{7} + 145x^{6} + 680x^{5} - 1501x^{4} - 3203x^{3} + 4784x^{2} + 3584x - 4096 \) Copy content Toggle raw display
Coefficient ring: \(\Z[a_1, a_2, a_3]\)
Coefficient ring index: \( 13^{2} \)
Twist minimal: yes
Fricke sign: \(1\)
Sato-Tate group: $\mathrm{SU}(2)$

Embedding invariants

Embedding label 1.4
Root \(1.39012\) of defining polynomial
Character \(\chi\) \(=\) 169.1

$q$-expansion

comment: q-expansion
 
sage: f.q_expansion() # note that sage often uses an isomorphic number field
 
gp: mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q-0.390115 q^{2} +3.60967 q^{3} -7.84781 q^{4} -7.52136 q^{5} -1.40819 q^{6} +19.5446 q^{7} +6.18247 q^{8} -13.9703 q^{9} +O(q^{10})\) \(q-0.390115 q^{2} +3.60967 q^{3} -7.84781 q^{4} -7.52136 q^{5} -1.40819 q^{6} +19.5446 q^{7} +6.18247 q^{8} -13.9703 q^{9} +2.93420 q^{10} +45.8243 q^{11} -28.3280 q^{12} -7.62463 q^{14} -27.1496 q^{15} +60.3706 q^{16} +86.5200 q^{17} +5.45003 q^{18} +148.737 q^{19} +59.0262 q^{20} +70.5494 q^{21} -17.8767 q^{22} -91.5351 q^{23} +22.3167 q^{24} -68.4292 q^{25} -147.889 q^{27} -153.382 q^{28} +258.901 q^{29} +10.5915 q^{30} +31.2317 q^{31} -73.0113 q^{32} +165.410 q^{33} -33.7528 q^{34} -147.002 q^{35} +109.636 q^{36} +148.436 q^{37} -58.0245 q^{38} -46.5006 q^{40} +95.9135 q^{41} -27.5224 q^{42} -80.9930 q^{43} -359.620 q^{44} +105.076 q^{45} +35.7093 q^{46} +94.3777 q^{47} +217.918 q^{48} +38.9898 q^{49} +26.6953 q^{50} +312.308 q^{51} +493.555 q^{53} +57.6938 q^{54} -344.661 q^{55} +120.834 q^{56} +536.891 q^{57} -101.001 q^{58} -575.686 q^{59} +213.065 q^{60} -40.2865 q^{61} -12.1840 q^{62} -273.043 q^{63} -454.482 q^{64} -64.5291 q^{66} +601.141 q^{67} -678.992 q^{68} -330.411 q^{69} +57.3476 q^{70} -518.800 q^{71} -86.3710 q^{72} -1055.21 q^{73} -57.9072 q^{74} -247.007 q^{75} -1167.26 q^{76} +895.615 q^{77} -320.840 q^{79} -454.069 q^{80} -156.633 q^{81} -37.4173 q^{82} -32.4841 q^{83} -553.658 q^{84} -650.748 q^{85} +31.5966 q^{86} +934.547 q^{87} +283.307 q^{88} +450.795 q^{89} -40.9916 q^{90} +718.350 q^{92} +112.736 q^{93} -36.8182 q^{94} -1118.70 q^{95} -263.546 q^{96} +231.743 q^{97} -15.2105 q^{98} -640.179 q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 9 q + 5 q^{2} + q^{3} + 37 q^{4} + 30 q^{5} + 48 q^{6} + 38 q^{7} + 60 q^{8} + 66 q^{9}+O(q^{10}) \) Copy content Toggle raw display \( 9 q + 5 q^{2} + q^{3} + 37 q^{4} + 30 q^{5} + 48 q^{6} + 38 q^{7} + 60 q^{8} + 66 q^{9} - 147 q^{10} + 181 q^{11} + 39 q^{12} - 147 q^{14} + 218 q^{15} + 269 q^{16} - 55 q^{17} + 79 q^{18} + 161 q^{19} + 370 q^{20} + 188 q^{21} + 340 q^{22} - 204 q^{23} + 798 q^{24} + 307 q^{25} - 668 q^{27} + 344 q^{28} + 280 q^{29} + 521 q^{30} + 706 q^{31} + 680 q^{32} + 500 q^{33} + 216 q^{34} + 20 q^{35} - 909 q^{36} + 298 q^{37} - 739 q^{38} + 13 q^{40} + 1201 q^{41} - 4 q^{42} - 533 q^{43} + 355 q^{44} - 90 q^{45} - 840 q^{46} + 956 q^{47} - 132 q^{48} + 403 q^{49} - 1156 q^{50} + 470 q^{51} - 278 q^{53} - 2555 q^{54} - 250 q^{55} + 250 q^{56} - 810 q^{57} - 2877 q^{58} + 1377 q^{59} - 3157 q^{60} - 136 q^{61} + 2035 q^{62} - 944 q^{63} + 284 q^{64} + 3279 q^{66} - 931 q^{67} - 1536 q^{68} - 2050 q^{69} - 4854 q^{70} + 2046 q^{71} - 4342 q^{72} - 45 q^{73} - 1990 q^{74} + 2393 q^{75} - 3608 q^{76} - 718 q^{77} + 412 q^{79} - 787 q^{80} - 835 q^{81} + 2757 q^{82} + 3709 q^{83} - 1539 q^{84} - 2106 q^{85} + 125 q^{86} - 786 q^{87} - 636 q^{88} + 1663 q^{89} - 1280 q^{90} + 4010 q^{92} - 1186 q^{93} - 2531 q^{94} - 1614 q^{95} - 3084 q^{96} - 1087 q^{97} - 282 q^{98} + 1357 q^{99}+O(q^{100}) \) 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:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) −0.390115 −0.137927 −0.0689633 0.997619i \(-0.521969\pi\)
−0.0689633 + 0.997619i \(0.521969\pi\)
\(3\) 3.60967 0.694681 0.347340 0.937739i \(-0.387085\pi\)
0.347340 + 0.937739i \(0.387085\pi\)
\(4\) −7.84781 −0.980976
\(5\) −7.52136 −0.672731 −0.336365 0.941732i \(-0.609198\pi\)
−0.336365 + 0.941732i \(0.609198\pi\)
\(6\) −1.40819 −0.0958150
\(7\) 19.5446 1.05531 0.527654 0.849460i \(-0.323072\pi\)
0.527654 + 0.849460i \(0.323072\pi\)
\(8\) 6.18247 0.273229
\(9\) −13.9703 −0.517418
\(10\) 2.93420 0.0927875
\(11\) 45.8243 1.25605 0.628024 0.778194i \(-0.283864\pi\)
0.628024 + 0.778194i \(0.283864\pi\)
\(12\) −28.3280 −0.681465
\(13\) 0 0
\(14\) −7.62463 −0.145555
\(15\) −27.1496 −0.467333
\(16\) 60.3706 0.943291
\(17\) 86.5200 1.23436 0.617182 0.786821i \(-0.288274\pi\)
0.617182 + 0.786821i \(0.288274\pi\)
\(18\) 5.45003 0.0713658
\(19\) 148.737 1.79593 0.897963 0.440072i \(-0.145047\pi\)
0.897963 + 0.440072i \(0.145047\pi\)
\(20\) 59.0262 0.659933
\(21\) 70.5494 0.733102
\(22\) −17.8767 −0.173242
\(23\) −91.5351 −0.829843 −0.414922 0.909857i \(-0.636191\pi\)
−0.414922 + 0.909857i \(0.636191\pi\)
\(24\) 22.3167 0.189807
\(25\) −68.4292 −0.547433
\(26\) 0 0
\(27\) −147.889 −1.05412
\(28\) −153.382 −1.03523
\(29\) 258.901 1.65782 0.828909 0.559383i \(-0.188962\pi\)
0.828909 + 0.559383i \(0.188962\pi\)
\(30\) 10.5915 0.0644577
\(31\) 31.2317 0.180948 0.0904739 0.995899i \(-0.471162\pi\)
0.0904739 + 0.995899i \(0.471162\pi\)
\(32\) −73.0113 −0.403334
\(33\) 165.410 0.872553
\(34\) −33.7528 −0.170252
\(35\) −147.002 −0.709938
\(36\) 109.636 0.507575
