Properties

Label 1859.4.a.d.1.5
Level $1859$
Weight $4$
Character 1859.1
Self dual yes
Analytic conductor $109.685$
Analytic rank $1$
Dimension $9$
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] = [1859,4,Mod(1,1859)]
 
mf = mfinit([N,k,chi],0)
 
lf = mfeigenbasis(mf)
 
from sage.modular.dirichlet import DirichletCharacter
 
H = DirichletGroup(1859, base_ring=CyclotomicField(2))
 
chi = DirichletCharacter(H, H._module([0, 0]))
 
N = Newforms(chi, 4, names="a")
 
//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code
 
chi := DirichletCharacter("1859.1");
 
S:= CuspForms(chi, 4);
 
N := Newforms(S);
 
Level: \( N \) \(=\) \( 1859 = 11 \cdot 13^{2} \)
Weight: \( k \) \(=\) \( 4 \)
Character orbit: \([\chi]\) \(=\) 1859.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: \(109.684550701\)
Analytic rank: \(1\)
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: \( x^{9} - 59x^{7} - 12x^{6} + 1144x^{5} + 345x^{4} - 7888x^{3} - 2245x^{2} + 9710x - 2988 \) Copy content Toggle raw display
Coefficient ring: \(\Z[a_1, \ldots, a_{5}]\)
Coefficient ring index: \( 1 \)
Twist minimal: no (minimal twist has level 143)
Fricke sign: \(-1\)
Sato-Tate group: $\mathrm{SU}(2)$

Embedding invariants

Embedding label 1.5
Root \(0.388321\) of defining polynomial
Character \(\chi\) \(=\) 1859.1

