Properties

Label 435.4.a.g.1.5
Level $435$
Weight $4$
Character 435.1
Self dual yes
Analytic conductor $25.666$
Analytic rank $1$
Dimension $6$
CM no
Inner twists $1$

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Show commands: Magma / Pari/GP / SageMath

Newspace parameters

Copy content comment:Compute space of new eigenforms
 
Copy content gp:[N,k,chi] = [435,4,Mod(1,435)] mf = mfinit([N,k,chi],0) lf = mfeigenbasis(mf)
 
Copy content magma://Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code chi := DirichletCharacter("435.1"); S:= CuspForms(chi, 4); N := Newforms(S);
 
Copy content sage:from sage.modular.dirichlet import DirichletCharacter H = DirichletGroup(435, base_ring=CyclotomicField(2)) chi = DirichletCharacter(H, H._module([0, 0, 0])) N = Newforms(chi, 4, names="a")
 
Level: \( N \) \(=\) \( 435 = 3 \cdot 5 \cdot 29 \)
Weight: \( k \) \(=\) \( 4 \)
Character orbit: \([\chi]\) \(=\) 435.a (trivial)

Newform invariants

Copy content comment:select newform
 
Copy content sage:traces = [6,-1] f = next(g for g in N if [g.coefficient(i+1).trace() for i in range(2)] == traces)
 
Copy content gp:f = lf[1] \\ Warning: the index may be different
 
Self dual: yes
Analytic conductor: \(25.6658308525\)
Analytic rank: \(1\)
Dimension: \(6\)
Coefficient field: \(\mathbb{Q}[x]/(x^{6} - \cdots)\)
Copy content comment:defining polynomial
 
Copy content gp:f.mod \\ as an extension of the character field
 
Defining polynomial: \( x^{6} - x^{5} - 31x^{4} + 9x^{3} + 230x^{2} + 32x - 128 \) Copy content Toggle raw display
Coefficient ring: \(\Z[a_1, \ldots, a_{11}]\)
Coefficient ring index: \( 2^{4} \)
Twist minimal: yes
Fricke sign: \(-1\)
Sato-Tate group: $\mathrm{SU}(2)$

Embedding invariants

Embedding label 1.5
Root \(-3.16884\) of defining polynomial
Character \(\chi\) \(=\) 435.1

$q$-expansion

Copy content comment:q-expansion
 
Copy content sage:f.q_expansion() # note that sage often uses an isomorphic number field
 
Copy content gp:mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q+3.16884 q^{2} -3.00000 q^{3} +2.04152 q^{4} +5.00000 q^{5} -9.50651 q^{6} -6.36645 q^{7} -18.8814 q^{8} +9.00000 q^{9} +15.8442 q^{10} +33.2106 q^{11} -6.12455 q^{12} +7.42718 q^{13} -20.1742 q^{14} -15.0000 q^{15} -76.1643 q^{16} -80.4958 q^{17} +28.5195 q^{18} -77.9369 q^{19} +10.2076 q^{20} +19.0993 q^{21} +105.239 q^{22} -26.4240 q^{23} +56.6443 q^{24} +25.0000 q^{25} +23.5355 q^{26} -27.0000 q^{27} -12.9972 q^{28} -29.0000 q^{29} -47.5325 q^{30} -272.292 q^{31} -90.3007 q^{32} -99.6318 q^{33} -255.078 q^{34} -31.8322 q^{35} +18.3737 q^{36} -143.570 q^{37} -246.969 q^{38} -22.2816 q^{39} -94.4072 q^{40} -393.257 q^{41} +60.5227 q^{42} +122.730 q^{43} +67.8000 q^{44} +45.0000 q^{45} -83.7334 q^{46} -226.518 q^{47} +228.493 q^{48} -302.468 q^{49} +79.2209 q^{50} +241.487 q^{51} +15.1627 q^{52} +493.905 q^{53} -85.5586 q^{54} +166.053 q^{55} +120.208 q^{56} +233.811 q^{57} -91.8962 q^{58} +657.572 q^{59} -30.6228 q^{60} -642.052 q^{61} -862.848 q^{62} -57.2980 q^{63} +323.167 q^{64} +37.1359 q^{65} -315.717 q^{66} +339.263 q^{67} -164.334 q^{68} +79.2721 q^{69} -100.871 q^{70} -891.455 q^{71} -169.933 q^{72} -94.6503 q^{73} -454.950 q^{74} -75.0000 q^{75} -159.110 q^{76} -211.434 q^{77} -70.6066 q^{78} -268.324 q^{79} -380.822 q^{80} +81.0000 q^{81} -1246.17 q^{82} +1224.27 q^{83} +38.9917 q^{84} -402.479 q^{85} +388.912 q^{86} +87.0000 q^{87} -627.064 q^{88} +632.108 q^{89} +142.598 q^{90} -47.2848 q^{91} -53.9452 q^{92} +816.876 q^{93} -717.797 q^{94} -389.684 q^{95} +270.902 q^{96} -416.938 q^{97} -958.472 q^{98} +298.895 q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 6 q - q^{2} - 18 q^{3} + 15 q^{4} + 30 q^{5} + 3 q^{6} + 23 q^{7} - 51 q^{8} + 54 q^{9} - 5 q^{10} - 111 q^{11} - 45 q^{12} - 83 q^{13} - 102 q^{14} - 90 q^{15} - 37 q^{16} - 35 q^{17} - 9 q^{18} - 76 q^{19}+ \cdots - 999 q^{99}+O(q^{100}) \) Copy content Toggle raw display

