Properties

Label 289.4.a.c.1.1
Level $289$
Weight $4$
Character 289.1
Self dual yes
Analytic conductor $17.052$
Analytic rank $0$
Dimension $4$
CM no
Inner twists $1$

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Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms
 
[N,k,chi] = [289,4,Mod(1,289)]
 
mf = mfinit([N,k,chi],0)
 
lf = mfeigenbasis(mf)
 
from sage.modular.dirichlet import DirichletCharacter
 
H = DirichletGroup(289, base_ring=CyclotomicField(2))
 
chi = DirichletCharacter(H, H._module([0]))
 
N = Newforms(chi, 4, names="a")
 
//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code
 
chi := DirichletCharacter("289.1");
 
S:= CuspForms(chi, 4);
 
N := Newforms(S);
 
Level: \( N \) \(=\) \( 289 = 17^{2} \)
Weight: \( k \) \(=\) \( 4 \)
Character orbit: \([\chi]\) \(=\) 289.a (trivial)

Newform invariants

comment: select newform
 
sage: f = N[0] # Warning: the index may be different
 
gp: f = lf[1] \\ Warning: the index may be different
 
Self dual: yes
Analytic conductor: \(17.0515519917\)
Analytic rank: \(0\)
Dimension: \(4\)
Coefficient field: 4.4.2555057.1
comment: defining polynomial
 
gp: f.mod \\ as an extension of the character field
 
Defining polynomial: \( x^{4} - x^{3} - 21x^{2} - 4x + 36 \) Copy content Toggle raw display
Coefficient ring: \(\Z[a_1, a_2, a_3]\)
Coefficient ring index: \( 1 \)
Twist minimal: yes
Fricke sign: \(1\)
Sato-Tate group: $\mathrm{SU}(2)$

Embedding invariants

Embedding label 1.1
Root \(-3.68488\) of defining polynomial
Character \(\chi\) \(=\) 289.1

