Properties

Label 242.4.c.q.81.2
Level $242$
Weight $4$
Character 242.81
Analytic conductor $14.278$
Analytic rank $0$
Dimension $8$
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] = [242,4,Mod(3,242)]
 
mf = mfinit([N,k,chi],0)
 
lf = mfeigenbasis(mf)
 
from sage.modular.dirichlet import DirichletCharacter
 
H = DirichletGroup(242, base_ring=CyclotomicField(10))
 
chi = DirichletCharacter(H, H._module([8]))
 
N = Newforms(chi, 4, names="a")
 
//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code
 
chi := DirichletCharacter("242.3");
 
S:= CuspForms(chi, 4);
 
N := Newforms(S);
 
Level: \( N \) \(=\) \( 242 = 2 \cdot 11^{2} \)
Weight: \( k \) \(=\) \( 4 \)
Character orbit: \([\chi]\) \(=\) 242.c (of order \(5\), degree \(4\), 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: \(14.2784622214\)
Analytic rank: \(0\)
Dimension: \(8\)
Relative dimension: \(2\) over \(\Q(\zeta_{5})\)
Coefficient field: \(\mathbb{Q}[x]/(x^{8} - \cdots)\)
comment: defining polynomial
 
gp: f.mod \\ as an extension of the character field
 
Defining polynomial: \( x^{8} - x^{7} + 71x^{6} - 141x^{5} + 2911x^{4} + 2710x^{3} + 75340x^{2} + 169400x + 5856400 \) Copy content Toggle raw display
Coefficient ring: \(\Z[a_1, a_2, a_3]\)
Coefficient ring index: \( 1 \)
Twist minimal: no (minimal twist has level 22)
Sato-Tate group: $\mathrm{SU}(2)[C_{5}]$

Embedding invariants

Embedding label 81.2
Root \(5.60402 + 4.07156i\) of defining polynomial
Character \(\chi\) \(=\) 242.81
Dual form 242.4.c.q.3.2

$q$-expansion

comment: q-expansion
 
sage: f.q_expansion() # note that sage often uses an isomorphic number field
 
gp: mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q+(-1.61803 - 1.17557i) q^{2} +(2.64055 - 8.12677i) q^{3} +(1.23607 + 3.80423i) q^{4} +(-10.3036 + 7.48598i) q^{5} +(-13.8261 + 10.0452i) q^{6} +(-7.24988 - 22.3128i) q^{7} +(2.47214 - 7.60845i) q^{8} +(-37.2284 - 27.0480i) q^{9} +O(q^{10})\) \(q+(-1.61803 - 1.17557i) q^{2} +(2.64055 - 8.12677i) q^{3} +(1.23607 + 3.80423i) q^{4} +(-10.3036 + 7.48598i) q^{5} +(-13.8261 + 10.0452i) q^{6} +(-7.24988 - 22.3128i) q^{7} +(2.47214 - 7.60845i) q^{8} +(-37.2284 - 27.0480i) q^{9} +25.4718 q^{10} +34.1799 q^{12} +(9.27574 + 6.73922i) q^{13} +(-14.4998 + 44.6257i) q^{14} +(33.6298 + 103.502i) q^{15} +(-12.9443 + 9.40456i) q^{16} +(-52.9924 + 38.5012i) q^{17} +(28.4400 + 87.5292i) q^{18} +(2.24041 - 6.89528i) q^{19} +(-41.2143 - 29.9439i) q^{20} -200.475 q^{21} -104.072 q^{23} +(-55.3043 - 40.1809i) q^{24} +(11.4965 - 35.3825i) q^{25} +(-7.08604 - 21.8086i) q^{26} +(-131.464 + 95.5141i) q^{27} +(75.9218 - 55.1604i) q^{28} +(39.3536 + 121.118i) q^{29} +(67.2595 - 207.004i) q^{30} +(233.653 + 169.759i) q^{31} +32.0000 q^{32} +131.004 q^{34} +(241.733 + 175.629i) q^{35} +(56.8799 - 175.058i) q^{36} +(-26.3908 - 81.2224i) q^{37} +(-11.7310 + 8.52303i) q^{38} +(79.2611 - 57.5866i) q^{39} +(31.4849 + 96.9006i) q^{40} +(41.8544 - 128.815i) q^{41} +(324.375 + 235.672i) q^{42} -353.691 q^{43} +586.066 q^{45} +(168.393 + 122.344i) q^{46} +(-41.5948 + 128.016i) q^{47} +(42.2487 + 130.028i) q^{48} +(-167.810 + 121.921i) q^{49} +(-60.1964 + 43.7352i) q^{50} +(172.962 + 532.321i) q^{51} +(-14.1721 + 43.6171i) q^{52} +(-405.666 - 294.734i) q^{53} +324.997 q^{54} -187.689 q^{56} +(-50.1204 - 36.4146i) q^{57} +(78.7073 - 242.236i) q^{58} +(201.373 + 619.763i) q^{59} +(-352.175 + 255.870i) q^{60} +(295.928 - 215.004i) q^{61} +(-178.495 - 549.352i) q^{62} +(-333.616 + 1026.77i) q^{63} +(-51.7771 - 37.6183i) q^{64} -146.023 q^{65} -294.576 q^{67} +(-211.969 - 154.005i) q^{68} +(-274.808 + 845.772i) q^{69} +(-184.668 - 568.349i) q^{70} +(-107.151 + 77.8500i) q^{71} +(-297.827 + 216.384i) q^{72} +(-145.080 - 446.511i) q^{73} +(-52.7815 + 162.445i) q^{74} +(-257.189 - 186.858i) q^{75} +29.0005 q^{76} -195.944 q^{78} +(330.105 + 239.836i) q^{79} +(62.9698 - 193.801i) q^{80} +(45.1451 + 138.942i) q^{81} +(-219.152 + 159.224i) q^{82} +(-1099.89 + 799.119i) q^{83} +(-247.801 - 762.652i) q^{84} +(257.791 - 793.400i) q^{85} +(572.283 + 415.788i) q^{86} +1088.21 q^{87} -260.255 q^{89} +(-948.275 - 688.962i) q^{90} +(83.1232 - 255.827i) q^{91} +(-128.641 - 395.915i) q^{92} +(1996.56 - 1450.59i) q^{93} +(217.793 - 158.236i) q^{94} +(28.5337 + 87.8177i) q^{95} +(84.4975 - 260.057i) q^{96} +(-1144.38 - 831.440i) q^{97} +414.848 q^{98} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 8 q - 4 q^{2} + 3 q^{3} - 8 q^{4} + 5 q^{5} - 14 q^{6} + q^{7} - 16 q^{8} - 21 q^{9}+O(q^{10}) \) Copy content Toggle raw display \( 8 q - 4 q^{2} + 3 q^{3} - 8 q^{4} + 5 q^{5} - 14 q^{6} + q^{7} - 16 q^{8} - 21 q^{9} + 100 q^{10} + 32 q^{12} - 7 q^{13} + 2 q^{14} + 211 q^{15} - 32 q^{16} - 161 q^{17} - 162 q^{18} + 272 q^{19} + 20 q^{20} + 50 q^{21} + 628 q^{23} - 56 q^{24} - 17 q^{25} + 96 q^{26} - 528 q^{27} - 16 q^{28} - 33 q^{29} + 422 q^{30} + 323 q^{31} + 256 q^{32} + 208 q^{34} + 697 q^{35} - 324 q^{36} + 49 q^{37} - 576 q^{38} - 391 q^{39} - 240 q^{40} - 361 q^{41} + 1430 q^{42} - 1442 q^{43} + 2652 q^{45} + 416 q^{46} - 1069 q^{47} + 48 q^{48} - 709 q^{49} + 76 q^{50} + 1332 q^{51} + 192 q^{52} - 281 q^{53} + 1144 q^{54} + 48 q^{56} + 438 q^{57} - 66 q^{58} - 128 q^{59} - 1116 q^{60} + 617 q^{61} - 1044 q^{62} - 694 q^{63} - 128 q^{64} + 138 q^{65} + 578 q^{67} - 644 q^{68} - 310 q^{69} + 34 q^{70} + 115 q^{71} - 168 q^{72} + 1487 q^{73} + 98 q^{74} - 1852 q^{75} + 128 q^{76} - 4152 q^{78} - 71 q^{79} - 480 q^{80} + 1630 q^{81} + 658 q^{82} - 1942 q^{83} - 2960 q^{84} + 329 q^{85} + 2426 q^{86} - 2122 q^{87} - 2202 q^{89} - 1286 q^{90} + 4523 q^{91} - 2088 q^{92} + 6019 q^{93} + 1332 q^{94} + 793 q^{95} + 96 q^{96} - 5128 q^{97} + 3292 q^{98}+O(q^{100}) \) Copy content Toggle raw display