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:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) 3.16884 1.12035 0.560176 0.828373i \(-0.310733\pi\)
0.560176 + 0.828373i \(0.310733\pi\)
\(3\) −3.00000 −0.577350
\(4\) 2.04152 0.255190
\(5\) 5.00000 0.447214
\(6\) −9.50651 −0.646836
\(7\) −6.36645 −0.343756 −0.171878 0.985118i \(-0.554983\pi\)
−0.171878 + 0.985118i \(0.554983\pi\)
\(8\) −18.8814 −0.834450
\(9\) 9.00000 0.333333
\(10\) 15.8442 0.501037
\(11\) 33.2106 0.910306 0.455153 0.890413i \(-0.349584\pi\)
0.455153 + 0.890413i \(0.349584\pi\)
\(12\) −6.12455 −0.147334
\(13\) 7.42718 0.158456 0.0792281 0.996857i \(-0.474754\pi\)
0.0792281 + 0.996857i \(0.474754\pi\)
\(14\) −20.1742 −0.385128
\(15\) −15.0000 −0.258199
\(16\) −76.1643 −1.19007
\(17\) −80.4958 −1.14842 −0.574208 0.818709i \(-0.694690\pi\)
−0.574208 + 0.818709i \(0.694690\pi\)
\(18\) 28.5195 0.373451
\(19\) −77.9369 −0.941050 −0.470525 0.882387i \(-0.655935\pi\)
−0.470525 + 0.882387i \(0.655935\pi\)
\(20\) 10.2076 0.114124
\(21\) 19.0993 0.198468
\(22\) 105.239 1.01986
\(23\) −26.4240 −0.239556 −0.119778 0.992801i \(-0.538218\pi\)
−0.119778 + 0.992801i \(0.538218\pi\)
\(24\) 56.6443 0.481770
\(25\) 25.0000 0.200000
\(26\) 23.5355 0.177527
\(27\) −27.0000 −0.192450
\(28\) −12.9972 −0.0877230
\(29\) −29.0000 −0.185695
\(30\) −47.5325 −0.289274
\(31\) −272.292 −1.57758 −0.788791 0.614661i \(-0.789293\pi\)
−0.788791 + 0.614661i \(0.789293\pi\)
\(32\) −90.3007 −0.498846
\(33\) −99.6318 −0.525566
\(34\) −255.078 −1.28663
\(35\) −31.8322 −0.153732
\(36\) 18.3737 0.0850633
\(37\) −143.570 −0.637913 −0.318957 0.947769i \(-0.603332\pi\)
−0.318957 + 0.947769i \(0.603332\pi\)
\(38\) −246.969 −1.05431
\(39\) −22.2816 −0.0914847
\(40\) −94.4072 −0.373177
\(41\) −393.257 −1.49796 −0.748980 0.662593i \(-0.769456\pi\)
−0.748980 + 0.662593i \(0.769456\pi\)
\(42\) 60.5227 0.222354
\(43\) 122.730 0.435260 0.217630 0.976031i \(-0.430167\pi\)
0.217630 + 0.976031i \(0.430167\pi\)
\(44\) 67.8000 0.232301
\(45\) 45.0000 0.149071
\(46\) −83.7334 −0.268387
\(47\) −226.518 −0.703000 −0.351500 0.936188i \(-0.614328\pi\)
−0.351500 + 0.936188i \(0.614328\pi\)
\(48\) 228.493 0.687086
\(49\) −302.468 −0.881832
\(50\) 79.2209 0.224071
\(51\) 241.487 0.663039
\(52\) 15.1627 0.0404364
\(53\) 493.905 1.28006 0.640029 0.768351i \(-0.278922\pi\)
0.640029 + 0.768351i \(0.278922\pi\)
\(54\) −85.5586 −0.215612
\(55\) 166.053 0.407101
\(56\) 120.208 0.286847
\(57\) 233.811 0.543315
\(58\) −91.8962 −0.208044
\(59\) 657.572 1.45099 0.725497 0.688225i \(-0.241610\pi\)
0.725497 + 0.688225i \(0.241610\pi\)
\(60\) −30.6228 −0.0658897
\(61\) −642.052 −1.34764 −0.673822 0.738894i \(-0.735349\pi\)
−0.673822 + 0.738894i \(0.735349\pi\)
\(62\) −862.848 −1.76745
\(63\) −57.2980 −0.114585
\(64\) 323.167 0.631185
\(65\) 37.1359 0.0708638
\(66\) −315.717 −0.588819
\(67\) 339.263 0.618621 0.309311 0.950961i \(-0.399902\pi\)
0.309311 + 0.950961i \(0.399902\pi\)
\(68\) −164.334 −0.293064
\(69\) 79.2721 0.138308
\(70\) −100.871 −0.172234
\(71\) −891.455 −1.49009 −0.745044 0.667015i \(-0.767571\pi\)
−0.745044 + 0.667015i \(0.767571\pi\)
\(72\) −169.933 −0.278150
\(73\) −94.6503 −0.151753 −0.0758766 0.997117i \(-0.524175\pi\)
−0.0758766 + 0.997117i \(0.524175\pi\)
\(74\) −454.950 −0.714688
\(75\) −75.0000 −0.115470
\(76\) −159.110 −0.240146
\(77\) −211.434 −0.312923
\(78\) −70.6066 −0.102495
\(79\) −268.324 −0.382137 −0.191069 0.981577i \(-0.561195\pi\)
−0.191069 + 0.981577i \(0.561195\pi\)
\(80\) −380.822 −0.532215
\(81\) 81.0000 0.111111
\(82\) −1246.17 −1.67824
\(83\) 1224.27 1.61905 0.809525 0.587085i \(-0.199725\pi\)
0.809525 + 0.587085i \(0.199725\pi\)
\(84\) 38.9917 0.0506469
\(85\) −402.479 −0.513588
\(86\) 388.912 0.487644
\(87\) 87.0000 0.107211
\(88\) −627.064 −0.759605
\(89\) 632.108 0.752847 0.376423 0.926448i \(-0.377154\pi\)
0.376423 + 0.926448i \(0.377154\pi\)
\(90\) 142.598 0.167012
\(91\) −47.2848 −0.0544702
\(92\) −53.9452 −0.0611323
\(93\) 816.876 0.910818
\(94\) −717.797 −0.787608
\(95\) −389.684 −0.420850
\(96\) 270.902 0.288009
\(97\) −416.938 −0.436429 −0.218215 0.975901i \(-0.570023\pi\)
−0.218215 + 0.975901i \(0.570023\pi\)
\(98\) −958.472 −0.987963
\(99\) 298.895 0.303435
\(100\) 51.0380 0.0510380
\(101\) 420.881 0.414646 0.207323 0.978273i \(-0.433525\pi\)
0.207323 + 0.978273i \(0.433525\pi\)
\(102\) 765.233 0.742837
\(103\) −237.251 −0.226962 −0.113481 0.993540i \(-0.536200\pi\)
−0.113481 + 0.993540i \(0.536200\pi\)
\(104\) −140.236 −0.132224
\(105\) 95.4967 0.0887574
\(106\) 1565.10 1.43412
\(107\) −485.508 −0.438653 −0.219326 0.975652i \(-0.570386\pi\)
−0.219326 + 0.975652i \(0.570386\pi\)
\(108\) −55.1210 −0.0491113
\(109\) 1390.40 1.22180 0.610901 0.791707i \(-0.290807\pi\)
0.610901 + 0.791707i \(0.290807\pi\)
\(110\) 526.194 0.456097
\(111\) 430.711 0.368299
\(112\) 484.896 0.409093
\(113\) −1300.57 −1.08272 −0.541359 0.840792i \(-0.682090\pi\)
−0.541359 + 0.840792i \(0.682090\pi\)
\(114\) 740.907 0.608705
\(115\) −132.120 −0.107133
\(116\) −59.2040 −0.0473876
\(117\) 66.8447 0.0528187
\(118\) 2083.74 1.62562
\(119\) 512.472 0.394775
\(120\) 283.222 0.215454
\(121\) −228.057 −0.171342
\(122\) −2034.56 −1.50984
\(123\) 1179.77 0.864848
\(124\) −555.889 −0.402583
\(125\) 125.000 0.0894427
\(126\) −181.568 −0.128376
\(127\) 436.569 0.305034 0.152517 0.988301i \(-0.451262\pi\)
0.152517 + 0.988301i \(0.451262\pi\)
\(128\) 1746.47 1.20600
\(129\) −368.190 −0.251297
\(130\) 117.678 0.0793924
\(131\) −1783.17 −1.18929 −0.594644 0.803989i \(-0.702707\pi\)