$q$-expansion

comment: q-expansion
 
sage: f.q_expansion() # note that sage often uses an isomorphic number field
 
gp: mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q-3.68488 q^{2} -9.05894 q^{3} +5.57832 q^{4} +7.08909 q^{5} +33.3811 q^{6} +28.1854 q^{7} +8.92359 q^{8} +55.0643 q^{9} +O(q^{10})\) \(q-3.68488 q^{2} -9.05894 q^{3} +5.57832 q^{4} +7.08909 q^{5} +33.3811 q^{6} +28.1854 q^{7} +8.92359 q^{8} +55.0643 q^{9} -26.1224 q^{10} -15.3047 q^{11} -50.5336 q^{12} +2.51532 q^{13} -103.860 q^{14} -64.2196 q^{15} -77.5089 q^{16} -202.905 q^{18} +14.3453 q^{19} +39.5452 q^{20} -255.330 q^{21} +56.3958 q^{22} +180.191 q^{23} -80.8383 q^{24} -74.7448 q^{25} -9.26864 q^{26} -254.233 q^{27} +157.227 q^{28} +41.2425 q^{29} +236.641 q^{30} +155.242 q^{31} +214.222 q^{32} +138.644 q^{33} +199.809 q^{35} +307.167 q^{36} -225.676 q^{37} -52.8606 q^{38} -22.7861 q^{39} +63.2602 q^{40} +234.306 q^{41} +940.860 q^{42} -321.875 q^{43} -85.3743 q^{44} +390.356 q^{45} -663.983 q^{46} -326.183 q^{47} +702.148 q^{48} +451.418 q^{49} +275.425 q^{50} +14.0313 q^{52} -57.1579 q^{53} +936.818 q^{54} -108.496 q^{55} +251.515 q^{56} -129.953 q^{57} -151.974 q^{58} -241.623 q^{59} -358.238 q^{60} +460.925 q^{61} -572.046 q^{62} +1552.01 q^{63} -169.311 q^{64} +17.8313 q^{65} -510.886 q^{66} +392.696 q^{67} -1632.34 q^{69} -736.272 q^{70} +615.558 q^{71} +491.372 q^{72} -697.452 q^{73} +831.587 q^{74} +677.109 q^{75} +80.0226 q^{76} -431.369 q^{77} +83.9641 q^{78} +991.317 q^{79} -549.468 q^{80} +816.345 q^{81} -863.387 q^{82} -98.9057 q^{83} -1424.31 q^{84} +1186.07 q^{86} -373.613 q^{87} -136.573 q^{88} +698.470 q^{89} -1438.41 q^{90} +70.8954 q^{91} +1005.16 q^{92} -1406.32 q^{93} +1201.94 q^{94} +101.695 q^{95} -1940.62 q^{96} -1428.66 q^{97} -1663.42 q^{98} -842.741 q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 4 q + q^{2} - 2 q^{3} + 11 q^{4} + 14 q^{5} + 38 q^{6} + 36 q^{7} + 60 q^{8} + 6 q^{9}+O(q^{10}) \) Copy content Toggle raw display \( 4 q + q^{2} - 2 q^{3} + 11 q^{4} + 14 q^{5} + 38 q^{6} + 36 q^{7} + 60 q^{8} + 6 q^{9} - 7 q^{10} + 10 q^{11} - 29 q^{12} - 22 q^{13} + 73 q^{14} + 54 q^{15} + 63 q^{16} - 334 q^{18} + 22 q^{19} + 330 q^{20} - 352 q^{21} - 79 q^{22} + 380 q^{23} + 159 q^{24} + 378 q^{25} - 448 q^{26} - 494 q^{27} + 608 q^{28} - 78 q^{29} + 313 q^{30} + 362 q^{31} + 331 q^{32} + 94 q^{33} - 242 q^{35} + 141 q^{36} + 512 q^{37} - 524 q^{38} + 12 q^{39} + 1381 q^{40} + 840 q^{41} + 1455 q^{42} - 114 q^{43} - 1041 q^{44} + 648 q^{45} - 1051 q^{46} + 10 q^{47} + 998 q^{48} + 1006 q^{49} + 805 q^{50} - 1537 q^{52} + 50 q^{53} + 581 q^{54} - 1316 q^{55} + 411 q^{56} + 358 q^{57} - 376 q^{58} + 996 q^{59} - 217 q^{60} + 448 q^{61} - 73 q^{62} + 766 q^{63} - 150 q^{64} - 372 q^{65} - 1090 q^{66} - 868 q^{67} - 1128 q^{69} + 1052 q^{70} + 1116 q^{71} - 39 q^{72} + 540 q^{73} + 1630 q^{74} + 1070 q^{75} - 873 q^{76} - 894 q^{77} - 1245 q^{78} + 940 q^{79} + 307 q^{80} + 1080 q^{81} - 334 q^{82} + 850 q^{83} + 443 q^{84} + 2411 q^{86} - 384 q^{87} - 2252 q^{88} + 784 q^{89} - 2069 q^{90} - 2858 q^{91} - 1566 q^{92} - 1550 q^{93} + 1119 q^{94} + 2494 q^{95} - 2643 q^{96} - 518 q^{97} - 1877 q^{98} - 1406 q^{99}+O(q^{100}) \) 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:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) −3.68488 −1.30280 −0.651400 0.758734i \(-0.725818\pi\)
−0.651400 + 0.758734i \(0.725818\pi\)
\(3\) −9.05894 −1.74339 −0.871697 0.490046i \(-0.836980\pi\)
−0.871697 + 0.490046i \(0.836980\pi\)
\(4\) 5.57832 0.697290
\(5\) 7.08909 0.634067 0.317034 0.948414i \(-0.397313\pi\)
0.317034 + 0.948414i \(0.397313\pi\)
\(6\) 33.3811 2.27129
\(7\) 28.1854 1.52187 0.760935 0.648828i \(-0.224741\pi\)
0.760935 + 0.648828i \(0.224741\pi\)
\(8\) 8.92359 0.394371
\(9\) 55.0643 2.03942
\(10\) −26.1224 −0.826064
\(11\) −15.3047 −0.419503 −0.209751 0.977755i \(-0.567265\pi\)
−0.209751 + 0.977755i \(0.567265\pi\)
\(12\) −50.5336 −1.21565
\(13\) 2.51532 0.0536634 0.0268317 0.999640i \(-0.491458\pi\)
0.0268317 + 0.999640i \(0.491458\pi\)
\(14\) −103.860 −1.98269
\(15\) −64.2196 −1.10543
\(16\) −77.5089 −1.21108
\(17\) 0 0
\(18\) −202.905 −2.65696
\(19\) 14.3453 0.173212 0.0866062 0.996243i \(-0.472398\pi\)
0.0866062 + 0.996243i \(0.472398\pi\)
\(20\) 39.5452 0.442129
\(21\) −255.330 −2.65322
\(22\) 56.3958 0.546529
\(23\) 180.191 1.63359 0.816793 0.576931i \(-0.195750\pi\)
0.816793 + 0.576931i \(0.195750\pi\)
\(24\) −80.8383 −0.687544
\(25\) −74.7448 −0.597958
\(26\) −9.26864 −0.0699127
\(27\) −254.233 −1.81212
\(28\) 157.227 1.06118
\(29\) 41.2425 0.264088 0.132044 0.991244i \(-0.457846\pi\)
0.132044 + 0.991244i \(0.457846\pi\)
\(30\) 236.641 1.44015
\(31\) 155.242 0.899426 0.449713 0.893173i \(-0.351526\pi\)
0.449713 + 0.893173i \(0.351526\pi\)
\(32\) 214.222 1.18342
\(33\) 138.644 0.731358
\(34\) 0 0
\(35\) 199.809 0.964968
\(36\) 307.167 1.42207
\(37\) −225.676 −1.00273 −0.501363 0.865237i \(-0.667168\pi\)
−0.501363 + 0.865237i \(0.667168\pi\)
\(38\) −52.8606 −0.225661
\(39\) −22.7861 −0.0935564
\(40\) 63.2602 0.250058
\(41\) 234.306 0.892497 0.446249 0.894909i \(-0.352760\pi\)
0.446249 + 0.894909i \(0.352760\pi\)
\(42\) 940.860 3.45661
\(43\) −321.875 −1.14152 −0.570761 0.821117i \(-0.693352\pi\)
−0.570761 + 0.821117i \(0.693352\pi\)
\(44\) −85.3743 −0.292515
\(45\) 390.356 1.29313
\(46\) −663.983 −2.12824
\(47\) −326.183 −1.01231 −0.506156 0.862442i \(-0.668934\pi\)
−0.506156 + 0.862442i \(0.668934\pi\)
\(48\) 702.148 2.11138
\(49\) 451.418 1.31609
\(50\) 275.425 0.779021
\(51\) 0 0
\(52\) 14.0313 0.0374189
\(53\) −57.1579 −0.148137 −0.0740683 0.997253i \(-0.523598\pi\)
−0.0740683 + 0.997253i \(0.523598\pi\)
\(54\) 936.818 2.36083
\(55\) −108.496 −0.265993
\(56\) 251.515 0.600181
\(57\) −129.953 −0.301977
\(58\) −151.974 −0.344054
\(59\) −241.623 −0.533164 −0.266582 0.963812i \(-0.585894\pi\)
−0.266582 + 0.963812i \(0.585894\pi\)