Display 100 coefficients 10 coefficients

Character values

We give the values of \(\chi\) on generators for \(\left(\mathbb{Z}/242\mathbb{Z}\right)^\times\).

\(n\) \(123\)
\(\chi(n)\) \(e\left(\frac{1}{5}\right)\)

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:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) −1.61803 1.17557i −0.572061 0.415627i
\(3\) 2.64055 8.12677i 0.508173 1.56400i −0.287196 0.957872i \(-0.592723\pi\)
0.795369 0.606125i \(-0.207277\pi\)
\(4\) 1.23607 + 3.80423i 0.154508 + 0.475528i
\(5\) −10.3036 + 7.48598i −0.921579 + 0.669566i −0.943917 0.330184i \(-0.892889\pi\)
0.0223375 + 0.999750i \(0.492889\pi\)
\(6\) −13.8261 + 10.0452i −0.940746 + 0.683492i
\(7\) −7.24988 22.3128i −0.391457 1.20478i −0.931687 0.363263i \(-0.881663\pi\)
0.540230 0.841518i \(-0.318337\pi\)
\(8\) 2.47214 7.60845i 0.109254 0.336249i
\(9\) −37.2284 27.0480i −1.37883 1.00178i
\(10\) 25.4718 0.805490
\(11\) 0 0
\(12\) 34.1799 0.822242
\(13\) 9.27574 + 6.73922i 0.197894 + 0.143779i 0.682320 0.731054i \(-0.260971\pi\)
−0.484425 + 0.874833i \(0.660971\pi\)
\(14\) −14.4998 + 44.6257i −0.276802 + 0.851908i
\(15\) 33.6298 + 103.502i 0.578878 + 1.78160i
\(16\) −12.9443 + 9.40456i −0.202254 + 0.146946i
\(17\) −52.9924 + 38.5012i −0.756032 + 0.549289i −0.897691 0.440626i \(-0.854756\pi\)
0.141659 + 0.989916i \(0.454756\pi\)
\(18\) 28.4400 + 87.5292i 0.372409 + 1.14616i
\(19\) 2.24041 6.89528i 0.0270519 0.0832571i −0.936619 0.350349i \(-0.886063\pi\)
0.963671 + 0.267092i \(0.0860628\pi\)
\(20\) −41.2143 29.9439i −0.460790 0.334783i
\(21\) −200.475 −2.08320
\(22\) 0 0
\(23\) −104.072 −0.943504 −0.471752 0.881731i \(-0.656378\pi\)
−0.471752 + 0.881731i \(0.656378\pi\)
\(24\) −55.3043 40.1809i −0.470373 0.341746i
\(25\) 11.4965 35.3825i 0.0919719 0.283060i
\(26\) −7.08604 21.8086i −0.0534495 0.164501i
\(27\) −131.464 + 95.5141i −0.937046 + 0.680804i
\(28\) 75.9218 55.1604i 0.512424 0.372298i
\(29\) 39.3536 + 121.118i 0.251993 + 0.775554i 0.994407 + 0.105613i \(0.0336805\pi\)
−0.742415 + 0.669941i \(0.766319\pi\)
\(30\) 67.2595 207.004i 0.409328 1.25978i
\(31\) 233.653 + 169.759i 1.35372 + 0.983536i 0.998817 + 0.0486336i \(0.0154867\pi\)
0.354905 + 0.934903i \(0.384513\pi\)
\(32\) 32.0000 0.176777
\(33\) 0 0
\(34\) 131.004 0.660796
\(35\) 241.733 + 175.629i 1.16744 + 0.848194i
\(36\) 56.8799 175.058i 0.263333 0.810455i
\(37\) −26.3908 81.2224i −0.117260 0.360889i 0.875152 0.483849i \(-0.160761\pi\)
−0.992412 + 0.122960i \(0.960761\pi\)
\(38\) −11.7310 + 8.52303i −0.0500792 + 0.0363847i
\(39\) 79.2611 57.5866i 0.325434 0.236442i
\(40\) 31.4849 + 96.9006i 0.124455 + 0.383033i
\(41\) 41.8544 128.815i 0.159428 0.490670i −0.839154 0.543893i \(-0.816950\pi\)
0.998583 + 0.0532236i \(0.0169496\pi\)
\(42\) 324.375 + 235.672i 1.19172 + 0.865834i
\(43\) −353.691 −1.25436 −0.627178 0.778876i \(-0.715790\pi\)
−0.627178 + 0.778876i \(0.715790\pi\)
\(44\) 0 0
\(45\) 586.066 1.94146
\(46\) 168.393 + 122.344i 0.539742 + 0.392146i
\(47\) −41.5948 + 128.016i −0.129090 + 0.397298i −0.994624 0.103552i \(-0.966979\pi\)
0.865534 + 0.500850i \(0.166979\pi\)
\(48\) 42.2487 + 130.028i 0.127043 + 0.390999i
\(49\) −167.810 + 121.921i −0.489241 + 0.355454i
\(50\) −60.1964 + 43.7352i −0.170261 + 0.123702i
\(51\) 172.962 + 532.321i 0.474891 + 1.46157i
\(52\) −14.1721 + 43.6171i −0.0377945 + 0.116319i
\(53\) −405.666 294.734i −1.05137 0.763864i −0.0788966 0.996883i \(-0.525140\pi\)
−0.972472 + 0.233019i \(0.925140\pi\)
\(54\) 324.997 0.819008
\(55\) 0 0
\(56\) −187.689 −0.447875
\(57\) −50.1204 36.4146i −0.116467 0.0846181i
\(58\) 78.7073 242.236i 0.178186 0.548399i
\(59\) 201.373 + 619.763i 0.444349 + 1.36756i 0.883196 + 0.469003i \(0.155387\pi\)
−0.438848 + 0.898561i \(0.644613\pi\)
\(60\) −352.175 + 255.870i −0.757761 + 0.550545i
\(61\) 295.928 215.004i 0.621143 0.451287i −0.232178 0.972673i \(-0.574585\pi\)
0.853320 + 0.521387i \(0.174585\pi\)
\(62\) −178.495 549.352i −0.365628 1.12529i
\(63\) −333.616 + 1026.77i −0.667170 + 2.05334i
\(64\) −51.7771 37.6183i −0.101127 0.0734732i
\(65\) −146.023 −0.278645
\(66\) 0 0
\(67\) −294.576 −0.537136 −0.268568 0.963261i \(-0.586550\pi\)
−0.268568 + 0.963261i \(0.586550\pi\)
\(68\) −211.969 154.005i −0.378016 0.274645i
\(69\) −274.808 + 845.772i −0.479464 + 1.47564i