$q$-expansion

comment: q-expansion
 
sage: f.q_expansion() # note that sage often uses an isomorphic number field
 
gp: mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q-0.388321 q^{2} +3.09988 q^{3} -7.84921 q^{4} -16.8933 q^{5} -1.20375 q^{6} -26.1569 q^{7} +6.15457 q^{8} -17.3907 q^{9} +O(q^{10})\) \(q-0.388321 q^{2} +3.09988 q^{3} -7.84921 q^{4} -16.8933 q^{5} -1.20375 q^{6} -26.1569 q^{7} +6.15457 q^{8} -17.3907 q^{9} +6.56001 q^{10} +11.0000 q^{11} -24.3316 q^{12} +10.1573 q^{14} -52.3671 q^{15} +60.4037 q^{16} +80.2409 q^{17} +6.75319 q^{18} -97.0754 q^{19} +132.599 q^{20} -81.0832 q^{21} -4.27153 q^{22} +173.956 q^{23} +19.0784 q^{24} +160.383 q^{25} -137.606 q^{27} +205.311 q^{28} -40.5745 q^{29} +20.3352 q^{30} +234.483 q^{31} -72.6926 q^{32} +34.0987 q^{33} -31.1592 q^{34} +441.876 q^{35} +136.504 q^{36} +31.5992 q^{37} +37.6964 q^{38} -103.971 q^{40} +447.194 q^{41} +31.4863 q^{42} -291.357 q^{43} -86.3413 q^{44} +293.787 q^{45} -67.5507 q^{46} -361.139 q^{47} +187.244 q^{48} +341.183 q^{49} -62.2801 q^{50} +248.737 q^{51} -313.121 q^{53} +53.4352 q^{54} -185.826 q^{55} -160.985 q^{56} -300.922 q^{57} +15.7559 q^{58} -27.1513 q^{59} +411.041 q^{60} +305.678 q^{61} -91.0544 q^{62} +454.888 q^{63} -455.002 q^{64} -13.2412 q^{66} +998.792 q^{67} -629.827 q^{68} +539.243 q^{69} -171.590 q^{70} -548.738 q^{71} -107.033 q^{72} +596.069 q^{73} -12.2706 q^{74} +497.168 q^{75} +761.965 q^{76} -287.726 q^{77} -370.922 q^{79} -1020.42 q^{80} +42.9884 q^{81} -173.655 q^{82} +1383.29 q^{83} +636.439 q^{84} -1355.53 q^{85} +113.140 q^{86} -125.776 q^{87} +67.7003 q^{88} -928.836 q^{89} -114.084 q^{90} -1365.42 q^{92} +726.868 q^{93} +140.238 q^{94} +1639.92 q^{95} -225.338 q^{96} -1082.85 q^{97} -132.488 q^{98} -191.298 q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 9 q + 8 q^{3} + 46 q^{4} - 30 q^{5} - 34 q^{6} - 25 q^{7} - 36 q^{8} + 91 q^{9}+O(q^{10}) \) Copy content Toggle raw display \( 9 q + 8 q^{3} + 46 q^{4} - 30 q^{5} - 34 q^{6} - 25 q^{7} - 36 q^{8} + 91 q^{9} - 22 q^{10} + 99 q^{11} + 181 q^{12} - 351 q^{15} + 130 q^{16} + 53 q^{17} - 33 q^{18} - 69 q^{19} - 282 q^{20} - 463 q^{21} + 216 q^{23} + 121 q^{24} + 617 q^{25} + 275 q^{27} - 279 q^{28} - 91 q^{29} + 29 q^{30} - 636 q^{31} - 663 q^{32} + 88 q^{33} - 423 q^{34} - 358 q^{35} - 252 q^{36} - 967 q^{37} - 101 q^{38} + 652 q^{40} + 226 q^{41} - 1186 q^{42} + 42 q^{43} + 506 q^{44} - 5 q^{45} + 1127 q^{46} + 269 q^{47} - 1820 q^{48} + 228 q^{49} + 1374 q^{50} - 589 q^{51} + 1227 q^{53} + 2438 q^{54} - 330 q^{55} - 659 q^{56} + 71 q^{57} - 471 q^{58} + 613 q^{59} + 859 q^{60} + 427 q^{61} - 1714 q^{62} - 305 q^{63} - 1194 q^{64} - 374 q^{66} + 271 q^{67} - 2835 q^{68} - 846 q^{69} + 102 q^{70} - 2279 q^{71} + 2400 q^{72} - 3602 q^{73} - 4955 q^{74} - 883 q^{75} - 1126 q^{76} - 275 q^{77} - 1182 q^{79} + 2360 q^{80} + 2697 q^{81} + 1007 q^{82} + 1877 q^{83} - 1618 q^{84} + 441 q^{85} - 830 q^{86} + 1942 q^{87} - 396 q^{88} - 1258 q^{89} - 5669 q^{90} + 1046 q^{92} - 1556 q^{93} + 1439 q^{94} + 2032 q^{95} + 3417 q^{96} - 4002 q^{97} + 1855 q^{98} + 1001 q^{99}+O(q^{100}) \) 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:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) −0.388321 −0.137292 −0.0686460 0.997641i \(-0.521868\pi\)
−0.0686460 + 0.997641i \(0.521868\pi\)
\(3\) 3.09988 0.596572 0.298286 0.954477i \(-0.403585\pi\)
0.298286 + 0.954477i \(0.403585\pi\)
\(4\) −7.84921 −0.981151
\(5\) −16.8933 −1.51098 −0.755491 0.655159i \(-0.772601\pi\)
−0.755491 + 0.655159i \(0.772601\pi\)
\(6\) −1.20375 −0.0819046
\(7\) −26.1569 −1.41234 −0.706170 0.708042i \(-0.749578\pi\)
−0.706170 + 0.708042i \(0.749578\pi\)
\(8\) 6.15457 0.271996
\(9\) −17.3907 −0.644102
\(10\) 6.56001 0.207446
\(11\) 11.0000 0.301511
\(12\) −24.3316 −0.585327
\(13\) 0 0
\(14\) 10.1573 0.193903
\(15\) −52.3671 −0.901409
\(16\) 60.4037 0.943808
\(17\) 80.2409 1.14478 0.572390 0.819981i \(-0.306016\pi\)
0.572390 + 0.819981i \(0.306016\pi\)
\(18\) 6.75319 0.0884301
\(19\) −97.0754 −1.17214 −0.586069 0.810261i \(-0.699325\pi\)
−0.586069 + 0.810261i \(0.699325\pi\)
\(20\) 132.599 1.48250
\(21\) −81.0832 −0.842562
\(22\) −4.27153 −0.0413951
\(23\) 173.956 1.57706 0.788529 0.614997i \(-0.210843\pi\)
0.788529 + 0.614997i \(0.210843\pi\)
\(24\) 19.0784 0.162265
\(25\) 160.383 1.28306
\(26\) 0 0
\(27\) −137.606 −0.980825
\(28\) 205.311 1.38572
\(29\) −40.5745 −0.259810 −0.129905 0.991526i \(-0.541467\pi\)
−0.129905 + 0.991526i \(0.541467\pi\)
\(30\) 20.3352 0.123756
\(31\) 234.483 1.35853 0.679263 0.733895i \(-0.262299\pi\)
0.679263 + 0.733895i \(0.262299\pi\)
\(32\) −72.6926 −0.401574
\(33\) 34.0987 0.179873
\(34\) −31.1592 −0.157169
\(35\) 441.876 2.13402
\(36\) 136.504 0.631961
\(37\) 31.5992 0.140402 0.0702010 0.997533i \(-0.477636\pi\)
0.0702010 + 0.997533i \(0.477636\pi\)
\(38\) 37.6964 0.160925
\(39\) 0 0
\(40\) −103.971 −0.410981
\(41\) 447.194 1.70342 0.851708 0.524017i \(-0.175567\pi\)
0.851708 + 0.524017i \(0.175567\pi\)
\(42\) 31.4863 0.115677
\(43\) −291.357 −1.03329 −0.516646 0.856199i \(-0.672820\pi\)
−0.516646 + 0.856199i \(0.672820\pi\)
\(44\) −86.3413 −0.295828
\(45\) 293.787 0.973226
\(46\) −67.5507 −0.216518
\(47\) −361.139 −1.12080 −0.560400 0.828222i \(-0.689353\pi\)
−0.560400 + 0.828222i \(0.689353\pi\)
\(48\) 187.244 0.563049
\(49\) 341.183 0.994703
\(50\) −62.2801 −0.176155
\(51\) 248.737 0.682944
\(52\) 0 0
\(53\) −313.121 −0.811519 −0.405759 0.913980i \(-0.632993\pi\)
−0.405759 + 0.913980i \(0.632993\pi\)
\(54\) 53.4352 0.134660
\(55\) −185.826 −0.455578
\(56\) −160.985 −0.384151
\(57\) −300.922 −0.699265
\(58\) 15.7559 0.0356698
\(59\) −27.1513 −0.0599118 −0.0299559 0.999551i \(-0.509537\pi\)
−0.0299559 + 0.999551i \(0.509537\pi\)
\(60\) 411.041 0.884418
\(61\) 305.678 0.641608 0.320804 0.947146i \(-0.396047\pi\)
0.320804 + 0.947146i \(0.396047\pi\)