\(60\) −358.238 −0.770805
\(61\) 460.925 0.967465 0.483732 0.875216i \(-0.339281\pi\)
0.483732 + 0.875216i \(0.339281\pi\)
\(62\) −572.046 −1.17177
\(63\) 1552.01 3.10373
\(64\) −169.311 −0.330685
\(65\) 17.8313 0.0340262
\(66\) −510.886 −0.952814
\(67\) 392.696 0.716052 0.358026 0.933712i \(-0.383450\pi\)
0.358026 + 0.933712i \(0.383450\pi\)
\(68\) 0 0
\(69\) −1632.34 −2.84798
\(70\) −736.272 −1.25716
\(71\) 615.558 1.02892 0.514460 0.857515i \(-0.327993\pi\)
0.514460 + 0.857515i \(0.327993\pi\)
\(72\) 491.372 0.804288
\(73\) −697.452 −1.11823 −0.559114 0.829091i \(-0.688858\pi\)
−0.559114 + 0.829091i \(0.688858\pi\)
\(74\) 831.587 1.30635
\(75\) 677.109 1.04248
\(76\) 80.0226 0.120779
\(77\) −431.369 −0.638429
\(78\) 83.9641 0.121885
\(79\) 991.317 1.41180 0.705898 0.708313i \(-0.250544\pi\)
0.705898 + 0.708313i \(0.250544\pi\)
\(80\) −549.468 −0.767904
\(81\) 816.345 1.11981
\(82\) −863.387 −1.16275
\(83\) −98.9057 −0.130799 −0.0653995 0.997859i \(-0.520832\pi\)
−0.0653995 + 0.997859i \(0.520832\pi\)
\(84\) −1424.31 −1.85006
\(85\) 0 0
\(86\) 1186.07 1.48717
\(87\) −373.613 −0.460409
\(88\) −136.573 −0.165440
\(89\) 698.470 0.831884 0.415942 0.909391i \(-0.363452\pi\)
0.415942 + 0.909391i \(0.363452\pi\)
\(90\) −1438.41 −1.68469
\(91\) 70.8954 0.0816687
\(92\) 1005.16 1.13908
\(93\) −1406.32 −1.56805
\(94\) 1201.94 1.31884
\(95\) 101.695 0.109828
\(96\) −1940.62 −2.06317
\(97\) −1428.66 −1.49545 −0.747725 0.664009i \(-0.768854\pi\)
−0.747725 + 0.664009i \(0.768854\pi\)
\(98\) −1663.42 −1.71460
\(99\) −842.741 −0.855542
\(100\) −416.950 −0.416950
\(101\) 408.671 0.402617 0.201308 0.979528i \(-0.435481\pi\)
0.201308 + 0.979528i \(0.435481\pi\)
\(102\) 0 0
\(103\) 1649.55 1.57801 0.789007 0.614384i \(-0.210596\pi\)
0.789007 + 0.614384i \(0.210596\pi\)
\(104\) 22.4457 0.0211633
\(105\) −1810.06 −1.68232
\(106\) 210.620 0.192993
\(107\) 2055.01 1.85668 0.928340 0.371731i \(-0.121236\pi\)
0.928340 + 0.371731i \(0.121236\pi\)
\(108\) −1418.19 −1.26357
\(109\) −445.064 −0.391095 −0.195548 0.980694i \(-0.562648\pi\)
−0.195548 + 0.980694i \(0.562648\pi\)
\(110\) 399.795 0.346536
\(111\) 2044.38 1.74814
\(112\) −2184.62 −1.84310
\(113\) 1226.02 1.02066 0.510330 0.859979i \(-0.329523\pi\)
0.510330 + 0.859979i \(0.329523\pi\)
\(114\) 478.861 0.393416
\(115\) 1277.39 1.03580
\(116\) 230.064 0.184146
\(117\) 138.504 0.109442
\(118\) 890.352 0.694607
\(119\) 0 0
\(120\) −573.070 −0.435949
\(121\) −1096.77 −0.824017
\(122\) −1698.45 −1.26041
\(123\) −2122.56 −1.55597
\(124\) 865.987 0.627161
\(125\) −1416.01 −1.01321
\(126\) −5718.97 −4.04354
\(127\) −591.124 −0.413022 −0.206511 0.978444i \(-0.566211\pi\)
−0.206511 + 0.978444i \(0.566211\pi\)
\(128\) −1089.89 −0.752604
\(129\) 2915.84 1.99012
\(130\) −65.7063 −0.0443294
\(131\) 2025.27 1.35075 0.675375 0.737474i \(-0.263982\pi\)
0.675375 + 0.737474i \(0.263982\pi\)
\(132\) 773.401 0.509969
\(133\) 404.328 0.263607
\(134\) −1447.04 −0.932873
\(135\) −1802.28 −1.14901
\(136\) 0 0
\(137\) 623.919 0.389087 0.194544 0.980894i \(-0.437677\pi\)
0.194544 + 0.980894i \(0.437677\pi\)
\(138\) 6014.98 3.71036
\(139\) −1033.14 −0.630429 −0.315214 0.949020i \(-0.602076\pi\)
−0.315214 + 0.949020i \(0.602076\pi\)
\(140\) 1114.60 0.672863
\(141\) 2954.87 1.76486
\(142\) −2268.25 −1.34048
\(143\) −38.4961 −0.0225119
\(144\) −4267.98 −2.46989
\(145\) 292.372 0.167449
\(146\) 2570.02 1.45683
\(147\) −4089.37 −2.29446
\(148\) −1258.89 −0.699190
\(149\) −284.476 −0.156411 −0.0782054 0.996937i \(-0.524919\pi\)
−0.0782054 + 0.996937i \(0.524919\pi\)
\(150\) −2495.06 −1.35814
\(151\) 3153.25 1.69939 0.849696 0.527273i \(-0.176786\pi\)
0.849696 + 0.527273i \(0.176786\pi\)
\(152\) 128.012 0.0683099
\(153\) 0 0
\(154\) 1589.54 0.831745
\(155\) 1100.52 0.570297
\(156\) −127.108 −0.0652359
\(157\) −482.335 −0.245188 −0.122594 0.992457i \(-0.539121\pi\)
−0.122594 + 0.992457i \(0.539121\pi\)
\(158\) −3652.88 −1.83929
\(159\) 517.790 0.258261
\(160\) 1518.64 0.750369
\(161\) 5078.77 2.48611
\(162\) −3008.13 −1.45890
\(163\) −3717.39 −1.78631 −0.893155 0.449749i \(-0.851513\pi\)
−0.893155 + 0.449749i \(0.851513\pi\)
\(164\) 1307.03 0.622329
\(165\) 982.860 0.463731
\(166\) 364.455 0.170405
\(167\) 2128.93 0.986475 0.493237 0.869895i \(-0.335813\pi\)
0.493237 + 0.869895i \(0.335813\pi\)
\(168\) −2278.46 −1.04635
\(169\) −2190.67 −0.997120
\(170\) 0 0
\(171\) 789.914 0.353253
\(172\) −1795.52 −0.795971
\(173\) −1197.86 −0.526426 −0.263213 0.964738i \(-0.584782\pi\)
−0.263213 + 0.964738i \(0.584782\pi\)
\(174\) 1376.72 0.599821
\(175\) −2106.71 −0.910015
\(176\) 1186.25 0.508050
\(177\) 2188.85 0.929515
\(178\) −2573.78 −1.08378
\(179\) 4095.63 1.71018 0.855089 0.518482i \(-0.173503\pi\)
0.855089 + 0.518482i \(0.173503\pi\)
\(180\) 2177.53 0.901687
\(181\) 1297.08 0.532660 0.266330 0.963882i \(-0.414189\pi\)
0.266330 + 0.963882i \(0.414189\pi\)
\(182\) −261.241 −0.106398
\(183\) −4175.49 −1.68667
\(184\) 1607.95 0.644239
\(185\) −1599.83 −0.635795
\(186\) 5182.13 2.04286
\(187\) 0 0
\(188\) −1819.55 −0.705876
\(189\) −7165.67 −2.75781
\(190\) −374.734 −0.143084
\(191\) 4381.72 1.65995 0.829974 0.557803i \(-0.188355\pi\)
0.829974 + 0.557803i \(0.188355\pi\)
\(192\) 1533.77 0.576514
\(193\) −1022.20 −0.381240 −0.190620 0.981664i \(-0.561050\pi\)
−0.190620 + 0.981664i \(0.561050\pi\)
\(194\) 5264.44 1.94827
\(195\) −161.533 −0.0593211
\(196\) 2518.15 0.917695
\(197\) 2202.50 0.796555 0.398278 0.917265i \(-0.369608\pi\)
0.398278 + 0.917265i \(0.369608\pi\)
\(198\) 3105.40 1.11460
\(199\) 76.0165 0.0270787 0.0135394 0.999908i \(-0.495690\pi\)
0.0135394 + 0.999908i \(0.495690\pi\)
\(200\) −666.992 −0.235817
\(201\) −3557.41 −1.24836
\(202\) −1505.90 −0.524529
\(203\) 1162.44 0.401907
\(204\) 0 0
\(205\) 1661.01 0.565904
\(206\) −6078.40 −2.05584
\(207\) 9922.12 3.33157
\(208\) −194.960 −0.0649905
\(209\) −219.550 −0.0726631
\(210\) 6669.84 2.19173