\(70\) −184.668 568.349i −0.315315 0.970438i
\(71\) −107.151 + 77.8500i −0.179106 + 0.130128i −0.673726 0.738981i \(-0.735307\pi\)
0.494620 + 0.869109i \(0.335307\pi\)
\(72\) −297.827 + 216.384i −0.487490 + 0.354182i
\(73\) −145.080 446.511i −0.232607 0.715892i −0.997430 0.0716507i \(-0.977173\pi\)
0.764822 0.644241i \(-0.222827\pi\)
\(74\) −52.7815 + 162.445i −0.0829153 + 0.255187i
\(75\) −257.189 186.858i −0.395968 0.287687i
\(76\) 29.0005 0.0437709
\(77\) 0 0
\(78\) −195.944 −0.284440
\(79\) 330.105 + 239.836i 0.470124 + 0.341565i 0.797489 0.603333i \(-0.206161\pi\)
−0.327366 + 0.944898i \(0.606161\pi\)
\(80\) 62.9698 193.801i 0.0880030 0.270845i
\(81\) 45.1451 + 138.942i 0.0619275 + 0.190593i
\(82\) −219.152 + 159.224i −0.295138 + 0.214431i
\(83\) −1099.89 + 799.119i −1.45457 + 1.05680i −0.469827 + 0.882758i \(0.655684\pi\)
−0.984738 + 0.174045i \(0.944316\pi\)
\(84\) −247.801 762.652i −0.321872 0.990621i
\(85\) 257.791 793.400i 0.328957 1.01243i
\(86\) 572.283 + 415.788i 0.717569 + 0.521344i
\(87\) 1088.21 1.34102
\(88\) 0 0
\(89\) −260.255 −0.309966 −0.154983 0.987917i \(-0.549532\pi\)
−0.154983 + 0.987917i \(0.549532\pi\)
\(90\) −948.275 688.962i −1.11063 0.806922i
\(91\) 83.1232 255.827i 0.0957547 0.294703i
\(92\) −128.641 395.915i −0.145779 0.448663i
\(93\) 1996.56 1450.59i 2.22617 1.61741i
\(94\) 217.793 158.236i 0.238975 0.173626i
\(95\) 28.5337 + 87.8177i 0.0308157 + 0.0948411i
\(96\) 84.4975 260.057i 0.0898332 0.276478i
\(97\) −1144.38 831.440i −1.19788 0.870309i −0.203803 0.979012i \(-0.565330\pi\)
−0.994074 + 0.108703i \(0.965330\pi\)
\(98\) 414.848 0.427612
\(99\) 0 0
\(100\) 148.814 0.148814
\(101\) −150.976 109.691i −0.148740 0.108066i 0.510927 0.859624i \(-0.329302\pi\)
−0.659666 + 0.751559i \(0.729302\pi\)
\(102\) 345.923 1064.64i 0.335799 1.03348i
\(103\) −362.450 1115.51i −0.346731 1.06713i −0.960651 0.277760i \(-0.910408\pi\)
0.613919 0.789369i \(-0.289592\pi\)
\(104\) 74.2059 53.9138i 0.0699662 0.0508335i
\(105\) 2065.61 1500.75i 1.91983 1.39484i
\(106\) 309.901 + 953.779i 0.283965 + 0.873954i
\(107\) 220.241 677.831i 0.198986 0.612415i −0.800921 0.598770i \(-0.795656\pi\)
0.999907 0.0136452i \(-0.00434354\pi\)
\(108\) −525.856 382.057i −0.468523 0.340402i
\(109\) −1247.22 −1.09598 −0.547989 0.836486i \(-0.684606\pi\)
−0.547989 + 0.836486i \(0.684606\pi\)
\(110\) 0 0
\(111\) −729.762 −0.624017
\(112\) 303.687 + 220.642i 0.256212 + 0.186149i
\(113\) −303.455 + 933.939i −0.252625 + 0.777501i 0.741663 + 0.670773i \(0.234037\pi\)
−0.994288 + 0.106728i \(0.965963\pi\)
\(114\) 38.2886 + 117.840i 0.0314566 + 0.0968135i
\(115\) 1072.32 779.084i 0.869513 0.631739i
\(116\) −412.117 + 299.420i −0.329863 + 0.239659i
\(117\) −163.038 501.780i −0.128828 0.396492i
\(118\) 402.747 1239.53i 0.314202 0.967014i
\(119\) 1243.26 + 903.281i 0.957727 + 0.695829i
\(120\) 870.625 0.662307
\(121\) 0 0
\(122\) −731.574 −0.542899
\(123\) −936.328 680.282i −0.686389 0.498691i
\(124\) −356.990 + 1098.70i −0.258538 + 0.795697i
\(125\) −345.533 1063.44i −0.247244 0.760937i
\(126\) 1746.84 1269.15i 1.23509 0.897342i
\(127\) −1254.52 + 911.460i −0.876538 + 0.636842i −0.932333 0.361600i \(-0.882231\pi\)
0.0557950 + 0.998442i \(0.482231\pi\)
\(128\) 39.5542 + 121.735i 0.0273135 + 0.0840623i
\(129\) −933.937 + 2874.36i −0.637430 + 1.96181i
\(130\) 236.270 + 171.660i 0.159402 + 0.115812i
\(131\) −742.114 −0.494953 −0.247476 0.968894i \(-0.579601\pi\)
−0.247476 + 0.968894i \(0.579601\pi\)
\(132\) 0 0
\(133\) −170.096 −0.110896
\(134\) 476.633 + 346.294i 0.307275 + 0.223248i
\(135\) 639.531 1968.27i 0.407719 1.25483i
\(136\) 161.930 + 498.370i 0.102099 + 0.314227i
\(137\) −417.192 + 303.108i −0.260169 + 0.189024i −0.710222 0.703978i \(-0.751405\pi\)
0.450053 + 0.893002i \(0.351405\pi\)
\(138\) 1438.91 1045.43i 0.887597 0.644877i
\(139\) −761.160 2342.61i −0.464466 1.42948i −0.859653 0.510878i \(-0.829320\pi\)
0.395187 0.918601i \(-0.370680\pi\)
\(140\) −369.335 + 1136.70i −0.222961 + 0.686203i
\(141\) 930.520 + 676.063i 0.555773 + 0.403793i
\(142\) 264.893 0.156544
\(143\) 0 0
\(144\) 736.269 0.426082
\(145\) −1312.17 953.348i −0.751516 0.546008i
\(146\) −290.160 + 893.021i −0.164478 + 0.506212i
\(147\) 547.713 + 1685.69i 0.307310 + 0.945803i
\(148\) 276.368 200.793i 0.153495 0.111521i