\(37\) 148.436 0.659533 0.329767 0.944062i \(-0.393030\pi\)
0.329767 + 0.944062i \(0.393030\pi\)
\(38\) −58.0245 −0.247706
\(39\) 0 0
\(40\) −46.5006 −0.183810
\(41\) 95.9135 0.365346 0.182673 0.983174i \(-0.441525\pi\)
0.182673 + 0.983174i \(0.441525\pi\)
\(42\) −27.5224 −0.101114
\(43\) −80.9930 −0.287240 −0.143620 0.989633i \(-0.545874\pi\)
−0.143620 + 0.989633i \(0.545874\pi\)
\(44\) −359.620 −1.23215
\(45\) 105.076 0.348083
\(46\) 35.7093 0.114457
\(47\) 94.3777 0.292902 0.146451 0.989218i \(-0.453215\pi\)
0.146451 + 0.989218i \(0.453215\pi\)
\(48\) 217.918 0.655286
\(49\) 38.9898 0.113673
\(50\) 26.6953 0.0755056
\(51\) 312.308 0.857489
\(52\) 0 0
\(53\) 493.555 1.27915 0.639575 0.768729i \(-0.279110\pi\)
0.639575 + 0.768729i \(0.279110\pi\)
\(54\) 57.6938 0.145391
\(55\) −344.661 −0.844983
\(56\) 120.834 0.288341
\(57\) 536.891 1.24759
\(58\) −101.001 −0.228657
\(59\) −575.686 −1.27030 −0.635152 0.772387i \(-0.719062\pi\)
−0.635152 + 0.772387i \(0.719062\pi\)
\(60\) 213.065 0.458443
\(61\) −40.2865 −0.0845599 −0.0422800 0.999106i \(-0.513462\pi\)
−0.0422800 + 0.999106i \(0.513462\pi\)
\(62\) −12.1840 −0.0249575
\(63\) −273.043 −0.546035
\(64\) −454.482 −0.887660
\(65\) 0 0
\(66\) −64.5291 −0.120348
\(67\) 601.141 1.09613 0.548067 0.836434i \(-0.315364\pi\)
0.548067 + 0.836434i \(0.315364\pi\)
\(68\) −678.992 −1.21088
\(69\) −330.411 −0.576476
\(70\) 57.3476 0.0979193
\(71\) −518.800 −0.867187 −0.433593 0.901109i \(-0.642755\pi\)
−0.433593 + 0.901109i \(0.642755\pi\)
\(72\) −86.3710 −0.141374
\(73\) −1055.21 −1.69182 −0.845908 0.533328i \(-0.820941\pi\)
−0.845908 + 0.533328i \(0.820941\pi\)
\(74\) −57.9072 −0.0909672
\(75\) −247.007 −0.380291
\(76\) −1167.26 −1.76176
\(77\) 895.615 1.32552
\(78\) 0 0
\(79\) −320.840 −0.456928 −0.228464 0.973552i \(-0.573370\pi\)
−0.228464 + 0.973552i \(0.573370\pi\)
\(80\) −454.069 −0.634581
\(81\) −156.633 −0.214860
\(82\) −37.4173 −0.0503909
\(83\) −32.4841 −0.0429590 −0.0214795 0.999769i \(-0.506838\pi\)
−0.0214795 + 0.999769i \(0.506838\pi\)
\(84\) −553.658 −0.719155
\(85\) −650.748 −0.830394
\(86\) 31.5966 0.0396180
\(87\) 934.547 1.15165
\(88\) 283.307 0.343189
\(89\) 450.795 0.536901 0.268450 0.963293i \(-0.413488\pi\)
0.268450 + 0.963293i \(0.413488\pi\)
\(90\) −40.9916 −0.0480099
\(91\) 0 0
\(92\) 718.350 0.814057
\(93\) 112.736 0.125701
\(94\) −36.8182 −0.0403990
\(95\) −1118.70 −1.20817
\(96\) −263.546 −0.280189
\(97\) 231.743 0.242576 0.121288 0.992617i \(-0.461298\pi\)
0.121288 + 0.992617i \(0.461298\pi\)
\(98\) −15.2105 −0.0156785
\(99\) −640.179 −0.649903
\(100\) 537.019 0.537019
\(101\) 570.125 0.561679 0.280840 0.959755i \(-0.409387\pi\)
0.280840 + 0.959755i \(0.409387\pi\)
\(102\) −121.836 −0.118270
\(103\) 969.551 0.927502 0.463751 0.885965i \(-0.346503\pi\)
0.463751 + 0.885965i \(0.346503\pi\)
\(104\) 0 0
\(105\) −530.627 −0.493180
\(106\) −192.543 −0.176429
\(107\) −343.156 −0.310039 −0.155019 0.987911i \(-0.549544\pi\)
−0.155019 + 0.987911i \(0.549544\pi\)
\(108\) 1160.61 1.03407
\(109\) −83.1640 −0.0730795 −0.0365398 0.999332i \(-0.511634\pi\)
−0.0365398 + 0.999332i \(0.511634\pi\)
\(110\) 134.457 0.116546
\(111\) 535.805 0.458165
\(112\) 1179.92 0.995461
\(113\) −2116.18 −1.76171 −0.880856 0.473384i \(-0.843032\pi\)
−0.880856 + 0.473384i \(0.843032\pi\)
\(114\) −209.449 −0.172077
\(115\) 688.469 0.558261
\(116\) −2031.81 −1.62628
\(117\) 0 0
\(118\) 224.584 0.175209
\(119\) 1691.00 1.30263
\(120\) −167.852 −0.127689
\(121\) 768.863 0.577658
\(122\) 15.7164 0.0116631
\(123\) 346.216 0.253799
\(124\) −245.101 −0.177506
\(125\) 1454.85 1.04101
\(126\) 106.518 0.0753128
\(127\) −1176.69 −0.822161 −0.411081 0.911599i \(-0.634848\pi\)
−0.411081 + 0.911599i \(0.634848\pi\)
\(128\) 761.391 0.525766
\(129\) −292.358 −0.199540
\(130\) 0 0
\(131\) 775.336 0.517110 0.258555 0.965996i \(-0.416754\pi\)
0.258555 + 0.965996i \(0.416754\pi\)
\(132\) −1298.11 −0.855954
\(133\) 2907.00 1.89525
\(134\) −234.514 −0.151186
\(135\) 1112.33 0.709140
\(136\) 534.907 0.337264
\(137\) 2542.62 1.58563 0.792814 0.609464i \(-0.208615\pi\)
0.792814 + 0.609464i \(0.208615\pi\)
\(138\) 128.899 0.0795114
\(139\) −286.317 −0.174713 −0.0873564 0.996177i \(-0.527842\pi\)
−0.0873564 + 0.996177i \(0.527842\pi\)
\(140\) 1153.64 0.696432
\(141\) 340.672 0.203473
\(142\) 202.392 0.119608
\(143\) 0 0
\(144\) −843.395 −0.488076
\(145\) −1947.29 −1.11527
\(146\) 411.652 0.233346
\(147\) 140.740 0.0789664
\(148\) −1164.90 −0.646987
\(149\) 2354.13 1.29435 0.647173 0.762343i \(-0.275951\pi\)
0.647173 + 0.762343i \(0.275951\pi\)
\(150\) 96.3610 0.0524523
\(151\) −165.158 −0.0890089 −0.0445045 0.999009i \(-0.514171\pi\)
−0.0445045 + 0.999009i \(0.514171\pi\)
\(152\) 919.562 0.490699
\(153\) −1208.71 −0.638682
\(154\) −349.393 −0.182824
\(155\) −234.905 −0.121729
\(156\) 0 0
\(157\) −3095.72 −1.57367 −0.786833 0.617166i \(-0.788281\pi\)
−0.786833 + 0.617166i \(0.788281\pi\)
\(158\) 125.165 0.0630226
\(159\) 1781.57 0.888601
\(160\) 549.144 0.271335
\(161\) −1789.01 −0.875740
\(162\) 61.1048 0.0296349
\(163\) −299.310 −0.143827 −0.0719134 0.997411i \(-0.522911\pi\)
−0.0719134 + 0.997411i \(0.522911\pi\)
\(164\) −752.711 −0.358395
\(165\) −1244.11 −0.586993
\(166\) 12.6726 0.00592519
\(167\) 3005.17 1.39250 0.696249 0.717801i \(-0.254851\pi\)