\(62\) −91.0544 −0.186515
\(63\) 454.888 0.909691
\(64\) −455.002 −0.888675
\(65\) 0 0
\(66\) −13.2412 −0.0246952
\(67\) 998.792 1.82122 0.910611 0.413264i \(-0.135611\pi\)
0.910611 + 0.413264i \(0.135611\pi\)
\(68\) −629.827 −1.12320
\(69\) 539.243 0.940829
\(70\) −171.590 −0.292984
\(71\) −548.738 −0.917228 −0.458614 0.888636i \(-0.651654\pi\)
−0.458614 + 0.888636i \(0.651654\pi\)
\(72\) −107.033 −0.175193
\(73\) 596.069 0.955680 0.477840 0.878447i \(-0.341420\pi\)
0.477840 + 0.878447i \(0.341420\pi\)
\(74\) −12.2706 −0.0192761
\(75\) 497.168 0.765441
\(76\) 761.965 1.15004
\(77\) −287.726 −0.425836
\(78\) 0 0
\(79\) −370.922 −0.528254 −0.264127 0.964488i \(-0.585084\pi\)
−0.264127 + 0.964488i \(0.585084\pi\)
\(80\) −1020.42 −1.42608
\(81\) 42.9884 0.0589689
\(82\) −173.655 −0.233865
\(83\) 1383.29 1.82934 0.914671 0.404198i \(-0.132449\pi\)
0.914671 + 0.404198i \(0.132449\pi\)
\(84\) 636.439 0.826681
\(85\) −1355.53 −1.72974
\(86\) 113.140 0.141863
\(87\) −125.776 −0.154995
\(88\) 67.7003 0.0820100
\(89\) −928.836 −1.10625 −0.553126 0.833098i \(-0.686565\pi\)
−0.553126 + 0.833098i \(0.686565\pi\)
\(90\) −114.084 −0.133616
\(91\) 0 0
\(92\) −1365.42 −1.54733
\(93\) 726.868 0.810459
\(94\) 140.238 0.153877
\(95\) 1639.92 1.77108
\(96\) −225.338 −0.239568
\(97\) −1082.85 −1.13348 −0.566738 0.823898i \(-0.691795\pi\)
−0.566738 + 0.823898i \(0.691795\pi\)
\(98\) −132.488 −0.136565
\(99\) −191.298 −0.194204
\(100\) −1258.88 −1.25888
\(101\) 143.629 0.141501 0.0707507 0.997494i \(-0.477461\pi\)
0.0707507 + 0.997494i \(0.477461\pi\)
\(102\) −96.5897 −0.0937628
\(103\) 1055.62 1.00984 0.504920 0.863166i \(-0.331522\pi\)
0.504920 + 0.863166i \(0.331522\pi\)
\(104\) 0 0
\(105\) 1369.76 1.27310
\(106\) 121.591 0.111415
\(107\) −1507.85 −1.36233 −0.681166 0.732129i \(-0.738527\pi\)
−0.681166 + 0.732129i \(0.738527\pi\)
\(108\) 1080.10 0.962337
\(109\) −40.3152 −0.0354266 −0.0177133 0.999843i \(-0.505639\pi\)
−0.0177133 + 0.999843i \(0.505639\pi\)
\(110\) 72.1601 0.0625472
\(111\) 97.9536 0.0837599
\(112\) −1579.97 −1.33298
\(113\) −1378.35 −1.14747 −0.573735 0.819041i \(-0.694506\pi\)
−0.573735 + 0.819041i \(0.694506\pi\)
\(114\) 116.854 0.0960035
\(115\) −2938.69 −2.38291
\(116\) 318.477 0.254913
\(117\) 0 0
\(118\) 10.5434 0.00822542
\(119\) −2098.85 −1.61682
\(120\) −322.297 −0.245180
\(121\) 121.000 0.0909091
\(122\) −118.701 −0.0880876
\(123\) 1386.25 1.01621
\(124\) −1840.50 −1.33292
\(125\) −597.737 −0.427706
\(126\) −176.642 −0.124893
\(127\) 413.487 0.288906 0.144453 0.989512i \(-0.453858\pi\)
0.144453 + 0.989512i \(0.453858\pi\)
\(128\) 758.227 0.523582
\(129\) −903.173 −0.616434
\(130\) 0 0
\(131\) −1905.08 −1.27059 −0.635296 0.772269i \(-0.719122\pi\)
−0.635296 + 0.772269i \(0.719122\pi\)
\(132\) −267.648 −0.176483
\(133\) 2539.19 1.65546
\(134\) −387.852 −0.250039
\(135\) 2324.62 1.48201
\(136\) 493.848 0.311376
\(137\) 2360.37 1.47197 0.735985 0.676998i \(-0.236719\pi\)
0.735985 + 0.676998i \(0.236719\pi\)
\(138\) −209.399 −0.129168
\(139\) 2193.45 1.33846 0.669231 0.743054i \(-0.266623\pi\)
0.669231 + 0.743054i \(0.266623\pi\)
\(140\) −3468.38 −2.09379
\(141\) −1119.49 −0.668638
\(142\) 213.086 0.125928
\(143\) 0 0
\(144\) −1050.47 −0.607908
\(145\) 685.436 0.392568
\(146\) −231.466 −0.131207
\(147\) 1057.63 0.593412
\(148\) −248.028 −0.137756
\(149\) −1722.29 −0.946952 −0.473476 0.880807i \(-0.657001\pi\)
−0.473476 + 0.880807i \(0.657001\pi\)
\(150\) −193.061 −0.105089
\(151\) 1543.77 0.831988 0.415994 0.909367i \(-0.363434\pi\)
0.415994 + 0.909367i \(0.363434\pi\)
\(152\) −597.458 −0.318817
\(153\) −1395.45 −0.737355
\(154\) 111.730 0.0584640
\(155\) −3961.18 −2.05271
\(156\) 0 0
\(157\) 626.041 0.318239 0.159120 0.987259i \(-0.449134\pi\)
0.159120 + 0.987259i \(0.449134\pi\)
\(158\) 144.037 0.0725250
\(159\) −970.637 −0.484129
\(160\) 1228.02 0.606770
\(161\) −4550.15 −2.22734
\(162\) −16.6933 −0.00809597
\(163\) −2287.19 −1.09906 −0.549530 0.835474i \(-0.685193\pi\)
−0.549530 + 0.835474i \(0.685193\pi\)
\(164\) −3510.12 −1.67131
\(165\) −576.039 −0.271785
\(166\) −537.159 −0.251154
\(167\) 422.194 0.195631 0.0978154 0.995205i \(-0.468815\pi\)
0.0978154 + 0.995205i \(0.468815\pi\)
\(168\) −499.033 −0.229174
\(169\) 0 0
\(170\) 526.381 0.237480
\(171\) 1688.21 0.754976
\(172\) 2286.92 1.01382
\(173\) −94.3342 −0.0414572 −0.0207286 0.999785i \(-0.506599\pi\)
−0.0207286 + 0.999785i \(0.506599\pi\)
\(174\) 48.8414 0.0212796
\(175\) −4195.12 −1.81212
\(176\) 664.441 0.284569
\(177\) −84.1657 −0.0357417
\(178\) 360.686 0.151880
\(179\) −145.785 −0.0608741 −0.0304370 0.999537i \(-0.509690\pi\)
−0.0304370 + 0.999537i \(0.509690\pi\)
\(180\) −2305.99 −0.954881
\(181\) 951.575 0.390774 0.195387 0.980726i \(-0.437404\pi\)
0.195387 + 0.980726i \(0.437404\pi\)
\(182\) 0 0
\(183\) 947.565 0.382765
\(184\) 1070.63 0.428954
\(185\) −533.814 −0.212145
\(186\) −282.258 −0.111270
\(187\) 882.650 0.345164
\(188\) 2834.66 1.09967
\(189\) 3599.34 1.38526
\(190\) −636.816 −0.243155
\(191\) −804.423 −0.304744 −0.152372 0.988323i \(-0.548691\pi\)
−0.152372 + 0.988323i \(0.548691\pi\)
\(192\) −1410.45 −0.530159
\(193\) −2572.76 −0.959541 −0.479770 0.877394i \(-0.659280\pi\)
−0.479770 + 0.877394i \(0.659280\pi\)
\(194\) 420.495 0.155617
\(195\) 0 0
\(196\) −2678.02 −0.975954
\(197\) −2841.12 −1.02752 −0.513761 0.857934i \(-0.671748\pi\)
−0.513761 + 0.857934i \(0.671748\pi\)
\(198\) 74.2850 0.0266627
\(199\) 3073.36 1.09480 0.547399 0.836872i \(-0.315618\pi\)
0.547399 + 0.836872i \(0.315618\pi\)
\(200\) 987.090 0.348989
\(201\) 3096.14 1.08649
\(202\) −55.7741 −0.0194270
\(203\) 1061.30 0.366940
\(204\) −1952.39 −0.670071
\(205\) −7554.58 −2.57383
\(206\) −409.920 −0.138643
\(207\) −3025.23 −1.01579
\(208\) 0 0
\(209\) −1067.83 −0.353413
\(210\) −531.907 −0.174786
\(211\) −4014.76 −1.30989 −0.654946 0.755676i \(-0.727309\pi\)