\(149\) −351.726 + 255.544i −0.193386 + 0.140503i −0.680265 0.732966i \(-0.738135\pi\)
0.486879 + 0.873469i \(0.338135\pi\)
\(150\) 196.475 + 604.687i 0.106947 + 0.329150i
\(151\) 241.340 742.768i 0.130066 0.400302i −0.864724 0.502247i \(-0.832507\pi\)
0.994790 + 0.101945i \(0.0325067\pi\)
\(152\) −46.9238 34.0921i −0.0250396 0.0181924i
\(153\) 3014.20 1.59270
\(154\) 0 0
\(155\) −3678.27 −1.90610
\(156\) 317.044 + 230.346i 0.162717 + 0.118221i
\(157\) 161.425 496.815i 0.0820580 0.252549i −0.901607 0.432555i \(-0.857612\pi\)
0.983665 + 0.180007i \(0.0576120\pi\)
\(158\) −252.178 776.124i −0.126976 0.390792i
\(159\) −3466.41 + 2518.50i −1.72896 + 1.25616i
\(160\) −329.714 + 239.551i −0.162914 + 0.118364i
\(161\) 754.513 + 2322.15i 0.369341 + 1.13672i
\(162\) 90.2903 277.885i 0.0437893 0.134770i
\(163\) −2057.56 1494.91i −0.988716 0.718344i −0.0290761 0.999577i \(-0.509257\pi\)
−0.959639 + 0.281233i \(0.909257\pi\)
\(164\) 541.775 0.257960
\(165\) 0 0
\(166\) 2719.08 1.27134
\(167\) 1120.85 + 814.342i 0.519363 + 0.377339i 0.816364 0.577538i \(-0.195986\pi\)
−0.297001 + 0.954877i \(0.595986\pi\)
\(168\) −495.601 + 1525.30i −0.227598 + 0.700475i
\(169\) −638.288 1964.45i −0.290527 0.894150i
\(170\) −1349.81 + 980.696i −0.608976 + 0.442447i
\(171\) −269.910 + 196.101i −0.120705 + 0.0876974i
\(172\) −437.186 1345.52i −0.193809 0.596482i
\(173\) 137.052 421.804i 0.0602307 0.185371i −0.916414 0.400232i \(-0.868930\pi\)
0.976645 + 0.214861i \(0.0689297\pi\)
\(174\) −1760.77 1279.27i −0.767146 0.557364i
\(175\) −872.833 −0.377029
\(176\) 0 0
\(177\) 5568.41 2.36467
\(178\) 421.101 + 305.948i 0.177319 + 0.128830i
\(179\) 116.388 358.205i 0.0485991 0.149573i −0.923812 0.382846i \(-0.874944\pi\)
0.972411 + 0.233274i \(0.0749439\pi\)
\(180\) 724.417 + 2229.53i 0.299972 + 0.923217i
\(181\) −2664.71 + 1936.02i −1.09429 + 0.795047i −0.980118 0.198414i \(-0.936421\pi\)
−0.114170 + 0.993461i \(0.536421\pi\)
\(182\) −435.238 + 316.219i −0.177264 + 0.128790i
\(183\) −965.878 2972.67i −0.390163 1.20080i
\(184\) −257.281 + 791.830i −0.103082 + 0.317252i
\(185\) 879.949 + 639.320i 0.349703 + 0.254074i
\(186\) −4935.78 −1.94575
\(187\) 0 0
\(188\) −538.415 −0.208872
\(189\) 3084.29 + 2240.87i 1.18703 + 0.862430i
\(190\) 57.0674 175.635i 0.0217900 0.0670628i
\(191\) 707.730 + 2178.17i 0.268113 + 0.825166i 0.990960 + 0.134158i \(0.0428331\pi\)
−0.722847 + 0.691008i \(0.757167\pi\)
\(192\) −442.435 + 321.448i −0.166302 + 0.120825i
\(193\) −1863.49 + 1353.90i −0.695010 + 0.504954i −0.878303 0.478104i \(-0.841324\pi\)
0.183293 + 0.983058i \(0.441324\pi\)
\(194\) 874.228 + 2690.60i 0.323536 + 0.995740i
\(195\) −385.580 + 1186.69i −0.141600 + 0.435800i
\(196\) −671.238 487.683i −0.244620 0.177727i
\(197\) 1041.86 0.376801 0.188400 0.982092i \(-0.439670\pi\)
0.188400 + 0.982092i \(0.439670\pi\)
\(198\) 0 0
\(199\) 3463.83 1.23389 0.616946 0.787005i \(-0.288370\pi\)
0.616946 + 0.787005i \(0.288370\pi\)
\(200\) −240.785 174.941i −0.0851305 0.0618509i
\(201\) −777.840 + 2393.95i −0.272958 + 0.840079i
\(202\) 115.336 + 354.966i 0.0401732 + 0.123640i
\(203\) 2417.18 1756.18i 0.835728 0.607192i
\(204\) −1811.28 + 1315.97i −0.621641 + 0.451648i
\(205\) 533.054 + 1640.57i 0.181610 + 0.558939i
\(206\) −724.901 + 2231.02i −0.245176 + 0.754574i
\(207\) 3874.45 + 2814.95i 1.30093 + 0.945181i
\(208\) −183.447 −0.0611527
\(209\) 0 0
\(210\) −5106.46 −1.67800
\(211\) 1692.45 + 1229.63i 0.552193 + 0.401192i 0.828593 0.559851i \(-0.189142\pi\)
−0.276400 + 0.961043i \(0.589142\pi\)
\(212\) 619.803 1907.56i 0.200794 0.617979i
\(213\) 349.731 + 1076.36i 0.112503 + 0.346249i
\(214\) −1153.20 + 837.845i −0.368368 + 0.267635i
\(215\) 3644.28 2647.72i 1.15599 0.839875i
\(216\) 401.718 + 1236.36i 0.126544 + 0.389462i
\(217\) 2093.85 6444.20i 0.655022 2.01595i
\(218\) 2018.04 + 1466.19i 0.626967 + 0.455518i
\(219\) −4011.78 −1.23786
\(220\) 0 0
\(221\) −751.012 −0.228591
\(222\) 1180.78 + 857.887i 0.356976 + 0.259358i
\(223\) 1144.45 3522.26i 0.343669 1.05770i −0.618623 0.785688i \(-0.712309\pi\)
0.962292 0.272017i \(-0.0876906\pi\)
\(224\) −231.996 714.011i −0.0692005 0.212977i
\(225\) −1385.02 + 1006.28i −0.410377 + 0.298156i
\(226\) 1588.91 1154.41i 0.467667 0.339780i
\(227\) 1499.81 + 4615.95i 0.438529 + 1.34965i 0.889426 + 0.457079i \(0.151104\pi\)
−0.450897 + 0.892576i \(0.648896\pi\)