0.696249 + 0.717801i \(0.254851\pi\)
\(168\) 436.170 0.200305
\(169\) 0 0
\(170\) 253.867 0.114533
\(171\) −2077.90 −0.929245
\(172\) 635.618 0.281776
\(173\) 455.853 0.200334 0.100167 0.994971i \(-0.468062\pi\)
0.100167 + 0.994971i \(0.468062\pi\)
\(174\) −364.581 −0.158844
\(175\) −1337.42 −0.577710
\(176\) 2766.44 1.18482
\(177\) −2078.03 −0.882455
\(178\) −175.862 −0.0740529
\(179\) 1364.19 0.569635 0.284818 0.958582i \(-0.408067\pi\)
0.284818 + 0.958582i \(0.408067\pi\)
\(180\) −824.614 −0.341461
\(181\) −2026.11 −0.832041 −0.416021 0.909355i \(-0.636576\pi\)
−0.416021 + 0.909355i \(0.636576\pi\)
\(182\) 0 0
\(183\) −145.421 −0.0587422
\(184\) −565.914 −0.226738
\(185\) −1116.44 −0.443688
\(186\) −43.9801 −0.0173375
\(187\) 3964.71 1.55042
\(188\) −740.658 −0.287330
\(189\) −2890.43 −1.11242
\(190\) 436.423 0.166639
\(191\) 2161.06 0.818686 0.409343 0.912380i \(-0.365758\pi\)
0.409343 + 0.912380i \(0.365758\pi\)
\(192\) −1640.53 −0.616641
\(193\) −1207.88 −0.450491 −0.225246 0.974302i \(-0.572318\pi\)
−0.225246 + 0.974302i \(0.572318\pi\)
\(194\) −90.4063 −0.0334577
\(195\) 0 0
\(196\) −305.985 −0.111510
\(197\) 4926.76 1.78181 0.890906 0.454187i \(-0.150070\pi\)
0.890906 + 0.454187i \(0.150070\pi\)
\(198\) 249.743 0.0896389
\(199\) 1009.45 0.359589 0.179795 0.983704i \(-0.442457\pi\)
0.179795 + 0.983704i \(0.442457\pi\)
\(200\) −423.061 −0.149575
\(201\) 2169.92 0.761464
\(202\) −222.415 −0.0774705
\(203\) 5060.11 1.74951
\(204\) −2450.94 −0.841176
\(205\) −721.400 −0.245779
\(206\) −378.237 −0.127927
\(207\) 1278.77 0.429376
\(208\) 0 0
\(209\) 6815.76 2.25577
\(210\) 207.006 0.0680226
\(211\) −4911.32 −1.60241 −0.801206 0.598388i \(-0.795808\pi\)
−0.801206 + 0.598388i \(0.795808\pi\)
\(212\) −3873.32 −1.25482
\(213\) −1872.70 −0.602418
\(214\) 133.871 0.0427626
\(215\) 609.178 0.193235
\(216\) −914.321 −0.288017
\(217\) 610.410 0.190956
\(218\) 32.4435 0.0100796
\(219\) −3808.95 −1.17527
\(220\) 2704.83 0.828908
\(221\) 0 0
\(222\) −209.026 −0.0631932
\(223\) −1364.58 −0.409771 −0.204885 0.978786i \(-0.565682\pi\)
−0.204885 + 0.978786i \(0.565682\pi\)
\(224\) −1426.97 −0.425641
\(225\) 955.976 0.283252
\(226\) 825.554 0.242987
\(227\) −4169.88 −1.21923 −0.609614 0.792699i \(-0.708675\pi\)
−0.609614 + 0.792699i \(0.708675\pi\)
\(228\) −4213.42 −1.22386
\(229\) −3506.89 −1.01197 −0.505987 0.862541i \(-0.668872\pi\)
−0.505987 + 0.862541i \(0.668872\pi\)
\(230\) −268.582 −0.0769991
\(231\) 3232.87 0.920811
\(232\) 1600.65 0.452965
\(233\) −570.253 −0.160337 −0.0801684 0.996781i \(-0.525546\pi\)
−0.0801684 + 0.996781i \(0.525546\pi\)
\(234\) 0 0
\(235\) −709.848 −0.197044
\(236\) 4517.87 1.24614
\(237\) −1158.13 −0.317419
\(238\) −659.683 −0.179668
\(239\) −231.056 −0.0625347 −0.0312674 0.999511i \(-0.509954\pi\)
−0.0312674 + 0.999511i \(0.509954\pi\)
\(240\) −1639.04 −0.440831
\(241\) −3088.50 −0.825508 −0.412754 0.910842i \(-0.635433\pi\)
−0.412754 + 0.910842i \(0.635433\pi\)
\(242\) −299.945 −0.0796744
\(243\) 3427.62 0.904863
\(244\) 316.161 0.0829513
\(245\) −293.256 −0.0764713
\(246\) −135.064 −0.0350056
\(247\) 0 0
\(248\) 193.089 0.0494403
\(249\) −117.257 −0.0298428
\(250\) −567.559 −0.143582
\(251\) −2445.64 −0.615009 −0.307504 0.951547i \(-0.599494\pi\)
−0.307504 + 0.951547i \(0.599494\pi\)
\(252\) 2142.79 0.535648
\(253\) −4194.53 −1.04232
\(254\) 459.045 0.113398
\(255\) −2348.98 −0.576859
\(256\) 3338.83 0.815143
\(257\) 3273.99 0.794654 0.397327 0.917677i \(-0.369938\pi\)
0.397327 + 0.917677i \(0.369938\pi\)
\(258\) 114.053 0.0275219
\(259\) 2901.12 0.696010
\(260\) 0 0
\(261\) −3616.93 −0.857786
\(262\) −302.471 −0.0713233
\(263\) −4631.27 −1.08584 −0.542921 0.839784i \(-0.682682\pi\)
−0.542921 + 0.839784i \(0.682682\pi\)
\(264\) 1022.65 0.238407
\(265\) −3712.20 −0.860524
\(266\) −1134.06 −0.261406
\(267\) 1627.22 0.372975
\(268\) −4717.64 −1.07528
\(269\) −2838.51 −0.643373 −0.321686 0.946846i \(-0.604250\pi\)
−0.321686 + 0.946846i \(0.604250\pi\)
\(270\) −433.936 −0.0978093
\(271\) −7052.31 −1.58080 −0.790401 0.612589i \(-0.790128\pi\)
−0.790401 + 0.612589i \(0.790128\pi\)
\(272\) 5223.26 1.16436
\(273\) 0 0
\(274\) −991.917 −0.218700
\(275\) −3135.72 −0.687603
\(276\) 2593.01 0.565510
\(277\) −1938.31 −0.420439 −0.210220 0.977654i \(-0.567418\pi\)
−0.210220 + 0.977654i \(0.567418\pi\)
\(278\) 111.697 0.0240975
\(279\) −436.317 −0.0936258
\(280\) −908.834 −0.193976
\(281\) 3290.74 0.698609 0.349305 0.937009i \(-0.386418\pi\)
0.349305 + 0.937009i \(0.386418\pi\)
\(282\) −132.901 −0.0280644
\(283\) −7918.08 −1.66318 −0.831592 0.555388i \(-0.812570\pi\)
−0.831592 + 0.555388i \(0.812570\pi\)
\(284\) 4071.45 0.850690
\(285\) −4038.15 −0.839296
\(286\) 0 0
\(287\) 1874.59 0.385552
\(288\) 1019.99 0.208693
\(289\) 2572.71 0.523653
\(290\) 759.667 0.153825
\(291\) 836.514 0.168513
\(292\) 8281.06 1.65963
\(293\) −5675.43 −1.13161 −0.565806 0.824539i \(-0.691435\pi\)
−0.565806 + 0.824539i \(0.691435\pi\)
\(294\) −54.9049 −0.0108916
\(295\) 4329.94 0.854572
\(296\) 917.702 0.180204
\(297\) −6776.91 −1.32403
\(298\) −918.381 −0.178525
\(299\) 0 0
\(300\) 1938.46 0.373057
\(301\) −1582.97 −0.303126
\(302\) 64.4306 0.0122767
\(303\) 2057.96 0.390188
\(304\) 8979.33 1.69408
\(305\) 303.009 0.0568861
\(306\) 471.536 0.0880913
