Properties

Label 169.4.b.e.168.4
Level $169$
Weight $4$
Character 169.168
Analytic conductor $9.971$
Analytic rank $0$
Dimension $4$
CM no
Inner twists $2$

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Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms
 
[N,k,chi] = [169,4,Mod(168,169)]
 
mf = mfinit([N,k,chi],0)
 
lf = mfeigenbasis(mf)
 
from sage.modular.dirichlet import DirichletCharacter
 
H = DirichletGroup(169, base_ring=CyclotomicField(2))
 
chi = DirichletCharacter(H, H._module([1]))
 
N = Newforms(chi, 4, names="a")
 
//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code
 
chi := DirichletCharacter("169.168");
 
S:= CuspForms(chi, 4);
 
N := Newforms(S);
 
Level: \( N \) \(=\) \( 169 = 13^{2} \)
Weight: \( k \) \(=\) \( 4 \)
Character orbit: \([\chi]\) \(=\) 169.b (of order \(2\), degree \(1\), not minimal)

Newform invariants

comment: select newform
 
sage: f = N[0] # Warning: the index may be different
 
gp: f = lf[1] \\ Warning: the index may be different
 
Self dual: no
Analytic conductor: \(9.97132279097\)
Analytic rank: \(0\)
Dimension: \(4\)
Coefficient field: \(\Q(i, \sqrt{17})\)
comment: defining polynomial
 
gp: f.mod \\ as an extension of the character field
 
Defining polynomial: \( x^{4} + 9x^{2} + 16 \) Copy content Toggle raw display
Coefficient ring: \(\Z[a_1, \ldots, a_{7}]\)
Coefficient ring index: \( 1 \)
Twist minimal: no (minimal twist has level 13)
Sato-Tate group: $\mathrm{SU}(2)[C_{2}]$

Embedding invariants

Embedding label 168.4
Root \(1.56155i\) of defining polynomial
Character \(\chi\) \(=\) 169.168
Dual form 169.4.b.e.168.1

$q$-expansion

comment: q-expansion
 
sage: f.q_expansion() # note that sage often uses an isomorphic number field
 
gp: mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q+4.56155i q^{2} +8.68466 q^{3} -12.8078 q^{4} -2.80776i q^{5} +39.6155i q^{6} +9.56155i q^{7} -21.9309i q^{8} +48.4233 q^{9} +O(q^{10})\) \(q+4.56155i q^{2} +8.68466 q^{3} -12.8078 q^{4} -2.80776i q^{5} +39.6155i q^{6} +9.56155i q^{7} -21.9309i q^{8} +48.4233 q^{9} +12.8078 q^{10} +39.4233i q^{11} -111.231 q^{12} -43.6155 q^{14} -24.3845i q^{15} -2.42329 q^{16} -2.01515 q^{17} +220.885i q^{18} +60.1922i q^{19} +35.9612i q^{20} +83.0388i q^{21} -179.831 q^{22} -4.46876 q^{23} -190.462i q^{24} +117.116 q^{25} +186.054 q^{27} -122.462i q^{28} +140.693 q^{29} +111.231 q^{30} -136.155i q^{31} -186.501i q^{32} +342.378i q^{33} -9.19224i q^{34} +26.8466 q^{35} -620.194 q^{36} -185.708i q^{37} -274.570 q^{38} -61.5767 q^{40} -310.231i q^{41} -378.786 q^{42} -427.471 q^{43} -504.924i q^{44} -135.961i q^{45} -20.3845i q^{46} -258.617i q^{47} -21.0455 q^{48} +251.577 q^{49} +534.233i q^{50} -17.5009 q^{51} +612.656 q^{53} +848.695i q^{54} +110.691 q^{55} +209.693 q^{56} +522.749i q^{57} +641.779i q^{58} -517.885i q^{59} +312.311i q^{60} -161.311 q^{61} +621.080 q^{62} +463.002i q^{63} +831.348 q^{64} -1561.77 q^{66} +49.8987i q^{67} +25.8096 q^{68} -38.8096 q^{69} +122.462i q^{70} -279.963i q^{71} -1061.96i q^{72} +467.732i q^{73} +847.118 q^{74} +1017.12 q^{75} -770.928i q^{76} -376.948 q^{77} +37.5379 q^{79} +6.80403i q^{80} +308.386 q^{81} +1415.14 q^{82} +76.1553i q^{83} -1063.54i q^{84} +5.65808i q^{85} -1949.93i q^{86} +1221.87 q^{87} +864.587 q^{88} +202.806i q^{89} +620.194 q^{90} +57.2348 q^{92} -1182.46i q^{93} +1179.70 q^{94} +169.006 q^{95} -1619.70i q^{96} +1174.37i q^{97} +1147.58i q^{98} +1909.01i q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 4 q + 10 q^{3} - 10 q^{4} + 70 q^{9}+O(q^{10}) \) Copy content Toggle raw display \( 4 q + 10 q^{3} - 10 q^{4} + 70 q^{9} + 10 q^{10} - 280 q^{12} - 92 q^{14} + 114 q^{16} - 140 q^{17} - 340 q^{22} - 290 q^{23} - 150 q^{25} + 670 q^{27} + 68 q^{29} + 280 q^{30} - 140 q^{35} - 1450 q^{36} - 620 q^{38} - 370 q^{40} - 740 q^{42} - 910 q^{43} - 480 q^{48} + 1130 q^{49} + 466 q^{51} + 1090 q^{53} + 1020 q^{55} + 344 q^{56} + 1004 q^{61} + 1000 q^{62} + 2542 q^{64} - 3196 q^{66} - 1010 q^{68} + 958 q^{69} + 1698 q^{74} + 3450 q^{75} - 510 q^{77} + 480 q^{79} + 244 q^{81} + 3030 q^{82} + 3230 q^{87} + 2040 q^{88} + 1450 q^{90} - 2080 q^{92} + 2080 q^{94} - 2540 q^{95}+O(q^{100}) \) Copy content Toggle raw display

Display 100 coefficients 10 coefficients

Character values

We give the values of \(\chi\) on generators for \(\left(\mathbb{Z}/169\mathbb{Z}\right)^\times\).

\(n\) \(2\)
\(\chi(n)\) \(-1\)