−0.594644 + 0.803989i \(0.702707\pi\)
\(132\) −203.400 −0.134119
\(133\) 496.181 0.323491
\(134\) 1075.07 0.693074
\(135\) −135.000 −0.0860663
\(136\) 1519.88 0.958297
\(137\) 2696.32 1.68148 0.840739 0.541441i \(-0.182121\pi\)
0.840739 + 0.541441i \(0.182121\pi\)
\(138\) 251.200 0.154954
\(139\) 561.641 0.342717 0.171359 0.985209i \(-0.445184\pi\)
0.171359 + 0.985209i \(0.445184\pi\)
\(140\) −64.9861 −0.0392309
\(141\) 679.553 0.405877
\(142\) −2824.87 −1.66942
\(143\) 246.661 0.144244
\(144\) −685.479 −0.396689
\(145\) −145.000 −0.0830455
\(146\) −299.931 −0.170017
\(147\) 907.405 0.509126
\(148\) −293.101 −0.162789
\(149\) 335.540 0.184487 0.0922433 0.995736i \(-0.470596\pi\)
0.0922433 + 0.995736i \(0.470596\pi\)
\(150\) −237.663 −0.129367
\(151\) 2644.88 1.42541 0.712705 0.701464i \(-0.247470\pi\)
0.712705 + 0.701464i \(0.247470\pi\)
\(152\) 1471.56 0.785259
\(153\) −724.462 −0.382806
\(154\) −669.998 −0.350584
\(155\) −1361.46 −0.705516
\(156\) −45.4882 −0.0233460
\(157\) −2418.81 −1.22957 −0.614783 0.788696i \(-0.710756\pi\)
−0.614783 + 0.788696i \(0.710756\pi\)
\(158\) −850.276 −0.428129
\(159\) −1481.71 −0.739041
\(160\) −451.504 −0.223091
\(161\) 168.227 0.0823489
\(162\) 256.676 0.124484
\(163\) 2974.32 1.42924 0.714622 0.699511i \(-0.246599\pi\)
0.714622 + 0.699511i \(0.246599\pi\)
\(164\) −802.840 −0.382264
\(165\) −498.159 −0.235040
\(166\) 3879.51 1.81391
\(167\) −16.4512 −0.00762295 −0.00381148 0.999993i \(-0.501213\pi\)
−0.00381148 + 0.999993i \(0.501213\pi\)
\(168\) −360.623 −0.165611
\(169\) −2141.84 −0.974892
\(170\) −1275.39 −0.575399
\(171\) −701.432 −0.313683
\(172\) 250.556 0.111074
\(173\) 4066.95 1.78731 0.893655 0.448754i \(-0.148132\pi\)
0.893655 + 0.448754i \(0.148132\pi\)
\(174\) 275.689 0.120114
\(175\) −159.161 −0.0687512
\(176\) −2529.46 −1.08333
\(177\) −1972.72 −0.837732
\(178\) 2003.05 0.843454
\(179\) −512.397 −0.213957 −0.106979 0.994261i \(-0.534118\pi\)
−0.106979 + 0.994261i \(0.534118\pi\)
\(180\) 91.8683 0.0380414
\(181\) −1896.03 −0.778623 −0.389312 0.921106i \(-0.627287\pi\)
−0.389312 + 0.921106i \(0.627287\pi\)
\(182\) −149.838 −0.0610259
\(183\) 1926.16 0.778063
\(184\) 498.924 0.199898
\(185\) −717.851 −0.285283
\(186\) 2588.54 1.02044
\(187\) −2673.31 −1.04541
\(188\) −462.440 −0.179398
\(189\) 171.894 0.0661559
\(190\) −1234.85 −0.471501
\(191\) −2368.66 −0.897331 −0.448665 0.893700i \(-0.648100\pi\)
−0.448665 + 0.893700i \(0.648100\pi\)
\(192\) −969.500 −0.364415
\(193\) 360.892 0.134599 0.0672993 0.997733i \(-0.478562\pi\)
0.0672993 + 0.997733i \(0.478562\pi\)
\(194\) −1321.21 −0.488955
\(195\) −111.408 −0.0409132
\(196\) −617.495 −0.225034
\(197\) −3003.76 −1.08634 −0.543170 0.839622i \(-0.682776\pi\)
−0.543170 + 0.839622i \(0.682776\pi\)
\(198\) 947.150 0.339955
\(199\) 3445.61 1.22740 0.613701 0.789538i \(-0.289680\pi\)
0.613701 + 0.789538i \(0.289680\pi\)
\(200\) −472.036 −0.166890
\(201\) −1017.79 −0.357161
\(202\) 1333.70 0.464550
\(203\) 184.627 0.0638339
\(204\) 493.001 0.169201
\(205\) −1966.28 −0.669908
\(206\) −751.810 −0.254277
\(207\) −237.816 −0.0798521
\(208\) −565.687 −0.188574
\(209\) −2588.33 −0.856643
\(210\) 302.613 0.0994396
\(211\) 3886.03 1.26789 0.633946 0.773378i \(-0.281434\pi\)
0.633946 + 0.773378i \(0.281434\pi\)
\(212\) 1008.32 0.326658
\(213\) 2674.36 0.860303
\(214\) −1538.50 −0.491446
\(215\) 613.651 0.194654
\(216\) 509.799 0.160590
\(217\) 1733.53 0.542303
\(218\) 4405.96 1.36885
\(219\) 283.951 0.0876147
\(220\) 339.000 0.103888
\(221\) −597.857 −0.181974
\(222\) 1364.85 0.412625
\(223\) 4372.83 1.31312 0.656561 0.754273i \(-0.272011\pi\)
0.656561 + 0.754273i \(0.272011\pi\)
\(224\) 574.895 0.171481
\(225\) 225.000 0.0666667
\(226\) −4121.28 −1.21303
\(227\) −3042.94 −0.889722 −0.444861 0.895600i \(-0.646747\pi\)
−0.444861 + 0.895600i \(0.646747\pi\)
\(228\) 477.329 0.138649
\(229\) −1424.37 −0.411026 −0.205513 0.978654i \(-0.565886\pi\)
−0.205513 + 0.978654i \(0.565886\pi\)
\(230\) −418.667 −0.120026
\(231\) 634.301 0.180666
\(232\) 547.562 0.154953
\(233\) −5281.04 −1.48486 −0.742430 0.669924i \(-0.766327\pi\)
−0.742430 + 0.669924i \(0.766327\pi\)
\(234\) 211.820 0.0591756
\(235\) −1132.59 −0.314391
\(236\) 1342.45 0.370279
\(237\) 804.973 0.220627
\(238\) 1623.94 0.442287
\(239\) −2912.01 −0.788126 −0.394063 0.919084i \(-0.628931\pi\)
−0.394063 + 0.919084i \(0.628931\pi\)
\(240\) 1142.47 0.307274
\(241\) −433.499 −0.115868 −0.0579339 0.998320i \(-0.518451\pi\)
−0.0579339 + 0.998320i \(0.518451\pi\)
\(242\) −722.674 −0.191964
\(243\) −243.000 −0.0641500
\(244\) −1310.76 −0.343905
\(245\) −1512.34 −0.394367
\(246\) 3738.50 0.968934
\(247\) −578.851 −0.149115
\(248\) 5141.26 1.31641
\(249\) −3672.81 −0.934759
\(250\) 396.104 0.100207
\(251\) 4495.12 1.13040 0.565198 0.824955i \(-0.308800\pi\)
0.565198 + 0.824955i \(0.308800\pi\)
\(252\) −116.975 −0.0292410
\(253\) −877.558 −0.218070
\(254\) 1383.42 0.341745
\(255\) 1207.44 0.296520
\(256\) 2948.94 0.719955
\(257\) −651.655 −0.158168 −0.0790838 0.996868i \(-0.525199\pi\)
−0.0790838 + 0.996868i \(0.525199\pi\)
\(258\) −1166.74 −0.281542
\(259\) 914.032 0.219286
\(260\) 75.8137 0.0180837
\(261\) −261.000 −0.0618984
\(262\) −5650.58 −1.33242
\(263\) −5171.84 −1.21258 −0.606291 0.795243i \(-0.707343\pi\)
−0.606291 + 0.795243i \(0.707343\pi\)
\(264\) 1881.19 0.438558
\(265\) 2469.52 0.572459
\(266\) 1572.32 0.362424
\(267\) −1896.33 −0.434656
\(268\) 692.612 0.157866
\(269\) −4651.80 −1.05437 −0.527184 0.849751i \(-0.676752\pi\)
−0.527184 + 0.849751i \(0.676752\pi\)
\(270\) −427.793 −0.0964246