\(307\) 4338.86 0.806618 0.403309 0.915064i \(-0.367860\pi\)
0.403309 + 0.915064i \(0.367860\pi\)
\(308\) −7028.62 −1.30030
\(309\) 3499.76 0.644318
\(310\) 91.6401 0.0167897
\(311\) −5234.75 −0.954454 −0.477227 0.878780i \(-0.658358\pi\)
−0.477227 + 0.878780i \(0.658358\pi\)
\(312\) 0 0
\(313\) 2167.86 0.391484 0.195742 0.980655i \(-0.437288\pi\)
0.195742 + 0.980655i \(0.437288\pi\)
\(314\) 1207.69 0.217050
\(315\) 2053.66 0.367335
\(316\) 2517.89 0.448236
\(317\) −4863.71 −0.861744 −0.430872 0.902413i \(-0.641794\pi\)
−0.430872 + 0.902413i \(0.641794\pi\)
\(318\) −695.017 −0.122562
\(319\) 11864.0 2.08230
\(320\) 3418.32 0.597156
\(321\) −1238.68 −0.215378
\(322\) 697.922 0.120788
\(323\) 12868.7 2.21682
\(324\) 1229.22 0.210772
\(325\) 0 0
\(326\) 116.765 0.0198375
\(327\) −300.194 −0.0507669
\(328\) 592.983 0.0998231
\(329\) 1844.57 0.309102
\(330\) 485.347 0.0809620
\(331\) 2685.26 0.445908 0.222954 0.974829i \(-0.428430\pi\)
0.222954 + 0.974829i \(0.428430\pi\)
\(332\) 254.929 0.0421417
\(333\) −2073.70 −0.341255
\(334\) −1172.36 −0.192062
\(335\) −4521.39 −0.737404
\(336\) 4259.11 0.691528
\(337\) −6518.36 −1.05364 −0.526821 0.849976i \(-0.676616\pi\)
−0.526821 + 0.849976i \(0.676616\pi\)
\(338\) 0 0
\(339\) −7638.71 −1.22383
\(340\) 5106.95 0.814597
\(341\) 1431.17 0.227279
\(342\) 810.620 0.128168
\(343\) −5941.75 −0.935347
\(344\) −500.737 −0.0784824
\(345\) 2485.14 0.387813
\(346\) −177.835 −0.0276314
\(347\) 75.7963 0.0117261 0.00586305 0.999983i \(-0.498134\pi\)
0.00586305 + 0.999983i \(0.498134\pi\)
\(348\) −7334.15 −1.12975
\(349\) 3682.09 0.564750 0.282375 0.959304i \(-0.408878\pi\)
0.282375 + 0.959304i \(0.408878\pi\)
\(350\) 521.747 0.0796816
\(351\) 0 0
\(352\) −3345.69 −0.506607
\(353\) −10031.5 −1.51254 −0.756268 0.654261i \(-0.772980\pi\)
−0.756268 + 0.654261i \(0.772980\pi\)
\(354\) 810.673 0.121714
\(355\) 3902.08 0.583383
\(356\) −3537.75 −0.526687
\(357\) 6103.93 0.904914
\(358\) −532.193 −0.0785678
\(359\) 6869.76 1.00995 0.504975 0.863134i \(-0.331502\pi\)
0.504975 + 0.863134i \(0.331502\pi\)
\(360\) 649.627 0.0951066
\(361\) 15263.7 2.22535
\(362\) 790.416 0.114761
\(363\) 2775.34 0.401288
\(364\) 0 0
\(365\) 7936.59 1.13814
\(366\) 56.7309 0.00810211
\(367\) 8883.29 1.26350 0.631749 0.775173i \(-0.282337\pi\)
0.631749 + 0.775173i \(0.282337\pi\)
\(368\) −5526.03 −0.782784
\(369\) −1339.94 −0.189037
\(370\) 435.541 0.0611964
\(371\) 9646.31 1.34990
\(372\) −884.732 −0.123310
\(373\) −5454.50 −0.757166 −0.378583 0.925567i \(-0.623589\pi\)
−0.378583 + 0.925567i \(0.623589\pi\)
\(374\) −1546.70 −0.213844
\(375\) 5251.53 0.723167
\(376\) 583.487 0.0800294
\(377\) 0 0
\(378\) 1127.60 0.153433
\(379\) −6642.15 −0.900222 −0.450111 0.892973i \(-0.648616\pi\)
−0.450111 + 0.892973i \(0.648616\pi\)
\(380\) 8779.37 1.18519
\(381\) −4247.46 −0.571140
\(382\) −843.064 −0.112919
\(383\) −1262.33 −0.168413 −0.0842066 0.996448i \(-0.526836\pi\)
−0.0842066 + 0.996448i \(0.526836\pi\)
\(384\) 2748.37 0.365240
\(385\) −6736.24 −0.891716
\(386\) 471.211 0.0621347
\(387\) 1131.50 0.148623
\(388\) −1818.67 −0.237962
\(389\) −2793.42 −0.364093 −0.182046 0.983290i \(-0.558272\pi\)
−0.182046 + 0.983290i \(0.558272\pi\)
\(390\) 0 0
\(391\) −7919.62 −1.02433
\(392\) 241.053 0.0310588
\(393\) 2798.71 0.359227
\(394\) −1922.00 −0.245759
\(395\) 2413.15 0.307390
\(396\) 5024.00 0.637539
\(397\) −6848.91 −0.865836 −0.432918 0.901433i \(-0.642516\pi\)
−0.432918 + 0.901433i \(0.642516\pi\)
\(398\) −393.803 −0.0495969
\(399\) 10493.3 1.31660
\(400\) −4131.11 −0.516389
\(401\) −11024.5 −1.37291 −0.686456 0.727171i \(-0.740835\pi\)
−0.686456 + 0.727171i \(0.740835\pi\)
\(402\) −846.518 −0.105026
\(403\) 0 0
\(404\) −4474.24 −0.550994
\(405\) 1178.09 0.144543
\(406\) −1974.03 −0.241304
\(407\) 6801.97 0.828406
\(408\) 1930.84 0.234291
\(409\) −3530.56 −0.426833 −0.213417 0.976961i \(-0.568459\pi\)
−0.213417 + 0.976961i \(0.568459\pi\)
\(410\) 281.429 0.0338995
\(411\) 9178.03 1.10151
\(412\) −7608.86 −0.909858
\(413\) −11251.5 −1.34056
\(414\) −498.869 −0.0592224
\(415\) 244.325 0.0288998
\(416\) 0 0
\(417\) −1033.51 −0.121370
\(418\) −2658.93 −0.311131
\(419\) −4179.22 −0.487275 −0.243637 0.969866i \(-0.578341\pi\)
−0.243637 + 0.969866i \(0.578341\pi\)
\(420\) 4164.26 0.483798
\(421\) 6209.31 0.718820 0.359410 0.933180i \(-0.382978\pi\)
0.359410 + 0.933180i \(0.382978\pi\)
\(422\) 1915.98 0.221015
\(423\) −1318.48 −0.151553
\(424\) 3051.39 0.349501
\(425\) −5920.49 −0.675732
\(426\) 730.568 0.0830895
\(427\) −787.382 −0.0892367
\(428\) 2693.03 0.304141
\(429\) 0 0
\(430\) −237.650 −0.0266523
\(431\) 11880.2 1.32773 0.663864 0.747854i \(-0.268916\pi\)
0.663864 + 0.747854i \(0.268916\pi\)
\(432\) −8928.16 −0.994343
\(433\) 8725.71 0.968432 0.484216 0.874949i \(-0.339105\pi\)
0.484216 + 0.874949i \(0.339105\pi\)
\(434\) −238.130 −0.0263378
\(435\) −7029.06 −0.774754
\(436\) 652.655 0.0716893
\(437\) −13614.7 −1.49034
\(438\) 1485.93 0.162101
\(439\) −1200.37 −0.130503 −0.0652514 0.997869i \(-0.520785\pi\)
−0.0652514 + 0.997869i \(0.520785\pi\)
\(440\) −2130.86 −0.230874
\(441\) −544.699 −0.0588165
\(442\) 0 0
\(443\) 2258.86 0.242261 0.121130 0.992637i \(-0.461348\pi\)
0.121130 + 0.992637i \(0.461348\pi\)
\(444\) −4204.90 −0.449449