Coefficient data

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



Display \(a_p\) with \(p\) up to: 50 250 1000 (See \(a_n\) instead) (See \(a_n\) instead) (See \(a_n\) instead) Display \(a_n\) with \(n\) up to: 50 250 1000 (See only \(a_p\)) (See only \(a_p\)) (See only \(a_p\))
Significant digits:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) 4.56155i 1.61275i 0.591403 + 0.806376i \(0.298574\pi\)
−0.591403 + 0.806376i \(0.701426\pi\)
\(3\) 8.68466 1.67136 0.835682 0.549214i \(-0.185073\pi\)
0.835682 + 0.549214i \(0.185073\pi\)
\(4\) −12.8078 −1.60097
\(5\) − 2.80776i − 0.251134i −0.992085 0.125567i \(-0.959925\pi\)
0.992085 0.125567i \(-0.0400750\pi\)
\(6\) 39.6155i 2.69550i
\(7\) 9.56155i 0.516275i 0.966108 + 0.258138i \(0.0831088\pi\)
−0.966108 + 0.258138i \(0.916891\pi\)
\(8\) − 21.9309i − 0.969217i
\(9\) 48.4233 1.79346
\(10\) 12.8078 0.405017
\(11\) 39.4233i 1.08060i 0.841473 + 0.540299i \(0.181689\pi\)
−0.841473 + 0.540299i \(0.818311\pi\)
\(12\) −111.231 −2.67580
\(13\) 0 0
\(14\) −43.6155 −0.832624
\(15\) − 24.3845i − 0.419736i
\(16\) −2.42329 −0.0378639
\(17\) −2.01515 −0.0287498 −0.0143749 0.999897i \(-0.504576\pi\)
−0.0143749 + 0.999897i \(0.504576\pi\)
\(18\) 220.885i 2.89240i
\(19\) 60.1922i 0.726792i 0.931635 + 0.363396i \(0.118383\pi\)
−0.931635 + 0.363396i \(0.881617\pi\)
\(20\) 35.9612i 0.402058i
\(21\) 83.0388i 0.862884i
\(22\) −179.831 −1.74274
\(23\) −4.46876 −0.0405131 −0.0202565 0.999795i \(-0.506448\pi\)
−0.0202565 + 0.999795i \(0.506448\pi\)
\(24\) − 190.462i − 1.61991i
\(25\) 117.116 0.936932
\(26\) 0 0
\(27\) 186.054 1.32615
\(28\) − 122.462i − 0.826542i
\(29\) 140.693 0.900899 0.450449 0.892802i \(-0.351264\pi\)
0.450449 + 0.892802i \(0.351264\pi\)
\(30\) 111.231 0.676931
\(31\) − 136.155i − 0.788845i −0.918929 0.394423i \(-0.870945\pi\)
0.918929 0.394423i \(-0.129055\pi\)
\(32\) − 186.501i − 1.03028i
\(33\) 342.378i 1.80607i
\(34\) − 9.19224i − 0.0463663i
\(35\) 26.8466 0.129654
\(36\) −620.194 −2.87127
\(37\) − 185.708i − 0.825142i −0.910925 0.412571i \(-0.864631\pi\)
0.910925 0.412571i \(-0.135369\pi\)
\(38\) −274.570 −1.17214
\(39\) 0 0
\(40\) −61.5767 −0.243403
\(41\) − 310.231i − 1.18171i −0.806779 0.590853i \(-0.798791\pi\)
0.806779 0.590853i \(-0.201209\pi\)
\(42\) −378.786 −1.39162
\(43\) −427.471 −1.51602 −0.758008 0.652246i \(-0.773827\pi\)
−0.758008 + 0.652246i \(0.773827\pi\)
\(44\) − 504.924i − 1.73000i
\(45\) − 135.961i − 0.450398i
\(46\) − 20.3845i − 0.0653375i
\(47\) − 258.617i − 0.802622i −0.915942 0.401311i \(-0.868555\pi\)
0.915942 0.401311i \(-0.131445\pi\)
\(48\) −21.0455 −0.0632844
\(49\) 251.577 0.733460
\(50\) 534.233i 1.51104i
\(51\) −17.5009 −0.0480514
\(52\) 0 0
\(53\) 612.656 1.58783 0.793913 0.608031i \(-0.208040\pi\)
0.793913 + 0.608031i \(0.208040\pi\)
\(54\) 848.695i 2.13875i
\(55\) 110.691 0.271375
\(56\) 209.693 0.500383
\(57\) 522.749i 1.21473i
\(58\) 641.779i 1.45293i
\(59\) − 517.885i − 1.14276i −0.820685 0.571381i \(-0.806408\pi\)
0.820685 0.571381i \(-0.193592\pi\)
\(60\) 312.311i 0.671985i
\(61\) −161.311 −0.338585 −0.169293 0.985566i \(-0.554148\pi\)
−0.169293 + 0.985566i \(0.554148\pi\)
\(62\) 621.080 1.27221
\(63\) 463.002i 0.925917i
\(64\) 831.348 1.62373
\(65\) 0 0
\(66\) −1561.77 −2.91274
\(67\) 49.8987i 0.0909865i 0.998965 + 0.0454933i \(0.0144860\pi\)
−0.998965 + 0.0454933i \(0.985514\pi\)
\(68\) 25.8096 0.0460276
\(69\) −38.8096 −0.0677120
\(70\) 122.462i 0.209100i
\(71\) − 279.963i − 0.467965i −0.972241 0.233982i \(-0.924824\pi\)
0.972241 0.233982i \(-0.0751758\pi\)
\(72\) − 1061.96i − 1.73825i
\(73\) 467.732i 0.749916i 0.927042 + 0.374958i \(0.122343\pi\)
−0.927042 + 0.374958i \(0.877657\pi\)
\(74\) 847.118 1.33075
\(75\) 1017.12 1.56595
\(76\) − 770.928i − 1.16357i
\(77\) −376.948 −0.557886
\(78\) 0 0
\(79\) 37.5379 0.0534600 0.0267300 0.999643i \(-0.491491\pi\)
0.0267300 + 0.999643i \(0.491491\pi\)
\(80\) 6.80403i 0.00950892i
\(81\) 308.386 0.423027
\(82\) 1415.14 1.90580
\(83\) 76.1553i 0.100712i 0.998731 + 0.0503562i \(0.0160357\pi\)
−0.998731 + 0.0503562i \(0.983964\pi\)
\(84\) − 1063.54i − 1.38145i
\(85\) 5.65808i 0.00722006i
\(86\) − 1949.93i − 2.44496i
\(87\) 1221.87 1.50573
\(88\) 864.587 1.04733
\(89\) 202.806i 0.241544i 0.992680 + 0.120772i \(0.0385369\pi\)
−0.992680 + 0.120772i \(0.961463\pi\)
\(90\) 620.194 0.726380
\(91\) 0 0
\(92\) 57.2348 0.0648602
\(93\) − 1182.46i − 1.31845i
\(94\) 1179.70 1.29443
\(95\) 169.006 0.182522
\(96\) − 1619.70i − 1.72198i
\(97\) 1174.37i 1.22927i 0.788812 + 0.614634i \(0.210696\pi\)
−0.788812 + 0.614634i \(0.789304\pi\)
\(98\) 1147.58i 1.18289i
\(99\) 1909.01i 1.93800i
\(100\) −1500.00 −1.50000
\(101\) −970.697 −0.956316 −0.478158 0.878274i \(-0.658695\pi\)
−0.478158 + 0.878274i \(0.658695\pi\)
\(102\) − 79.8314i − 0.0774950i
\(103\) 1899.70 1.81731 0.908654 0.417550i \(-0.137111\pi\)
0.908654 + 0.417550i \(0.137111\pi\)
\(104\) 0 0
\(105\) 233.153 0.216699
\(106\) 2794.66i 2.56077i
\(107\) −1906.49 −1.72250 −0.861251 0.508180i \(-0.830318\pi\)
−0.861251 + 0.508180i \(0.830318\pi\)
\(108\) −2382.94 −2.12313
\(109\) 896.004i 0.787354i 0.919249 + 0.393677i \(0.128797\pi\)
−0.919249 + 0.393677i \(0.871203\pi\)
\(110\) 504.924i 0.437660i
\(111\) − 1612.81i − 1.37911i
\(112\) − 23.1704i − 0.0195482i
\(113\) −334.882 −0.278788 −0.139394 0.990237i \(-0.544516\pi\)
−0.139394 + 0.990237i \(0.544516\pi\)
\(114\) −2384.55 −1.95906
\(115\) 12.5472i 0.0101742i
\(116\) −1801.96 −1.44231
\(117\) 0 0
\(118\) 2362.36 1.84299
\(119\) − 19.2680i − 0.0148428i
\(120\) −534.773 −0.406815
\(121\) −223.196 −0.167690
\(122\) − 735.827i − 0.546054i
\(123\) − 2694.25i − 1.97506i
\(124\) 1743.84i 1.26292i
\(125\) − 679.806i − 0.486430i
\(126\) −2112.01 −1.49327
\(127\) −620.893 −0.433822 −0.216911 0.976191i \(-0.569598\pi\)
−0.216911 + 0.976191i \(0.569598\pi\)
\(128\) 2300.23i 1.58839i
\(129\) −3712.44 −2.53381
\(130\) 0 0
\(131\) −1331.70 −0.888180 −0.444090 0.895982i \(-0.646473\pi\)
−0.444090 + 0.895982i \(0.646473\pi\)
\(132\) − 4385.09i − 2.89147i
\(133\) −575.531 −0.375225
\(134\) −227.616 −0.146739
\(135\) − 522.396i − 0.333042i
\(136\) 44.1941i 0.0278648i
\(137\) 622.015i 0.387900i 0.981011 + 0.193950i \(0.0621300\pi\)
−0.981011 + 0.193950i \(0.937870\pi\)
\(138\) − 177.032i − 0.109203i
\(139\) 330.580 0.201723 0.100861 0.994900i \(-0.467840\pi\)
0.100861 + 0.994900i \(0.467840\pi\)
\(140\) −343.845 −0.207573
\(141\) − 2246.00i − 1.34147i
\(142\) 1277.07 0.754711
\(143\) 0 0
\(144\) −117.344 −0.0679073
\(145\) − 395.033i − 0.226246i
\(146\) −2133.58 −1.20943