\(271\) 7206.79 1.61543 0.807715 0.589574i \(-0.200704\pi\)
0.807715 + 0.589574i \(0.200704\pi\)
\(272\) 6130.91 1.36669
\(273\) 141.854 0.0314484
\(274\) 8544.20 1.88385
\(275\) 830.265 0.182061
\(276\) 161.835 0.0352947
\(277\) 2309.60 0.500976 0.250488 0.968120i \(-0.419409\pi\)
0.250488 + 0.968120i \(0.419409\pi\)
\(278\) 1779.75 0.383964
\(279\) −2450.63 −0.525861
\(280\) 601.039 0.128282
\(281\) −7601.52 −1.61377 −0.806884 0.590710i \(-0.798848\pi\)
−0.806884 + 0.590710i \(0.798848\pi\)
\(282\) 2153.39 0.454726
\(283\) −4779.99 −1.00403 −0.502016 0.864858i \(-0.667408\pi\)
−0.502016 + 0.864858i \(0.667408\pi\)
\(284\) −1819.92 −0.380255
\(285\) 1169.05 0.242978
\(286\) 781.629 0.161604
\(287\) 2503.65 0.514933
\(288\) −812.706 −0.166282
\(289\) 1566.57 0.318862
\(290\) −459.481 −0.0930402
\(291\) 1250.81 0.251973
\(292\) −193.230 −0.0387258
\(293\) −5323.91 −1.06152 −0.530761 0.847522i \(-0.678094\pi\)
−0.530761 + 0.847522i \(0.678094\pi\)
\(294\) 2875.42 0.570400
\(295\) 3287.86 0.648904
\(296\) 2710.81 0.532307
\(297\) −896.686 −0.175189
\(298\) 1063.27 0.206690
\(299\) −196.256 −0.0379592
\(300\) −153.114 −0.0294668
\(301\) −781.355 −0.149623
\(302\) 8381.18 1.59696
\(303\) −1262.64 −0.239396
\(304\) 5936.01 1.11991
\(305\) −3210.26 −0.602685
\(306\) −2295.70 −0.428877
\(307\) 5559.88 1.03361 0.516807 0.856102i \(-0.327121\pi\)
0.516807 + 0.856102i \(0.327121\pi\)
\(308\) −431.645 −0.0798548
\(309\) 711.754 0.131036
\(310\) −4314.24 −0.790427
\(311\) −7920.33 −1.44412 −0.722059 0.691831i \(-0.756804\pi\)
−0.722059 + 0.691831i \(0.756804\pi\)
\(312\) 420.708 0.0763394
\(313\) 4963.28 0.896297 0.448148 0.893959i \(-0.352084\pi\)
0.448148 + 0.893959i \(0.352084\pi\)
\(314\) −7664.80 −1.37755
\(315\) −286.490 −0.0512441
\(316\) −547.789 −0.0975175
\(317\) 245.601 0.0435152 0.0217576 0.999763i \(-0.493074\pi\)
0.0217576 + 0.999763i \(0.493074\pi\)
\(318\) −4695.31 −0.827987
\(319\) −963.107 −0.169040
\(320\) 1615.83 0.282275
\(321\) 1456.52 0.253256
\(322\) 533.085 0.0922597
\(323\) 6273.59 1.08072
\(324\) 165.363 0.0283544
\(325\) 185.680 0.0316912
\(326\) 9425.13 1.60126
\(327\) −4171.21 −0.705408
\(328\) 7425.25 1.24997
\(329\) 1442.11 0.241660
\(330\) −1578.58 −0.263328
\(331\) −336.413 −0.0558638 −0.0279319 0.999610i \(-0.508892\pi\)
−0.0279319 + 0.999610i \(0.508892\pi\)
\(332\) 2499.37 0.413165
\(333\) −1292.13 −0.212638
\(334\) −52.1312 −0.00854039
\(335\) 1696.32 0.276656
\(336\) −1454.69 −0.236190
\(337\) 5888.49 0.951830 0.475915 0.879491i \(-0.342117\pi\)
0.475915 + 0.879491i \(0.342117\pi\)
\(338\) −6787.13 −1.09222
\(339\) 3901.70 0.625107
\(340\) −821.668 −0.131062
\(341\) −9042.97 −1.43608
\(342\) −2222.72 −0.351436
\(343\) 4109.34 0.646891
\(344\) −2317.32 −0.363203
\(345\) 396.361 0.0618531
\(346\) 12887.5 2.00242
\(347\) −1000.15 −0.154729 −0.0773645 0.997003i \(-0.524651\pi\)
−0.0773645 + 0.997003i \(0.524651\pi\)
\(348\) 177.612 0.0273592
\(349\) −7602.06 −1.16599 −0.582993 0.812477i \(-0.698118\pi\)
−0.582993 + 0.812477i \(0.698118\pi\)
\(350\) −504.356 −0.0770256
\(351\) −200.534 −0.0304949
\(352\) −2998.94 −0.454102
\(353\) −72.6144 −0.0109487 −0.00547433 0.999985i \(-0.501743\pi\)
−0.00547433 + 0.999985i \(0.501743\pi\)
\(354\) −6251.22 −0.938555
\(355\) −4457.27 −0.666388
\(356\) 1290.46 0.192119
\(357\) −1537.42 −0.227924
\(358\) −1623.70 −0.239707
\(359\) −4787.09 −0.703768 −0.351884 0.936044i \(-0.614459\pi\)
−0.351884 + 0.936044i \(0.614459\pi\)
\(360\) −849.665 −0.124392
\(361\) −784.845 −0.114426
\(362\) −6008.21 −0.872333
\(363\) 684.170 0.0989245
\(364\) −96.5327 −0.0139002
\(365\) −473.251 −0.0678661
\(366\) 6103.67 0.871705
\(367\) −8456.98 −1.20286 −0.601432 0.798924i \(-0.705403\pi\)
−0.601432 + 0.798924i \(0.705403\pi\)
\(368\) 2012.57 0.285088
\(369\) −3539.31 −0.499320
\(370\) −2274.75 −0.319618
\(371\) −3144.42 −0.440027
\(372\) 1667.67 0.232431
\(373\) −109.448 −0.0151930 −0.00759652 0.999971i \(-0.502418\pi\)
−0.00759652 + 0.999971i \(0.502418\pi\)
\(374\) −8471.28 −1.17123
\(375\) −375.000 −0.0516398
\(376\) 4276.98 0.586618
\(377\) −215.388 −0.0294246
\(378\) 544.704 0.0741179
\(379\) 1446.28 0.196017 0.0980087 0.995186i \(-0.468753\pi\)
0.0980087 + 0.995186i \(0.468753\pi\)
\(380\) −795.548 −0.107397
\(381\) −1309.71 −0.176111
\(382\) −7505.89 −1.00533
\(383\) −6954.48 −0.927826 −0.463913 0.885881i \(-0.653555\pi\)
−0.463913 + 0.885881i \(0.653555\pi\)
\(384\) −5239.40 −0.696282
\(385\) −1057.17 −0.139943
\(386\) 1143.61 0.150798
\(387\) 1104.57 0.145087
\(388\) −851.187 −0.111372
\(389\) 1771.46 0.230892 0.115446 0.993314i \(-0.463170\pi\)
0.115446 + 0.993314i \(0.463170\pi\)
\(390\) −353.033 −0.0458372
\(391\) 2127.02 0.275110
\(392\) 5711.04 0.735845
\(393\) 5349.52 0.686635
\(394\) −9518.43 −1.21708
\(395\) −1341.62 −0.170897
\(396\) 610.200 0.0774336
\(397\) 8022.99 1.01426 0.507131 0.861869i \(-0.330706\pi\)
0.507131 + 0.861869i \(0.330706\pi\)
\(398\) 10918.6 1.37512
\(399\) −1488.54 −0.186768
\(400\) −1904.11 −0.238014
\(401\) −2268.78 −0.282537 −0.141268 0.989971i \(-0.545118\pi\)
−0.141268 + 0.989971i \(0.545118\pi\)
\(402\) −3225.21 −0.400146
\(403\) −2022.36 −0.249978
\(404\) 859.236 0.105813
\(405\) 405.000 0.0496904
\(406\) 585.053 0.0715164
\(407\) −4768.05 −0.580696
\(408\) −4559.63 −0.553273
\(409\) −11953.1 −1.44509 −0.722545 0.691324i \(-0.757028\pi\)
−0.722545 + 0.691324i \(0.757028\pi\)
\(410\) −6230.83 −0.750533
\(411\) −8088.97 −0.970801
\(412\) −484.353 −0.0579183
\(413\) −4186.40 −0.498788
\(414\) −753.601 −0.0894625
\(415\) 6121.35 0.724061