\(228\) 76.5772 235.680i 0.0222432 0.0684575i
\(229\) 1081.53 + 785.778i 0.312094 + 0.226750i 0.732795 0.680450i \(-0.238216\pi\)
−0.420700 + 0.907200i \(0.638216\pi\)
\(230\) −2650.91 −0.759983
\(231\) 0 0
\(232\) 1018.81 0.288311
\(233\) −4776.36 3470.23i −1.34296 0.975718i −0.999330 0.0366132i \(-0.988343\pi\)
−0.343631 0.939105i \(-0.611657\pi\)
\(234\) −326.077 + 1003.56i −0.0910953 + 0.280363i
\(235\) −529.748 1630.40i −0.147051 0.452576i
\(236\) −2108.81 + 1532.14i −0.581660 + 0.422601i
\(237\) 2820.75 2049.39i 0.773110 0.561698i
\(238\) −949.766 2923.08i −0.258673 0.796114i
\(239\) 1025.87 3157.30i 0.277649 0.854515i −0.710858 0.703336i \(-0.751693\pi\)
0.988506 0.151179i \(-0.0483070\pi\)
\(240\) −1408.70 1023.48i −0.378880 0.275273i
\(241\) 5275.95 1.41018 0.705091 0.709116i \(-0.250906\pi\)
0.705091 + 0.709116i \(0.250906\pi\)
\(242\) 0 0
\(243\) −3139.10 −0.828696
\(244\) 1183.71 + 860.017i 0.310571 + 0.225643i
\(245\) 816.340 2512.44i 0.212874 0.655158i
\(246\) 715.291 + 2201.44i 0.185387 + 0.570563i
\(247\) 67.2503 48.8602i 0.0173240 0.0125866i
\(248\) 1869.23 1358.07i 0.478613 0.347733i
\(249\) 3589.93 + 11048.7i 0.913666 + 2.81197i
\(250\) −691.067 + 2126.88i −0.174828 + 0.538064i
\(251\) 1587.17 + 1153.15i 0.399129 + 0.289984i 0.769186 0.639025i \(-0.220662\pi\)
−0.370057 + 0.929009i \(0.620662\pi\)
\(252\) −4318.42 −1.07950
\(253\) 0 0
\(254\) 3101.34 0.766123
\(255\) −5767.06 4190.02i −1.41626 1.02898i
\(256\) 79.1084 243.470i 0.0193136 0.0594410i
\(257\) 1836.17 + 5651.15i 0.445669 + 1.37163i 0.881748 + 0.471721i \(0.156367\pi\)
−0.436078 + 0.899909i \(0.643633\pi\)
\(258\) 4890.16 3552.91i 1.18003 0.857342i
\(259\) −1620.97 + 1177.71i −0.388890 + 0.282545i
\(260\) −180.494 555.504i −0.0430530 0.132503i
\(261\) 1810.93 5573.47i 0.429478 1.32180i
\(262\) 1200.77 + 872.408i 0.283143 + 0.205716i
\(263\) 1704.11 0.399544 0.199772 0.979842i \(-0.435980\pi\)
0.199772 + 0.979842i \(0.435980\pi\)
\(264\) 0 0
\(265\) 6386.18 1.48038
\(266\) 275.221 + 199.960i 0.0634395 + 0.0460915i
\(267\) −687.215 + 2115.03i −0.157516 + 0.484785i
\(268\) −364.115 1120.63i −0.0829921 0.255423i
\(269\) 4728.97 3435.80i 1.07186 0.778752i 0.0956148 0.995418i \(-0.469518\pi\)
0.976246 + 0.216666i \(0.0695183\pi\)
\(270\) −3348.63 + 2432.92i −0.754781 + 0.548381i
\(271\) −1825.00 5616.79i −0.409082 1.25902i −0.917439 0.397877i \(-0.869747\pi\)
0.508357 0.861146i \(-0.330253\pi\)
\(272\) 323.861 996.740i 0.0721946 0.222192i
\(273\) −1859.55 1351.04i −0.412254 0.299520i
\(274\) 1031.36 0.227396
\(275\) 0 0
\(276\) −3557.19 −0.775788
\(277\) 7186.00 + 5220.93i 1.55872 + 1.13247i 0.937051 + 0.349193i \(0.113544\pi\)
0.621667 + 0.783281i \(0.286456\pi\)
\(278\) −1522.32 + 4685.22i −0.328427 + 1.01079i
\(279\) −4106.89 12639.7i −0.881265 2.71226i
\(280\) 1933.87 1405.04i 0.412752 0.299882i
\(281\) −6594.92 + 4791.49i −1.40007 + 1.01721i −0.405397 + 0.914141i \(0.632867\pi\)
−0.994674 + 0.103070i \(0.967133\pi\)
\(282\) −710.854 2187.78i −0.150109 0.461988i
\(283\) −1812.06 + 5576.96i −0.380622 + 1.17143i 0.558985 + 0.829178i \(0.311191\pi\)
−0.939607 + 0.342256i \(0.888809\pi\)
\(284\) −428.605 311.400i −0.0895529 0.0650640i
\(285\) 789.018 0.163991
\(286\) 0 0
\(287\) −3177.66 −0.653559
\(288\) −1191.31 865.536i −0.243745 0.177091i
\(289\) −192.352 + 592.000i −0.0391517 + 0.120497i
\(290\) 1002.41 + 3085.10i 0.202978 + 0.624701i
\(291\) −9778.71 + 7104.65i −1.96989 + 1.43121i
\(292\) 1519.30 1103.83i 0.304487 0.221223i
\(293\) −2353.65 7243.79i −0.469289 1.44432i −0.853507 0.521081i \(-0.825529\pi\)
0.384218 0.923242i \(-0.374471\pi\)
\(294\) 1095.43 3371.37i 0.217301 0.668784i
\(295\) −6714.40 4878.30i −1.32518 0.962798i
\(296\) −683.219 −0.134160
\(297\) 0 0
\(298\) 869.515 0.169026
\(299\) −965.348 701.367i −0.186714 0.135656i
\(300\) 392.949 1209.37i 0.0756231 0.232744i
\(301\) 2564.22 + 7891.85i 0.491026 + 1.51122i
\(302\) −1263.67 + 918.112i −0.240782 + 0.174938i
\(303\) −1290.09 + 937.305i −0.244600 + 0.177712i
\(304\) 35.8466 + 110.324i 0.00676297 + 0.0208143i
\(305\) −1439.60 + 4430.62i −0.270266 + 0.831792i
\(306\) −4877.08 3543.41i −0.911124 0.661971i
\(307\) −4100.68 −0.762339 −0.381170 0.924505i \(-0.624479\pi\)
−0.381170 + 0.924505i \(0.624479\pi\)
\(308\) 0 0
\(309\) −10022.5 −1.84519