−0.654946 + 0.755676i \(0.727309\pi\)
\(212\) 2457.75 0.796222
\(213\) −1701.02 −0.547192
\(214\) 585.530 0.187037
\(215\) 4921.98 1.56129
\(216\) −846.906 −0.266781
\(217\) −6133.34 −1.91870
\(218\) 15.6552 0.00486379
\(219\) 1847.74 0.570132
\(220\) 1458.59 0.446991
\(221\) 0 0
\(222\) −38.0374 −0.0114996
\(223\) 1161.62 0.348825 0.174413 0.984673i \(-0.444197\pi\)
0.174413 + 0.984673i \(0.444197\pi\)
\(224\) 1901.41 0.567158
\(225\) −2789.18 −0.826424
\(226\) 535.241 0.157539
\(227\) −834.066 −0.243872 −0.121936 0.992538i \(-0.538910\pi\)
−0.121936 + 0.992538i \(0.538910\pi\)
\(228\) 2362.00 0.686084
\(229\) −6536.75 −1.88629 −0.943146 0.332379i \(-0.892149\pi\)
−0.943146 + 0.332379i \(0.892149\pi\)
\(230\) 1141.15 0.327154
\(231\) −891.915 −0.254042
\(232\) −249.719 −0.0706673
\(233\) 651.253 0.183112 0.0915558 0.995800i \(-0.470816\pi\)
0.0915558 + 0.995800i \(0.470816\pi\)
\(234\) 0 0
\(235\) 6100.83 1.69351
\(236\) 213.116 0.0587825
\(237\) −1149.81 −0.315141
\(238\) 815.028 0.221976
\(239\) 2659.32 0.719738 0.359869 0.933003i \(-0.382821\pi\)
0.359869 + 0.933003i \(0.382821\pi\)
\(240\) −3163.17 −0.850757
\(241\) 4013.82 1.07283 0.536417 0.843953i \(-0.319778\pi\)
0.536417 + 0.843953i \(0.319778\pi\)
\(242\) −46.9868 −0.0124811
\(243\) 3848.62 1.01600
\(244\) −2399.33 −0.629514
\(245\) −5763.71 −1.50298
\(246\) −538.309 −0.139518
\(247\) 0 0
\(248\) 1443.14 0.369514
\(249\) 4288.02 1.09133
\(250\) 232.114 0.0587206
\(251\) −342.694 −0.0861779 −0.0430889 0.999071i \(-0.513720\pi\)
−0.0430889 + 0.999071i \(0.513720\pi\)
\(252\) −3570.51 −0.892544
\(253\) 1913.52 0.475501
\(254\) −160.566 −0.0396645
\(255\) −4201.99 −1.03192
\(256\) 3345.58 0.816791
\(257\) 2210.79 0.536597 0.268299 0.963336i \(-0.413539\pi\)
0.268299 + 0.963336i \(0.413539\pi\)
\(258\) 350.721 0.0846314
\(259\) −826.536 −0.198295
\(260\) 0 0
\(261\) 705.620 0.167344
\(262\) 739.781 0.174442
\(263\) −1806.70 −0.423597 −0.211799 0.977313i \(-0.567932\pi\)
−0.211799 + 0.977313i \(0.567932\pi\)
\(264\) 209.863 0.0489249
\(265\) 5289.64 1.22619
\(266\) −986.020 −0.227281
\(267\) −2879.28 −0.659959
\(268\) −7839.73 −1.78689
\(269\) 7775.99 1.76249 0.881246 0.472657i \(-0.156705\pi\)
0.881246 + 0.472657i \(0.156705\pi\)
\(270\) −902.697 −0.203468
\(271\) −4238.19 −0.950007 −0.475004 0.879984i \(-0.657553\pi\)
−0.475004 + 0.879984i \(0.657553\pi\)
\(272\) 4846.85 1.08045
\(273\) 0 0
\(274\) −916.580 −0.202090
\(275\) 1764.21 0.386859
\(276\) −4232.63 −0.923095
\(277\) 1673.47 0.362993 0.181497 0.983392i \(-0.441906\pi\)
0.181497 + 0.983392i \(0.441906\pi\)
\(278\) −851.763 −0.183760
\(279\) −4077.83 −0.875029
\(280\) 2719.56 0.580445
\(281\) 4575.71 0.971401 0.485701 0.874125i \(-0.338564\pi\)
0.485701 + 0.874125i \(0.338564\pi\)
\(282\) 434.720 0.0917987
\(283\) −253.322 −0.0532100 −0.0266050 0.999646i \(-0.508470\pi\)
−0.0266050 + 0.999646i \(0.508470\pi\)
\(284\) 4307.16 0.899939
\(285\) 5083.56 1.05658
\(286\) 0 0
\(287\) −11697.2 −2.40580
\(288\) 1264.18 0.258654
\(289\) 1525.60 0.310523
\(290\) −266.169 −0.0538965
\(291\) −3356.72 −0.676200
\(292\) −4678.67 −0.937666
\(293\) −1573.27 −0.313690 −0.156845 0.987623i \(-0.550132\pi\)
−0.156845 + 0.987623i \(0.550132\pi\)
\(294\) −410.698 −0.0814708
\(295\) 458.674 0.0905256
\(296\) 194.479 0.0381888
\(297\) −1513.67 −0.295730
\(298\) 668.803 0.130009
\(299\) 0 0
\(300\) −3902.38 −0.751013
\(301\) 7621.01 1.45936
\(302\) −599.478 −0.114225
\(303\) 445.233 0.0844157
\(304\) −5863.71 −1.10627
\(305\) −5163.91 −0.969457
\(306\) 541.882 0.101233
\(307\) 8406.39 1.56280 0.781398 0.624033i \(-0.214507\pi\)
0.781398 + 0.624033i \(0.214507\pi\)
\(308\) 2258.42 0.417810
\(309\) 3272.30 0.602442
\(310\) 1538.21 0.281821
\(311\) 4745.50 0.865249 0.432624 0.901574i \(-0.357588\pi\)
0.432624 + 0.901574i \(0.357588\pi\)
\(312\) 0 0
\(313\) 9805.81 1.77079 0.885395 0.464840i \(-0.153888\pi\)
0.885395 + 0.464840i \(0.153888\pi\)
\(314\) −243.105 −0.0436917
\(315\) −7684.55 −1.37453
\(316\) 2911.45 0.518296
\(317\) −2770.42 −0.490859 −0.245429 0.969414i \(-0.578929\pi\)
−0.245429 + 0.969414i \(0.578929\pi\)
\(318\) 376.919 0.0664671
\(319\) −446.319 −0.0783356
\(320\) 7686.47 1.34277
\(321\) −4674.16 −0.812729
\(322\) 1766.92 0.305796
\(323\) −7789.41 −1.34184
\(324\) −337.425 −0.0578574
\(325\) 0 0
\(326\) 888.164 0.150892
\(327\) −124.972 −0.0211345
\(328\) 2752.29 0.463323
\(329\) 9446.28 1.58295
\(330\) 223.688 0.0373139
\(331\) 3336.72 0.554086 0.277043 0.960858i \(-0.410646\pi\)
0.277043 + 0.960858i \(0.410646\pi\)
\(332\) −10857.7 −1.79486
\(333\) −549.533 −0.0904332
\(334\) −163.947 −0.0268586
\(335\) −16872.9 −2.75183
\(336\) −4897.73 −0.795217
\(337\) 3687.31 0.596025 0.298013 0.954562i \(-0.403676\pi\)
0.298013 + 0.954562i \(0.403676\pi\)
\(338\) 0 0
\(339\) −4272.72 −0.684549
\(340\) 10639.9 1.69714
\(341\) 2579.31 0.409611
\(342\) −655.568 −0.103652
\(343\) 47.5212 0.00748077
\(344\) −1793.18 −0.281052
\(345\) −9109.58 −1.42158
\(346\) 36.6319 0.00569175
\(347\) −4234.07 −0.655034 −0.327517 0.944845i \(-0.606212\pi\)
−0.327517 + 0.944845i \(0.606212\pi\)
\(348\) 987.241 0.152074
\(349\) 960.345 0.147295 0.0736477 0.997284i \(-0.476536\pi\)
0.0736477 + 0.997284i \(0.476536\pi\)
\(350\) 1629.05 0.248790
\(351\) 0 0
\(352\) −799.619 −0.121079
\(353\) 6308.96 0.951253 0.475626 0.879647i \(-0.342221\pi\)
0.475626 + 0.879647i \(0.342221\pi\)
\(354\) 32.6833 0.00490705
\(355\) 9269.98 1.38591
\(356\) 7290.63 1.08540
\(357\) −6506.19 −0.964549
\(358\) 56.6112 0.00835753
\(359\) 4547.64 0.668566 0.334283 0.942473i \(-0.391506\pi\)
0.334283 + 0.942473i \(0.391506\pi\)
\(360\) 1808.13 0.264714
\(361\) 2564.63 0.373907
\(362\) −369.516 −0.0536501
\(363\) 375.085 0.0542338
\(364\) 0 0
\(365\) −10069.6 −1.44401
\(366\) −367.959 −0.0525506
\(367\) −1485.93 −0.211348 −0.105674 0.994401i \(-0.533700\pi\)