\(211\) −1972.63 −0.643609 −0.321804 0.946806i \(-0.604289\pi\)
−0.321804 + 0.946806i \(0.604289\pi\)
\(212\) −318.845 −0.103294
\(213\) −5576.30 −1.79381
\(214\) −7572.44 −2.41889
\(215\) −2281.80 −0.723801
\(216\) −2268.67 −0.714647
\(217\) 4375.55 1.36881
\(218\) 1640.01 0.509520
\(219\) 6318.17 1.94951
\(220\) −605.226 −0.185474
\(221\) 0 0
\(222\) −7533.29 −2.27748
\(223\) 1177.47 0.353584 0.176792 0.984248i \(-0.443428\pi\)
0.176792 + 0.984248i \(0.443428\pi\)
\(224\) 6037.94 1.80101
\(225\) −4115.77 −1.21949
\(226\) −4517.75 −1.32972
\(227\) −2845.44 −0.831976 −0.415988 0.909370i \(-0.636564\pi\)
−0.415988 + 0.909370i \(0.636564\pi\)
\(228\) −724.920 −0.210566
\(229\) 3605.93 1.04055 0.520277 0.853998i \(-0.325829\pi\)
0.520277 + 0.853998i \(0.325829\pi\)
\(230\) −4707.03 −1.34945
\(231\) 3907.74 1.11303
\(232\) 368.032 0.104149
\(233\) 835.204 0.234833 0.117416 0.993083i \(-0.462539\pi\)
0.117416 + 0.993083i \(0.462539\pi\)
\(234\) −510.372 −0.142581
\(235\) −2312.34 −0.641875
\(236\) −1347.85 −0.371770
\(237\) −8980.28 −2.46132
\(238\) 0 0
\(239\) −4057.52 −1.09816 −0.549078 0.835771i \(-0.685021\pi\)
−0.549078 + 0.835771i \(0.685021\pi\)
\(240\) 4977.59 1.33876
\(241\) 2130.64 0.569487 0.284743 0.958604i \(-0.408092\pi\)
0.284743 + 0.958604i \(0.408092\pi\)
\(242\) 4041.45 1.07353
\(243\) −530.923 −0.140159
\(244\) 2571.19 0.674604
\(245\) 3200.14 0.834489
\(246\) 7821.37 2.02712
\(247\) 36.0830 0.00929516
\(248\) 1385.31 0.354708
\(249\) 895.981 0.228034
\(250\) 5217.82 1.32002
\(251\) 2164.17 0.544227 0.272113 0.962265i \(-0.412277\pi\)
0.272113 + 0.962265i \(0.412277\pi\)
\(252\) 8657.62 2.16420
\(253\) −2757.77 −0.685294
\(254\) 2178.22 0.538085
\(255\) 0 0
\(256\) 5370.59 1.31118
\(257\) 6991.31 1.69691 0.848456 0.529267i \(-0.177533\pi\)
0.848456 + 0.529267i \(0.177533\pi\)
\(258\) −10744.5 −2.59273
\(259\) −6360.76 −1.52602
\(260\) 99.4688 0.0237261
\(261\) 2270.99 0.538586
\(262\) −7462.85 −1.75976
\(263\) −2985.57 −0.699993 −0.349996 0.936751i \(-0.613817\pi\)
−0.349996 + 0.936751i \(0.613817\pi\)
\(264\) 1237.20 0.288426
\(265\) −405.198 −0.0939287
\(266\) −1489.90 −0.343427
\(267\) −6327.40 −1.45030
\(268\) 2190.58 0.499296
\(269\) 4063.25 0.920969 0.460484 0.887668i \(-0.347676\pi\)
0.460484 + 0.887668i \(0.347676\pi\)
\(270\) 6641.19 1.49693
\(271\) 6295.85 1.41124 0.705619 0.708591i \(-0.250669\pi\)
0.705619 + 0.708591i \(0.250669\pi\)
\(272\) 0 0
\(273\) −642.237 −0.142381
\(274\) −2299.06 −0.506903
\(275\) 1143.94 0.250845
\(276\) −9105.72 −1.98587
\(277\) 4710.13 1.02168 0.510838 0.859677i \(-0.329335\pi\)
0.510838 + 0.859677i \(0.329335\pi\)
\(278\) 3806.99 0.821323
\(279\) 8548.28 1.83431
\(280\) 1783.01 0.380555
\(281\) −2458.26 −0.521878 −0.260939 0.965355i \(-0.584032\pi\)
−0.260939 + 0.965355i \(0.584032\pi\)
\(282\) −10888.3 −2.29926
\(283\) 9204.70 1.93344 0.966718 0.255843i \(-0.0823529\pi\)
0.966718 + 0.255843i \(0.0823529\pi\)
\(284\) 3433.78 0.717455
\(285\) −921.249 −0.191474
\(286\) 141.854 0.0293286
\(287\) 6604.00 1.35826
\(288\) 11796.0 2.41349
\(289\) 0 0
\(290\) −1077.35 −0.218153
\(291\) 12942.2 2.60716
\(292\) −3890.61 −0.779729
\(293\) 423.010 0.0843431 0.0421716 0.999110i \(-0.486572\pi\)
0.0421716 + 0.999110i \(0.486572\pi\)
\(294\) 15068.8 2.98922
\(295\) −1712.89 −0.338062
\(296\) −2013.84 −0.395446
\(297\) 3890.95 0.760189
\(298\) 1048.26 0.203772
\(299\) 453.239 0.0876638
\(300\) 3777.13 0.726909
\(301\) −9072.17 −1.73725
\(302\) −11619.4 −2.21397
\(303\) −3702.12 −0.701919
\(304\) −1111.89 −0.209773
\(305\) 3267.54 0.613438
\(306\) 0 0
\(307\) 632.590 0.117602 0.0588010 0.998270i \(-0.481272\pi\)
0.0588010 + 0.998270i \(0.481272\pi\)
\(308\) −2406.31 −0.445170
\(309\) −14943.2 −2.75110
\(310\) −4055.29 −0.742983
\(311\) −5293.07 −0.965089 −0.482544 0.875872i \(-0.660287\pi\)
−0.482544 + 0.875872i \(0.660287\pi\)
\(312\) −203.334 −0.0368959
\(313\) −3817.93 −0.689464 −0.344732 0.938701i \(-0.612030\pi\)
−0.344732 + 0.938701i \(0.612030\pi\)
\(314\) 1777.35 0.319431
\(315\) 11002.4 1.96798
\(316\) 5529.88 0.984431
\(317\) −1389.54 −0.246197 −0.123098 0.992394i \(-0.539283\pi\)
−0.123098 + 0.992394i \(0.539283\pi\)
\(318\) −1907.99 −0.336462
\(319\) −631.203 −0.110786
\(320\) −1200.26 −0.209677
\(321\) −18616.2 −3.23692
\(322\) −18714.6 −3.23890
\(323\) 0 0
\(324\) 4553.83 0.780836
\(325\) −188.007 −0.0320885
\(326\) 13698.1 2.32721
\(327\) 4031.81 0.681833
\(328\) 2090.85 0.351975
\(329\) −9193.61 −1.54061
\(330\) −3621.72 −0.604149
\(331\) −5736.36 −0.952565 −0.476282 0.879292i \(-0.658016\pi\)
−0.476282 + 0.879292i \(0.658016\pi\)
\(332\) −551.728 −0.0912048
\(333\) −12426.7 −2.04498
\(334\) −7844.83 −1.28518
\(335\) 2783.86 0.454025
\(336\) 19790.3 3.21325
\(337\) −3997.46 −0.646159 −0.323080 0.946372i \(-0.604718\pi\)
−0.323080 + 0.946372i \(0.604718\pi\)
\(338\) 8072.36 1.29905
\(339\) −11106.5 −1.77941
\(340\) 0 0
\(341\) −2375.92 −0.377312
\(342\) −2910.74 −0.460218
\(343\) 3055.81 0.481045
\(344\) −2872.28 −0.450183
\(345\) −11571.8 −1.80581
\(346\) 4413.97 0.685828
\(347\) −2485.37 −0.384500 −0.192250 0.981346i \(-0.561578\pi\)
−0.192250 + 0.981346i \(0.561578\pi\)
\(348\) −2084.14 −0.321038
\(349\) −9518.10 −1.45986 −0.729932 0.683520i \(-0.760448\pi\)
−0.729932 + 0.683520i \(0.760448\pi\)
\(350\) 7762.98 1.18557
\(351\) −639.478 −0.0972444
\(352\) −3278.60 −0.496448
\(353\) 174.509 0.0263121 0.0131561 0.999913i \(-0.495812\pi\)
0.0131561 + 0.999913i \(0.495812\pi\)
\(354\) −8065.65 −1.21097
\(355\) 4363.74 0.652404
\(356\) 3896.29 0.580065
\(357\) 0 0
\(358\) −15091.9 −2.22802
\(359\) −8112.87 −1.19270 −0.596352 0.802723i \(-0.703384\pi\)
−0.596352 + 0.802723i \(0.703384\pi\)
\(360\) 3483.38 0.509973
\(361\) −6653.21 −0.969997
\(362\) −4779.59 −0.693949
\(363\) 9935.55 1.43659
\(364\) 395.477 0.0569468
\(365\) −4944.30 −0.709031
\(366\) 15386.2 2.19740
\(367\) 41.1424 0.00585181 0.00292591 0.999996i \(-0.499069\pi\)