\(310\) 5951.57 + 4324.07i 1.09041 + 0.792228i
\(311\) 449.969 1384.86i 0.0820432 0.252503i −0.901618 0.432534i \(-0.857620\pi\)
0.983661 + 0.180031i \(0.0576197\pi\)
\(312\) −242.200 745.416i −0.0439484 0.135259i
\(313\) 2800.56 2034.72i 0.505740 0.367442i −0.305465 0.952203i \(-0.598812\pi\)
0.811205 + 0.584761i \(0.198812\pi\)
\(314\) −845.232 + 614.097i −0.151908 + 0.110368i
\(315\) −4248.91 13076.8i −0.759997 2.33903i
\(316\) −504.356 + 1552.25i −0.0897856 + 0.276332i
\(317\) −4038.86 2934.41i −0.715600 0.519914i 0.169375 0.985552i \(-0.445825\pi\)
−0.884975 + 0.465638i \(0.845825\pi\)
\(318\) 8569.44 1.51117
\(319\) 0 0
\(320\) 815.098 0.142392
\(321\) −4927.02 3579.69i −0.856696 0.622426i
\(322\) 1509.03 4644.30i 0.261164 0.803779i
\(323\) 146.752 + 451.656i 0.0252802 + 0.0778043i
\(324\) −472.766 + 343.485i −0.0810641 + 0.0588965i
\(325\) 345.089 250.722i 0.0588988 0.0427925i
\(326\) 1571.84 + 4837.62i 0.267043 + 0.821874i
\(327\) −3293.33 + 10135.8i −0.556947 + 1.71411i
\(328\) −876.610 636.894i −0.147569 0.107215i
\(329\) 3157.95 0.529190
\(330\) 0 0
\(331\) 10199.3 1.69366 0.846832 0.531861i \(-0.178507\pi\)
0.846832 + 0.531861i \(0.178507\pi\)
\(332\) −4399.57 3196.48i −0.727283 0.528402i
\(333\) −1214.42 + 3737.60i −0.199849 + 0.615072i
\(334\) −856.250 2635.27i −0.140275 0.431723i
\(335\) 3035.18 2205.19i 0.495014 0.359648i
\(336\) 2595.00 1885.38i 0.421336 0.306119i
\(337\) 519.376 + 1598.48i 0.0839532 + 0.258381i 0.984218 0.176962i \(-0.0566270\pi\)
−0.900264 + 0.435343i \(0.856627\pi\)
\(338\) −1276.58 + 3928.90i −0.205434 + 0.632260i
\(339\) 6788.62 + 4932.22i 1.08763 + 0.790210i
\(340\) 3336.92 0.532264
\(341\) 0 0
\(342\) 667.255 0.105500
\(343\) −2573.29 1869.61i −0.405087 0.294313i
\(344\) −874.371 + 2691.04i −0.137043 + 0.421776i
\(345\) −3499.93 10771.7i −0.546173 1.68095i
\(346\) −717.616 + 521.378i −0.111501 + 0.0810101i
\(347\) 8515.93 6187.19i 1.31746 0.957192i 0.317501 0.948258i \(-0.397156\pi\)
0.999960 0.00893386i \(-0.00284377\pi\)
\(348\) 1345.11 + 4139.81i 0.207199 + 0.637693i
\(349\) 1637.90 5040.94i 0.251217 0.773168i −0.743334 0.668920i \(-0.766757\pi\)
0.994551 0.104247i \(-0.0332433\pi\)
\(350\) 1412.27 + 1026.08i 0.215683 + 0.156703i
\(351\) −1863.12 −0.283321
\(352\) 0 0
\(353\) −7438.40 −1.12155 −0.560773 0.827969i \(-0.689496\pi\)
−0.560773 + 0.827969i \(0.689496\pi\)
\(354\) −9009.87 6546.06i −1.35274 0.982822i
\(355\) 521.257 1604.26i 0.0779309 0.239847i
\(356\) −321.693 990.068i −0.0478923 0.147397i
\(357\) 10623.6 7718.53i 1.57497 1.14428i
\(358\) −609.414 + 442.765i −0.0899680 + 0.0653656i
\(359\) −3136.93 9654.47i −0.461172 1.41934i −0.863734 0.503948i \(-0.831880\pi\)
0.402562 0.915393i \(-0.368120\pi\)
\(360\) 1448.83 4459.05i 0.212112 0.652813i
\(361\) 5506.52 + 4000.72i 0.802817 + 0.583281i
\(362\) 6587.52 0.956443
\(363\) 0 0
\(364\) 1075.97 0.154934
\(365\) 4837.41 + 3514.59i 0.693703 + 0.504005i
\(366\) −1931.76 + 5945.33i −0.275887 + 0.849092i
\(367\) 147.340 + 453.466i 0.0209567 + 0.0644980i 0.960988 0.276590i \(-0.0892045\pi\)
−0.940031 + 0.341088i \(0.889204\pi\)
\(368\) 1347.14 978.755i 0.190828 0.138644i
\(369\) −5042.35 + 3663.48i −0.711366 + 0.516838i
\(370\) −672.221 2068.88i −0.0944516 0.290692i
\(371\) −3635.32 + 11188.4i −0.508723 + 1.56569i
\(372\) 7986.26 + 5802.35i 1.11309 + 0.808704i
\(373\) 12738.5 1.76829 0.884146 0.467210i \(-0.154741\pi\)
0.884146 + 0.467210i \(0.154741\pi\)
\(374\) 0 0
\(375\) −9554.74 −1.31575
\(376\) 871.173 + 632.944i 0.119488 + 0.0868128i
\(377\) −451.207 + 1388.67i −0.0616402 + 0.189709i
\(378\) −2356.19 7251.60i −0.320607 0.986725i
\(379\) 1050.66 763.349i 0.142398 0.103458i −0.514306 0.857607i \(-0.671950\pi\)
0.656704 + 0.754149i \(0.271950\pi\)
\(380\) −298.809 + 217.097i −0.0403383 + 0.0293075i
\(381\) 4094.61 + 12601.9i 0.550586 + 1.69453i
\(382\) 1415.46 4356.34i 0.189584 0.583481i
\(383\) 542.501 + 394.150i 0.0723772 + 0.0525851i 0.623386 0.781915i \(-0.285757\pi\)
−0.551008 + 0.834500i \(0.685757\pi\)
\(384\) 1093.76 0.145353
\(385\) 0 0
\(386\) 4606.80 0.607461
\(387\) 13167.3 + 9566.62i 1.72954 + 1.25659i
\(388\) 1748.46 5381.20i 0.228774 0.704095i
\(389\) 1617.98 + 4979.64i 0.210887 + 0.649043i 0.999420 + 0.0340509i \(0.0108408\pi\)
−0.788533 + 0.614992i \(0.789159\pi\)