\(445\) −3390.59 −0.361190
\(446\) 532.343 0.0565183
\(447\) 8497.62 0.899158
\(448\) −8882.65 −0.936754
\(449\) −14662.4 −1.54112 −0.770561 0.637367i \(-0.780024\pi\)
−0.770561 + 0.637367i \(0.780024\pi\)
\(450\) −372.941 −0.0390680
\(451\) 4395.16 0.458892
\(452\) 16607.4 1.72820
\(453\) −596.165 −0.0618328
\(454\) 1626.73 0.168164
\(455\) 0 0
\(456\) 3319.31 0.340879
\(457\) 9334.94 0.955514 0.477757 0.878492i \(-0.341450\pi\)
0.477757 + 0.878492i \(0.341450\pi\)
\(458\) 1368.09 0.139578
\(459\) −12795.4 −1.30117
\(460\) −5402.97 −0.547641
\(461\) 10736.9 1.08474 0.542370 0.840140i \(-0.317527\pi\)
0.542370 + 0.840140i \(0.317527\pi\)
\(462\) −1261.19 −0.127004
\(463\) 10650.0 1.06900 0.534501 0.845168i \(-0.320499\pi\)
0.534501 + 0.845168i \(0.320499\pi\)
\(464\) 15630.0 1.56380
\(465\) −847.929 −0.0845630
\(466\) 222.464 0.0221147
\(467\) −2638.11 −0.261407 −0.130703 0.991422i \(-0.541724\pi\)
−0.130703 + 0.991422i \(0.541724\pi\)
\(468\) 0 0
\(469\) 11749.0 1.15676
\(470\) 276.923 0.0271776
\(471\) −11174.5 −1.09320
\(472\) −3559.16 −0.347084
\(473\) −3711.45 −0.360787
\(474\) 451.803 0.0437806
\(475\) −10177.9 −0.983149
\(476\) −13270.6 −1.27785
\(477\) −6895.11 −0.661856
\(478\) 90.1386 0.00862520
\(479\) −3225.31 −0.307658 −0.153829 0.988097i \(-0.549160\pi\)
−0.153829 + 0.988097i \(0.549160\pi\)
\(480\) 1982.23 0.188491
\(481\) 0 0
\(482\) 1204.87 0.113860
\(483\) −6457.75 −0.608360
\(484\) −6033.89 −0.566669
\(485\) −1743.02 −0.163189
\(486\) −1337.17 −0.124805
\(487\) −1496.39 −0.139236 −0.0696181 0.997574i \(-0.522178\pi\)
−0.0696181 + 0.997574i \(0.522178\pi\)
\(488\) −249.070 −0.0231043
\(489\) −1080.41 −0.0999137
\(490\) 114.404 0.0105474
\(491\) −518.408 −0.0476485 −0.0238243 0.999716i \(-0.507584\pi\)
−0.0238243 + 0.999716i \(0.507584\pi\)
\(492\) −2717.04 −0.248970
\(493\) 22400.1 2.04635
\(494\) 0 0
\(495\) 4815.01 0.437210
\(496\) 1885.48 0.170686
\(497\) −10139.7 −0.915148
\(498\) 45.7437 0.00411611
\(499\) −2405.01 −0.215757 −0.107879 0.994164i \(-0.534406\pi\)
−0.107879 + 0.994164i \(0.534406\pi\)
\(500\) −11417.4 −1.02120
\(501\) 10847.7 0.967341
\(502\) 954.080 0.0848260
\(503\) 2413.76 0.213965 0.106983 0.994261i \(-0.465881\pi\)
0.106983 + 0.994261i \(0.465881\pi\)
\(504\) −1688.08 −0.149193
\(505\) −4288.12 −0.377859
\(506\) 1636.35 0.143764
\(507\) 0 0
\(508\) 9234.45 0.806520
\(509\) 15678.3 1.36528 0.682641 0.730754i \(-0.260831\pi\)
0.682641 + 0.730754i \(0.260831\pi\)
\(510\) 916.374 0.0795642
\(511\) −20623.6 −1.78539
\(512\) −7393.65 −0.638196
\(513\) −21996.6 −1.89312
\(514\) −1277.24 −0.109604
\(515\) −7292.34 −0.623959
\(516\) 2294.37 0.195744
\(517\) 4324.79 0.367899
\(518\) −1131.77 −0.0959983
\(519\) 1645.48 0.139168
\(520\) 0 0
\(521\) −11691.5 −0.983135 −0.491568 0.870839i \(-0.663576\pi\)
−0.491568 + 0.870839i \(0.663576\pi\)
\(522\) 1411.02 0.118311
\(523\) −3878.95 −0.324311 −0.162156 0.986765i \(-0.551845\pi\)
−0.162156 + 0.986765i \(0.551845\pi\)
\(524\) −6084.69 −0.507273
\(525\) −4827.63 −0.401324
\(526\) 1806.73 0.149767
\(527\) 2702.17 0.223355
\(528\) 9985.92 0.823071
\(529\) −3788.32 −0.311360
\(530\) 1448.19 0.118689
\(531\) 8042.50 0.657278
\(532\) −22813.6 −1.85920
\(533\) 0 0
\(534\) −634.804 −0.0514431
\(535\) 2581.00 0.208573
\(536\) 3716.54 0.299496
\(537\) 4924.29 0.395715
\(538\) 1107.35 0.0887382
\(539\) 1786.68 0.142779
\(540\) −8729.34 −0.695650
\(541\) −16353.0 −1.29958 −0.649788 0.760115i \(-0.725142\pi\)
−0.649788 + 0.760115i \(0.725142\pi\)
\(542\) 2751.22 0.218035
\(543\) −7313.58 −0.578003
\(544\) −6316.93 −0.497861
\(545\) 625.506 0.0491628
\(546\) 0 0
\(547\) 2748.67 0.214853 0.107426 0.994213i \(-0.465739\pi\)
0.107426 + 0.994213i \(0.465739\pi\)
\(548\) −19954.0 −1.55546
\(549\) 562.814 0.0437529
\(550\) 1223.29 0.0948387
\(551\) 38508.1 2.97732
\(552\) −2042.76 −0.157510
\(553\) −6270.68 −0.482200
\(554\) 756.163 0.0579897
\(555\) −4029.98 −0.308222
\(556\) 2246.96 0.171389
\(557\) −16765.6 −1.27537 −0.637686 0.770297i \(-0.720108\pi\)
−0.637686 + 0.770297i \(0.720108\pi\)
\(558\) 170.214 0.0129135
\(559\) 0 0
\(560\) −8874.58 −0.669677
\(561\) 14311.3 1.07705
\(562\) −1283.77 −0.0963568
\(563\) 18492.4 1.38430 0.692151 0.721752i \(-0.256663\pi\)
0.692151 + 0.721752i \(0.256663\pi\)
\(564\) −2673.53 −0.199603
\(565\) 15916.5 1.18516
\(566\) 3088.96 0.229397
\(567\) −3061.32 −0.226743
\(568\) −3207.47 −0.236941
\(569\) 1563.28 0.115178 0.0575888 0.998340i \(-0.481659\pi\)
0.0575888 + 0.998340i \(0.481659\pi\)
\(570\) 1575.34 0.115761
\(571\) 9165.98 0.671776 0.335888 0.941902i \(-0.390964\pi\)
0.335888 + 0.941902i \(0.390964\pi\)
\(572\) 0 0
\(573\) 7800.72 0.568726
\(574\) −731.305 −0.0531778
\(575\) 6263.67 0.454284
\(576\) 6349.25 0.459292
\(577\) −18762.5 −1.35372 −0.676858 0.736114i \(-0.736659\pi\)
−0.676858 + 0.736114i \(0.736659\pi\)
\(578\) −1003.65 −0.0722257
\(579\) −4360.03 −0.312948
\(580\) 15281.9 1.09405
\(581\) −634.888 −0.0453349
\(582\) −326.337 −0.0232424
\(583\) 22616.8 1.60667
\(584\) −6523.79 −0.462254
\(585\) 0 0
\(586\) 2214.07 0.156079
\(587\) −12646.3 −0.889212 −0.444606 0.895726i \(-0.646656\pi\)
−0.444606 + 0.895726i \(0.646656\pi\)
\(588\) −1104.50 −0.0774642
\(589\) 4645.31 0.324969
\(590\) −1689.18 −0.117868