\(147\) 2184.86 1.22588
\(148\) 2378.51i 1.32103i
\(149\) 1810.54i 0.995470i 0.867329 + 0.497735i \(0.165835\pi\)
−0.867329 + 0.497735i \(0.834165\pi\)
\(150\) 4639.63i 2.52549i
\(151\) − 423.239i − 0.228097i −0.993475 0.114049i \(-0.963618\pi\)
0.993475 0.114049i \(-0.0363819\pi\)
\(152\) 1320.07 0.704419
\(153\) −97.5804 −0.0515615
\(154\) − 1719.47i − 0.899732i
\(155\) −382.292 −0.198106
\(156\) 0 0
\(157\) 1322.17 0.672105 0.336052 0.941843i \(-0.390908\pi\)
0.336052 + 0.941843i \(0.390908\pi\)
\(158\) 171.231i 0.0862178i
\(159\) 5320.71 2.65383
\(160\) −523.651 −0.258739
\(161\) − 42.7283i − 0.0209159i
\(162\) 1406.72i 0.682237i
\(163\) − 3606.39i − 1.73297i −0.499201 0.866486i \(-0.666373\pi\)
0.499201 0.866486i \(-0.333627\pi\)
\(164\) 3973.37i 1.89188i
\(165\) 961.316 0.453566
\(166\) −347.386 −0.162424
\(167\) − 3415.43i − 1.58260i −0.611429 0.791300i \(-0.709405\pi\)
0.611429 0.791300i \(-0.290595\pi\)
\(168\) 1821.11 0.836321
\(169\) 0 0
\(170\) −25.8096 −0.0116442
\(171\) 2914.71i 1.30347i
\(172\) 5474.94 2.42710
\(173\) −2342.23 −1.02934 −0.514671 0.857388i \(-0.672086\pi\)
−0.514671 + 0.857388i \(0.672086\pi\)
\(174\) 5573.63i 2.42837i
\(175\) 1119.82i 0.483715i
\(176\) − 95.5342i − 0.0409157i
\(177\) − 4497.66i − 1.90997i
\(178\) −925.110 −0.389550
\(179\) 666.891 0.278468 0.139234 0.990260i \(-0.455536\pi\)
0.139234 + 0.990260i \(0.455536\pi\)
\(180\) 1741.36i 0.721073i
\(181\) 701.037 0.287888 0.143944 0.989586i \(-0.454022\pi\)
0.143944 + 0.989586i \(0.454022\pi\)
\(182\) 0 0
\(183\) −1400.93 −0.565899
\(184\) 98.0037i 0.0392659i
\(185\) −521.425 −0.207221
\(186\) 5393.86 2.12633
\(187\) − 79.4440i − 0.0310670i
\(188\) 3312.31i 1.28497i
\(189\) 1778.96i 0.684660i
\(190\) 770.928i 0.294363i
\(191\) 1300.88 0.492819 0.246409 0.969166i \(-0.420749\pi\)
0.246409 + 0.969166i \(0.420749\pi\)
\(192\) 7219.97 2.71384
\(193\) − 519.333i − 0.193691i −0.995299 0.0968457i \(-0.969125\pi\)
0.995299 0.0968457i \(-0.0308753\pi\)
\(194\) −5356.94 −1.98251
\(195\) 0 0
\(196\) −3222.14 −1.17425
\(197\) − 3121.05i − 1.12876i −0.825516 0.564379i \(-0.809116\pi\)
0.825516 0.564379i \(-0.190884\pi\)
\(198\) −8708.03 −3.12552
\(199\) −1237.06 −0.440667 −0.220333 0.975425i \(-0.570715\pi\)
−0.220333 + 0.975425i \(0.570715\pi\)
\(200\) − 2568.47i − 0.908090i
\(201\) 433.353i 0.152072i
\(202\) − 4427.89i − 1.54230i
\(203\) 1345.25i 0.465112i
\(204\) 224.148 0.0769289
\(205\) −871.056 −0.296767
\(206\) 8665.57i 2.93087i
\(207\) −216.392 −0.0726584
\(208\) 0 0
\(209\) −2372.98 −0.785369
\(210\) 1063.54i 0.349483i
\(211\) −2531.67 −0.826006 −0.413003 0.910730i \(-0.635520\pi\)
−0.413003 + 0.910730i \(0.635520\pi\)
\(212\) −7846.76 −2.54206
\(213\) − 2431.38i − 0.782139i
\(214\) − 8696.57i − 2.77797i
\(215\) 1200.24i 0.380723i
\(216\) − 4080.33i − 1.28533i
\(217\) 1301.86 0.407261
\(218\) −4087.17 −1.26981
\(219\) 4062.09i 1.25338i
\(220\) −1417.71 −0.434463
\(221\) 0 0
\(222\) 7356.93 2.22417
\(223\) 1195.53i 0.359008i 0.983757 + 0.179504i \(0.0574492\pi\)
−0.983757 + 0.179504i \(0.942551\pi\)
\(224\) 1783.24 0.531909
\(225\) 5671.16 1.68035
\(226\) − 1527.58i − 0.449617i
\(227\) 869.192i 0.254142i 0.991894 + 0.127071i \(0.0405577\pi\)
−0.991894 + 0.127071i \(0.959442\pi\)
\(228\) − 6695.25i − 1.94475i
\(229\) 4684.64i 1.35183i 0.736978 + 0.675916i \(0.236252\pi\)
−0.736978 + 0.675916i \(0.763748\pi\)
\(230\) −57.2348 −0.0164085
\(231\) −3273.66 −0.932430
\(232\) − 3085.52i − 0.873166i
\(233\) 4868.99 1.36900 0.684502 0.729011i \(-0.260020\pi\)
0.684502 + 0.729011i \(0.260020\pi\)
\(234\) 0 0
\(235\) −726.137 −0.201566
\(236\) 6632.95i 1.82953i
\(237\) 326.004 0.0893511
\(238\) 87.8920 0.0239378
\(239\) − 4807.53i − 1.30114i −0.759444 0.650572i \(-0.774529\pi\)
0.759444 0.650572i \(-0.225471\pi\)
\(240\) 59.0907i 0.0158929i
\(241\) 5875.96i 1.57056i 0.619143 + 0.785278i \(0.287480\pi\)
−0.619143 + 0.785278i \(0.712520\pi\)
\(242\) − 1018.12i − 0.270443i
\(243\) −2345.23 −0.619121
\(244\) 2066.03 0.542065
\(245\) − 706.368i − 0.184197i
\(246\) 12290.0 3.18528
\(247\) 0 0
\(248\) −2986.00 −0.764562
\(249\) 661.383i 0.168327i
\(250\) 3100.97 0.784490
\(251\) −5806.27 −1.46011 −0.730057 0.683386i \(-0.760506\pi\)
−0.730057 + 0.683386i \(0.760506\pi\)
\(252\) − 5930.02i − 1.48237i
\(253\) − 176.173i − 0.0437783i
\(254\) − 2832.24i − 0.699647i
\(255\) 49.1385i 0.0120673i
\(256\) −3841.83 −0.937947
\(257\) 1195.86 0.290256 0.145128 0.989413i \(-0.453641\pi\)
0.145128 + 0.989413i \(0.453641\pi\)
\(258\) − 16934.5i − 4.08641i
\(259\) 1775.66 0.426001
\(260\) 0 0
\(261\) 6812.83 1.61572
\(262\) − 6074.64i − 1.43241i
\(263\) 234.184 0.0549066 0.0274533 0.999623i \(-0.491260\pi\)
0.0274533 + 0.999623i \(0.491260\pi\)
\(264\) 7508.64 1.75047
\(265\) − 1720.19i − 0.398757i
\(266\) − 2625.32i − 0.605145i
\(267\) 1761.30i 0.403707i
\(268\) − 639.091i − 0.145667i
\(269\) −2668.27 −0.604785 −0.302393 0.953183i \(-0.597785\pi\)
−0.302393 + 0.953183i \(0.597785\pi\)
\(270\) 2382.94 0.537114
\(271\) 5701.28i 1.27796i 0.769222 + 0.638982i \(0.220644\pi\)
−0.769222 + 0.638982i \(0.779356\pi\)
\(272\) 4.88331 0.00108858
\(273\) 0 0
\(274\) −2837.35 −0.625587
\(275\) 4617.12i 1.01245i
\(276\) 497.065 0.108405
\(277\) 7152.49 1.55145 0.775725 0.631072i \(-0.217385\pi\)
0.775725 + 0.631072i \(0.217385\pi\)
\(278\) 1507.96i 0.325329i
\(279\) − 6593.09i − 1.41476i
\(280\) − 588.769i − 0.125663i
\(281\) − 6132.87i − 1.30198i −0.759086 0.650990i \(-0.774354\pi\)
0.759086 0.650990i \(-0.225646\pi\)
\(282\) 10245.3 2.16346
\(283\) −3377.15 −0.709367 −0.354683 0.934986i \(-0.615411\pi\)
−0.354683 + 0.934986i \(0.615411\pi\)
\(284\) 3585.70i 0.749198i
\(285\) 1467.76 0.305061
\(286\) 0 0
\(287\) 2966.29 0.610086
\(288\) − 9030.99i − 1.84776i
\(289\) −4908.94 −0.999173
\(290\) 1801.96 0.364879
\(291\) 10199.0i 2.05455i
\(292\) − 5990.60i − 1.20059i
\(293\) − 4704.77i − 0.938073i −0.883179 0.469037i \(-0.844601\pi\)
0.883179 0.469037i \(-0.155399\pi\)
\(294\) 9966.34i 1.97704i
\(295\) −1454.10 −0.286986
\(296\) −4072.75 −0.799742
\(297\) 7334.86i 1.43304i
\(298\) −8258.86 −1.60545
\(299\) 0 0
\(300\) −13027.0 −2.50704
\(301\) − 4087.28i − 0.782681i
\(302\) 1930.62 0.367864
\(303\) −8430.17 −1.59835
\(304\) − 145.863i − 0.0275192i
\(305\) 452.922i 0.0850303i
\(306\) − 445.118i − 0.0831560i
\(307\) 5130.49i 0.953787i 0.878961 + 0.476894i \(0.158237\pi\)
−0.878961 + 0.476894i \(0.841763\pi\)
\(308\) 4827.86 0.893159
\(309\) 16498.2 3.03738
\(310\) − 1743.84i − 0.319496i
\(311\) −7948.94 −1.44933 −0.724667 0.689099i \(-0.758006\pi\)