\(390\) 2018.92 1466.83i 0.262134 0.190451i
\(391\) 5515.04 4006.91i 0.713319 0.518256i
\(392\) 512.780 + 1578.18i 0.0660697 + 0.203342i
\(393\) −1959.59 + 6030.99i −0.251522 + 0.774105i
\(394\) −1685.77 1224.79i −0.215553 0.156609i
\(395\) −5196.67 −0.661956
\(396\) 0 0
\(397\) 1751.64 0.221442 0.110721 0.993852i \(-0.464684\pi\)
0.110721 + 0.993852i \(0.464684\pi\)
\(398\) −5604.60 4071.98i −0.705862 0.512839i
\(399\) −449.147 + 1382.33i −0.0563545 + 0.173441i
\(400\) 183.944 + 566.121i 0.0229930 + 0.0707651i
\(401\) −2922.80 + 2123.54i −0.363984 + 0.264450i −0.754712 0.656056i \(-0.772223\pi\)
0.390728 + 0.920506i \(0.372223\pi\)
\(402\) 4072.83 2959.08i 0.505309 0.367128i
\(403\) 1023.26 + 3149.28i 0.126482 + 0.389273i
\(404\) 230.671 709.933i 0.0284067 0.0874269i
\(405\) −1505.28 1093.65i −0.184686 0.134182i
\(406\) −5975.60 −0.730453
\(407\) 0 0
\(408\) 4477.72 0.543334
\(409\) −9137.83 6639.02i −1.10473 0.802637i −0.122908 0.992418i \(-0.539222\pi\)
−0.981826 + 0.189781i \(0.939222\pi\)
\(410\) 1066.11 3281.14i 0.128418 0.395229i
\(411\) 1361.67 + 4190.79i 0.163422 + 0.502960i
\(412\) 3795.63 2757.69i 0.453877 0.329761i
\(413\) 12368.8 8986.42i 1.47367 1.07069i
\(414\) −2959.81 9109.37i −0.351369 1.08140i
\(415\) 5350.63 16467.5i 0.632897 1.94786i
\(416\) 296.824 + 215.655i 0.0349831 + 0.0254167i
\(417\) −21047.7 −2.47173
\(418\) 0 0
\(419\) −3680.45 −0.429121 −0.214560 0.976711i \(-0.568832\pi\)
−0.214560 + 0.976711i \(0.568832\pi\)
\(420\) 8262.43 + 6003.01i 0.959917 + 0.697421i
\(421\) 2860.31 8803.14i 0.331124 1.01909i −0.637476 0.770470i \(-0.720021\pi\)
0.968600 0.248625i \(-0.0799786\pi\)
\(422\) −1292.91 3979.18i −0.149142 0.459013i
\(423\) 5011.08 3640.76i 0.575997 0.418487i
\(424\) −3245.33 + 2357.87i −0.371715 + 0.270067i
\(425\) 753.045 + 2317.63i 0.0859483 + 0.264522i
\(426\) 699.461 2152.72i 0.0795516 0.244835i
\(427\) −6942.80 5044.24i −0.786852 0.571681i
\(428\) 2850.85 0.321966
\(429\) 0 0
\(430\) −9009.14 −1.01037
\(431\) 2899.55 + 2106.64i 0.324052 + 0.235437i 0.737902 0.674907i \(-0.235816\pi\)
−0.413851 + 0.910345i \(0.635816\pi\)
\(432\) 803.436 2472.72i 0.0894800 0.275391i
\(433\) −2566.94 7900.24i −0.284895 0.876816i −0.986430 0.164181i \(-0.947502\pi\)
0.701535 0.712635i \(-0.252498\pi\)
\(434\) −10963.5 + 7965.47i −1.21260 + 0.881002i
\(435\) −11212.5 + 8146.34i −1.23586 + 0.897902i
\(436\) −1541.64 4744.69i −0.169338 0.521168i
\(437\) −233.165 + 717.608i −0.0255236 + 0.0785534i
\(438\) 6491.19 + 4716.13i 0.708130 + 0.514487i
\(439\) −11932.4 −1.29727 −0.648634 0.761101i \(-0.724659\pi\)
−0.648634 + 0.761101i \(0.724659\pi\)
\(440\) 0 0
\(441\) 9544.99 1.03067
\(442\) 1215.16 + 882.867i 0.130768 + 0.0950084i
\(443\) 333.374 1026.02i 0.0357541 0.110040i −0.931587 0.363519i \(-0.881575\pi\)
0.967341 + 0.253480i \(0.0815750\pi\)
\(444\) −902.035 2776.18i −0.0964160 0.296738i
\(445\) 2681.55 1948.26i 0.285658 0.207543i
\(446\) −5992.43 + 4353.75i −0.636210 + 0.462234i
\(447\) 1148.00 + 3533.17i 0.121473 + 0.373855i
\(448\) −463.993 + 1428.02i −0.0489321 + 0.150598i
\(449\) −10327.9 7503.63i −1.08553 0.788682i −0.106889 0.994271i \(-0.534089\pi\)
−0.978638 + 0.205589i \(0.934089\pi\)
\(450\) 3423.96 0.358683
\(451\) 0 0
\(452\) −3928.01 −0.408756
\(453\) −5399.03 3922.63i −0.559975 0.406846i
\(454\) 2999.63 9231.91i 0.310087 0.954350i
\(455\) 1058.65 + 3258.19i 0.109077 + 0.335706i
\(456\) −400.963 + 291.317i −0.0411773 + 0.0299170i
\(457\) −9082.69 + 6598.96i −0.929695 + 0.675463i −0.945918 0.324406i \(-0.894836\pi\)
0.0162235 + 0.999868i \(0.494836\pi\)
\(458\) −826.216 2542.83i −0.0842938 0.259430i
\(459\) 3289.18 10123.0i 0.334478 1.02942i
\(460\) 4289.27 + 3116.33i 0.434757 + 0.315869i
\(461\) 2160.58 0.218283 0.109141 0.994026i \(-0.465190\pi\)
0.109141 + 0.994026i \(0.465190\pi\)
\(462\) 0 0
\(463\) 11469.5 1.15125 0.575627 0.817712i \(-0.304758\pi\)
0.575627 + 0.817712i \(0.304758\pi\)
\(464\) −1648.47 1197.68i −0.164931 0.119830i
\(465\) −9712.65 + 29892.5i −0.968631 + 2.98114i
\(466\) 3648.81 + 11229.9i 0.362721 + 1.11634i
\(467\) −1632.91 + 1186.38i −0.161803 + 0.117557i −0.665741 0.746183i \(-0.731884\pi\)
0.503937 + 0.863740i \(0.331884\pi\)
\(468\) 1707.36 1240.47i 0.168638 0.122523i
\(469\) 2135.64 + 6572.82i 0.210266 + 0.647131i