\(591\) 17784.0 1.23779
\(592\) 8961.17 0.622132
\(593\) 9662.74 0.669142 0.334571 0.942371i \(-0.391409\pi\)
0.334571 + 0.942371i \(0.391409\pi\)
\(594\) 2643.78 0.182619
\(595\) −12718.6 −0.876321
\(596\) −18474.7 −1.26972
\(597\) 3643.79 0.249800
\(598\) 0 0
\(599\) −26968.7 −1.83959 −0.919794 0.392402i \(-0.871644\pi\)
−0.919794 + 0.392402i \(0.871644\pi\)
\(600\) −1527.11 −0.103907
\(601\) 11280.1 0.765600 0.382800 0.923831i \(-0.374960\pi\)
0.382800 + 0.923831i \(0.374960\pi\)
\(602\) 617.542 0.0418092
\(603\) −8398.11 −0.567160
\(604\) 1296.13 0.0873156
\(605\) −5782.89 −0.388608
\(606\) −802.843 −0.0538173
\(607\) 12052.6 0.805931 0.402965 0.915215i \(-0.367979\pi\)
0.402965 + 0.915215i \(0.367979\pi\)
\(608\) −10859.5 −0.724358
\(609\) 18265.3 1.21535
\(610\) −118.208 −0.00784610
\(611\) 0 0
\(612\) 9485.73 0.626532
\(613\) −11259.7 −0.741883 −0.370941 0.928656i \(-0.620965\pi\)
−0.370941 + 0.928656i \(0.620965\pi\)
\(614\) −1692.65 −0.111254
\(615\) −2604.01 −0.170738
\(616\) 5537.12 0.362170
\(617\) 24058.2 1.56976 0.784882 0.619645i \(-0.212723\pi\)
0.784882 + 0.619645i \(0.212723\pi\)
\(618\) −1365.31 −0.0888686
\(619\) 2793.41 0.181384 0.0906919 0.995879i \(-0.471092\pi\)
0.0906919 + 0.995879i \(0.471092\pi\)
\(620\) 1843.49 0.119413
\(621\) 13537.1 0.874756
\(622\) 2042.15 0.131645
\(623\) 8810.59 0.566595
\(624\) 0 0
\(625\) −2388.81 −0.152884
\(626\) −845.714 −0.0539960
\(627\) 24602.6 1.56704
\(628\) 24294.6 1.54373
\(629\) 12842.7 0.814104
\(630\) −801.163 −0.0506652
\(631\) 24850.0 1.56777 0.783883 0.620908i \(-0.213236\pi\)
0.783883 + 0.620908i \(0.213236\pi\)
\(632\) −1983.59 −0.124846
\(633\) −17728.2 −1.11317
\(634\) 1897.41 0.118857
\(635\) 8850.32 0.553093
\(636\) −13981.4 −0.871696
\(637\) 0 0
\(638\) −4628.31 −0.287205
\(639\) 7247.79 0.448698
\(640\) −5726.69 −0.353699
\(641\) −7794.71 −0.480300 −0.240150 0.970736i \(-0.577197\pi\)
−0.240150 + 0.970736i \(0.577197\pi\)
\(642\) 483.228 0.0297064
\(643\) −27709.9 −1.69949 −0.849744 0.527195i \(-0.823244\pi\)
−0.849744 + 0.527195i \(0.823244\pi\)
\(644\) 14039.8 0.859080
\(645\) 2198.93 0.134237
\(646\) −5020.28 −0.305759
\(647\) 11150.9 0.677571 0.338786 0.940864i \(-0.389984\pi\)
0.338786 + 0.940864i \(0.389984\pi\)
\(648\) −968.378 −0.0587060
\(649\) −26380.4 −1.59556
\(650\) 0 0
\(651\) 2203.38 0.132653
\(652\) 2348.93 0.141091
\(653\) 29137.5 1.74615 0.873077 0.487583i \(-0.162121\pi\)
0.873077 + 0.487583i \(0.162121\pi\)
\(654\) 117.110 0.00700211
\(655\) −5831.58 −0.347876
\(656\) 5790.36 0.344627
\(657\) 14741.6 0.875377
\(658\) −719.595 −0.0426333
\(659\) −5300.12 −0.313298 −0.156649 0.987654i \(-0.550069\pi\)
−0.156649 + 0.987654i \(0.550069\pi\)
\(660\) 9763.54 0.575826
\(661\) 27412.5 1.61305 0.806523 0.591203i \(-0.201347\pi\)
0.806523 + 0.591203i \(0.201347\pi\)
\(662\) −1047.56 −0.0615025
\(663\) 0 0
\(664\) −200.832 −0.0117377
\(665\) −21864.6 −1.27499
\(666\) 808.981 0.0470681
\(667\) −23698.6 −1.37573
\(668\) −23584.0 −1.36601
\(669\) −4925.67 −0.284660
\(670\) 1763.87 0.101708
\(671\) −1846.10 −0.106211
\(672\) −5150.90 −0.295685
\(673\) −21282.1 −1.21896 −0.609482 0.792800i \(-0.708623\pi\)
−0.609482 + 0.792800i \(0.708623\pi\)
\(674\) 2542.91 0.145325
\(675\) 10119.9 0.577061
\(676\) 0 0
\(677\) −13544.2 −0.768904 −0.384452 0.923145i \(-0.625610\pi\)
−0.384452 + 0.923145i \(0.625610\pi\)
\(678\) 2979.98 0.168798
\(679\) 4529.31 0.255992
\(680\) −4023.23 −0.226888
\(681\) −15051.9 −0.846974
\(682\) −558.322 −0.0313479
\(683\) −10350.1 −0.579849 −0.289924 0.957050i \(-0.593630\pi\)
−0.289924 + 0.957050i \(0.593630\pi\)
\(684\) 16307.0 0.911567
\(685\) −19124.0 −1.06670
\(686\) 2317.97 0.129009
\(687\) −12658.7 −0.702999
\(688\) −4889.60 −0.270951
\(689\) 0 0
\(690\) −969.492 −0.0534898
\(691\) 25714.8 1.41569 0.707843 0.706370i \(-0.249669\pi\)
0.707843 + 0.706370i \(0.249669\pi\)
\(692\) −3577.45 −0.196523
\(693\) −12512.0 −0.685847
\(694\) −29.5693 −0.00161734
\(695\) 2153.49 0.117535
\(696\) 5777.81 0.314666
\(697\) 8298.43 0.450969
\(698\) −1436.44 −0.0778940
\(699\) −2058.42 −0.111383
\(700\) 10495.8 0.566720
\(701\) 7431.30 0.400394 0.200197 0.979756i \(-0.435842\pi\)
0.200197 + 0.979756i \(0.435842\pi\)
\(702\) 0 0
\(703\) 22077.9 1.18447
\(704\) −20826.3 −1.11494
\(705\) −2562.32 −0.136883
\(706\) 3913.46 0.208619
\(707\) 11142.8 0.592744
\(708\) 16308.0 0.865668
\(709\) 19986.8 1.05870 0.529351 0.848403i \(-0.322435\pi\)
0.529351 + 0.848403i \(0.322435\pi\)
\(710\) −1522.26 −0.0804641
\(711\) 4482.23 0.236423
\(712\) 2787.03 0.146697
\(713\) −2858.80 −0.150158
\(714\) −2381.24 −0.124812
\(715\) 0 0
\(716\) −10705.9 −0.558798
\(717\) −834.037 −0.0434417
\(718\) −2680.00 −0.139299
\(719\) 36101.9 1.87256 0.936281 0.351251i \(-0.114244\pi\)
0.936281 + 0.351251i \(0.114244\pi\)
\(720\) 6343.48 0.328344
\(721\) 18949.5 0.978800
\(722\) −5954.59 −0.306935
\(723\) −11148.4 −0.573465
\(724\) 15900.5 0.816213
\(725\) −17716.4 −0.907545
\(726\) −1082.70 −0.0553483
\(727\) −1751.90 −0.0893735 −0.0446868 0.999001i \(-0.514229\pi\)
−0.0446868 + 0.999001i \(0.514229\pi\)
\(728\) 0 0
\(729\) 16601.6 0.843451
\(730\) −3096.18 −0.156979
\(731\) −7007.52 −0.354559
\(732\) 1141.24 0.0576247
\(733\) 20031.3 1.00938 0.504688 0.863302i \(-0.331607\pi\)