\(416\) −670.680 −0.0790452
\(417\) −1684.92 −0.197868
\(418\) −8201.99 −0.959743
\(419\) −10234.8 −1.19333 −0.596665 0.802491i \(-0.703508\pi\)
−0.596665 + 0.802491i \(0.703508\pi\)
\(420\) 194.958 0.0226500
\(421\) −1894.70 −0.219340 −0.109670 0.993968i \(-0.534979\pi\)
−0.109670 + 0.993968i \(0.534979\pi\)
\(422\) 12314.2 1.42049
\(423\) −2038.66 −0.234333
\(424\) −9325.64 −1.06814
\(425\) −2012.39 −0.229683
\(426\) 8474.62 0.963842
\(427\) 4087.59 0.463261
\(428\) −991.174 −0.111940
\(429\) −739.983 −0.0832791
\(430\) 1944.56 0.218081
\(431\) 4238.72 0.473717 0.236858 0.971544i \(-0.423882\pi\)
0.236858 + 0.971544i \(0.423882\pi\)
\(432\) 2056.44 0.229029
\(433\) −13631.8 −1.51294 −0.756471 0.654027i \(-0.773078\pi\)
−0.756471 + 0.654027i \(0.773078\pi\)
\(434\) 5493.28 0.607571
\(435\) 435.000 0.0479463
\(436\) 2838.53 0.311791
\(437\) 2059.41 0.225434
\(438\) 899.794 0.0981594
\(439\) 725.415 0.0788660 0.0394330 0.999222i \(-0.487445\pi\)
0.0394330 + 0.999222i \(0.487445\pi\)
\(440\) −3135.32 −0.339706
\(441\) −2722.22 −0.293944
\(442\) −1894.51 −0.203875
\(443\) 14355.3 1.53959 0.769797 0.638288i \(-0.220357\pi\)
0.769797 + 0.638288i \(0.220357\pi\)
\(444\) 879.303 0.0939862
\(445\) 3160.54 0.336683
\(446\) 13856.8 1.47116
\(447\) −1006.62 −0.106513
\(448\) −2057.42 −0.216974
\(449\) 519.743 0.0546285 0.0273142 0.999627i \(-0.491305\pi\)
0.0273142 + 0.999627i \(0.491305\pi\)
\(450\) 712.988 0.0746902
\(451\) −13060.3 −1.36360
\(452\) −2655.13 −0.276298
\(453\) −7934.63 −0.822961
\(454\) −9642.57 −0.996803
\(455\) −236.424 −0.0243598
\(456\) −4414.68 −0.453369
\(457\) 5739.92 0.587532 0.293766 0.955877i \(-0.405091\pi\)
0.293766 + 0.955877i \(0.405091\pi\)
\(458\) −4513.60 −0.460495
\(459\) 2173.39 0.221013
\(460\) −269.726 −0.0273392
\(461\) −10071.6 −1.01753 −0.508763 0.860907i \(-0.669897\pi\)
−0.508763 + 0.860907i \(0.669897\pi\)
\(462\) 2009.99 0.202410
\(463\) 6265.21 0.628874 0.314437 0.949278i \(-0.398184\pi\)
0.314437 + 0.949278i \(0.398184\pi\)
\(464\) 2208.77 0.220990
\(465\) 4084.38 0.407330
\(466\) −16734.7 −1.66357
\(467\) 17387.0 1.72285 0.861427 0.507881i \(-0.169571\pi\)
0.861427 + 0.507881i \(0.169571\pi\)
\(468\) 136.465 0.0134788
\(469\) −2159.90 −0.212655
\(470\) −3588.99 −0.352229
\(471\) 7256.42 0.709890
\(472\) −12415.9 −1.21078
\(473\) 4075.94 0.396220
\(474\) 2550.83 0.247180
\(475\) −1948.42 −0.188210
\(476\) 1046.22 0.100743
\(477\) 4445.14 0.426686
\(478\) −9227.67 −0.882979
\(479\) −15957.4 −1.52216 −0.761080 0.648658i \(-0.775330\pi\)
−0.761080 + 0.648658i \(0.775330\pi\)
\(480\) 1354.51 0.128801
\(481\) −1066.32 −0.101081
\(482\) −1373.69 −0.129813
\(483\) −504.682 −0.0475441
\(484\) −465.582 −0.0437248
\(485\) −2084.69 −0.195177
\(486\) −770.027 −0.0718706
\(487\) −15053.5 −1.40070 −0.700350 0.713800i \(-0.746973\pi\)
−0.700350 + 0.713800i \(0.746973\pi\)
\(488\) 12122.9 1.12454
\(489\) −8922.96 −0.825174
\(490\) −4792.36 −0.441830
\(491\) −12513.2 −1.15013 −0.575066 0.818107i \(-0.695024\pi\)
−0.575066 + 0.818107i \(0.695024\pi\)
\(492\) 2408.52 0.220700
\(493\) 2334.38 0.213256
\(494\) −1834.28 −0.167062
\(495\) 1494.48 0.135700
\(496\) 20738.9 1.87743
\(497\) 5675.40 0.512226
\(498\) −11638.5 −1.04726
\(499\) −2702.24 −0.242423 −0.121211 0.992627i \(-0.538678\pi\)
−0.121211 + 0.992627i \(0.538678\pi\)
\(500\) 255.190 0.0228249
\(501\) 49.3536 0.00440111
\(502\) 14244.3 1.26644
\(503\) 13863.2 1.22889 0.614445 0.788960i \(-0.289380\pi\)
0.614445 + 0.788960i \(0.289380\pi\)
\(504\) 1081.87 0.0956157
\(505\) 2104.41 0.185435
\(506\) −2780.84 −0.244315
\(507\) 6425.51 0.562854
\(508\) 891.264 0.0778415
\(509\) 13363.9 1.16374 0.581871 0.813281i \(-0.302321\pi\)
0.581871 + 0.813281i \(0.302321\pi\)
\(510\) 3826.17 0.332207
\(511\) 602.586 0.0521660
\(512\) −4627.05 −0.399392
\(513\) 2104.30 0.181105
\(514\) −2064.99 −0.177204
\(515\) −1186.26 −0.101500
\(516\) −751.668 −0.0641285
\(517\) −7522.78 −0.639945
\(518\) 2896.42 0.245678
\(519\) −12200.9 −1.03190
\(520\) −701.180 −0.0591323
\(521\) −11833.2 −0.995050 −0.497525 0.867450i \(-0.665758\pi\)
−0.497525 + 0.867450i \(0.665758\pi\)
\(522\) −827.066 −0.0693481
\(523\) 3346.53 0.279796 0.139898 0.990166i \(-0.455323\pi\)
0.139898 + 0.990166i \(0.455323\pi\)
\(524\) −3640.38 −0.303494
\(525\) 477.484 0.0396935
\(526\) −16388.7 −1.35852
\(527\) 21918.3 1.81172
\(528\) 7588.39 0.625459
\(529\) −11468.8 −0.942613
\(530\) 7825.51 0.641356
\(531\) 5918.15 0.483665
\(532\) 1012.96 0.0825517
\(533\) −2920.79 −0.237361
\(534\) −6009.14 −0.486968
\(535\) −2427.54 −0.196171
\(536\) −6405.78 −0.516208
\(537\) 1537.19 0.123528
\(538\) −14740.8 −1.18126
\(539\) −10045.2 −0.802737
\(540\) −275.605 −0.0219632
\(541\) 24735.2 1.96571 0.982856 0.184373i \(-0.0590253\pi\)
0.982856 + 0.184373i \(0.0590253\pi\)
\(542\) 22837.1 1.80985
\(543\) 5688.09 0.449538
\(544\) 7268.82 0.572883
\(545\) 6952.01 0.546406
\(546\) 449.513 0.0352333
\(547\) 11807.1 0.922916 0.461458 0.887162i \(-0.347326\pi\)
0.461458 + 0.887162i \(0.347326\pi\)
\(548\) 5504.59 0.429096
\(549\) −5778.47 −0.449215
\(550\) 2630.97 0.203973
\(551\) 2260.17 0.174749
\(552\) −1496.77 −0.115411
\(553\) 1708.27 0.131362
\(554\) 7318.74 0.561270
\(555\) 2153.55 0.164708
\(556\) 1146.60 0.0874580
\(557\) 13080.8 0.995065 0.497533 0.867445i \(-0.334239\pi\)
0.497533 + 0.867445i \(0.334239\pi\)
\(558\) −7765.63 −0.589150
\(559\) 911.539 0.0689696
\(560\) 2424.48 0.182952
\(561\) 8019.93 0.603568
\(562\) −24088.0 −1.80799
\(563\) 8350.94 0.625133 0.312567 0.949896i \(-0.398811\pi\)