−0.724667 + 0.689099i \(0.758006\pi\)
\(312\) 0 0
\(313\) −8521.87 −1.53893 −0.769465 0.638689i \(-0.779477\pi\)
−0.769465 + 0.638689i \(0.779477\pi\)
\(314\) 6031.14i 1.08394i
\(315\) 1300.00 0.232529
\(316\) −480.776 −0.0855879
\(317\) 6662.46i 1.18044i 0.807241 + 0.590222i \(0.200960\pi\)
−0.807241 + 0.590222i \(0.799040\pi\)
\(318\) 24270.7i 4.27998i
\(319\) 5546.59i 0.973509i
\(320\) − 2334.23i − 0.407773i
\(321\) −16557.2 −2.87893
\(322\) 194.907 0.0337322
\(323\) − 121.297i − 0.0208951i
\(324\) −3949.74 −0.677253
\(325\) 0 0
\(326\) 16450.8 2.79486
\(327\) 7781.49i 1.31595i
\(328\) −6803.64 −1.14533
\(329\) 2472.78 0.414374
\(330\) 4385.09i 0.731489i
\(331\) 3911.77i 0.649578i 0.945786 + 0.324789i \(0.105293\pi\)
−0.945786 + 0.324789i \(0.894707\pi\)
\(332\) − 975.379i − 0.161238i
\(333\) − 8992.61i − 1.47986i
\(334\) 15579.7 2.55234
\(335\) 140.104 0.0228498
\(336\) − 201.227i − 0.0326722i
\(337\) 627.211 0.101384 0.0506919 0.998714i \(-0.483857\pi\)
0.0506919 + 0.998714i \(0.483857\pi\)
\(338\) 0 0
\(339\) −2908.34 −0.465957
\(340\) − 72.4674i − 0.0115591i
\(341\) 5367.69 0.852424
\(342\) −13295.6 −2.10217
\(343\) 5685.08i 0.894943i
\(344\) 9374.80i 1.46935i
\(345\) 108.968i 0.0170048i
\(346\) − 10684.2i − 1.66007i
\(347\) −3823.02 −0.591442 −0.295721 0.955274i \(-0.595560\pi\)
−0.295721 + 0.955274i \(0.595560\pi\)
\(348\) −15649.4 −2.41063
\(349\) 3410.67i 0.523120i 0.965187 + 0.261560i \(0.0842369\pi\)
−0.965187 + 0.261560i \(0.915763\pi\)
\(350\) −5108.10 −0.780112
\(351\) 0 0
\(352\) 7352.48 1.11332
\(353\) 5587.64i 0.842492i 0.906946 + 0.421246i \(0.138407\pi\)
−0.906946 + 0.421246i \(0.861593\pi\)
\(354\) 20516.3 3.08031
\(355\) −786.070 −0.117522
\(356\) − 2597.49i − 0.386704i
\(357\) − 167.336i − 0.0248077i
\(358\) 3042.06i 0.449100i
\(359\) 2230.14i 0.327861i 0.986472 + 0.163931i \(0.0524173\pi\)
−0.986472 + 0.163931i \(0.947583\pi\)
\(360\) −2981.75 −0.436533
\(361\) 3235.89 0.471774
\(362\) 3197.82i 0.464292i
\(363\) −1938.38 −0.280272
\(364\) 0 0
\(365\) 1313.28 0.188330
\(366\) − 6390.40i − 0.912655i
\(367\) −8699.14 −1.23731 −0.618653 0.785664i \(-0.712321\pi\)
−0.618653 + 0.785664i \(0.712321\pi\)
\(368\) 10.8291 0.00153398
\(369\) − 15022.4i − 2.11934i
\(370\) − 2378.51i − 0.334197i
\(371\) 5857.94i 0.819756i
\(372\) 15144.7i 2.11080i
\(373\) 10964.2 1.52199 0.760997 0.648755i \(-0.224710\pi\)
0.760997 + 0.648755i \(0.224710\pi\)
\(374\) 362.388 0.0501033
\(375\) − 5903.88i − 0.813000i
\(376\) −5671.70 −0.777914
\(377\) 0 0
\(378\) −8114.84 −1.10419
\(379\) − 13910.1i − 1.88526i −0.333835 0.942631i \(-0.608343\pi\)
0.333835 0.942631i \(-0.391657\pi\)
\(380\) −2164.58 −0.292213
\(381\) −5392.24 −0.725074
\(382\) 5934.03i 0.794794i
\(383\) 494.753i 0.0660071i 0.999455 + 0.0330035i \(0.0105073\pi\)
−0.999455 + 0.0330035i \(0.989493\pi\)
\(384\) 19976.7i 2.65477i
\(385\) 1058.38i 0.140104i
\(386\) 2368.97 0.312376
\(387\) −20699.5 −2.71891
\(388\) − 15041.0i − 1.96802i
\(389\) 4140.47 0.539666 0.269833 0.962907i \(-0.413032\pi\)
0.269833 + 0.962907i \(0.413032\pi\)
\(390\) 0 0
\(391\) 9.00524 0.00116474
\(392\) − 5517.30i − 0.710881i
\(393\) −11565.4 −1.48447
\(394\) 14236.8 1.82041
\(395\) − 105.398i − 0.0134256i
\(396\) − 24450.1i − 3.10269i
\(397\) − 1881.79i − 0.237895i −0.992901 0.118948i \(-0.962048\pi\)
0.992901 0.118948i \(-0.0379521\pi\)
\(398\) − 5642.90i − 0.710686i
\(399\) −4998.29 −0.627137
\(400\) −283.807 −0.0354759
\(401\) 421.765i 0.0525236i 0.999655 + 0.0262618i \(0.00836035\pi\)
−0.999655 + 0.0262618i \(0.991640\pi\)
\(402\) −1976.76 −0.245254
\(403\) 0 0
\(404\) 12432.5 1.53103
\(405\) − 865.876i − 0.106236i
\(406\) −6136.41 −0.750110
\(407\) 7321.23 0.891646
\(408\) 383.811i 0.0465722i
\(409\) − 2550.22i − 0.308313i −0.988046 0.154157i \(-0.950734\pi\)
0.988046 0.154157i \(-0.0492660\pi\)
\(410\) − 3973.37i − 0.478611i
\(411\) 5401.99i 0.648322i
\(412\) −24330.9 −2.90946
\(413\) 4951.79 0.589980
\(414\) − 987.083i − 0.117180i
\(415\) 213.826 0.0252923
\(416\) 0 0
\(417\) 2870.98 0.337152
\(418\) − 10824.5i − 1.26661i
\(419\) 12384.8 1.44400 0.722002 0.691891i \(-0.243222\pi\)
0.722002 + 0.691891i \(0.243222\pi\)
\(420\) −2986.17 −0.346929
\(421\) − 10463.0i − 1.21124i −0.795752 0.605622i \(-0.792924\pi\)
0.795752 0.605622i \(-0.207076\pi\)
\(422\) − 11548.3i − 1.33214i
\(423\) − 12523.1i − 1.43947i
\(424\) − 13436.1i − 1.53895i
\(425\) −236.008 −0.0269366
\(426\) 11090.9 1.26140
\(427\) − 1542.38i − 0.174803i
\(428\) 24417.9 2.75767
\(429\) 0 0
\(430\) −5474.94 −0.614012
\(431\) 3962.39i 0.442834i 0.975179 + 0.221417i \(0.0710682\pi\)
−0.975179 + 0.221417i \(0.928932\pi\)
\(432\) −450.863 −0.0502133
\(433\) 8394.14 0.931632 0.465816 0.884882i \(-0.345761\pi\)
0.465816 + 0.884882i \(0.345761\pi\)
\(434\) 5938.48i 0.656812i
\(435\) − 3430.73i − 0.378140i
\(436\) − 11475.8i − 1.26053i
\(437\) − 268.984i − 0.0294446i
\(438\) −18529.4 −2.02140
\(439\) −10174.5 −1.10616 −0.553079 0.833129i \(-0.686547\pi\)
−0.553079 + 0.833129i \(0.686547\pi\)
\(440\) − 2427.56i − 0.263021i
\(441\) 12182.2 1.31543
\(442\) 0 0
\(443\) −5880.74 −0.630705 −0.315353 0.948975i \(-0.602123\pi\)
−0.315353 + 0.948975i \(0.602123\pi\)
\(444\) 20656.5i 2.20792i
\(445\) 569.431 0.0606598
\(446\) −5453.48 −0.578990
\(447\) 15723.9i 1.66379i
\(448\) 7948.97i 0.838289i
\(449\) 10664.9i 1.12095i 0.828172 + 0.560475i \(0.189381\pi\)
−0.828172 + 0.560475i \(0.810619\pi\)
\(450\) 25869.3i 2.70998i
\(451\) 12230.3 1.27695
\(452\) 4289.10 0.446332
\(453\) − 3675.68i − 0.381233i
\(454\) −3964.87 −0.409869
\(455\) 0 0
\(456\) 11464.3 1.17734
\(457\) 14828.9i 1.51787i 0.651169 + 0.758933i \(0.274279\pi\)
−0.651169 + 0.758933i \(0.725721\pi\)
\(458\) −21369.2 −2.18017
\(459\) −374.928 −0.0381266
\(460\) − 160.702i − 0.0162886i
\(461\) 9711.70i 0.981169i 0.871394 + 0.490585i \(0.163217\pi\)
−0.871394 + 0.490585i \(0.836783\pi\)
\(462\) − 14933.0i − 1.50378i
\(463\) 11353.5i 1.13962i 0.821777 + 0.569809i \(0.192983\pi\)
−0.821777 + 0.569809i \(0.807017\pi\)
\(464\) −340.941 −0.0341116
\(465\) −3320.07 −0.331107
\(466\) 22210.1i 2.20787i
\(467\) −6451.31 −0.639252 −0.319626 0.947544i \(-0.603557\pi\)
−0.319626 + 0.947544i \(0.603557\pi\)
\(468\) 0 0
\(469\) −477.109 −0.0469741
\(470\) − 3312.31i − 0.325076i
\(471\) 11482.6 1.12333
\(472\) −11357.7 −1.10758
\(473\) − 16852.3i − 1.63820i
\(474\) 1487.08i 0.144101i
\(475\) 7049.50i 0.680954i
\(476\) 246.780i 0.0237629i
\(477\) 29666.8 2.84770
\(478\) 21929.8 2.09842
\(479\) − 9566.46i − 0.912531i −0.889844 0.456266i \(-0.849187\pi\)