−0.105674 + 0.994401i \(0.533700\pi\)
\(368\) 10507.6 1.48844
\(369\) −7777.05 −1.09717
\(370\) 207.291 0.0291258
\(371\) 8190.27 1.14614
\(372\) −5705.34 −0.795182
\(373\) −12173.5 −1.68987 −0.844933 0.534871i \(-0.820360\pi\)
−0.844933 + 0.534871i \(0.820360\pi\)
\(374\) −342.751 −0.0473883
\(375\) −1852.91 −0.255157
\(376\) −2222.66 −0.304853
\(377\) 0 0
\(378\) −1397.70 −0.190185
\(379\) 5305.96 0.719127 0.359563 0.933121i \(-0.382926\pi\)
0.359563 + 0.933121i \(0.382926\pi\)
\(380\) −12872.1 −1.73770
\(381\) 1281.76 0.172353
\(382\) 312.374 0.0418389
\(383\) 6021.94 0.803412 0.401706 0.915769i \(-0.368417\pi\)
0.401706 + 0.915769i \(0.368417\pi\)
\(384\) 2350.41 0.312354
\(385\) 4860.64 0.643431
\(386\) 999.056 0.131737
\(387\) 5066.92 0.665546
\(388\) 8499.55 1.11211
\(389\) −10050.1 −1.30993 −0.654963 0.755661i \(-0.727316\pi\)
−0.654963 + 0.755661i \(0.727316\pi\)
\(390\) 0 0
\(391\) 13958.4 1.80539
\(392\) 2099.84 0.270556
\(393\) −5905.51 −0.757999
\(394\) 1103.27 0.141071
\(395\) 6266.10 0.798181
\(396\) 1501.54 0.190543
\(397\) −10158.2 −1.28420 −0.642099 0.766622i \(-0.721936\pi\)
−0.642099 + 0.766622i \(0.721936\pi\)
\(398\) −1193.45 −0.150307
\(399\) 7871.18 0.987599
\(400\) 9687.73 1.21097
\(401\) 6932.82 0.863362 0.431681 0.902026i \(-0.357921\pi\)
0.431681 + 0.902026i \(0.357921\pi\)
\(402\) −1202.29 −0.149166
\(403\) 0 0
\(404\) −1127.37 −0.138834
\(405\) −726.215 −0.0891010
\(406\) −412.125 −0.0503779
\(407\) 347.591 0.0423328
\(408\) 1530.87 0.185758
\(409\) −11451.0 −1.38439 −0.692196 0.721709i \(-0.743357\pi\)
−0.692196 + 0.721709i \(0.743357\pi\)
\(410\) 2933.60 0.353366
\(411\) 7316.86 0.878136
\(412\) −8285.79 −0.990805
\(413\) 710.193 0.0846158
\(414\) 1174.76 0.139459
\(415\) −23368.3 −2.76410
\(416\) 0 0
\(417\) 6799.44 0.798489
\(418\) 414.660 0.0485208
\(419\) −4201.20 −0.489838 −0.244919 0.969543i \(-0.578761\pi\)
−0.244919 + 0.969543i \(0.578761\pi\)
\(420\) −10751.5 −1.24910
\(421\) −13940.1 −1.61377 −0.806885 0.590709i \(-0.798848\pi\)
−0.806885 + 0.590709i \(0.798848\pi\)
\(422\) 1559.01 0.179838
\(423\) 6280.48 0.721909
\(424\) −1927.13 −0.220730
\(425\) 12869.3 1.46883
\(426\) 660.541 0.0751252
\(427\) −7995.59 −0.906168
\(428\) 11835.4 1.33665
\(429\) 0 0
\(430\) −1911.31 −0.214352
\(431\) 1690.07 0.188882 0.0944409 0.995530i \(-0.469894\pi\)
0.0944409 + 0.995530i \(0.469894\pi\)
\(432\) −8311.91 −0.925711
\(433\) 2726.88 0.302646 0.151323 0.988484i \(-0.451647\pi\)
0.151323 + 0.988484i \(0.451647\pi\)
\(434\) 2381.70 0.263422
\(435\) 2124.77 0.234195
\(436\) 316.442 0.0347588
\(437\) −16886.9 −1.84853
\(438\) −717.516 −0.0782746
\(439\) −17479.5 −1.90034 −0.950171 0.311729i \(-0.899092\pi\)
−0.950171 + 0.311729i \(0.899092\pi\)
\(440\) −1143.68 −0.123916
\(441\) −5933.43 −0.640690
\(442\) 0 0
\(443\) −17567.5 −1.88411 −0.942053 0.335465i \(-0.891107\pi\)
−0.942053 + 0.335465i \(0.891107\pi\)
\(444\) −768.858 −0.0821811
\(445\) 15691.1 1.67153
\(446\) −451.082 −0.0478909
\(447\) −5338.91 −0.564925
\(448\) 11901.4 1.25511
\(449\) −574.698 −0.0604046 −0.0302023 0.999544i \(-0.509615\pi\)
−0.0302023 + 0.999544i \(0.509615\pi\)
\(450\) 1083.10 0.113462
\(451\) 4919.14 0.513599
\(452\) 10818.9 1.12584
\(453\) 4785.50 0.496341
\(454\) 323.885 0.0334817
\(455\) 0 0
\(456\) −1852.05 −0.190197
\(457\) −18260.0 −1.86907 −0.934535 0.355871i \(-0.884184\pi\)
−0.934535 + 0.355871i \(0.884184\pi\)
\(458\) 2538.36 0.258973
\(459\) −11041.6 −1.12283
\(460\) 23066.4 2.33799
\(461\) −5790.45 −0.585007 −0.292504 0.956264i \(-0.594488\pi\)
−0.292504 + 0.956264i \(0.594488\pi\)
\(462\) 346.349 0.0348780
\(463\) −10900.8 −1.09418 −0.547088 0.837075i \(-0.684264\pi\)
−0.547088 + 0.837075i \(0.684264\pi\)
\(464\) −2450.85 −0.245211
\(465\) −12279.2 −1.22459
\(466\) −252.895 −0.0251398
\(467\) 5359.64 0.531080 0.265540 0.964100i \(-0.414450\pi\)
0.265540 + 0.964100i \(0.414450\pi\)
\(468\) 0 0
\(469\) −26125.3 −2.57218
\(470\) −2369.08 −0.232505
\(471\) 1940.65 0.189853
\(472\) −167.105 −0.0162958
\(473\) −3204.93 −0.311549
\(474\) 446.497 0.0432664
\(475\) −15569.3 −1.50393
\(476\) 16474.3 1.58634
\(477\) 5445.41 0.522701
\(478\) −1032.67 −0.0988143
\(479\) −9865.45 −0.941052 −0.470526 0.882386i \(-0.655936\pi\)
−0.470526 + 0.882386i \(0.655936\pi\)
\(480\) 3806.70 0.361982
\(481\) 0 0
\(482\) −1558.65 −0.147292
\(483\) −14104.9 −1.32877
\(484\) −949.754 −0.0891955
\(485\) 18293.0 1.71266
\(486\) −1494.50 −0.139489
\(487\) 1295.82 0.120573 0.0602865 0.998181i \(-0.480799\pi\)
0.0602865 + 0.998181i \(0.480799\pi\)
\(488\) 1881.32 0.174515
\(489\) −7090.02 −0.655668
\(490\) 2238.17 0.206347
\(491\) 8703.05 0.799925 0.399962 0.916532i \(-0.369023\pi\)
0.399962 + 0.916532i \(0.369023\pi\)
\(492\) −10881.0 −0.997055
\(493\) −3255.73 −0.297425
\(494\) 0 0
\(495\) 3231.66 0.293439
\(496\) 14163.6 1.28219
\(497\) 14353.3 1.29544
\(498\) −1665.13 −0.149832
\(499\) 18369.1 1.64793 0.823963 0.566643i \(-0.191758\pi\)
0.823963 + 0.566643i \(0.191758\pi\)
\(500\) 4691.76 0.419644
\(501\) 1308.75 0.116708
\(502\) 133.075 0.0118315
\(503\) −15592.1 −1.38214 −0.691071 0.722787i \(-0.742861\pi\)
−0.691071 + 0.722787i \(0.742861\pi\)
\(504\) 2799.64 0.247432
\(505\) −2426.37 −0.213806
\(506\) −743.058 −0.0652825
\(507\) 0 0
\(508\) −3245.55 −0.283460
\(509\) −5263.23 −0.458327 −0.229164 0.973388i \(-0.573599\pi\)
−0.229164 + 0.973388i \(0.573599\pi\)
\(510\) 1631.72 0.141674
\(511\) −15591.3 −1.34974
\(512\) −7364.97 −0.635721
\(513\) 13358.2 1.14966
\(514\) −858.497 −0.0736706
\(515\) −17832.9 −1.52585
\(516\) 7089.19 0.604814
\(517\) −3972.53 −0.337934
\(518\) 320.961 0.0272244
\(519\) −292.425 −0.0247322
\(520\) 0 0
\(521\) −5050.74 −0.424716 −0.212358 0.977192i \(-0.568114\pi\)
−0.212358 + 0.977192i \(0.568114\pi\)
\(522\) −274.007 −0.0229750
\(523\) 9314.66 0.778779 0.389390 0.921073i \(-0.372686\pi\)