0.312567 + 0.949896i \(0.398811\pi\)
\(564\) 1387.32 0.103576
\(565\) −6502.84 −0.484206
\(566\) −15147.0 −1.12487
\(567\) −515.682 −0.0381951
\(568\) 16832.0 1.24340
\(569\) 16013.7 1.17984 0.589921 0.807461i \(-0.299159\pi\)
0.589921 + 0.807461i \(0.299159\pi\)
\(570\) 3704.54 0.272221
\(571\) −7224.45 −0.529482 −0.264741 0.964320i \(-0.585286\pi\)
−0.264741 + 0.964320i \(0.585286\pi\)
\(572\) 503.563 0.0368095
\(573\) 7105.98 0.518074
\(574\) 7933.65 0.576906
\(575\) −660.601 −0.0479112
\(576\) 2908.50 0.210395
\(577\) −22764.3 −1.64244 −0.821222 0.570610i \(-0.806707\pi\)
−0.821222 + 0.570610i \(0.806707\pi\)
\(578\) 4964.19 0.357237
\(579\) −1082.67 −0.0777106
\(580\) −296.020 −0.0211924
\(581\) −7794.26 −0.556558
\(582\) 3963.62 0.282298
\(583\) 16402.9 1.16524
\(584\) 1787.13 0.126630
\(585\) 334.223 0.0236213
\(586\) −16870.6 −1.18928
\(587\) 23104.2 1.62456 0.812278 0.583270i \(-0.198227\pi\)
0.812278 + 0.583270i \(0.198227\pi\)
\(588\) 1852.48 0.129924
\(589\) 21221.6 1.48458
\(590\) 10418.7 0.727001
\(591\) 9011.28 0.627199
\(592\) 10934.9 0.759160
\(593\) −19221.9 −1.33111 −0.665556 0.746348i \(-0.731806\pi\)
−0.665556 + 0.746348i \(0.731806\pi\)
\(594\) −2841.45 −0.196273
\(595\) 2562.36 0.176549
\(596\) 685.011 0.0470791
\(597\) −10336.8 −0.708641
\(598\) −621.904 −0.0425276
\(599\) 8313.99 0.567113 0.283556 0.958956i \(-0.408486\pi\)
0.283556 + 0.958956i \(0.408486\pi\)
\(600\) 1416.11 0.0963540
\(601\) −8379.05 −0.568700 −0.284350 0.958721i \(-0.591778\pi\)
−0.284350 + 0.958721i \(0.591778\pi\)
\(602\) −2475.99 −0.167631
\(603\) 3053.37 0.206207
\(604\) 5399.56 0.363750
\(605\) −1140.28 −0.0766266
\(606\) −4001.11 −0.268208
\(607\) −2133.39 −0.142655 −0.0713275 0.997453i \(-0.522724\pi\)
−0.0713275 + 0.997453i \(0.522724\pi\)
\(608\) 7037.75 0.469438
\(609\) −553.881 −0.0368545
\(610\) −10172.8 −0.675220
\(611\) −1682.39 −0.111395
\(612\) −1479.00 −0.0976881
\(613\) 12506.9 0.824062 0.412031 0.911170i \(-0.364820\pi\)
0.412031 + 0.911170i \(0.364820\pi\)
\(614\) 17618.4 1.15801
\(615\) 5898.85 0.386772
\(616\) 3992.17 0.261119
\(617\) −5460.31 −0.356278 −0.178139 0.984005i \(-0.557008\pi\)
−0.178139 + 0.984005i \(0.557008\pi\)
\(618\) 2255.43 0.146807
\(619\) 7635.72 0.495809 0.247904 0.968785i \(-0.420258\pi\)
0.247904 + 0.968785i \(0.420258\pi\)
\(620\) −2779.44 −0.180041
\(621\) 713.449 0.0461026
\(622\) −25098.2 −1.61792
\(623\) −4024.29 −0.258796
\(624\) 1697.06 0.108873
\(625\) 625.000 0.0400000
\(626\) 15727.8 1.00417
\(627\) 7764.99 0.494583
\(628\) −4938.04 −0.313773
\(629\) 11556.8 0.732590
\(630\) −907.840 −0.0574115
\(631\) 9951.47 0.627831 0.313916 0.949451i \(-0.398359\pi\)
0.313916 + 0.949451i \(0.398359\pi\)
\(632\) 5066.35 0.318875
\(633\) −11658.1 −0.732017
\(634\) 778.269 0.0487524
\(635\) 2182.85 0.136415
\(636\) −3024.95 −0.188596
\(637\) −2246.49 −0.139732
\(638\) −3051.93 −0.189384
\(639\) −8023.09 −0.496696
\(640\) 8732.34 0.539338
\(641\) 16935.0 1.04352 0.521758 0.853093i \(-0.325276\pi\)
0.521758 + 0.853093i \(0.325276\pi\)
\(642\) 4615.49 0.283736
\(643\) 20875.1 1.28030 0.640150 0.768250i \(-0.278872\pi\)
0.640150 + 0.768250i \(0.278872\pi\)
\(644\) 343.439 0.0210146
\(645\) −1840.95 −0.112384
\(646\) 19880.0 1.21078
\(647\) 21269.8 1.29243 0.646215 0.763155i \(-0.276351\pi\)
0.646215 + 0.763155i \(0.276351\pi\)
\(648\) −1529.40 −0.0927167
\(649\) 21838.4 1.32085
\(650\) 588.388 0.0355054
\(651\) −5200.60 −0.313099
\(652\) 6072.13 0.364728
\(653\) 14499.1 0.868905 0.434453 0.900695i \(-0.356942\pi\)
0.434453 + 0.900695i \(0.356942\pi\)
\(654\) −13217.9 −0.790305
\(655\) −8915.87 −0.531865
\(656\) 29952.1 1.78267
\(657\) −851.853 −0.0505844
\(658\) 4569.82 0.270745
\(659\) −2246.04 −0.132767 −0.0663833 0.997794i \(-0.521146\pi\)
−0.0663833 + 0.997794i \(0.521146\pi\)
\(660\) −1017.00 −0.0599798
\(661\) −9671.20 −0.569086 −0.284543 0.958663i \(-0.591842\pi\)
−0.284543 + 0.958663i \(0.591842\pi\)
\(662\) −1066.04 −0.0625871
\(663\) 1793.57 0.105063
\(664\) −23116.0 −1.35102
\(665\) 2480.91 0.144670
\(666\) −4094.55 −0.238229
\(667\) 766.297 0.0444845
\(668\) −33.5854 −0.00194530
\(669\) −13118.5 −0.758131
\(670\) 5375.35 0.309952
\(671\) −21322.9 −1.22677
\(672\) −1724.68 −0.0990047
\(673\) 14251.2 0.816260 0.408130 0.912924i \(-0.366181\pi\)
0.408130 + 0.912924i \(0.366181\pi\)
\(674\) 18659.7 1.06639
\(675\) −675.000 −0.0384900
\(676\) −4372.60 −0.248782
\(677\) 7864.63 0.446473 0.223236 0.974764i \(-0.428338\pi\)
0.223236 + 0.974764i \(0.428338\pi\)
\(678\) 12363.9 0.700340
\(679\) 2654.41 0.150025
\(680\) 7599.38 0.428563
\(681\) 9128.82 0.513681
\(682\) −28655.7 −1.60892
\(683\) −14468.3 −0.810561 −0.405280 0.914192i \(-0.632826\pi\)
−0.405280 + 0.914192i \(0.632826\pi\)
\(684\) −1431.99 −0.0800487
\(685\) 13481.6 0.751979
\(686\) 13021.8 0.724746
\(687\) 4273.11 0.237306
\(688\) −9347.66 −0.517989
\(689\) 3668.32 0.202833
\(690\) 1256.00 0.0692973
\(691\) 13182.6 0.725746 0.362873 0.931839i \(-0.381796\pi\)
0.362873 + 0.931839i \(0.381796\pi\)
\(692\) 8302.76 0.456103
\(693\) −1902.90 −0.104308
\(694\) −3169.32 −0.173351
\(695\) 2808.20 0.153268
\(696\) −1642.69 −0.0894624
\(697\) 31655.5 1.72028
\(698\) −24089.7 −1.30632
\(699\) 15843.1 0.857284
\(700\) −324.930 −0.0175446
\(701\) −9717.44 −0.523570 −0.261785 0.965126i \(-0.584311\pi\)
−0.261785 + 0.965126i \(0.584311\pi\)
\(702\) −635.459 −0.0341650
\(703\) 11189.4 0.600308
\(704\) 10732.6 0.574572
\(705\) 3397.76 0.181514
\(706\) −230.103 −0.0122664
\(707\) −2679.52 −0.142537
\(708\) −4027.34 −0.213781