0.00292591 + 0.999996i \(0.499069\pi\)
\(368\) −13966.4 −1.97840
\(369\) 12901.9 1.82018
\(370\) 5895.19 0.828315
\(371\) −1611.02 −0.225445
\(372\) −7844.93 −1.09339
\(373\) 1275.50 0.177059 0.0885296 0.996074i \(-0.471783\pi\)
0.0885296 + 0.996074i \(0.471783\pi\)
\(374\) 0 0
\(375\) 12827.5 1.76643
\(376\) −2910.73 −0.399227
\(377\) 103.738 0.0141718
\(378\) 26404.6 3.59288
\(379\) 4101.12 0.555832 0.277916 0.960605i \(-0.410356\pi\)
0.277916 + 0.960605i \(0.410356\pi\)
\(380\) 567.287 0.0765822
\(381\) 5354.95 0.720059
\(382\) −16146.1 −2.16258
\(383\) −10390.1 −1.38619 −0.693094 0.720848i \(-0.743753\pi\)
−0.693094 + 0.720848i \(0.743753\pi\)
\(384\) 9873.22 1.31209
\(385\) −3058.01 −0.404807
\(386\) 3766.67 0.496679
\(387\) −17723.8 −2.32804
\(388\) −7969.53 −1.04276
\(389\) 6213.37 0.809846 0.404923 0.914351i \(-0.367298\pi\)
0.404923 + 0.914351i \(0.367298\pi\)
\(390\) 595.229 0.0772835
\(391\) 0 0
\(392\) 4028.27 0.519027
\(393\) −18346.8 −2.35489
\(394\) −8115.93 −1.03775
\(395\) 7027.54 0.895174
\(396\) −4701.08 −0.596561
\(397\) 171.318 0.0216580 0.0108290 0.999941i \(-0.496553\pi\)
0.0108290 + 0.999941i \(0.496553\pi\)
\(398\) −280.111 −0.0352782
\(399\) −3662.78 −0.459570
\(400\) 5793.39 0.724174
\(401\) 9328.60 1.16172 0.580858 0.814005i \(-0.302717\pi\)
0.580858 + 0.814005i \(0.302717\pi\)
\(402\) 13108.6 1.62636
\(403\) 390.482 0.0482663
\(404\) 2279.70 0.280741
\(405\) 5787.14 0.710038
\(406\) −4283.44 −0.523605
\(407\) 3453.89 0.420646
\(408\) 0 0
\(409\) −6370.74 −0.770202 −0.385101 0.922874i \(-0.625833\pi\)
−0.385101 + 0.922874i \(0.625833\pi\)
\(410\) −6120.63 −0.737260
\(411\) −5652.04 −0.678332
\(412\) 9201.74 1.10033
\(413\) −6810.26 −0.811406
\(414\) −36561.8 −4.34037
\(415\) −701.152 −0.0829354
\(416\) 538.837 0.0635064
\(417\) 9359.13 1.09909
\(418\) 809.014 0.0946655
\(419\) 8067.75 0.940657 0.470329 0.882491i \(-0.344135\pi\)
0.470329 + 0.882491i \(0.344135\pi\)
\(420\) −10097.1 −1.17306
\(421\) −6254.81 −0.724088 −0.362044 0.932161i \(-0.617921\pi\)
−0.362044 + 0.932161i \(0.617921\pi\)
\(422\) 7268.90 0.838494
\(423\) −17961.1 −2.06453
\(424\) −510.054 −0.0584208
\(425\) 0 0
\(426\) 20548.0 2.33698
\(427\) 12991.4 1.47236
\(428\) 11463.5 1.29464
\(429\) 348.734 0.0392472
\(430\) 8408.14 0.942969
\(431\) 5910.99 0.660609 0.330305 0.943874i \(-0.392849\pi\)
0.330305 + 0.943874i \(0.392849\pi\)
\(432\) 19705.3 2.19461
\(433\) 11833.5 1.31335 0.656677 0.754172i \(-0.271962\pi\)
0.656677 + 0.754172i \(0.271962\pi\)
\(434\) −16123.4 −1.78329
\(435\) −2648.58 −0.291930
\(436\) −2482.71 −0.272707
\(437\) 2584.90 0.282957
\(438\) −23281.7 −2.53982
\(439\) 7520.94 0.817665 0.408833 0.912609i \(-0.365936\pi\)
0.408833 + 0.912609i \(0.365936\pi\)
\(440\) −968.176 −0.104900
\(441\) 24857.0 2.68406
\(442\) 0 0
\(443\) 8478.34 0.909296 0.454648 0.890671i \(-0.349765\pi\)
0.454648 + 0.890671i \(0.349765\pi\)
\(444\) 11404.2 1.21896
\(445\) 4951.52 0.527471
\(446\) −4338.83 −0.460649
\(447\) 2577.05 0.272685
\(448\) −4772.09 −0.503259
\(449\) −1078.67 −0.113375 −0.0566877 0.998392i \(-0.518054\pi\)
−0.0566877 + 0.998392i \(0.518054\pi\)
\(450\) 15166.1 1.58875
\(451\) −3585.97 −0.374405
\(452\) 6839.15 0.711696
\(453\) −28565.1 −2.96271
\(454\) 10485.1 1.08390
\(455\) 502.584 0.0517835
\(456\) −1159.65 −0.119091
\(457\) 5664.74 0.579837 0.289918 0.957051i \(-0.406372\pi\)
0.289918 + 0.957051i \(0.406372\pi\)
\(458\) −13287.4 −1.35563
\(459\) 0 0
\(460\) 7125.70 0.722256
\(461\) 710.717 0.0718034 0.0359017 0.999355i \(-0.488570\pi\)
0.0359017 + 0.999355i \(0.488570\pi\)
\(462\) −14399.5 −1.45006
\(463\) 8328.23 0.835952 0.417976 0.908458i \(-0.362740\pi\)
0.417976 + 0.908458i \(0.362740\pi\)
\(464\) −3196.66 −0.319831
\(465\) −9969.56 −0.994252
\(466\) −3077.62 −0.305940
\(467\) −14132.8 −1.40040 −0.700201 0.713946i \(-0.746906\pi\)
−0.700201 + 0.713946i \(0.746906\pi\)
\(468\) 772.622 0.0763130
\(469\) 11068.3 1.08974
\(470\) 8520.69 0.836235
\(471\) 4369.44 0.427459
\(472\) −2156.15 −0.210264
\(473\) 4926.18 0.478871
\(474\) 33091.2 3.20660
\(475\) −1072.24 −0.103574
\(476\) 0 0
\(477\) −3147.36 −0.302113
\(478\) 14951.5 1.43068
\(479\) 6522.89 0.622210 0.311105 0.950376i \(-0.399301\pi\)
0.311105 + 0.950376i \(0.399301\pi\)
\(480\) −13757.3 −1.30819
\(481\) −567.646 −0.0538096
\(482\) −7851.13 −0.741928
\(483\) −46008.3 −4.33426
\(484\) −6118.12 −0.574579
\(485\) −10127.9 −0.948216
\(486\) 1956.39 0.182600
\(487\) −2178.49 −0.202704 −0.101352 0.994851i \(-0.532317\pi\)
−0.101352 + 0.994851i \(0.532317\pi\)
\(488\) 4113.11 0.381540
\(489\) 33675.6 3.11424
\(490\) −11792.1 −1.08717
\(491\) −12618.8 −1.15983 −0.579915 0.814677i \(-0.696914\pi\)
−0.579915 + 0.814677i \(0.696914\pi\)
\(492\) −11840.3 −1.08496
\(493\) 0 0
\(494\) −132.961 −0.0121097
\(495\) −5974.27 −0.542472
\(496\) −12032.6 −1.08927
\(497\) 17349.8 1.56588
\(498\) −3301.58 −0.297083
\(499\) 13762.8 1.23469 0.617343 0.786694i \(-0.288209\pi\)
0.617343 + 0.786694i \(0.288209\pi\)
\(500\) −7898.95 −0.706504
\(501\) −19285.8 −1.71981
\(502\) −7974.69 −0.709019
\(503\) 491.671 0.0435836 0.0217918 0.999763i \(-0.493063\pi\)
0.0217918 + 0.999763i \(0.493063\pi\)
\(504\) 13849.5 1.22402
\(505\) 2897.11 0.255286
\(506\) 10162.0 0.892802
\(507\) 19845.2 1.73837
\(508\) −3297.48 −0.287996
\(509\) 576.514 0.0502034 0.0251017 0.999685i \(-0.492009\pi\)
0.0251017 + 0.999685i \(0.492009\pi\)
\(510\) 0 0
\(511\) −19658.0 −1.70180
\(512\) −11070.9 −0.955600
\(513\) −3647.05 −0.313881
\(514\) −25762.1 −2.21074
\(515\) 11693.8 1.00057
\(516\) 16265.5 1.38769
\(517\) 4992.12 0.424668
\(518\) 23438.6 1.98810
\(519\) 10851.4 0.917768
\(520\) 159.120 0.0134189
\(521\) 6102.95 0.513196 0.256598 0.966518i \(-0.417398\pi\)
0.256598 + 0.966518i \(0.417398\pi\)
\(522\) −8368.33 −0.701670
\(523\) 13593.3 1.13651 0.568255 0.822853i \(-0.307619\pi\)
0.568255 + 0.822853i \(0.307619\pi\)
\(524\) 11297.6 0.941864