0.389390 + 0.921073i \(0.372686\pi\)
\(524\) 14953.4 1.24664
\(525\) −13004.4 −1.08106
\(526\) 701.580 0.0581566
\(527\) 18815.1 1.55521
\(528\) 2059.69 0.169766
\(529\) 18093.7 1.48711
\(530\) −2054.08 −0.168346
\(531\) 472.181 0.0385893
\(532\) −19930.6 −1.62425
\(533\) 0 0
\(534\) 1118.08 0.0906072
\(535\) 25472.6 2.05846
\(536\) 6147.14 0.495366
\(537\) −451.915 −0.0363158
\(538\) −3019.58 −0.241976
\(539\) 3753.02 0.299914
\(540\) −18246.4 −1.45407
\(541\) −12179.3 −0.967889 −0.483944 0.875099i \(-0.660796\pi\)
−0.483944 + 0.875099i \(0.660796\pi\)
\(542\) 1645.78 0.130428
\(543\) 2949.77 0.233125
\(544\) −5832.92 −0.459714
\(545\) 681.056 0.0535289
\(546\) 0 0
\(547\) 19581.3 1.53060 0.765298 0.643676i \(-0.222592\pi\)
0.765298 + 0.643676i \(0.222592\pi\)
\(548\) −18527.0 −1.44423
\(549\) −5315.97 −0.413261
\(550\) −685.081 −0.0531126
\(551\) 3938.78 0.304533
\(552\) 3318.81 0.255902
\(553\) 9702.18 0.746073
\(554\) −649.843 −0.0498361
\(555\) −1654.76 −0.126560
\(556\) −17216.9 −1.31323
\(557\) 8584.07 0.652996 0.326498 0.945198i \(-0.394131\pi\)
0.326498 + 0.945198i \(0.394131\pi\)
\(558\) 1583.50 0.120135
\(559\) 0 0
\(560\) 26690.9 2.01410
\(561\) 2736.11 0.205915
\(562\) −1776.84 −0.133366
\(563\) −1319.00 −0.0987375 −0.0493688 0.998781i \(-0.515721\pi\)
−0.0493688 + 0.998781i \(0.515721\pi\)
\(564\) 8787.10 0.656035
\(565\) 23284.8 1.73381
\(566\) 98.3702 0.00730531
\(567\) −1124.44 −0.0832842
\(568\) −3377.25 −0.249483
\(569\) 7345.65 0.541205 0.270603 0.962691i \(-0.412777\pi\)
0.270603 + 0.962691i \(0.412777\pi\)
\(570\) −1974.05 −0.145059
\(571\) −7322.64 −0.536678 −0.268339 0.963325i \(-0.586475\pi\)
−0.268339 + 0.963325i \(0.586475\pi\)
\(572\) 0 0
\(573\) −2493.61 −0.181801
\(574\) 4542.27 0.330297
\(575\) 27899.6 2.02347
\(576\) 7912.82 0.572397
\(577\) −8781.69 −0.633599 −0.316799 0.948493i \(-0.602608\pi\)
−0.316799 + 0.948493i \(0.602608\pi\)
\(578\) −592.422 −0.0426324
\(579\) −7975.25 −0.572435
\(580\) −5380.13 −0.385168
\(581\) −36182.5 −2.58365
\(582\) 1303.48 0.0928369
\(583\) −3444.33 −0.244682
\(584\) 3668.55 0.259941
\(585\) 0 0
\(586\) 610.931 0.0430671
\(587\) −23072.1 −1.62229 −0.811147 0.584842i \(-0.801157\pi\)
−0.811147 + 0.584842i \(0.801157\pi\)
\(588\) −8301.53 −0.582227
\(589\) −22762.5 −1.59238
\(590\) −178.113 −0.0124284
\(591\) −8807.14 −0.612990
\(592\) 1908.71 0.132512
\(593\) −4835.36 −0.334848 −0.167424 0.985885i \(-0.553545\pi\)
−0.167424 + 0.985885i \(0.553545\pi\)
\(594\) 587.788 0.0406014
\(595\) 35456.5 2.44298
\(596\) 13518.6 0.929103
\(597\) 9527.05 0.653126
\(598\) 0 0
\(599\) 18398.9 1.25502 0.627512 0.778607i \(-0.284073\pi\)
0.627512 + 0.778607i \(0.284073\pi\)
\(600\) 3059.86 0.208197
\(601\) 4647.76 0.315451 0.157726 0.987483i \(-0.449584\pi\)
0.157726 + 0.987483i \(0.449584\pi\)
\(602\) −2959.39 −0.200359
\(603\) −17369.7 −1.17305
\(604\) −12117.4 −0.816306
\(605\) −2044.09 −0.137362
\(606\) −172.893 −0.0115896
\(607\) −23180.5 −1.55003 −0.775015 0.631943i \(-0.782258\pi\)
−0.775015 + 0.631943i \(0.782258\pi\)
\(608\) 7056.66 0.470700
\(609\) 3289.91 0.218906
\(610\) 2005.25 0.133099
\(611\) 0 0
\(612\) 10953.2 0.723457
\(613\) −14114.2 −0.929965 −0.464982 0.885320i \(-0.653939\pi\)
−0.464982 + 0.885320i \(0.653939\pi\)
\(614\) −3264.38 −0.214559
\(615\) −23418.3 −1.53547
\(616\) −1770.83 −0.115826
\(617\) 7122.52 0.464735 0.232368 0.972628i \(-0.425353\pi\)
0.232368 + 0.972628i \(0.425353\pi\)
\(618\) −1270.70 −0.0827105
\(619\) −5509.59 −0.357753 −0.178877 0.983872i \(-0.557246\pi\)
−0.178877 + 0.983872i \(0.557246\pi\)
\(620\) 31092.1 2.01402
\(621\) −23937.4 −1.54682
\(622\) −1842.77 −0.118792
\(623\) 24295.5 1.56240
\(624\) 0 0
\(625\) −9950.15 −0.636810
\(626\) −3807.80 −0.243115
\(627\) −3310.14 −0.210836
\(628\) −4913.93 −0.312241
\(629\) 2535.55 0.160729
\(630\) 2984.07 0.188711
\(631\) −7677.54 −0.484371 −0.242185 0.970230i \(-0.577864\pi\)
−0.242185 + 0.970230i \(0.577864\pi\)
\(632\) −2282.87 −0.143683
\(633\) −12445.3 −0.781445
\(634\) 1075.81 0.0673910
\(635\) −6985.15 −0.436531
\(636\) 7618.73 0.475004
\(637\) 0 0
\(638\) 173.315 0.0107549
\(639\) 9542.96 0.590788
\(640\) −12808.9 −0.791122
\(641\) −17836.4 −1.09906 −0.549530 0.835474i \(-0.685193\pi\)
−0.549530 + 0.835474i \(0.685193\pi\)
\(642\) 1815.07 0.111581
\(643\) −20385.9 −1.25030 −0.625148 0.780506i \(-0.714961\pi\)
−0.625148 + 0.780506i \(0.714961\pi\)
\(644\) 35715.1 2.18536
\(645\) 15257.6 0.931420
\(646\) 3024.79 0.184224
\(647\) −16906.7 −1.02731 −0.513656 0.857997i \(-0.671709\pi\)
−0.513656 + 0.857997i \(0.671709\pi\)
\(648\) 264.575 0.0160393
\(649\) −298.664 −0.0180641
\(650\) 0 0
\(651\) −19012.6 −1.14464
\(652\) 17952.6 1.07834
\(653\) −23768.4 −1.42439 −0.712196 0.701981i \(-0.752299\pi\)
−0.712196 + 0.701981i \(0.752299\pi\)
\(654\) 48.5293 0.00290160
\(655\) 32183.0 1.91984
\(656\) 27012.2 1.60770
\(657\) −10366.1 −0.615555
\(658\) −3668.19 −0.217326
\(659\) 12086.8 0.714469 0.357234 0.934015i \(-0.383720\pi\)
0.357234 + 0.934015i \(0.383720\pi\)
\(660\) 4521.45 0.266662
\(661\) 27808.1 1.63632 0.818162 0.574987i \(-0.194993\pi\)
0.818162 + 0.574987i \(0.194993\pi\)
\(662\) −1295.72 −0.0760716
\(663\) 0 0
\(664\) 8513.54 0.497575
\(665\) −42895.3 −2.50136
\(666\) 213.395 0.0124158
\(667\) −7058.17 −0.409736
\(668\) −3313.89 −0.191943
\(669\) 3600.89 0.208099
\(670\) 6552.09 0.377805
\(671\) 3362.46 0.193452
\(672\) 5894.15 0.338351
\(673\) 23925.2 1.37036 0.685178 0.728375i \(-0.259724\pi\)
0.685178 + 0.728375i \(0.259724\pi\)
\(674\) −1431.86 −0.0818296
\(675\) −22069.7 −1.25846
\(676\) 0 0
\(677\) 14944.4 0.848387 0.424194 0.905571i \(-0.360558\pi\)
0.424194 + 0.905571i \(0.360558\pi\)
\(678\) 1659.18 0.0939831
\(679\) 28324.1 1.60085
\(680\) −8342.72 −0.470484
\(681\) −2585.50 −0.145487
\(682\) −1001.60 −0.0562364