\(709\) −15655.2 −0.829259 −0.414629 0.909990i \(-0.636089\pi\)
−0.414629 + 0.909990i \(0.636089\pi\)
\(710\) −14124.4 −0.746589
\(711\) −2414.92 −0.127379
\(712\) −11935.1 −0.628213
\(713\) 7195.05 0.377920
\(714\) −4871.82 −0.255355
\(715\) 1233.31 0.0645077
\(716\) −1046.07 −0.0545997
\(717\) 8736.02 0.455025
\(718\) −15169.5 −0.788469
\(719\) −36868.3 −1.91232 −0.956158 0.292853i \(-0.905395\pi\)
−0.956158 + 0.292853i \(0.905395\pi\)
\(720\) −3427.40 −0.177405
\(721\) 1510.45 0.0780195
\(722\) −2487.04 −0.128197
\(723\) 1300.50 0.0668963
\(724\) −3870.78 −0.198697
\(725\) −725.000 −0.0371391
\(726\) 2168.02 0.110830
\(727\) −36049.7 −1.83908 −0.919540 0.392996i \(-0.871438\pi\)
−0.919540 + 0.392996i \(0.871438\pi\)
\(728\) 892.805 0.0454527
\(729\) 729.000 0.0370370
\(730\) −1499.66 −0.0760339
\(731\) −9879.26 −0.499860
\(732\) 3932.28 0.198554
\(733\) −4057.83 −0.204474 −0.102237 0.994760i \(-0.532600\pi\)
−0.102237 + 0.994760i \(0.532600\pi\)
\(734\) −26798.8 −1.34763
\(735\) 4537.03 0.227688
\(736\) 2386.11 0.119502
\(737\) 11267.1 0.563135
\(738\) −11215.5 −0.559414
\(739\) −7614.89 −0.379050 −0.189525 0.981876i \(-0.560695\pi\)
−0.189525 + 0.981876i \(0.560695\pi\)
\(740\) −1465.51 −0.0728014
\(741\) 1736.55 0.0860917
\(742\) −9964.15 −0.492986
\(743\) 17395.9 0.858944 0.429472 0.903080i \(-0.358700\pi\)
0.429472 + 0.903080i \(0.358700\pi\)
\(744\) −15423.8 −0.760032
\(745\) 1677.70 0.0825049
\(746\) −346.823 −0.0170216
\(747\) 11018.4 0.539683
\(748\) −5457.61 −0.266778
\(749\) 3090.96 0.150789
\(750\) −1188.31 −0.0578548
\(751\) 2229.80 0.108344 0.0541720 0.998532i \(-0.482748\pi\)
0.0541720 + 0.998532i \(0.482748\pi\)
\(752\) 17252.6 0.836618
\(753\) −13485.4 −0.652635
\(754\) −682.530 −0.0329659
\(755\) 13224.4 0.637463
\(756\) 350.925 0.0168823
\(757\) −27616.9 −1.32596 −0.662982 0.748636i \(-0.730709\pi\)
−0.662982 + 0.748636i \(0.730709\pi\)
\(758\) 4583.03 0.219608
\(759\) 2632.67 0.125903
\(760\) 7357.80 0.351178
\(761\) −19746.5 −0.940617 −0.470309 0.882502i \(-0.655857\pi\)
−0.470309 + 0.882502i \(0.655857\pi\)
\(762\) −4150.25 −0.197307
\(763\) −8851.93 −0.420002
\(764\) −4835.66 −0.228990
\(765\) −3622.31 −0.171196
\(766\) −22037.6 −1.03949
\(767\) 4883.91 0.229919
\(768\) −8846.81 −0.415666
\(769\) 33709.4 1.58075 0.790373 0.612627i \(-0.209887\pi\)
0.790373 + 0.612627i \(0.209887\pi\)
\(770\) −3349.99 −0.156786
\(771\) 1954.96 0.0913182
\(772\) 736.767 0.0343482
\(773\) −39591.9 −1.84220 −0.921102 0.389322i \(-0.872709\pi\)
−0.921102 + 0.389322i \(0.872709\pi\)
\(774\) 3500.21 0.162548
\(775\) −6807.30 −0.315517
\(776\) 7872.40 0.364179
\(777\) −2742.10 −0.126605
\(778\) 5613.48 0.258680
\(779\) 30649.2 1.40965
\(780\) −227.441 −0.0104406
\(781\) −29605.7 −1.35644
\(782\) 6740.19 0.308221
\(783\) 783.000 0.0357371
\(784\) 23037.3 1.04944
\(785\) −12094.0 −0.549879
\(786\) 16951.8 0.769274
\(787\) 1728.19 0.0782760 0.0391380 0.999234i \(-0.487539\pi\)
0.0391380 + 0.999234i \(0.487539\pi\)
\(788\) −6132.23 −0.277223
\(789\) 15515.5 0.700085
\(790\) −4251.38 −0.191465
\(791\) 8279.99 0.372191
\(792\) −5643.58 −0.253202
\(793\) −4768.64 −0.213543
\(794\) 25423.5 1.13633
\(795\) −7408.57 −0.330509
\(796\) 7034.29 0.313221
\(797\) −36797.2 −1.63541 −0.817706 0.575636i \(-0.804754\pi\)
−0.817706 + 0.575636i \(0.804754\pi\)
\(798\) −4716.95 −0.209246
\(799\) 18233.7 0.807337
\(800\) −2257.52 −0.0997691
\(801\) 5688.98 0.250949
\(802\) −7189.38 −0.316541
\(803\) −3143.39 −0.138142
\(804\) −2077.84 −0.0911439
\(805\) 841.136 0.0368275
\(806\) −6408.53 −0.280063
\(807\) 13955.4 0.608740
\(808\) −7946.85 −0.346001
\(809\) −26350.1 −1.14514 −0.572572 0.819854i \(-0.694054\pi\)
−0.572572 + 0.819854i \(0.694054\pi\)
\(810\) 1283.38 0.0556708
\(811\) −4092.41 −0.177194 −0.0885968 0.996068i \(-0.528238\pi\)
−0.0885968 + 0.996068i \(0.528238\pi\)
\(812\) 376.919 0.0162897
\(813\) −21620.4 −0.932668
\(814\) −15109.2 −0.650585
\(815\) 14871.6 0.639177
\(816\) −18392.7 −0.789061
\(817\) −9565.20 −0.409601
\(818\) −37877.3 −1.61901
\(819\) −425.563 −0.0181567
\(820\) −4014.20 −0.170954
\(821\) 9821.87 0.417522 0.208761 0.977967i \(-0.433057\pi\)
0.208761 + 0.977967i \(0.433057\pi\)
\(822\) −25632.6 −1.08764
\(823\) 23701.0 1.00384 0.501922 0.864913i \(-0.332627\pi\)
0.501922 + 0.864913i \(0.332627\pi\)
\(824\) 4479.65 0.189388
\(825\) −2490.79 −0.105113
\(826\) −13266.0 −0.558818
\(827\) −21957.8 −0.923274 −0.461637 0.887069i \(-0.652738\pi\)
−0.461637 + 0.887069i \(0.652738\pi\)
\(828\) −485.506 −0.0203774
\(829\) 16697.5 0.699553 0.349776 0.936833i \(-0.386258\pi\)
0.349776 + 0.936833i \(0.386258\pi\)
\(830\) 19397.6 0.811204
\(831\) −6928.80 −0.289239
\(832\) 2400.22 0.100015
\(833\) 24347.4 1.01271
\(834\) −5339.24 −0.221682
\(835\) −82.2560 −0.00340909
\(836\) −5284.12 −0.218607
\(837\) 7351.88 0.303606
\(838\) −32432.5 −1.33695
\(839\) 33590.2 1.38220 0.691098 0.722761i \(-0.257127\pi\)
0.691098 + 0.722761i \(0.257127\pi\)
\(840\) −1803.12 −0.0740636
\(841\) 841.000 0.0344828
\(842\) −6003.99 −0.245738
\(843\) 22804.6 0.931709
\(844\) 7933.39 0.323553
\(845\) −10709.2 −0.435985
\(846\) −6460.17 −0.262536
\(847\) 1451.91 0.0588999
\(848\) −37617.9 −1.52336
\(849\) 14340.0 0.579678
\(850\) −6376.95 −0.257326
\(851\) 3793.70 0.152816
\(852\) 5459.76 0.219540
\(853\) 5408.43 0.217094 0.108547 0.994091i \(-0.465380\pi\)
0.108547 + 0.994091i \(0.465380\pi\)
\(854\) 12952.9 0.519015
\(855\) −3507.16 −0.140283
\(856\) 9167.10 0.366034
\(857\) −20198.6 −0.805100 −0.402550 0.915398i \(-0.631876\pi\)