\(525\) 19084.6 1.58651
\(526\) 11001.5 0.911951
\(527\) 0 0
\(528\) −10746.1 −0.885731
\(529\) 20301.9 1.66860
\(530\) 1493.10 0.122370
\(531\) −13304.8 −1.08735
\(532\) 2255.47 0.183810
\(533\) 589.354 0.0478944
\(534\) 23315.7 1.88945
\(535\) 14568.1 1.17726
\(536\) 3504.26 0.282390
\(537\) −37102.1 −2.98151
\(538\) −14972.6 −1.19984
\(539\) −6908.80 −0.552103
\(540\) −10053.7 −0.801190
\(541\) −20360.3 −1.61803 −0.809017 0.587786i \(-0.800000\pi\)
−0.809017 + 0.587786i \(0.800000\pi\)
\(542\) −23199.4 −1.83856
\(543\) −11750.2 −0.928635
\(544\) 0 0
\(545\) −3155.10 −0.247981
\(546\) 2366.56 0.185494
\(547\) −253.860 −0.0198433 −0.00992164 0.999951i \(-0.503158\pi\)
−0.00992164 + 0.999951i \(0.503158\pi\)
\(548\) 3480.42 0.271307
\(549\) 25380.5 1.97307
\(550\) −4215.29 −0.326801
\(551\) 591.636 0.0457433
\(552\) −14566.4 −1.12316
\(553\) 27940.7 2.14857
\(554\) −17356.2 −1.33104
\(555\) 14492.8 1.10844
\(556\) −5763.17 −0.439592
\(557\) 1519.94 0.115623 0.0578116 0.998328i \(-0.481588\pi\)
0.0578116 + 0.998328i \(0.481588\pi\)
\(558\) −31499.4 −2.38974
\(559\) −809.617 −0.0612579
\(560\) −15487.0 −1.16865
\(561\) 0 0
\(562\) 9058.40 0.679903
\(563\) −25112.9 −1.87990 −0.939948 0.341317i \(-0.889127\pi\)
−0.939948 + 0.341317i \(0.889127\pi\)
\(564\) 16483.2 1.23062
\(565\) 8691.39 0.647168
\(566\) −33918.2 −2.51888
\(567\) 23009.0 1.70421
\(568\) 5492.99 0.405776
\(569\) 3649.16 0.268859 0.134430 0.990923i \(-0.457080\pi\)
0.134430 + 0.990923i \(0.457080\pi\)
\(570\) 3394.69 0.249452
\(571\) 4111.91 0.301362 0.150681 0.988582i \(-0.451853\pi\)
0.150681 + 0.988582i \(0.451853\pi\)
\(572\) −214.744 −0.0156974
\(573\) −39693.7 −2.89394
\(574\) −24334.9 −1.76955
\(575\) −13468.4 −0.976817
\(576\) −9322.98 −0.674405
\(577\) 25307.1 1.82591 0.912954 0.408062i \(-0.133795\pi\)
0.912954 + 0.408062i \(0.133795\pi\)
\(578\) 0 0
\(579\) 9260.01 0.664651
\(580\) 1630.94 0.116761
\(581\) −2787.70 −0.199059
\(582\) −47690.3 −3.39661
\(583\) 874.783 0.0621438
\(584\) −6223.78 −0.440996
\(585\) 981.870 0.0693938
\(586\) −1558.74 −0.109882
\(587\) 6734.14 0.473506 0.236753 0.971570i \(-0.423917\pi\)
0.236753 + 0.971570i \(0.423917\pi\)
\(588\) −22811.8 −1.59990
\(589\) 2226.99 0.155792
\(590\) 6311.79 0.440427
\(591\) −19952.3 −1.38871
\(592\) 17491.9 1.21438
\(593\) 885.596 0.0613273 0.0306636 0.999530i \(-0.490238\pi\)
0.0306636 + 0.999530i \(0.490238\pi\)
\(594\) −14337.7 −0.990374
\(595\) 0 0
\(596\) −1586.90 −0.109064
\(597\) −688.629 −0.0472089
\(598\) −1670.13 −0.114208
\(599\) 7411.88 0.505578 0.252789 0.967521i \(-0.418652\pi\)
0.252789 + 0.967521i \(0.418652\pi\)
\(600\) 6042.24 0.411123
\(601\) 19232.0 1.30531 0.652653 0.757657i \(-0.273656\pi\)
0.652653 + 0.757657i \(0.273656\pi\)
\(602\) 33429.8 2.26329
\(603\) 21623.6 1.46033
\(604\) 17589.9 1.18497
\(605\) −7775.08 −0.522483
\(606\) 13641.9 0.914461
\(607\) −3485.07 −0.233039 −0.116519 0.993188i \(-0.537174\pi\)
−0.116519 + 0.993188i \(0.537174\pi\)
\(608\) 3073.08 0.204983
\(609\) −10530.5 −0.700682
\(610\) −12040.5 −0.799188
\(611\) −820.455 −0.0543241
\(612\) 0 0
\(613\) −27347.9 −1.80191 −0.900954 0.433915i \(-0.857132\pi\)
−0.900954 + 0.433915i \(0.857132\pi\)
\(614\) −2331.02 −0.153212
\(615\) −15047.0 −0.986592
\(616\) −3849.36 −0.251778
\(617\) 12625.9 0.823822 0.411911 0.911224i \(-0.364861\pi\)
0.411911 + 0.911224i \(0.364861\pi\)
\(618\) 55063.9 3.58413
\(619\) 16469.8 1.06943 0.534714 0.845033i \(-0.320419\pi\)
0.534714 + 0.845033i \(0.320419\pi\)
\(620\) 6139.06 0.397662
\(621\) −45810.6 −2.96025
\(622\) 19504.3 1.25732
\(623\) 19686.7 1.26602
\(624\) 1766.13 0.113304
\(625\) −695.113 −0.0444872
\(626\) 14068.6 0.898235
\(627\) 1988.89 0.126680
\(628\) −2690.62 −0.170967
\(629\) 0 0
\(630\) −40542.3 −2.56388
\(631\) 6691.13 0.422139 0.211069 0.977471i \(-0.432305\pi\)
0.211069 + 0.977471i \(0.432305\pi\)
\(632\) 8846.11 0.556771
\(633\) 17869.9 1.12206
\(634\) 5120.28 0.320745
\(635\) −4190.53 −0.261884
\(636\) 2888.40 0.180082
\(637\) 1135.46 0.0706258
\(638\) 2325.91 0.144332
\(639\) 33895.3 2.09840
\(640\) −7726.31 −0.477202
\(641\) 14335.5 0.883335 0.441668 0.897179i \(-0.354387\pi\)
0.441668 + 0.897179i \(0.354387\pi\)
\(642\) 68598.3 4.21707
\(643\) 30421.9 1.86582 0.932910 0.360109i \(-0.117260\pi\)
0.932910 + 0.360109i \(0.117260\pi\)
\(644\) 28331.0 1.73354
\(645\) 20670.7 1.26187
\(646\) 0 0
\(647\) −9221.00 −0.560301 −0.280151 0.959956i \(-0.590384\pi\)
−0.280151 + 0.959956i \(0.590384\pi\)
\(648\) 7284.73 0.441622
\(649\) 3697.96 0.223664
\(650\) 692.783 0.0418049
\(651\) −39637.8 −2.38637
\(652\) −20736.8 −1.24558
\(653\) −24958.5 −1.49572 −0.747858 0.663859i \(-0.768918\pi\)
−0.747858 + 0.663859i \(0.768918\pi\)
\(654\) −14856.7 −0.888293
\(655\) 14357.3 0.856467
\(656\) −18160.8 −1.08088
\(657\) −38404.7 −2.28054
\(658\) 33877.3 2.00711
\(659\) −3367.32 −0.199047 −0.0995236 0.995035i \(-0.531732\pi\)
−0.0995236 + 0.995035i \(0.531732\pi\)
\(660\) 5482.71 0.323355
\(661\) −6389.67 −0.375990 −0.187995 0.982170i \(-0.560199\pi\)
−0.187995 + 0.982170i \(0.560199\pi\)
\(662\) 21137.8 1.24100
\(663\) 0 0
\(664\) −882.595 −0.0515833
\(665\) 2866.32 0.167144
\(666\) 45790.8 2.66420
\(667\) 7431.55 0.431410
\(668\) 11875.8 0.687859
\(669\) −10666.6 −0.616436
\(670\) −10258.2 −0.591504
\(671\) −7054.30 −0.405854
\(672\) −54697.3 −3.13987
\(673\) −27441.4 −1.57175 −0.785877 0.618383i \(-0.787788\pi\)
−0.785877 + 0.618383i \(0.787788\pi\)
\(674\) 14730.2 0.841817
\(675\) 19002.6 1.08357
\(676\) −12220.3 −0.695282
\(677\) −16931.5 −0.961194 −0.480597 0.876941i \(-0.659580\pi\)
−0.480597 + 0.876941i \(0.659580\pi\)
\(678\) 40926.0 2.31822
\(679\) −40267.4 −2.27588
\(680\) 0 0
\(681\) 25776.7 1.45046
\(682\) 8754.98 0.491562
\(683\) 69.2829 0.00388146 0.00194073 0.999998i \(-0.499382\pi\)
0.00194073 + 0.999998i \(0.499382\pi\)
\(684\) 4406.39 0.246320
\(685\) 4423.01 0.246708