0.889844 0.456266i \(-0.150813\pi\)
\(480\) −4547.73 −0.432447
\(481\) 0 0
\(482\) −26803.5 −2.53292
\(483\) − 371.080i − 0.0349581i
\(484\) 2858.64 0.268467
\(485\) 3297.35 0.308711
\(486\) − 10697.9i − 0.998489i
\(487\) − 4917.11i − 0.457527i −0.973482 0.228764i \(-0.926532\pi\)
0.973482 0.228764i \(-0.0734683\pi\)
\(488\) 3537.68i 0.328162i
\(489\) − 31320.3i − 2.89643i
\(490\) 3222.14 0.297064
\(491\) −2950.82 −0.271220 −0.135610 0.990762i \(-0.543299\pi\)
−0.135610 + 0.990762i \(0.543299\pi\)
\(492\) 34507.3i 3.16201i
\(493\) −283.519 −0.0259007
\(494\) 0 0
\(495\) 5360.04 0.486699
\(496\) 329.944i 0.0298688i
\(497\) 2676.88 0.241599
\(498\) −3016.93 −0.271470
\(499\) − 13430.1i − 1.20484i −0.798180 0.602418i \(-0.794204\pi\)
0.798180 0.602418i \(-0.205796\pi\)
\(500\) 8706.79i 0.778759i
\(501\) − 29661.9i − 2.64510i
\(502\) − 26485.6i − 2.35480i
\(503\) 1320.29 0.117035 0.0585175 0.998286i \(-0.481363\pi\)
0.0585175 + 0.998286i \(0.481363\pi\)
\(504\) 10154.0 0.897414
\(505\) 2725.49i 0.240164i
\(506\) 803.623 0.0706036
\(507\) 0 0
\(508\) 7952.25 0.694536
\(509\) − 20916.4i − 1.82143i −0.413041 0.910713i \(-0.635533\pi\)
0.413041 0.910713i \(-0.364467\pi\)
\(510\) −224.148 −0.0194616
\(511\) −4472.24 −0.387163
\(512\) 877.105i 0.0757089i
\(513\) 11199.0i 0.963837i
\(514\) 5454.98i 0.468110i
\(515\) − 5333.90i − 0.456388i
\(516\) 47548.0 4.05656
\(517\) 10195.5 0.867311
\(518\) 8099.77i 0.687033i
\(519\) −20341.4 −1.72040
\(520\) 0 0
\(521\) −10104.2 −0.849661 −0.424831 0.905273i \(-0.639666\pi\)
−0.424831 + 0.905273i \(0.639666\pi\)
\(522\) 31077.1i 2.60576i
\(523\) 7131.22 0.596227 0.298113 0.954530i \(-0.403643\pi\)
0.298113 + 0.954530i \(0.403643\pi\)
\(524\) 17056.2 1.42195
\(525\) 9725.21i 0.808463i
\(526\) 1068.24i 0.0885507i
\(527\) 274.374i 0.0226792i
\(528\) − 829.682i − 0.0683849i
\(529\) −12147.0 −0.998359
\(530\) 7846.76 0.643097
\(531\) − 25077.7i − 2.04949i
\(532\) 7371.27 0.600724
\(533\) 0 0
\(534\) −8034.26 −0.651080
\(535\) 5352.98i 0.432579i
\(536\) 1094.32 0.0881856
\(537\) 5791.72 0.465421
\(538\) − 12171.5i − 0.975369i
\(539\) 9917.98i 0.792575i
\(540\) 6690.72i 0.533190i
\(541\) 16831.7i 1.33762i 0.743435 + 0.668809i \(0.233195\pi\)
−0.743435 + 0.668809i \(0.766805\pi\)
\(542\) −26006.7 −2.06104
\(543\) 6088.27 0.481165
\(544\) 375.828i 0.0296204i
\(545\) 2515.77 0.197731
\(546\) 0 0
\(547\) −9560.55 −0.747312 −0.373656 0.927567i \(-0.621896\pi\)
−0.373656 + 0.927567i \(0.621896\pi\)
\(548\) − 7966.62i − 0.621017i
\(549\) −7811.19 −0.607238
\(550\) −21061.2 −1.63282
\(551\) 8468.64i 0.654766i
\(552\) 851.129i 0.0656276i
\(553\) 358.920i 0.0276001i
\(554\) 32626.5i 2.50210i
\(555\) −4528.40 −0.346342
\(556\) −4234.00 −0.322952
\(557\) − 22827.9i − 1.73653i −0.496097 0.868267i \(-0.665234\pi\)
0.496097 0.868267i \(-0.334766\pi\)
\(558\) 30074.7 2.28166
\(559\) 0 0
\(560\) −65.0571 −0.00490922
\(561\) − 689.944i − 0.0519242i
\(562\) 27975.4 2.09977
\(563\) −21629.7 −1.61916 −0.809578 0.587013i \(-0.800304\pi\)
−0.809578 + 0.587013i \(0.800304\pi\)
\(564\) 28766.3i 2.14766i
\(565\) 940.271i 0.0700133i
\(566\) − 15405.1i − 1.14403i
\(567\) 2948.65i 0.218398i
\(568\) −6139.83 −0.453559
\(569\) 10589.9 0.780229 0.390114 0.920766i \(-0.372436\pi\)
0.390114 + 0.920766i \(0.372436\pi\)
\(570\) 6695.25i 0.491988i
\(571\) 1757.27 0.128791 0.0643954 0.997924i \(-0.479488\pi\)
0.0643954 + 0.997924i \(0.479488\pi\)
\(572\) 0 0
\(573\) 11297.7 0.823679
\(574\) 13530.9i 0.983917i
\(575\) −523.365 −0.0379580
\(576\) 40256.6 2.91208
\(577\) 13580.6i 0.979840i 0.871767 + 0.489920i \(0.162974\pi\)
−0.871767 + 0.489920i \(0.837026\pi\)
\(578\) − 22392.4i − 1.61142i
\(579\) − 4510.23i − 0.323729i
\(580\) 5059.49i 0.362214i
\(581\) −728.163 −0.0519953
\(582\) −46523.2 −3.31349
\(583\) 24152.9i 1.71580i
\(584\) 10257.8 0.726831
\(585\) 0 0
\(586\) 21461.0 1.51288
\(587\) 957.326i 0.0673136i 0.999433 + 0.0336568i \(0.0107153\pi\)
−0.999433 + 0.0336568i \(0.989285\pi\)
\(588\) −27983.1 −1.96259
\(589\) 8195.49 0.573327
\(590\) − 6632.95i − 0.462838i
\(591\) − 27105.2i − 1.88657i
\(592\) 450.026i 0.0312431i
\(593\) 6729.49i 0.466015i 0.972475 + 0.233007i \(0.0748567\pi\)
−0.972475 + 0.233007i \(0.925143\pi\)
\(594\) −33458.4 −2.31113
\(595\) −54.1000 −0.00372754
\(596\) − 23188.9i − 1.59372i
\(597\) −10743.4 −0.736514
\(598\) 0 0
\(599\) 2281.52 0.155626 0.0778132 0.996968i \(-0.475206\pi\)
0.0778132 + 0.996968i \(0.475206\pi\)
\(600\) − 22306.2i − 1.51775i
\(601\) 6401.42 0.434475 0.217237 0.976119i \(-0.430295\pi\)
0.217237 + 0.976119i \(0.430295\pi\)
\(602\) 18644.4 1.26227
\(603\) 2416.26i 0.163180i
\(604\) 5420.74i 0.365177i
\(605\) 626.682i 0.0421128i
\(606\) − 38454.7i − 2.57775i
\(607\) 2779.24 0.185841 0.0929207 0.995674i \(-0.470380\pi\)
0.0929207 + 0.995674i \(0.470380\pi\)
\(608\) 11225.9 0.748800
\(609\) 11683.0i 0.777371i
\(610\) −2066.03 −0.137133
\(611\) 0 0
\(612\) 1249.79 0.0825485
\(613\) − 22620.8i − 1.49045i −0.666812 0.745226i \(-0.732342\pi\)
0.666812 0.745226i \(-0.267658\pi\)
\(614\) −23403.0 −1.53822
\(615\) −7564.82 −0.496005
\(616\) 8266.80i 0.540712i
\(617\) − 21974.0i − 1.43378i −0.697187 0.716889i \(-0.745565\pi\)
0.697187 0.716889i \(-0.254435\pi\)
\(618\) 75257.5i 4.89854i
\(619\) 7145.19i 0.463957i 0.972721 + 0.231979i \(0.0745199\pi\)
−0.972721 + 0.231979i \(0.925480\pi\)
\(620\) 4896.30 0.317162
\(621\) −831.430 −0.0537265
\(622\) − 36259.5i − 2.33742i
\(623\) −1939.14 −0.124703
\(624\) 0 0
\(625\) 12730.8 0.814773
\(626\) − 38873.0i − 2.48191i
\(627\) −20608.5 −1.31264
\(628\) −16934.0 −1.07602
\(629\) 374.231i 0.0237227i
\(630\) 5930.02i 0.375012i
\(631\) − 18883.2i − 1.19133i −0.803232 0.595666i \(-0.796888\pi\)
0.803232 0.595666i \(-0.203112\pi\)
\(632\) − 823.239i − 0.0518144i
\(633\) −21986.7 −1.38056
\(634\) −30391.1 −1.90376
\(635\) 1743.32i 0.108947i
\(636\) −68146.4 −4.24871
\(637\) 0 0
\(638\) −25301.1 −1.57003
\(639\) − 13556.7i − 0.839274i
\(640\) 6458.50 0.398898
\(641\) 3631.08 0.223743 0.111871 0.993723i \(-0.464316\pi\)
0.111871 + 0.993723i \(0.464316\pi\)
\(642\) − 75526.7i − 4.64299i
\(643\) 10772.0i 0.660660i 0.943866 + 0.330330i \(0.107160\pi\)
−0.943866 + 0.330330i \(0.892840\pi\)
\(644\) 547.253i 0.0334857i
\(645\) 10423.6i 0.636327i
\(646\) 553.301 0.0336987
\(647\) −15148.3 −0.920464 −0.460232 0.887799i \(-0.652234\pi\)
−0.460232 + 0.887799i \(0.652234\pi\)
\(648\) − 6763.18i − 0.410004i
\(649\) 20416.7 1.23487
\(650\) 0 0
\(651\) 11306.2 0.680682
\(652\) 46189.8i 2.77444i