\(683\) 1419.94 0.0795499 0.0397749 0.999209i \(-0.487336\pi\)
0.0397749 + 0.999209i \(0.487336\pi\)
\(684\) −13251.1 −0.740745
\(685\) −39874.4 −2.22412
\(686\) −18.4535 −0.00102705
\(687\) −20263.1 −1.12531
\(688\) −17599.1 −0.975230
\(689\) 0 0
\(690\) 3537.44 0.195171
\(691\) −12724.8 −0.700540 −0.350270 0.936649i \(-0.613910\pi\)
−0.350270 + 0.936649i \(0.613910\pi\)
\(692\) 740.449 0.0406758
\(693\) 5003.77 0.274282
\(694\) 1644.18 0.0899309
\(695\) −37054.6 −2.02239
\(696\) −774.097 −0.0421582
\(697\) 35883.3 1.95004
\(698\) −372.922 −0.0202225
\(699\) 2018.81 0.109239
\(700\) 32928.4 1.77797
\(701\) 828.514 0.0446399 0.0223199 0.999751i \(-0.492895\pi\)
0.0223199 + 0.999751i \(0.492895\pi\)
\(702\) 0 0
\(703\) −3067.50 −0.164570
\(704\) −5005.02 −0.267946
\(705\) 18911.8 1.01030
\(706\) −2449.90 −0.130599
\(707\) −3756.89 −0.199848
\(708\) 660.634 0.0350680
\(709\) 12499.3 0.662087 0.331044 0.943615i \(-0.392599\pi\)
0.331044 + 0.943615i \(0.392599\pi\)
\(710\) −3599.72 −0.190275
\(711\) 6450.62 0.340249
\(712\) −5716.59 −0.300897
\(713\) 40789.7 2.14248
\(714\) 2526.49 0.132425
\(715\) 0 0
\(716\) 1144.29 0.0597266
\(717\) 8243.58 0.429376
\(718\) −1765.94 −0.0917889
\(719\) −29160.2 −1.51251 −0.756254 0.654278i \(-0.772972\pi\)
−0.756254 + 0.654278i \(0.772972\pi\)
\(720\) 17745.8 0.918538
\(721\) −27611.8 −1.42624
\(722\) −995.898 −0.0513345
\(723\) 12442.4 0.640022
\(724\) −7469.11 −0.383408
\(725\) −6507.46 −0.333353
\(726\) −145.653 −0.00744587
\(727\) 16792.6 0.856676 0.428338 0.903619i \(-0.359099\pi\)
0.428338 + 0.903619i \(0.359099\pi\)
\(728\) 0 0
\(729\) 10769.6 0.547151
\(730\) 3910.22 0.198252
\(731\) −23378.8 −1.18289
\(732\) −7437.64 −0.375550
\(733\) −13898.3 −0.700333 −0.350167 0.936687i \(-0.613875\pi\)
−0.350167 + 0.936687i \(0.613875\pi\)
\(734\) 577.016 0.0290164
\(735\) −17866.8 −0.896635
\(736\) −12645.3 −0.633305
\(737\) 10986.7 0.549119
\(738\) 3019.99 0.150633
\(739\) −18553.3 −0.923536 −0.461768 0.887001i \(-0.652785\pi\)
−0.461768 + 0.887001i \(0.652785\pi\)
\(740\) 4190.02 0.208146
\(741\) 0 0
\(742\) −3180.45 −0.157356
\(743\) −6605.17 −0.326138 −0.163069 0.986615i \(-0.552139\pi\)
−0.163069 + 0.986615i \(0.552139\pi\)
\(744\) 4473.56 0.220442
\(745\) 29095.2 1.43083
\(746\) 4727.22 0.232005
\(747\) −24056.4 −1.17828
\(748\) −6928.10 −0.338658
\(749\) 39440.7 1.92408
\(750\) 719.524 0.0350311
\(751\) 27529.8 1.33765 0.668827 0.743418i \(-0.266797\pi\)
0.668827 + 0.743418i \(0.266797\pi\)
\(752\) −21814.2 −1.05782
\(753\) −1062.31 −0.0514113
\(754\) 0 0
\(755\) −26079.4 −1.25712
\(756\) −28252.0 −1.35915
\(757\) 3426.76 0.164528 0.0822641 0.996611i \(-0.473785\pi\)
0.0822641 + 0.996611i \(0.473785\pi\)
\(758\) −2060.42 −0.0987304
\(759\) 5931.67 0.283671
\(760\) 10093.0 0.481727
\(761\) 27501.2 1.31001 0.655005 0.755625i \(-0.272667\pi\)
0.655005 + 0.755625i \(0.272667\pi\)
\(762\) −497.734 −0.0236627
\(763\) 1054.52 0.0500343
\(764\) 6314.08 0.298999
\(765\) 23573.7 1.11413
\(766\) −2338.44 −0.110302
\(767\) 0 0
\(768\) 10370.9 0.487275
\(769\) 4717.83 0.221234 0.110617 0.993863i \(-0.464717\pi\)
0.110617 + 0.993863i \(0.464717\pi\)
\(770\) −1887.48 −0.0883380
\(771\) 6853.20 0.320119
\(772\) 20194.1 0.941454
\(773\) 11526.9 0.536344 0.268172 0.963371i \(-0.413581\pi\)
0.268172 + 0.963371i \(0.413581\pi\)
\(774\) −1967.59 −0.0913742
\(775\) 37607.0 1.74308
\(776\) −6664.51 −0.308301
\(777\) −2562.16 −0.118297
\(778\) 3902.67 0.179842
\(779\) −43411.6 −1.99664
\(780\) 0 0
\(781\) −6036.11 −0.276555
\(782\) −5420.33 −0.247865
\(783\) 5583.29 0.254828
\(784\) 20608.7 0.938809
\(785\) −10575.9 −0.480853
\(786\) 2293.23 0.104067
\(787\) −6868.27 −0.311090 −0.155545 0.987829i \(-0.549713\pi\)
−0.155545 + 0.987829i \(0.549713\pi\)
\(788\) 22300.6 1.00815
\(789\) −5600.56 −0.252706
\(790\) −2433.26 −0.109584
\(791\) 36053.3 1.62062
\(792\) −1177.36 −0.0528228
\(793\) 0 0
\(794\) 3944.65 0.176310
\(795\) 16397.3 0.731510
\(796\) −24123.5 −1.07416
\(797\) −13049.8 −0.579983 −0.289991 0.957029i \(-0.593652\pi\)
−0.289991 + 0.957029i \(0.593652\pi\)
\(798\) −3056.54 −0.135590
\(799\) −28978.1 −1.28307
\(800\) −11658.7 −0.515245
\(801\) 16153.2 0.712539
\(802\) −2692.16 −0.118533
\(803\) 6556.76 0.288148
\(804\) −24302.2 −1.06601
\(805\) 76867.0 3.36547
\(806\) 0 0
\(807\) 24104.6 1.05145
\(808\) 883.976 0.0384878
\(809\) 13499.8 0.586685 0.293343 0.956007i \(-0.405232\pi\)
0.293343 + 0.956007i \(0.405232\pi\)
\(810\) 282.004 0.0122329
\(811\) 13092.8 0.566893 0.283447 0.958988i \(-0.408522\pi\)
0.283447 + 0.958988i \(0.408522\pi\)
\(812\) −8330.38 −0.360023
\(813\) −13137.9 −0.566748
\(814\) −134.977 −0.00581196
\(815\) 38638.2 1.66066
\(816\) 15024.6 0.644568
\(817\) 28283.6 1.21116
\(818\) 4446.67 0.190066
\(819\) 0 0
\(820\) 59297.5 2.52531
\(821\) 19444.8 0.826588 0.413294 0.910598i \(-0.364378\pi\)
0.413294 + 0.910598i \(0.364378\pi\)
\(822\) −2841.29 −0.120561
\(823\) −9237.46 −0.391249 −0.195624 0.980679i \(-0.562673\pi\)
−0.195624 + 0.980679i \(0.562673\pi\)
\(824\) 6496.90 0.274673
\(825\) 5468.85 0.230789
\(826\) −275.783 −0.0116171
\(827\) 24430.4 1.02724 0.513620 0.858018i \(-0.328304\pi\)
0.513620 + 0.858018i \(0.328304\pi\)
\(828\) 23745.6 0.996640
\(829\) 19965.7 0.836473 0.418237 0.908338i \(-0.362648\pi\)
0.418237 + 0.908338i \(0.362648\pi\)
\(830\) 9074.38 0.379489
\(831\) 5187.55 0.216551
\(832\) 0 0
\(833\) 27376.8 1.13872
\(834\) −2640.36 −0.109626
\(835\) −7132.24 −0.295595
\(836\) 8381.61 0.346751
\(837\) −32266.2 −1.33248
\(838\) 1631.41 0.0672509
\(839\) −43310.0 −1.78216 −0.891078 0.453851i \(-0.850050\pi\)
−0.891078 + 0.453851i \(0.850050\pi\)
\(840\) 8430.30 0.346277
\(841\) −22742.7 −0.932499
\(842\) 5413.21 0.221558
\(843\) 14184.1 0.579511
\(844\) 31512.6 1.28520
\(845\) 0 0
\(846\) −2438.84 −0.0991124
\(847\) −3164.98 −0.128395
\(848\) −18913.7 −0.765918