\(686\) −11260.3 −0.626705
\(687\) −32665.9 −1.81409
\(688\) 24948.1 1.38247
\(689\) −143.770 −0.00794952
\(690\) 42640.7 2.35262
\(691\) −1509.96 −0.0831282 −0.0415641 0.999136i \(-0.513234\pi\)
−0.0415641 + 0.999136i \(0.513234\pi\)
\(692\) −6682.05 −0.367072
\(693\) −23753.0 −1.30202
\(694\) 9158.27 0.500927
\(695\) −7324.01 −0.399734
\(696\) −3333.98 −0.181572
\(697\) 0 0
\(698\) 35073.0 1.90191
\(699\) −7566.06 −0.409406
\(700\) −11751.9 −0.634544
\(701\) −16452.5 −0.886449 −0.443224 0.896411i \(-0.646165\pi\)
−0.443224 + 0.896411i \(0.646165\pi\)
\(702\) 2356.40 0.126690
\(703\) −3237.38 −0.173684
\(704\) 2591.24 0.138723
\(705\) 20947.4 1.11904
\(706\) −643.045 −0.0342795
\(707\) 11518.6 0.612730
\(708\) 12210.1 0.648141
\(709\) −4602.45 −0.243792 −0.121896 0.992543i \(-0.538897\pi\)
−0.121896 + 0.992543i \(0.538897\pi\)
\(710\) −16079.9 −0.849953
\(711\) 54586.2 2.87925
\(712\) 6232.87 0.328071
\(713\) 27973.2 1.46929
\(714\) 0 0
\(715\) −272.903 −0.0142741
\(716\) 22846.7 1.19249
\(717\) 36756.8 1.91452
\(718\) 29894.9 1.55386
\(719\) −23515.7 −1.21973 −0.609865 0.792505i \(-0.708776\pi\)
−0.609865 + 0.792505i \(0.708776\pi\)
\(720\) −30256.1 −1.56608
\(721\) 46493.4 2.40153
\(722\) 24516.3 1.26371
\(723\) −19301.3 −0.992839
\(724\) 7235.54 0.371418
\(725\) −3082.66 −0.157914
\(726\) −36611.3 −1.87159
\(727\) −8389.04 −0.427968 −0.213984 0.976837i \(-0.568644\pi\)
−0.213984 + 0.976837i \(0.568644\pi\)
\(728\) 632.641 0.0322078
\(729\) −17231.7 −0.875462
\(730\) 18219.1 0.923727
\(731\) 0 0
\(732\) −23292.2 −1.17610
\(733\) −7677.37 −0.386863 −0.193431 0.981114i \(-0.561962\pi\)
−0.193431 + 0.981114i \(0.561962\pi\)
\(734\) −151.605 −0.00762374
\(735\) −28989.9 −1.45484
\(736\) 38601.0 1.93322
\(737\) −6010.08 −0.300386
\(738\) −47541.9 −2.37133
\(739\) 26617.3 1.32494 0.662472 0.749087i \(-0.269507\pi\)
0.662472 + 0.749087i \(0.269507\pi\)
\(740\) −8924.39 −0.443334
\(741\) −326.873 −0.0162051
\(742\) 5936.41 0.293710
\(743\) −20951.6 −1.03451 −0.517253 0.855832i \(-0.673046\pi\)
−0.517253 + 0.855832i \(0.673046\pi\)
\(744\) −12549.5 −0.618395
\(745\) −2016.68 −0.0991750
\(746\) −4700.07 −0.230673
\(747\) −5446.18 −0.266754
\(748\) 0 0
\(749\) 57921.2 2.82563
\(750\) −47267.9 −2.30131
\(751\) −8252.35 −0.400975 −0.200488 0.979696i \(-0.564253\pi\)
−0.200488 + 0.979696i \(0.564253\pi\)
\(752\) 25282.1 1.22599
\(753\) −19605.0 −0.948801
\(754\) −382.262 −0.0184631
\(755\) 22353.7 1.07753
\(756\) −39972.4 −1.92299
\(757\) −21203.1 −1.01802 −0.509010 0.860760i \(-0.669988\pi\)
−0.509010 + 0.860760i \(0.669988\pi\)
\(758\) −15112.1 −0.724139
\(759\) 24982.4 1.19474
\(760\) 907.485 0.0433131
\(761\) 29378.2 1.39942 0.699711 0.714426i \(-0.253312\pi\)
0.699711 + 0.714426i \(0.253312\pi\)
\(762\) −19732.3 −0.938094
\(763\) −12544.3 −0.595196
\(764\) 24442.6 1.15746
\(765\) 0 0
\(766\) 38286.3 1.80593
\(767\) −607.760 −0.0286114
\(768\) −48651.8 −2.28590
\(769\) −16559.6 −0.776532 −0.388266 0.921547i \(-0.626926\pi\)
−0.388266 + 0.921547i \(0.626926\pi\)
\(770\) 11268.4 0.527383
\(771\) −63333.9 −2.95838
\(772\) −5702.13 −0.265835
\(773\) −39537.3 −1.83966 −0.919830 0.392317i \(-0.871673\pi\)
−0.919830 + 0.392317i \(0.871673\pi\)
\(774\) 65310.1 3.03297
\(775\) −11603.5 −0.537820
\(776\) −12748.8 −0.589762
\(777\) 57621.7 2.66045
\(778\) −22895.5 −1.05507
\(779\) 3361.18 0.154592
\(780\) −901.082 −0.0413640
\(781\) −9420.91 −0.431634
\(782\) 0 0
\(783\) −10485.2 −0.478558
\(784\) −34988.9 −1.59388
\(785\) −3419.32 −0.155466
\(786\) 67605.5 3.06795
\(787\) −17801.2 −0.806280 −0.403140 0.915138i \(-0.632081\pi\)
−0.403140 + 0.915138i \(0.632081\pi\)
\(788\) 12286.2 0.555430
\(789\) 27046.1 1.22036
\(790\) −25895.6 −1.16623
\(791\) 34556.0 1.55331
\(792\) −7520.28 −0.337401
\(793\) 1159.37 0.0519175
\(794\) −631.287 −0.0282161
\(795\) 3670.66 0.163755
\(796\) 424.044 0.0188817
\(797\) 34006.4 1.51138 0.755688 0.654932i \(-0.227303\pi\)
0.755688 + 0.654932i \(0.227303\pi\)
\(798\) 13496.9 0.598728
\(799\) 0 0
\(800\) −16012.0 −0.707636
\(801\) 38460.8 1.69656
\(802\) −34374.7 −1.51348
\(803\) 10674.3 0.469099
\(804\) −19844.4 −0.870469
\(805\) 36003.8 1.57636
\(806\) −1438.88 −0.0628813
\(807\) −36808.7 −1.60561
\(808\) 3646.81 0.158780
\(809\) 7943.98 0.345235 0.172618 0.984989i \(-0.444777\pi\)
0.172618 + 0.984989i \(0.444777\pi\)
\(810\) −21324.9 −0.925038
\(811\) −29182.7 −1.26355 −0.631777 0.775150i \(-0.717674\pi\)
−0.631777 + 0.775150i \(0.717674\pi\)
\(812\) 6484.45 0.280246
\(813\) −57033.7 −2.46034
\(814\) −12727.2 −0.548018
\(815\) −26352.9 −1.13264
\(816\) 0 0
\(817\) −4617.38 −0.197726
\(818\) 23475.4 1.00342
\(819\) 3903.81 0.166557
\(820\) 9265.66 0.394599
\(821\) 29589.4 1.25783 0.628913 0.777475i \(-0.283500\pi\)
0.628913 + 0.777475i \(0.283500\pi\)
\(822\) 20827.1 0.883732
\(823\) −11121.5 −0.471046 −0.235523 0.971869i \(-0.575680\pi\)
−0.235523 + 0.971869i \(0.575680\pi\)
\(824\) 14720.0 0.622323
\(825\) −10362.9 −0.437322
\(826\) 25095.0 1.05710
\(827\) −12401.7 −0.521461 −0.260730 0.965412i \(-0.583963\pi\)
−0.260730 + 0.965412i \(0.583963\pi\)
\(828\) 55348.7 2.32307
\(829\) −6224.06 −0.260761 −0.130380 0.991464i \(-0.541620\pi\)
−0.130380 + 0.991464i \(0.541620\pi\)
\(830\) 2583.66 0.108048
\(831\) −42668.8 −1.78118
\(832\) −425.870 −0.0177457
\(833\) 0 0
\(834\) −34487.3 −1.43189
\(835\) 15092.1 0.625491
\(836\) −1224.72 −0.0506672
\(837\) −39467.6 −1.62987
\(838\) −29728.7 −1.22549
\(839\) 36811.6 1.51475 0.757377 0.652978i \(-0.226481\pi\)
0.757377 + 0.652978i \(0.226481\pi\)
\(840\) −16152.2 −0.663458
\(841\) −22688.1 −0.930258
\(842\) 23048.2 0.943342
\(843\) 22269.3 0.909839
\(844\) −11004.0 −0.448782
\(845\) −15529.9 −0.632241
\(846\) 66184.3 2.68967
\(847\) −30912.8 −1.25405
\(848\) 4430.25 0.179405
\(849\) −83384.8 −3.37074
\(850\) 0 0
\(851\) −40664.8 −1.63804
\(852\) −31106.4 −1.25081
\(853\) 3319.10 0.133228 0.0666141 0.997779i \(-0.478780\pi\)