\(653\) 7358.89 0.441004 0.220502 0.975387i \(-0.429230\pi\)
0.220502 + 0.975387i \(0.429230\pi\)
\(654\) −35495.7 −2.12231
\(655\) 3739.11i 0.223052i
\(656\) 751.780i 0.0447441i
\(657\) 22649.1i 1.34494i
\(658\) 11279.7i 0.668282i
\(659\) 28333.3 1.67482 0.837411 0.546574i \(-0.184068\pi\)
0.837411 + 0.546574i \(0.184068\pi\)
\(660\) −12312.3 −0.726146
\(661\) 1109.68i 0.0652975i 0.999467 + 0.0326488i \(0.0103943\pi\)
−0.999467 + 0.0326488i \(0.989606\pi\)
\(662\) −17843.8 −1.04761
\(663\) 0 0
\(664\) 1670.15 0.0976121
\(665\) 1615.96i 0.0942317i
\(666\) 41020.3 2.38664
\(667\) −628.724 −0.0364982
\(668\) 43744.1i 2.53369i
\(669\) 10382.8i 0.600032i
\(670\) 639.091i 0.0368511i
\(671\) − 6359.39i − 0.365874i
\(672\) 15486.8 0.889013
\(673\) −20979.1 −1.20161 −0.600806 0.799395i \(-0.705154\pi\)
−0.600806 + 0.799395i \(0.705154\pi\)
\(674\) 2861.06i 0.163507i
\(675\) 21790.0 1.24251
\(676\) 0 0
\(677\) 30941.9 1.75656 0.878282 0.478142i \(-0.158690\pi\)
0.878282 + 0.478142i \(0.158690\pi\)
\(678\) − 13266.5i − 0.751473i
\(679\) −11228.8 −0.634641
\(680\) 124.087 0.00699780
\(681\) 7548.64i 0.424764i
\(682\) 24485.0i 1.37475i
\(683\) 5426.21i 0.303995i 0.988381 + 0.151997i \(0.0485705\pi\)
−0.988381 + 0.151997i \(0.951429\pi\)
\(684\) − 37330.9i − 2.08682i
\(685\) 1746.47 0.0974150
\(686\) −25932.8 −1.44332
\(687\) 40684.5i 2.25940i
\(688\) 1035.89 0.0574023
\(689\) 0 0
\(690\) −497.065 −0.0274245
\(691\) 33792.7i 1.86040i 0.367056 + 0.930199i \(0.380366\pi\)
−0.367056 + 0.930199i \(0.619634\pi\)
\(692\) 29998.7 1.64795
\(693\) −18253.1 −1.00054
\(694\) − 17438.9i − 0.953849i
\(695\) − 928.192i − 0.0506595i
\(696\) − 26796.7i − 1.45938i
\(697\) 625.164i 0.0339738i
\(698\) −15557.9 −0.843662
\(699\) 42285.5 2.28810
\(700\) − 14342.3i − 0.774413i
\(701\) −6905.96 −0.372089 −0.186045 0.982541i \(-0.559567\pi\)
−0.186045 + 0.982541i \(0.559567\pi\)
\(702\) 0 0
\(703\) 11178.2 0.599707
\(704\) 32774.5i 1.75459i
\(705\) −6306.25 −0.336889
\(706\) −25488.3 −1.35873
\(707\) − 9281.37i − 0.493723i
\(708\) 57604.9i 3.05781i
\(709\) − 2007.13i − 0.106318i −0.998586 0.0531589i \(-0.983071\pi\)
0.998586 0.0531589i \(-0.0169290\pi\)
\(710\) − 3585.70i − 0.189534i
\(711\) 1817.71 0.0958782
\(712\) 4447.71 0.234108
\(713\) 608.445i 0.0319585i
\(714\) 763.312 0.0400088
\(715\) 0 0
\(716\) −8541.38 −0.445819
\(717\) − 41751.8i − 2.17469i
\(718\) −10172.9 −0.528759
\(719\) 12787.4 0.663270 0.331635 0.943408i \(-0.392400\pi\)
0.331635 + 0.943408i \(0.392400\pi\)
\(720\) 329.474i 0.0170538i
\(721\) 18164.1i 0.938231i
\(722\) 14760.7i 0.760854i
\(723\) 51030.7i 2.62497i
\(724\) −8978.72 −0.460900
\(725\) 16477.5 0.844081
\(726\) − 8842.03i − 0.452009i
\(727\) 6090.70 0.310717 0.155359 0.987858i \(-0.450347\pi\)
0.155359 + 0.987858i \(0.450347\pi\)
\(728\) 0 0
\(729\) −28693.9 −1.45780
\(730\) 5990.60i 0.303729i
\(731\) 861.420 0.0435852
\(732\) 17942.7 0.905988
\(733\) 38846.5i 1.95747i 0.205117 + 0.978737i \(0.434243\pi\)
−0.205117 + 0.978737i \(0.565757\pi\)
\(734\) − 39681.6i − 1.99547i
\(735\) − 6134.57i − 0.307860i
\(736\) 833.427i 0.0417399i
\(737\) −1967.17 −0.0983198
\(738\) 68525.5 3.41797
\(739\) 14457.5i 0.719661i 0.933018 + 0.359830i \(0.117165\pi\)
−0.933018 + 0.359830i \(0.882835\pi\)
\(740\) 6678.29 0.331755
\(741\) 0 0
\(742\) −26721.3 −1.32206
\(743\) 1277.80i 0.0630929i 0.999502 + 0.0315464i \(0.0100432\pi\)
−0.999502 + 0.0315464i \(0.989957\pi\)
\(744\) −25932.4 −1.27786
\(745\) 5083.56 0.249996
\(746\) 50013.7i 2.45460i
\(747\) 3687.69i 0.180623i
\(748\) 1017.50i 0.0497373i
\(749\) − 18229.0i − 0.889285i
\(750\) 26930.9 1.31117
\(751\) 13007.9 0.632042 0.316021 0.948752i \(-0.397653\pi\)
0.316021 + 0.948752i \(0.397653\pi\)
\(752\) 626.706i 0.0303904i
\(753\) −50425.5 −2.44038
\(754\) 0 0
\(755\) −1188.35 −0.0572829
\(756\) − 22784.6i − 1.09612i
\(757\) −10723.2 −0.514850 −0.257425 0.966298i \(-0.582874\pi\)
−0.257425 + 0.966298i \(0.582874\pi\)
\(758\) 63451.7 3.04046
\(759\) − 1530.00i − 0.0731694i
\(760\) − 3706.44i − 0.176904i
\(761\) 13621.8i 0.648870i 0.945908 + 0.324435i \(0.105174\pi\)
−0.945908 + 0.324435i \(0.894826\pi\)
\(762\) − 24597.0i − 1.16936i
\(763\) −8567.19 −0.406491
\(764\) −16661.4 −0.788988
\(765\) 273.983i 0.0129489i
\(766\) −2256.84 −0.106453
\(767\) 0 0
\(768\) −33365.0 −1.56765
\(769\) 8495.15i 0.398365i 0.979962 + 0.199183i \(0.0638287\pi\)
−0.979962 + 0.199183i \(0.936171\pi\)
\(770\) −4827.86 −0.225953
\(771\) 10385.6 0.485123
\(772\) 6651.50i 0.310094i
\(773\) − 34262.5i − 1.59423i −0.603830 0.797113i \(-0.706359\pi\)
0.603830 0.797113i \(-0.293641\pi\)
\(774\) − 94422.0i − 4.38492i
\(775\) − 15946.0i − 0.739094i
\(776\) 25754.9 1.19143
\(777\) 15421.0 0.712002
\(778\) 18887.0i 0.870348i
\(779\) 18673.5 0.858854
\(780\) 0 0
\(781\) 11037.1 0.505681
\(782\) 41.0779i 0.00187844i
\(783\) 26176.5 1.19473
\(784\) −609.644 −0.0277717
\(785\) − 3712.33i − 0.168788i
\(786\) − 52756.2i − 2.39408i
\(787\) − 12642.6i − 0.572629i −0.958136 0.286315i \(-0.907570\pi\)
0.958136 0.286315i \(-0.0924303\pi\)
\(788\) 39973.6i 1.80711i
\(789\) 2033.81 0.0917688
\(790\) 480.776 0.0216522
\(791\) − 3202.00i − 0.143932i
\(792\) 41866.2 1.87834
\(793\) 0 0
\(794\) 8583.89 0.383666
\(795\) − 14939.3i − 0.666468i
\(796\) 15843.9 0.705494
\(797\) −19084.4 −0.848184 −0.424092 0.905619i \(-0.639407\pi\)
−0.424092 + 0.905619i \(0.639407\pi\)
\(798\) − 22800.0i − 1.01142i
\(799\) 521.154i 0.0230752i
\(800\) − 21842.3i − 0.965304i
\(801\) 9820.53i 0.433198i
\(802\) −1923.90 −0.0847075
\(803\) −18439.5 −0.810357
\(804\) − 5550.28i − 0.243462i
\(805\) −119.971 −0.00525269
\(806\) 0 0
\(807\) −23173.0 −1.01082
\(808\) 21288.2i 0.926878i
\(809\) 11610.0 0.504558 0.252279 0.967655i \(-0.418820\pi\)
0.252279 + 0.967655i \(0.418820\pi\)
\(810\) 3949.74 0.171333
\(811\) − 9613.36i − 0.416240i −0.978103 0.208120i \(-0.933266\pi\)
0.978103 0.208120i \(-0.0667345\pi\)
\(812\) − 17229.6i − 0.744630i
\(813\) 49513.7i 2.13594i
\(814\) 33396.2i 1.43800i
\(815\) −10125.9 −0.435208
\(816\) 42.4099 0.00181941
\(817\) − 25730.4i − 1.10183i
\(818\) 11632.9 0.497233
\(819\) 0 0
\(820\) 11156.3 0.475115
\(821\) 26481.5i 1.12571i 0.826555 + 0.562856i \(0.190297\pi\)
−0.826555 + 0.562856i \(0.809703\pi\)
\(822\) −24641.5 −1.04558
\(823\) −13814.5 −0.585107 −0.292553 0.956249i \(-0.594505\pi\)
−0.292553 + 0.956249i \(0.594505\pi\)
\(824\) − 41662.0i − 1.76136i
\(825\) 40098.1i 1.69216i
\(826\) 22587.8i 0.951491i
\(827\) − 44401.0i − 1.86696i −0.358633 0.933479i \(-0.616757\pi\)
0.358633 0.933479i \(-0.383243\pi\)
\(828\) 2771.50 0.116324