−0.402550 + 0.915398i \(0.631876\pi\)
\(858\) −2344.89 −0.0933020
\(859\) 38903.1 1.54523 0.772617 0.634872i \(-0.218947\pi\)
0.772617 + 0.634872i \(0.218947\pi\)
\(860\) 1252.78 0.0496737
\(861\) −7510.94 −0.297296
\(862\) 13431.8 0.530730
\(863\) −35466.6 −1.39895 −0.699476 0.714656i \(-0.746583\pi\)
−0.699476 + 0.714656i \(0.746583\pi\)
\(864\) 2438.12 0.0960029
\(865\) 20334.8 0.799310
\(866\) −43197.0 −1.69503
\(867\) −4699.70 −0.184095
\(868\) 3539.04 0.138390
\(869\) −8911.21 −0.347862
\(870\) 1378.44 0.0537168
\(871\) 2519.77 0.0980243
\(872\) −26252.8 −1.01953
\(873\) −3752.44 −0.145476
\(874\) 6525.92 0.252566
\(875\) −795.806 −0.0307465
\(876\) 579.691 0.0223584
\(877\) −2742.28 −0.105588 −0.0527938 0.998605i \(-0.516813\pi\)
−0.0527938 + 0.998605i \(0.516813\pi\)
\(878\) 2298.72 0.0883577
\(879\) 15971.7 0.612870
\(880\) −12647.3 −0.484478
\(881\) −25595.0 −0.978794 −0.489397 0.872061i \(-0.662783\pi\)
−0.489397 + 0.872061i \(0.662783\pi\)
\(882\) −8626.25 −0.329321
\(883\) −22207.0 −0.846347 −0.423173 0.906049i \(-0.639084\pi\)
−0.423173 + 0.906049i \(0.639084\pi\)
\(884\) −1220.54 −0.0464378
\(885\) −9863.59 −0.374645
\(886\) 45489.6 1.72489
\(887\) 21956.1 0.831133 0.415567 0.909563i \(-0.363583\pi\)
0.415567 + 0.909563i \(0.363583\pi\)
\(888\) −8132.44 −0.307327
\(889\) −2779.40 −0.104857
\(890\) 10015.2 0.377204
\(891\) 2690.06 0.101145
\(892\) 8927.20 0.335095
\(893\) 17654.1 0.661558
\(894\) −3189.81 −0.119333
\(895\) −2561.98 −0.0956845
\(896\) −11118.8 −0.414568
\(897\) 588.769 0.0219157
\(898\) 1646.98 0.0612031
\(899\) 7896.46 0.292950
\(900\) 459.342 0.0170127
\(901\) −39757.2 −1.47004
\(902\) −41385.9 −1.52772
\(903\) 2344.07 0.0863850
\(904\) 24556.6 0.903474
\(905\) −9480.15 −0.348211
\(906\) −25143.5 −0.922007
\(907\) −10598.6 −0.388006 −0.194003 0.981001i \(-0.562147\pi\)
−0.194003 + 0.981001i \(0.562147\pi\)
\(908\) −6212.22 −0.227048
\(909\) 3787.93 0.138215
\(910\) −749.188 −0.0272916
\(911\) 28026.0 1.01926 0.509628 0.860395i \(-0.329783\pi\)
0.509628 + 0.860395i \(0.329783\pi\)
\(912\) −17808.0 −0.646582
\(913\) 40658.8 1.47383
\(914\) 18188.8 0.658242
\(915\) 9630.78 0.347960
\(916\) −2907.88 −0.104890
\(917\) 11352.5 0.408824
\(918\) 6887.10 0.247612
\(919\) 21116.9 0.757977 0.378989 0.925401i \(-0.376272\pi\)
0.378989 + 0.925401i \(0.376272\pi\)
\(920\) 2494.62 0.0893970
\(921\) −16679.7 −0.596757
\(922\) −31915.1 −1.13999
\(923\) −6621.00 −0.236114
\(924\) 1294.94 0.0461042
\(925\) −3589.25 −0.127583
\(926\) 19853.4 0.704561
\(927\) −2135.26 −0.0756539
\(928\) 2618.72 0.0926333
\(929\) 15051.0 0.531548 0.265774 0.964035i \(-0.414372\pi\)
0.265774 + 0.964035i \(0.414372\pi\)
\(930\) 12942.7 0.456353
\(931\) 23573.4 0.829848
\(932\) −10781.3 −0.378921
\(933\) 23761.0 0.833762
\(934\) 55096.4 1.93020
\(935\) −13366.6 −0.467522
\(936\) −1262.12 −0.0440746
\(937\) −35687.4 −1.24424 −0.622122 0.782920i \(-0.713729\pi\)
−0.622122 + 0.782920i \(0.713729\pi\)
\(938\) −6844.38 −0.238248
\(939\) −14889.8 −0.517477
\(940\) −2312.20 −0.0802294
\(941\) −22876.5 −0.792510 −0.396255 0.918141i \(-0.629690\pi\)
−0.396255 + 0.918141i \(0.629690\pi\)
\(942\) 22994.4 0.795327
\(943\) 10391.4 0.358846
\(944\) −50083.6 −1.72678
\(945\) 859.471 0.0295858
\(946\) 12916.0 0.443906
\(947\) −10094.8 −0.346396 −0.173198 0.984887i \(-0.555410\pi\)
−0.173198 + 0.984887i \(0.555410\pi\)
\(948\) 1643.37 0.0563018
\(949\) −702.985 −0.0240462
\(950\) −6174.23 −0.210861
\(951\) −736.803 −0.0251235
\(952\) −9676.21 −0.329420
\(953\) 23570.2 0.801170 0.400585 0.916260i \(-0.368807\pi\)
0.400585 + 0.916260i \(0.368807\pi\)
\(954\) 14085.9 0.478038
\(955\) −11843.3 −0.401299
\(956\) −5944.91 −0.201122
\(957\) 2889.32 0.0975951
\(958\) −50566.5 −1.70536
\(959\) −17166.0 −0.578018
\(960\) −4847.50 −0.162971
\(961\) 44351.9 1.48877
\(962\) −3379.00 −0.113247
\(963\) −4369.57 −0.146218
\(964\) −884.996 −0.0295683
\(965\) 1804.46 0.0601944
\(966\) −1599.25 −0.0532662
\(967\) 18620.8 0.619239 0.309620 0.950860i \(-0.399798\pi\)
0.309620 + 0.950860i \(0.399798\pi\)
\(968\) 4306.04 0.142977
\(969\) −18820.8 −0.623952
\(970\) −6606.04 −0.218667
\(971\) −33876.6 −1.11962 −0.559811 0.828621i \(-0.689126\pi\)
−0.559811 + 0.828621i \(0.689126\pi\)
\(972\) −496.089 −0.0163704
\(973\) −3575.66 −0.117811
\(974\) −47702.2 −1.56928
\(975\) −557.039 −0.0182969
\(976\) 48901.5 1.60379
\(977\) −14376.7 −0.470780 −0.235390 0.971901i \(-0.575637\pi\)
−0.235390 + 0.971901i \(0.575637\pi\)
\(978\) −28275.4 −0.924486
\(979\) 20992.7 0.685321
\(980\) −3087.47 −0.100638
\(981\) 12513.6 0.407267
\(982\) −39652.4 −1.28855
\(983\) −32902.2 −1.06757 −0.533784 0.845621i \(-0.679230\pi\)
−0.533784 + 0.845621i \(0.679230\pi\)
\(984\) −22275.8 −0.721672
\(985\) −15018.8 −0.485826
\(986\) 7397.26 0.238922
\(987\) −4326.34 −0.139523
\(988\) −1181.74 −0.0380527
\(989\) −3243.03 −0.104269
\(990\) 4735.75 0.152032
\(991\) −42096.2 −1.34937 −0.674687 0.738104i \(-0.735721\pi\)
−0.674687 + 0.738104i \(0.735721\pi\)
\(992\) 24588.1 0.786970
\(993\) 1009.24 0.0322530
\(994\) 17984.4 0.573874
\(995\) 17228.1 0.548911
\(996\) −7498.11 −0.238541
\(997\) −29384.9 −0.933431 −0.466715 0.884408i \(-0.654563\pi\)
−0.466715 + 0.884408i \(0.654563\pi\)
\(998\) −8562.97 −0.271599
\(999\) 3876.39 0.122766
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 435.4.a.g.1.5 6
3.2 odd 2 1305.4.a.i.1.2 6
5.4 even 2 2175.4.a.l.1.2 6
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
435.4.a.g.1.5 6 1.1 even 1 trivial
1305.4.a.i.1.2 6 3.2 odd 2
2175.4.a.l.1.2 6 5.4 even 2