\(849\) −785.268 −0.0317436
\(850\) −4997.41 −0.201658
\(851\) 5496.87 0.221422
\(852\) 13351.7 0.536878
\(853\) 38615.6 1.55003 0.775014 0.631944i \(-0.217743\pi\)
0.775014 + 0.631944i \(0.217743\pi\)
\(854\) 3104.85 0.124410
\(855\) −28519.5 −1.14075
\(856\) −9280.18 −0.370549
\(857\) 35769.1 1.42573 0.712863 0.701303i \(-0.247398\pi\)
0.712863 + 0.701303i \(0.247398\pi\)
\(858\) 0 0
\(859\) −45037.0 −1.78887 −0.894437 0.447194i \(-0.852423\pi\)
−0.894437 + 0.447194i \(0.852423\pi\)
\(860\) −38633.7 −1.53186
\(861\) −36260.0 −1.43523
\(862\) −656.291 −0.0259320
\(863\) 1064.65 0.0419941 0.0209971 0.999780i \(-0.493316\pi\)
0.0209971 + 0.999780i \(0.493316\pi\)
\(864\) 10002.9 0.393874
\(865\) 1593.61 0.0626411
\(866\) −1058.91 −0.0415509
\(867\) 4729.18 0.185249
\(868\) 48141.8 1.88253
\(869\) −4080.15 −0.159274
\(870\) −825.091 −0.0321531
\(871\) 0 0
\(872\) −248.123 −0.00963589
\(873\) 18831.7 0.730074
\(874\) 6557.51 0.253789
\(875\) 15634.9 0.604066
\(876\) −14503.3 −0.559385
\(877\) 20297.2 0.781513 0.390757 0.920494i \(-0.372213\pi\)
0.390757 + 0.920494i \(0.372213\pi\)
\(878\) 6787.64 0.260902
\(879\) −4876.93 −0.187139
\(880\) −11224.6 −0.429978
\(881\) 38070.2 1.45586 0.727932 0.685649i \(-0.240481\pi\)
0.727932 + 0.685649i \(0.240481\pi\)
\(882\) 2304.07 0.0879617
\(883\) −40484.9 −1.54295 −0.771476 0.636258i \(-0.780481\pi\)
−0.771476 + 0.636258i \(0.780481\pi\)
\(884\) 0 0
\(885\) 1421.84 0.0540051
\(886\) 6821.84 0.258673
\(887\) 11696.1 0.442748 0.221374 0.975189i \(-0.428946\pi\)
0.221374 + 0.975189i \(0.428946\pi\)
\(888\) 602.863 0.0227824
\(889\) −10815.5 −0.408033
\(890\) −6093.18 −0.229487
\(891\) 472.872 0.0177798
\(892\) −9117.82 −0.342250
\(893\) 35057.7 1.31373
\(894\) 2073.21 0.0775597
\(895\) 2462.78 0.0919796
\(896\) −19832.9 −0.739475
\(897\) 0 0
\(898\) 223.167 0.00829308
\(899\) −9514.00 −0.352959
\(900\) 21892.9 0.810847
\(901\) −25125.1 −0.929011
\(902\) −1910.20 −0.0705131
\(903\) 23624.2 0.870614
\(904\) −8483.15 −0.312108
\(905\) −16075.2 −0.590452
\(906\) −1858.31 −0.0681437
\(907\) 659.923 0.0241592 0.0120796 0.999927i \(-0.496155\pi\)
0.0120796 + 0.999927i \(0.496155\pi\)
\(908\) 6546.76 0.239275
\(909\) −2497.82 −0.0911412
\(910\) 0 0
\(911\) −10817.0 −0.393396 −0.196698 0.980464i \(-0.563022\pi\)
−0.196698 + 0.980464i \(0.563022\pi\)
\(912\) −18176.8 −0.659972
\(913\) 15216.2 0.551568
\(914\) 7090.72 0.256609
\(915\) −16007.5 −0.578351
\(916\) 51308.3 1.85074
\(917\) 49830.9 1.79451
\(918\) 4287.69 0.154156
\(919\) 52996.0 1.90226 0.951129 0.308794i \(-0.0999252\pi\)
0.951129 + 0.308794i \(0.0999252\pi\)
\(920\) −18086.4 −0.648142
\(921\) 26058.8 0.932320
\(922\) 2248.55 0.0803168
\(923\) 0 0
\(924\) 7000.83 0.249254
\(925\) 5067.97 0.180145
\(926\) 4233.01 0.150222
\(927\) −18358.1 −0.650440
\(928\) 2949.46 0.104333
\(929\) −27996.7 −0.988743 −0.494371 0.869251i \(-0.664602\pi\)
−0.494371 + 0.869251i \(0.664602\pi\)
\(930\) 4768.26 0.168126
\(931\) −33120.5 −1.16593
\(932\) −5111.82 −0.179660
\(933\) 14710.5 0.516183
\(934\) −2081.26 −0.0729131
\(935\) −14910.9 −0.521537
\(936\) 0 0
\(937\) −6544.13 −0.228161 −0.114081 0.993471i \(-0.536392\pi\)
−0.114081 + 0.993471i \(0.536392\pi\)
\(938\) 10145.0 0.353140
\(939\) 30396.8 1.05640
\(940\) −47886.7 −1.66159
\(941\) −16898.1 −0.585402 −0.292701 0.956204i \(-0.594554\pi\)
−0.292701 + 0.956204i \(0.594554\pi\)
\(942\) −753.595 −0.0260652
\(943\) 77792.2 2.68639
\(944\) −1640.04 −0.0565452
\(945\) −60804.8 −2.09310
\(946\) 1244.54 0.0427733
\(947\) −23070.4 −0.791643 −0.395822 0.918327i \(-0.629540\pi\)
−0.395822 + 0.918327i \(0.629540\pi\)
\(948\) 9025.13 0.309201
\(949\) 0 0
\(950\) 6045.86 0.206477
\(951\) −8587.97 −0.292833
\(952\) −12917.5 −0.439769
\(953\) 2759.61 0.0938013 0.0469006 0.998900i \(-0.485066\pi\)
0.0469006 + 0.998900i \(0.485066\pi\)
\(954\) −2114.56 −0.0717626
\(955\) 13589.3 0.460462
\(956\) −20873.6 −0.706172
\(957\) −1383.54 −0.0467329
\(958\) 3830.96 0.129199
\(959\) −61739.9 −2.07892
\(960\) 23827.1 0.801060
\(961\) 25191.1 0.845594
\(962\) 0 0
\(963\) 26222.7 0.877480
\(964\) −31505.3 −1.05261
\(965\) 43462.4 1.44985
\(966\) 5477.23 0.182430
\(967\) −20005.3 −0.665281 −0.332641 0.943054i \(-0.607940\pi\)
−0.332641 + 0.943054i \(0.607940\pi\)
\(968\) 744.703 0.0247269
\(969\) −24146.2 −0.800505
\(970\) −7103.54 −0.235135
\(971\) 30229.1 0.999071 0.499536 0.866293i \(-0.333504\pi\)
0.499536 + 0.866293i \(0.333504\pi\)
\(972\) −30208.6 −0.996854
\(973\) −57373.9 −1.89036
\(974\) −503.192 −0.0165537
\(975\) 0 0
\(976\) 18464.1 0.605554
\(977\) 32984.9 1.08012 0.540061 0.841626i \(-0.318401\pi\)
0.540061 + 0.841626i \(0.318401\pi\)
\(978\) 2753.20 0.0900180
\(979\) −10217.2 −0.333548
\(980\) 45240.5 1.47465
\(981\) 701.111 0.0228183
\(982\) −3379.57 −0.109823
\(983\) 19452.7 0.631173 0.315587 0.948897i \(-0.397799\pi\)
0.315587 + 0.948897i \(0.397799\pi\)
\(984\) 8531.77 0.276405
\(985\) 47995.9 1.55257
\(986\) 1264.27 0.0408342
\(987\) 29282.3 0.944344
\(988\) 0 0
\(989\) −50683.4 −1.62956
\(990\) −1254.92 −0.0402868
\(991\) 46420.8 1.48800 0.743999 0.668181i \(-0.232927\pi\)
0.743999 + 0.668181i \(0.232927\pi\)
\(992\) −17045.1 −0.545548
\(993\) 10343.4 0.330552
\(994\) −5573.67 −0.177853
\(995\) −51919.2 −1.65422
\(996\) −33657.6 −1.07076
\(997\) 6479.05 0.205811 0.102906 0.994691i \(-0.467186\pi\)
0.102906 + 0.994691i \(0.467186\pi\)
\(998\) −7133.11 −0.226247
\(999\) −4348.24 −0.137710
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 1859.4.a.d.1.5 9
13.12 even 2 143.4.a.c.1.5 9
39.38 odd 2 1287.4.a.k.1.5 9
52.51 odd 2 2288.4.a.r.1.4 9
143.142 odd 2 1573.4.a.e.1.5 9
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
143.4.a.c.1.5 9 13.12 even 2
1287.4.a.k.1.5 9 39.38 odd 2
1573.4.a.e.1.5 9 143.142 odd 2
1859.4.a.d.1.5 9 1.1 even 1 trivial
2288.4.a.r.1.4 9 52.51 odd 2