\(829\) −24337.4 −1.01963 −0.509815 0.860284i \(-0.670286\pi\)
−0.509815 + 0.860284i \(0.670286\pi\)
\(830\) 975.379i 0.0407902i
\(831\) 62116.9 2.59303
\(832\) 0 0
\(833\) −506.966 −0.0210868
\(834\) 13096.1i 0.543743i
\(835\) −9589.73 −0.397445
\(836\) 30392.5 1.25735
\(837\) − 25332.2i − 1.04613i
\(838\) 56494.0i 2.32882i
\(839\) − 24680.1i − 1.01556i −0.861488 0.507778i \(-0.830467\pi\)
0.861488 0.507778i \(-0.169533\pi\)
\(840\) − 5113.26i − 0.210029i
\(841\) −4594.43 −0.188381
\(842\) 47727.4 1.95344
\(843\) − 53261.9i − 2.17608i
\(844\) 32425.0 1.32241
\(845\) 0 0
\(846\) 57124.8 2.32150
\(847\) − 2134.10i − 0.0865744i
\(848\) −1484.65 −0.0601214
\(849\) −29329.4 −1.18561
\(850\) − 1076.56i − 0.0434421i
\(851\) 829.885i 0.0334290i
\(852\) 31140.6i 1.25218i
\(853\) − 10151.7i − 0.407490i −0.979024 0.203745i \(-0.934689\pi\)
0.979024 0.203745i \(-0.0653113\pi\)
\(854\) 7035.65 0.281914
\(855\) 8183.81 0.327345
\(856\) 41811.1i 1.66948i
\(857\) −2028.92 −0.0808713 −0.0404357 0.999182i \(-0.512875\pi\)
−0.0404357 + 0.999182i \(0.512875\pi\)
\(858\) 0 0
\(859\) 6655.76 0.264367 0.132184 0.991225i \(-0.457801\pi\)
0.132184 + 0.991225i \(0.457801\pi\)
\(860\) − 15372.3i − 0.609526i
\(861\) 25761.2 1.01967
\(862\) −18074.6 −0.714182
\(863\) − 45690.8i − 1.80224i −0.433568 0.901121i \(-0.642746\pi\)
0.433568 0.901121i \(-0.357254\pi\)
\(864\) − 34699.2i − 1.36631i
\(865\) 6576.42i 0.258503i
\(866\) 38290.3i 1.50249i
\(867\) −42632.5 −1.66998
\(868\) −16673.9 −0.652014
\(869\) 1479.87i 0.0577688i
\(870\) 15649.4 0.609846
\(871\) 0 0
\(872\) 19650.1 0.763117
\(873\) 56866.8i 2.20464i
\(874\) 1226.99 0.0474868
\(875\) 6500.00 0.251132
\(876\) − 52026.3i − 2.00663i
\(877\) − 30447.5i − 1.17234i −0.810189 0.586168i \(-0.800636\pi\)
0.810189 0.586168i \(-0.199364\pi\)
\(878\) − 46411.6i − 1.78396i
\(879\) − 40859.3i − 1.56786i
\(880\) −268.237 −0.0102753
\(881\) −32542.0 −1.24446 −0.622230 0.782835i \(-0.713773\pi\)
−0.622230 + 0.782835i \(0.713773\pi\)
\(882\) 55569.6i 2.12146i
\(883\) −27641.9 −1.05348 −0.526741 0.850026i \(-0.676586\pi\)
−0.526741 + 0.850026i \(0.676586\pi\)
\(884\) 0 0
\(885\) −12628.4 −0.479658
\(886\) − 26825.3i − 1.01717i
\(887\) 40099.9 1.51795 0.758976 0.651119i \(-0.225700\pi\)
0.758976 + 0.651119i \(0.225700\pi\)
\(888\) −35370.4 −1.33666
\(889\) − 5936.70i − 0.223971i
\(890\) 2597.49i 0.0978293i
\(891\) 12157.6i 0.457121i
\(892\) − 15312.1i − 0.574761i
\(893\) 15566.8 0.583339
\(894\) −71725.4 −2.68328
\(895\) − 1872.47i − 0.0699328i
\(896\) −21993.8 −0.820044
\(897\) 0 0
\(898\) −48648.4 −1.80781
\(899\) − 19156.1i − 0.710670i
\(900\) −72634.9 −2.69018
\(901\) −1234.60 −0.0456497
\(902\) 55789.3i 2.05940i
\(903\) − 35496.7i − 1.30814i
\(904\) 7344.26i 0.270206i
\(905\) − 1968.35i − 0.0722984i
\(906\) 16766.8 0.614835
\(907\) 36824.9 1.34812 0.674062 0.738674i \(-0.264548\pi\)
0.674062 + 0.738674i \(0.264548\pi\)
\(908\) − 11132.4i − 0.406874i
\(909\) −47004.3 −1.71511
\(910\) 0 0
\(911\) 34520.5 1.25545 0.627725 0.778435i \(-0.283986\pi\)
0.627725 + 0.778435i \(0.283986\pi\)
\(912\) − 1266.77i − 0.0459946i
\(913\) −3002.29 −0.108830
\(914\) −67642.6 −2.44794
\(915\) 3933.47i 0.142117i
\(916\) − 59999.8i − 2.16424i
\(917\) − 12733.2i − 0.458545i
\(918\) − 1710.25i − 0.0614888i
\(919\) 23522.8 0.844336 0.422168 0.906518i \(-0.361269\pi\)
0.422168 + 0.906518i \(0.361269\pi\)
\(920\) 275.171 0.00986101
\(921\) 44556.6i 1.59412i
\(922\) −44300.4 −1.58238
\(923\) 0 0
\(924\) 41928.3 1.49279
\(925\) − 21749.5i − 0.773102i
\(926\) −51789.7 −1.83792
\(927\) 91989.6 3.25926
\(928\) − 26239.4i − 0.928180i
\(929\) 24563.2i 0.867482i 0.901038 + 0.433741i \(0.142807\pi\)
−0.901038 + 0.433741i \(0.857193\pi\)
\(930\) − 15144.7i − 0.533994i
\(931\) 15143.0i 0.533073i
\(932\) −62360.9 −2.19174
\(933\) −69033.8 −2.42236
\(934\) − 29428.0i − 1.03096i
\(935\) −223.060 −0.00780197
\(936\) 0 0
\(937\) −12115.6 −0.422411 −0.211206 0.977442i \(-0.567739\pi\)
−0.211206 + 0.977442i \(0.567739\pi\)
\(938\) − 2176.36i − 0.0757576i
\(939\) −74009.6 −2.57211
\(940\) 9300.19 0.322701
\(941\) − 14898.3i − 0.516123i −0.966128 0.258062i \(-0.916916\pi\)
0.966128 0.258062i \(-0.0830837\pi\)
\(942\) 52378.4i 1.81166i
\(943\) 1386.35i 0.0478745i
\(944\) 1254.99i 0.0432695i
\(945\) 4994.91 0.171941
\(946\) 76872.7 2.64201
\(947\) 7434.32i 0.255103i 0.991832 + 0.127552i \(0.0407119\pi\)
−0.991832 + 0.127552i \(0.959288\pi\)
\(948\) −4175.38 −0.143049
\(949\) 0 0
\(950\) −32156.7 −1.09821
\(951\) 57861.2i 1.97295i
\(952\) −422.564 −0.0143859
\(953\) 23528.6 0.799754 0.399877 0.916569i \(-0.369053\pi\)
0.399877 + 0.916569i \(0.369053\pi\)
\(954\) 135327.i 4.59263i
\(955\) − 3652.56i − 0.123764i
\(956\) 61573.8i 2.08309i
\(957\) 48170.2i 1.62709i
\(958\) 43637.9 1.47169
\(959\) −5947.43 −0.200263
\(960\) − 20272.0i − 0.681536i
\(961\) 11252.7 0.377723
\(962\) 0 0
\(963\) −92318.7 −3.08923
\(964\) − 75257.9i − 2.51441i
\(965\) −1458.17 −0.0486425
\(966\) 1692.70 0.0563787
\(967\) − 23558.0i − 0.783427i −0.920087 0.391713i \(-0.871882\pi\)
0.920087 0.391713i \(-0.128118\pi\)
\(968\) 4894.88i 0.162528i
\(969\) − 1053.42i − 0.0349234i
\(970\) 15041.0i 0.497875i
\(971\) −262.338 −0.00867026 −0.00433513 0.999991i \(-0.501380\pi\)
−0.00433513 + 0.999991i \(0.501380\pi\)
\(972\) 30037.1 0.991194
\(973\) 3160.86i 0.104144i
\(974\) 22429.7 0.737878
\(975\) 0 0
\(976\) 390.903 0.0128202
\(977\) − 33144.4i − 1.08535i −0.839944 0.542673i \(-0.817412\pi\)
0.839944 0.542673i \(-0.182588\pi\)
\(978\) 142869. 4.67122
\(979\) −7995.28 −0.261011
\(980\) 9047.00i 0.294894i
\(981\) 43387.5i 1.41208i
\(982\) − 13460.3i − 0.437410i
\(983\) − 4866.80i − 0.157911i −0.996878 0.0789557i \(-0.974841\pi\)
0.996878 0.0789557i \(-0.0251586\pi\)
\(984\) −59087.3 −1.91426
\(985\) −8763.17 −0.283470
\(986\) − 1293.28i − 0.0417714i
\(987\) 21475.3 0.692569
\(988\) 0 0
\(989\) 1910.26 0.0614184
\(990\) 24450.1i 0.784924i
\(991\) 12533.9 0.401770 0.200885 0.979615i \(-0.435618\pi\)
0.200885 + 0.979615i \(0.435618\pi\)
\(992\) −25393.1 −0.812733
\(993\) 33972.4i 1.08568i
\(994\) 12210.7i 0.389639i
\(995\) 3473.37i 0.110666i
\(996\) − 8470.83i − 0.269487i
\(997\) −3560.92 −0.113115 −0.0565574 0.998399i \(-0.518012\pi\)
−0.0565574 + 0.998399i \(0.518012\pi\)
\(998\) 61262.1 1.94310
\(999\) − 34551.8i − 1.09426i
Display \(a_p\) with \(p\) up to: 50 250 1000 (See \(a_n\) instead) (See \(a_n\) instead) (See \(a_n\) instead) Display \(a_n\) with \(n\) up to: 50 250 1000 (See only \(a_p\)) (See only \(a_p\)) (See only \(a_p\))