0.0666141 + 0.997779i \(0.478780\pi\)
\(854\) −47871.6 −1.91819
\(855\) 5599.77 0.223986
\(856\) 18338.0 0.732221
\(857\) −8084.66 −0.322248 −0.161124 0.986934i \(-0.551512\pi\)
−0.161124 + 0.986934i \(0.551512\pi\)
\(858\) −1285.04 −0.0511313
\(859\) −23619.8 −0.938181 −0.469091 0.883150i \(-0.655418\pi\)
−0.469091 + 0.883150i \(0.655418\pi\)
\(860\) −12728.6 −0.504699
\(861\) −59825.3 −2.36799
\(862\) −21781.3 −0.860642
\(863\) −34938.3 −1.37812 −0.689058 0.724706i \(-0.741975\pi\)
−0.689058 + 0.724706i \(0.741975\pi\)
\(864\) −54462.4 −2.14450
\(865\) −8491.75 −0.333790
\(866\) −43605.0 −1.71104
\(867\) 0 0
\(868\) 24408.2 0.954457
\(869\) −15171.8 −0.592252
\(870\) 9759.69 0.380327
\(871\) 987.756 0.0384258
\(872\) −3971.57 −0.154237
\(873\) −78668.3 −3.04985
\(874\) −9525.02 −0.368637
\(875\) −39910.8 −1.54198
\(876\) 35244.8 1.35937
\(877\) 20700.0 0.797022 0.398511 0.917164i \(-0.369527\pi\)
0.398511 + 0.917164i \(0.369527\pi\)
\(878\) −27713.8 −1.06525
\(879\) −3832.02 −0.147043
\(880\) 8409.42 0.322138
\(881\) −5183.11 −0.198211 −0.0991053 0.995077i \(-0.531598\pi\)
−0.0991053 + 0.995077i \(0.531598\pi\)
\(882\) −91595.2 −3.49679
\(883\) 7357.34 0.280401 0.140201 0.990123i \(-0.455225\pi\)
0.140201 + 0.990123i \(0.455225\pi\)
\(884\) 0 0
\(885\) 15517.0 0.589375
\(886\) −31241.6 −1.18463
\(887\) −35702.2 −1.35148 −0.675740 0.737140i \(-0.736176\pi\)
−0.675740 + 0.737140i \(0.736176\pi\)
\(888\) 18243.2 0.689417
\(889\) −16661.1 −0.628565
\(890\) −18245.7 −0.687189
\(891\) −12493.9 −0.469765
\(892\) 6568.30 0.246550
\(893\) −4679.19 −0.175345
\(894\) −9496.12 −0.355255
\(895\) 29034.3 1.08437
\(896\) −30718.9 −1.14537
\(897\) −4105.86 −0.152832
\(898\) 3974.77 0.147706
\(899\) 6402.56 0.237528
\(900\) −22959.1 −0.850337
\(901\) 0 0
\(902\) 13213.9 0.487775
\(903\) 82184.2 3.02870
\(904\) 10940.5 0.402519
\(905\) 9195.14 0.337742
\(906\) 105259. 3.85982
\(907\) −5660.56 −0.207228 −0.103614 0.994618i \(-0.533041\pi\)
−0.103614 + 0.994618i \(0.533041\pi\)
\(908\) −15872.8 −0.580128
\(909\) 22503.2 0.821105
\(910\) −1851.96 −0.0674636
\(911\) −11754.9 −0.427506 −0.213753 0.976888i \(-0.568569\pi\)
−0.213753 + 0.976888i \(0.568569\pi\)
\(912\) 10072.5 0.365718
\(913\) 1513.72 0.0548705
\(914\) −20873.9 −0.755412
\(915\) −29600.4 −1.06946
\(916\) 20115.0 0.725567
\(917\) 57083.0 2.05567
\(918\) 0 0
\(919\) 4513.88 0.162023 0.0810116 0.996713i \(-0.474185\pi\)
0.0810116 + 0.996713i \(0.474185\pi\)
\(920\) 11398.9 0.408491
\(921\) −5730.59 −0.205027
\(922\) −2618.90 −0.0935455
\(923\) 1548.32 0.0552153
\(924\) 21798.6 0.776106
\(925\) 16868.1 0.599588
\(926\) −30688.5 −1.08908
\(927\) 90831.6 3.21823
\(928\) 8835.06 0.312527
\(929\) −15124.4 −0.534138 −0.267069 0.963677i \(-0.586055\pi\)
−0.267069 + 0.963677i \(0.586055\pi\)
\(930\) 36736.6 1.29531
\(931\) 6475.72 0.227963
\(932\) 4659.03 0.163746
\(933\) 47949.6 1.68253
\(934\) 52077.6 1.82444
\(935\) 0 0
\(936\) 1235.96 0.0431608
\(937\) −19918.8 −0.694470 −0.347235 0.937778i \(-0.612879\pi\)
−0.347235 + 0.937778i \(0.612879\pi\)
\(938\) −40785.4 −1.41971
\(939\) 34586.4 1.20201
\(940\) −12899.0 −0.447573
\(941\) 2072.11 0.0717843 0.0358921 0.999356i \(-0.488573\pi\)
0.0358921 + 0.999356i \(0.488573\pi\)
\(942\) −16100.9 −0.556894
\(943\) 42219.8 1.45797
\(944\) 18728.0 0.645703
\(945\) −50798.1 −1.74864
\(946\) −18152.4 −0.623874
\(947\) −5522.83 −0.189512 −0.0947560 0.995501i \(-0.530207\pi\)
−0.0947560 + 0.995501i \(0.530207\pi\)
\(948\) −50094.9 −1.71625
\(949\) −1754.31 −0.0600079
\(950\) 3951.06 0.134936
\(951\) 12587.8 0.429217
\(952\) 0 0
\(953\) −39192.3 −1.33218 −0.666089 0.745873i \(-0.732033\pi\)
−0.666089 + 0.745873i \(0.732033\pi\)
\(954\) 11597.6 0.393593
\(955\) 31062.4 1.05252
\(956\) −22634.1 −0.765733
\(957\) 5718.03 0.193143
\(958\) −24036.1 −0.810616
\(959\) 17585.4 0.592140
\(960\) 10873.1 0.365549
\(961\) −5691.04 −0.191032
\(962\) 2091.71 0.0701033
\(963\) 113158. 3.78655
\(964\) 11885.4 0.397097
\(965\) −7246.44 −0.241732
\(966\) 169535. 5.64668
\(967\) 53414.4 1.77631 0.888155 0.459543i \(-0.151987\pi\)
0.888155 + 0.459543i \(0.151987\pi\)
\(968\) −9787.11 −0.324968
\(969\) 0 0
\(970\) 37320.1 1.23534
\(971\) −39644.8 −1.31026 −0.655130 0.755516i \(-0.727386\pi\)
−0.655130 + 0.755516i \(0.727386\pi\)
\(972\) −2961.66 −0.0977317
\(973\) −29119.4 −0.959431
\(974\) 8027.47 0.264083
\(975\) 1703.14 0.0559428
\(976\) −35725.8 −1.17167
\(977\) 40232.8 1.31746 0.658732 0.752378i \(-0.271093\pi\)
0.658732 + 0.752378i \(0.271093\pi\)
\(978\) −124090. −4.05723
\(979\) −10689.9 −0.348978
\(980\) 17851.4 0.581880
\(981\) −24507.2 −0.797608
\(982\) 46498.6 1.51103
\(983\) −40449.2 −1.31244 −0.656220 0.754569i \(-0.727846\pi\)
−0.656220 + 0.754569i \(0.727846\pi\)
\(984\) −18940.9 −0.613631
\(985\) 15613.7 0.505070
\(986\) 0 0
\(987\) 83284.3 2.68589
\(988\) 201.282 0.00648142
\(989\) −57999.0 −1.86477
\(990\) 22014.5 0.706733
\(991\) 41635.0 1.33459 0.667296 0.744793i \(-0.267452\pi\)
0.667296 + 0.744793i \(0.267452\pi\)
\(992\) 33256.2 1.06440
\(993\) 51965.4 1.66070
\(994\) −63931.7 −2.04003
\(995\) 538.888 0.0171697
\(996\) 4998.07 0.159006
\(997\) 33986.6 1.07960 0.539802 0.841792i \(-0.318499\pi\)
0.539802 + 0.841792i \(0.318499\pi\)
\(998\) −50714.3 −1.60855
\(999\) 57374.2 1.81706
Display \(a_p\) with \(p\) up to: 50 250 1000 (See \(a_n\) instead) (See \(a_n\) instead) (See \(a_n\) instead) Display \(a_n\) with \(n\) up to: 50 250 1000 (See only \(a_p\)) (See only \(a_p\)) (See only \(a_p\))

Twists

       By twisting character
Char Parity Ord Type Twist Min Dim
1.1 even 1 trivial 289.4.a.c.1.1 4
17.4 even 4 289.4.b.d.288.8 8
17.13 even 4 289.4.b.d.288.7 8
17.16 even 2 289.4.a.d.1.1 yes 4
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
289.4.a.c.1.1 4 1.1 even 1 trivial
289.4.a.d.1.1 yes 4 17.16 even 2
289.4.b.d.288.7 8 17.13 even 4
289.4.b.d.288.8 8 17.4 even 4