0.504688 + 0.863302i \(0.331607\pi\)
\(734\) −3465.51 −0.174270
\(735\) −1058.56 −0.0531231
\(736\) 6683.10 0.334704
\(737\) 27546.8 1.37680
\(738\) 522.731 0.0260732
\(739\) −18632.9 −0.927502 −0.463751 0.885966i \(-0.653497\pi\)
−0.463751 + 0.885966i \(0.653497\pi\)
\(740\) 8761.62 0.435248
\(741\) 0 0
\(742\) −3763.17 −0.186187
\(743\) −4907.69 −0.242323 −0.121161 0.992633i \(-0.538662\pi\)
−0.121161 + 0.992633i \(0.538662\pi\)
\(744\) 696.988 0.0343452
\(745\) −17706.2 −0.870747
\(746\) 2127.88 0.104433
\(747\) 453.813 0.0222278
\(748\) −31114.3 −1.52093
\(749\) −6706.84 −0.327186
\(750\) −2048.70 −0.0997440
\(751\) 31156.9 1.51389 0.756945 0.653479i \(-0.226691\pi\)
0.756945 + 0.653479i \(0.226691\pi\)
\(752\) 5697.64 0.276292
\(753\) −8827.93 −0.427235
\(754\) 0 0
\(755\) 1242.21 0.0598790
\(756\) 22683.5 1.09126
\(757\) −11047.0 −0.530396 −0.265198 0.964194i \(-0.585437\pi\)
−0.265198 + 0.964194i \(0.585437\pi\)
\(758\) 2591.20 0.124165
\(759\) −15140.9 −0.724082
\(760\) −6916.35 −0.330109
\(761\) −27606.1 −1.31501 −0.657503 0.753452i \(-0.728387\pi\)
−0.657503 + 0.753452i \(0.728387\pi\)
\(762\) 1657.00 0.0787753
\(763\) −1625.40 −0.0771213
\(764\) −16959.6 −0.803112
\(765\) 9091.14 0.429661
\(766\) 492.456 0.0232287
\(767\) 0 0
\(768\) 12052.1 0.566264
\(769\) 3694.72 0.173257 0.0866287 0.996241i \(-0.472391\pi\)
0.0866287 + 0.996241i \(0.472391\pi\)
\(770\) 2627.91 0.122991
\(771\) 11818.0 0.552031
\(772\) 9479.18 0.441921
\(773\) −19808.0 −0.921662 −0.460831 0.887488i \(-0.652449\pi\)
−0.460831 + 0.887488i \(0.652449\pi\)
\(774\) −441.414 −0.0204991
\(775\) −2137.16 −0.0990569
\(776\) 1432.74 0.0662789
\(777\) 10472.1 0.483505
\(778\) 1089.76 0.0502181
\(779\) 14265.9 0.656133
\(780\) 0 0
\(781\) −23773.6 −1.08923
\(782\) 3089.56 0.141282
\(783\) −38288.7 −1.74754
\(784\) 2353.84 0.107227
\(785\) 23284.0 1.05865
\(786\) −1091.82 −0.0495469
\(787\) 4116.79 0.186464 0.0932322 0.995644i \(-0.470280\pi\)
0.0932322 + 0.995644i \(0.470280\pi\)
\(788\) −38664.3 −1.74792
\(789\) −16717.4 −0.754314
\(790\) −941.408 −0.0423972
\(791\) −41359.8 −1.85915
\(792\) −3957.89 −0.177572
\(793\) 0 0
\(794\) 2671.86 0.119422
\(795\) −13399.8 −0.597789
\(796\) −7922.00 −0.352748
\(797\) 25359.3 1.12707 0.563533 0.826094i \(-0.309442\pi\)
0.563533 + 0.826094i \(0.309442\pi\)
\(798\) −4093.59 −0.181594
\(799\) 8165.55 0.361548
\(800\) 4996.10 0.220799
\(801\) −6297.74 −0.277802
\(802\) 4300.83 0.189361
\(803\) −48354.1 −2.12500
\(804\) −17029.1 −0.746978
\(805\) 13455.8 0.589137
\(806\) 0 0
\(807\) −10246.1 −0.446939
\(808\) 3524.78 0.153467
\(809\) −5558.73 −0.241576 −0.120788 0.992678i \(-0.538542\pi\)
−0.120788 + 0.992678i \(0.538542\pi\)
\(810\) −459.591 −0.0199363
\(811\) −15021.4 −0.650399 −0.325199 0.945646i \(-0.605431\pi\)
−0.325199 + 0.945646i \(0.605431\pi\)
\(812\) −39710.8 −1.71623
\(813\) −25456.5 −1.09815
\(814\) −2653.55 −0.114259
\(815\) 2251.22 0.0967567
\(816\) 18854.2 0.808861
\(817\) −12046.6 −0.515862
\(818\) 1377.32 0.0588717
\(819\) 0 0
\(820\) 5661.41 0.241104
\(821\) 15901.6 0.675966 0.337983 0.941152i \(-0.390255\pi\)
0.337983 + 0.941152i \(0.390255\pi\)
\(822\) −3580.49 −0.151927
\(823\) −40279.3 −1.70601 −0.853006 0.521901i \(-0.825223\pi\)
−0.853006 + 0.521901i \(0.825223\pi\)
\(824\) 5994.23 0.253421
\(825\) −11318.9 −0.477664
\(826\) 4389.39 0.184899
\(827\) 5251.09 0.220796 0.110398 0.993887i \(-0.464787\pi\)
0.110398 + 0.993887i \(0.464787\pi\)
\(828\) −10035.6 −0.421208
\(829\) 33964.4 1.42296 0.711479 0.702708i \(-0.248026\pi\)
0.711479 + 0.702708i \(0.248026\pi\)
\(830\) −95.3148 −0.00398606
\(831\) −6996.65 −0.292071
\(832\) 0 0
\(833\) 3373.40 0.140314
\(834\) 403.188 0.0167401
\(835\) −22603.0 −0.936776
\(836\) −53488.8 −2.21286
\(837\) −4618.83 −0.190741
\(838\) 1630.38 0.0672081
\(839\) −15485.0 −0.637188 −0.318594 0.947891i \(-0.603211\pi\)
−0.318594 + 0.947891i \(0.603211\pi\)
\(840\) −3280.59 −0.134751
\(841\) 42640.8 1.74836
\(842\) −2422.35 −0.0991444
\(843\) 11878.5 0.485311
\(844\) 38543.1 1.57193
\(845\) 0 0
\(846\) 514.361 0.0209032
\(847\) 15027.1 0.609606
\(848\) 29796.2 1.20661
\(849\) −28581.6 −1.15538
\(850\) 2309.67 0.0932014
\(851\) −13587.1 −0.547309
\(852\) 14696.6 0.590958
\(853\) 20057.8 0.805118 0.402559 0.915394i \(-0.368121\pi\)
0.402559 + 0.915394i \(0.368121\pi\)
\(854\) 307.170 0.0123081
\(855\) 15628.6 0.625132
\(856\) −2121.55 −0.0847117
\(857\) −8066.23 −0.321514 −0.160757 0.986994i \(-0.551394\pi\)
−0.160757 + 0.986994i \(0.551394\pi\)
\(858\) 0 0
\(859\) 39719.0 1.57764 0.788821 0.614623i \(-0.210692\pi\)
0.788821 + 0.614623i \(0.210692\pi\)
\(860\) −4780.71 −0.189559
\(861\) 6766.64 0.267835
\(862\) −4634.66 −0.183129
\(863\) −24473.8 −0.965351 −0.482676 0.875799i \(-0.660335\pi\)
−0.482676 + 0.875799i \(0.660335\pi\)
\(864\) 10797.6 0.425163
\(865\) −3428.63 −0.134771
\(866\) −3404.03 −0.133572
\(867\) 9286.62 0.363772
\(868\) −4790.38 −0.187323
\(869\) −14702.3 −0.573924
\(870\) 2742.15 0.106859
\(871\) 0 0
\(872\) −514.159 −0.0199675
\(873\) −3237.51 −0.125513
\(874\) 5311.28 0.205557
\(875\) 28434.4 1.09858
\(876\) 29891.9 1.15291
\(877\) −25326.6 −0.975162 −0.487581 0.873078i \(-0.662121\pi\)
−0.487581 + 0.873078i \(0.662121\pi\)
\(878\) 468.284 0.0179998