Twists

       By twisting character
Char Parity Ord Type Twist Min Dim
1.1 even 1 trivial 169.4.b.e.168.4 4
13.2 odd 12 169.4.c.f.22.1 4
13.3 even 3 169.4.e.g.147.1 8
13.4 even 6 169.4.e.g.23.1 8
13.5 odd 4 169.4.a.j.1.2 2
13.6 odd 12 169.4.c.f.146.1 4
13.7 odd 12 13.4.c.b.3.2 4
13.8 odd 4 169.4.a.f.1.1 2
13.9 even 3 169.4.e.g.23.4 8
13.10 even 6 169.4.e.g.147.4 8
13.11 odd 12 13.4.c.b.9.2 yes 4
13.12 even 2 inner 169.4.b.e.168.1 4
39.5 even 4 1521.4.a.l.1.1 2
39.8 even 4 1521.4.a.t.1.2 2
39.11 even 12 117.4.g.d.100.1 4
39.20 even 12 117.4.g.d.55.1 4
52.7 even 12 208.4.i.e.81.2 4
52.11 even 12 208.4.i.e.113.2 4
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
13.4.c.b.3.2 4 13.7 odd 12
13.4.c.b.9.2 yes 4 13.11 odd 12
117.4.g.d.55.1 4 39.20 even 12
117.4.g.d.100.1 4 39.11 even 12
169.4.a.f.1.1 2 13.8 odd 4
169.4.a.j.1.2 2 13.5 odd 4
169.4.b.e.168.1 4 13.12 even 2 inner
169.4.b.e.168.4 4 1.1 even 1 trivial
169.4.c.f.22.1 4 13.2 odd 12
169.4.c.f.146.1 4 13.6 odd 12
169.4.e.g.23.1 8 13.4 even 6
169.4.e.g.23.4 8 13.9 even 3
169.4.e.g.147.1 8 13.3 even 3
169.4.e.g.147.4 8 13.10 even 6
208.4.i.e.81.2 4 52.7 even 12
208.4.i.e.113.2 4 52.11 even 12
1521.4.a.l.1.1 2 39.5 even 4
1521.4.a.t.1.2 2 39.8 even 4