\(879\) −20486.4 −0.786109
\(880\) −20807.4 −0.797064
\(881\) 1327.44 0.0507634 0.0253817 0.999678i \(-0.491920\pi\)
0.0253817 + 0.999678i \(0.491920\pi\)
\(882\) 212.496 0.00811235
\(883\) −2112.05 −0.0804941 −0.0402470 0.999190i \(-0.512814\pi\)
−0.0402470 + 0.999190i \(0.512814\pi\)
\(884\) 0 0
\(885\) 15629.6 0.593655
\(886\) −881.214 −0.0334142
\(887\) −40935.4 −1.54958 −0.774790 0.632219i \(-0.782144\pi\)
−0.774790 + 0.632219i \(0.782144\pi\)
\(888\) 3312.60 0.125184
\(889\) −22997.9 −0.867632
\(890\) 1322.72 0.0498177
\(891\) −7177.58 −0.269874
\(892\) 10708.9 0.401975
\(893\) 14037.4 0.526030
\(894\) −3315.05 −0.124018
\(895\) −10260.6 −0.383211
\(896\) 14881.0 0.554845
\(897\) 0 0
\(898\) 5720.04 0.212562
\(899\) 8085.93 0.299979
\(900\) −7502.32 −0.277864
\(901\) 42702.3 1.57894
\(902\) −1714.62 −0.0632934
\(903\) −5714.01 −0.210576
\(904\) −13083.2 −0.481351
\(905\) 15239.1 0.559740
\(906\) 232.573 0.00852838
\(907\) 153.968 0.00563663 0.00281831 0.999996i \(-0.499103\pi\)
0.00281831 + 0.999996i \(0.499103\pi\)
\(908\) 32724.4 1.19603
\(909\) −7964.82 −0.290623
\(910\) 0 0
\(911\) −733.607 −0.0266800 −0.0133400 0.999911i \(-0.504246\pi\)
−0.0133400 + 0.999911i \(0.504246\pi\)
\(912\) 32412.4 1.17684
\(913\) −1488.56 −0.0539586
\(914\) −3641.70 −0.131791
\(915\) 1093.76 0.0395177
\(916\) 27521.4 0.992722
\(917\) 15153.6 0.545710
\(918\) 4991.67 0.179466
\(919\) −51106.4 −1.83443 −0.917216 0.398390i \(-0.869569\pi\)
−0.917216 + 0.398390i \(0.869569\pi\)
\(920\) 4256.44 0.152533
\(921\) 15661.8 0.560342
\(922\) −4188.61 −0.149615
\(923\) 0 0
\(924\) −25371.0 −0.903294
\(925\) −10157.4 −0.361051
\(926\) −4154.73 −0.147444
\(927\) −13544.9 −0.479907
\(928\) −18902.7 −0.668655
\(929\) 30645.2 1.08228 0.541139 0.840933i \(-0.317993\pi\)
0.541139 + 0.840933i \(0.317993\pi\)
\(930\) 330.790 0.0116635
\(931\) 5799.22 0.204148
\(932\) 4475.23 0.157287
\(933\) −18895.7 −0.663041
\(934\) 1029.17 0.0360550
\(935\) −29820.0 −1.04302
\(936\) 0 0
\(937\) −24422.2 −0.851482 −0.425741 0.904845i \(-0.639987\pi\)
−0.425741 + 0.904845i \(0.639987\pi\)
\(938\) −4583.48 −0.159548
\(939\) 7825.24 0.271956
\(940\) 5570.75 0.193296
\(941\) 16475.9 0.570774 0.285387 0.958412i \(-0.407878\pi\)
0.285387 + 0.958412i \(0.407878\pi\)
\(942\) 4359.35 0.150781
\(943\) −8779.46 −0.303180
\(944\) −34754.5 −1.19827
\(945\) 21740.0 0.748361
\(946\) 1447.89 0.0497622
\(947\) 10122.1 0.347332 0.173666 0.984805i \(-0.444439\pi\)
0.173666 + 0.984805i \(0.444439\pi\)
\(948\) 9088.76 0.311381
\(949\) 0 0
\(950\) 3970.57 0.135602
\(951\) −17556.4 −0.598637
\(952\) 10454.5 0.355917
\(953\) 38097.2 1.29495 0.647475 0.762086i \(-0.275825\pi\)
0.647475 + 0.762086i \(0.275825\pi\)
\(954\) 2689.89 0.0912875
\(955\) −16254.1 −0.550756
\(956\) 1813.29 0.0613451
\(957\) 42824.9 1.44653
\(958\) 1258.24 0.0424342
\(959\) 49694.5 1.67332
\(960\) 12339.0 0.414833
\(961\) −28815.6 −0.967258
\(962\) 0 0
\(963\) 4794.00 0.160420
\(964\) 24237.9 0.809804
\(965\) 9084.87 0.303059
\(966\) 2519.27 0.0839090
\(967\) 44515.5 1.48037 0.740187 0.672401i \(-0.234737\pi\)
0.740187 + 0.672401i \(0.234737\pi\)
\(968\) 4753.47 0.157833
\(969\) 46451.8 1.53999
\(970\) 679.978 0.0225080
\(971\) −25444.3 −0.840934 −0.420467 0.907308i \(-0.638134\pi\)
−0.420467 + 0.907308i \(0.638134\pi\)
\(972\) −26899.3 −0.887649
\(973\) −5595.94 −0.184376
\(974\) 583.765 0.0192044
\(975\) 0 0
\(976\) −2432.12 −0.0797646
\(977\) −39467.9 −1.29242 −0.646208 0.763161i \(-0.723646\pi\)
−0.646208 + 0.763161i \(0.723646\pi\)
\(978\) 421.484 0.0137808
\(979\) 20657.4 0.674374
\(980\) 2301.42 0.0750165
\(981\) 1161.83 0.0378127
\(982\) 202.239 0.00657200
\(983\) 14970.4 0.485740 0.242870 0.970059i \(-0.421911\pi\)
0.242870 + 0.970059i \(0.421911\pi\)
\(984\) 2140.47 0.0693452
\(985\) −37055.9 −1.19868
\(986\) −8738.63 −0.282246
\(987\) 6658.28 0.214727
\(988\) 0 0
\(989\) 7413.71 0.238364
\(990\) −1878.41 −0.0603028
\(991\) 58422.4 1.87270 0.936352 0.351063i \(-0.114180\pi\)
0.936352 + 0.351063i \(0.114180\pi\)
\(992\) −2280.27 −0.0729825
\(993\) 9692.91 0.309763
\(994\) 3955.66 0.126223
\(995\) −7592.46 −0.241907
\(996\) 920.210 0.0292751
\(997\) 20131.6 0.639493 0.319746 0.947503i \(-0.396402\pi\)
0.319746 + 0.947503i \(0.396402\pi\)
\(998\) 938.230 0.0297587
\(999\) −21952.1 −0.695228
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 169.4.a.l.1.4 yes 9
3.2 odd 2 1521.4.a.bg.1.6 9
13.2 odd 12 169.4.e.h.147.8 36
13.3 even 3 169.4.c.k.22.6 18
13.4 even 6 169.4.c.l.146.4 18
13.5 odd 4 169.4.b.g.168.11 18
13.6 odd 12 169.4.e.h.23.11 36
13.7 odd 12 169.4.e.h.23.8 36
13.8 odd 4 169.4.b.g.168.8 18
13.9 even 3 169.4.c.k.146.6 18
13.10 even 6 169.4.c.l.22.4 18
13.11 odd 12 169.4.e.h.147.11 36
13.12 even 2 169.4.a.k.1.6 9
39.38 odd 2 1521.4.a.bh.1.4 9
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
169.4.a.k.1.6 9 13.12 even 2
169.4.a.l.1.4 yes 9 1.1 even 1 trivial
169.4.b.g.168.8 18 13.8 odd 4
169.4.b.g.168.11 18 13.5 odd 4
169.4.c.k.22.6 18 13.3 even 3
169.4.c.k.146.6 18 13.9 even 3
169.4.c.l.22.4 18 13.10 even 6
169.4.c.l.146.4 18 13.4 even 6
169.4.e.h.23.8 36 13.7 odd 12
169.4.e.h.23.11 36 13.6 odd 12
169.4.e.h.147.8 36 13.2 odd 12
169.4.e.h.147.11 36 13.11 odd 12
1521.4.a.bg.1.6 9 3.2 odd 2
1521.4.a.bh.1.4 9 39.38 odd 2