\(470\) −1059.50 + 3260.79i −0.103981 + 0.320019i
\(471\) −3611.25 2623.72i −0.353286 0.256677i
\(472\) 5213.26 0.508389
\(473\) 0 0
\(474\) −6973.27 −0.675723
\(475\) −218.216 158.543i −0.0210788 0.0153146i
\(476\) −1899.53 + 5846.16i −0.182910 + 0.562938i
\(477\) 7130.34 + 21944.9i 0.684436 + 2.10648i
\(478\) −5371.53 + 3902.64i −0.513991 + 0.373437i
\(479\) −5927.67 + 4306.71i −0.565433 + 0.410811i −0.833443 0.552605i \(-0.813634\pi\)
0.268011 + 0.963416i \(0.413634\pi\)
\(480\) 1076.15 + 3312.06i 0.102332 + 0.314946i
\(481\) 302.582 931.252i 0.0286831 0.0882774i
\(482\) −8536.67 6202.26i −0.806711 0.586110i
\(483\) 20863.9 1.96551
\(484\) 0 0
\(485\) 18015.3 1.68667
\(486\) 5079.16 + 3690.23i 0.474065 + 0.344428i
\(487\) −1912.75 + 5886.85i −0.177978 + 0.547759i −0.999757 0.0220470i \(-0.992982\pi\)
0.821779 + 0.569806i \(0.192982\pi\)
\(488\) −904.276 2783.07i −0.0838824 0.258164i
\(489\) −17581.8 + 12774.0i −1.62593 + 1.18130i
\(490\) −4274.41 + 3105.54i −0.394078 + 0.286315i
\(491\) 3127.54 + 9625.57i 0.287462 + 0.884717i 0.985650 + 0.168802i \(0.0539900\pi\)
−0.698188 + 0.715914i \(0.746010\pi\)
\(492\) 1430.58 4402.88i 0.131089 0.403449i
\(493\) −6748.64 4903.17i −0.616518 0.447926i
\(494\) −166.252 −0.0151418
\(495\) 0 0
\(496\) −4620.98 −0.418323
\(497\) 2513.89 + 1826.45i 0.226888 + 0.164844i
\(498\) 7179.87 22097.4i 0.646059 1.98837i
\(499\) 791.952 + 2437.38i 0.0710474 + 0.218661i 0.980275 0.197638i \(-0.0633269\pi\)
−0.909228 + 0.416299i \(0.863327\pi\)
\(500\) 3618.47 2628.97i 0.323646 0.235143i
\(501\) 9577.61 6958.54i 0.854084 0.620528i
\(502\) −1212.49 3731.66i −0.107801 0.331777i
\(503\) −2658.01 + 8180.53i −0.235616 + 0.725152i 0.761423 + 0.648256i \(0.224501\pi\)
−0.997039 + 0.0768967i \(0.975499\pi\)
\(504\) 6987.35 + 5076.61i 0.617543 + 0.448671i
\(505\) 2376.74 0.209432
\(506\) 0 0
\(507\) −17650.0 −1.54609
\(508\) −5018.07 3645.84i −0.438269 0.318421i
\(509\) −4309.27 + 13262.6i −0.375255 + 1.15492i 0.568051 + 0.822993i \(0.307698\pi\)
−0.943306 + 0.331924i \(0.892302\pi\)
\(510\) 4405.64 + 13559.2i 0.382520 + 1.17728i
\(511\) −8911.11 + 6474.30i −0.771437 + 0.560482i
\(512\) −414.217 + 300.946i −0.0357538 + 0.0259767i
\(513\) 364.063 + 1120.47i 0.0313329 + 0.0964328i
\(514\) 3672.34 11302.3i 0.315136 0.969889i
\(515\) 12085.2 + 8780.41i 1.03405 + 0.751284i
\(516\) −12089.1 −1.03138
\(517\) 0 0
\(518\) 4007.27 0.339902
\(519\) −3066.01 2227.59i −0.259312 0.188401i
\(520\) −360.988 + 1111.01i −0.0304431 + 0.0936941i
\(521\) −3736.89 11501.0i −0.314234 0.967113i −0.976069 0.217463i \(-0.930222\pi\)
0.661834 0.749650i \(-0.269778\pi\)
\(522\) −9482.15 + 6889.18i −0.795062 + 0.577646i
\(523\) −13504.0 + 9811.21i −1.12904 + 0.820295i −0.985555 0.169358i \(-0.945831\pi\)
−0.143484 + 0.989653i \(0.545831\pi\)
\(524\) −917.304 2823.17i −0.0764744 0.235364i
\(525\) −2304.76 + 7093.31i −0.191596 + 0.589671i
\(526\) −2757.31 2003.30i −0.228564 0.166061i
\(527\) −18917.8 −1.56370
\(528\) 0 0
\(529\) −1335.94 −0.109800
\(530\) −10333.1 7507.41i −0.846867 0.615285i
\(531\) 9266.56 28519.5i 0.757315 2.33078i
\(532\) −210.250 647.084i −0.0171344 0.0527343i
\(533\) 1256.34 912.785i 0.102098 0.0741784i
\(534\) 3598.30 2614.32i 0.291599 0.211859i
\(535\) 2804.97 + 8632.79i 0.226671 + 0.697623i
\(536\) −728.231 + 2241.26i −0.0586843 + 0.180612i
\(537\) −2603.72 1891.71i −0.209234 0.152018i
\(538\) −11690.7 −0.936840
\(539\) 0 0
\(540\) 8278.26 0.659703
\(541\) 16725.1 + 12151.5i 1.32914 + 0.965679i 0.999769 + 0.0214796i \(0.00683769\pi\)
0.329374 + 0.944200i \(0.393162\pi\)
\(542\) −3650.01 + 11233.6i −0.289264 + 0.890264i
\(543\) 8697.33 + 26767.6i 0.687363 + 2.11548i
\(544\) −1695.76 + 1232.04i −0.133649 + 0.0971015i
\(545\) 12850.8 9336.63i 1.01003 0.733830i
\(546\) 1420.57 + 4372.07i 0.111346 + 0.342688i
\(547\) −2833.62 + 8721.00i −0.221494 + 0.681687i 0.777135 + 0.629334i \(0.216672\pi\)
−0.998629 + 0.0523532i \(0.983328\pi\)
\(548\) −1668.77 1212.43i −0.130084 0.0945119i
\(549\) −16832.4 −1.30854
\(550\) 0 0
\(551\) 923.311 0.0713873
\(552\) 5755.65 + 4181.73i 0.443799 + 0.322439i
\(553\) 2958.19 9104.37i 0.227477 0.700104i
\(554\) −5489.62 16895.3i −0.420995 1.29569i
\(555\) 7519.15 5462.98i 0.575081 0.417821i
\(556\) 7970.97 5791.25i 0.607994 0.441733i
\(557\) −6276.38 19316.7i −0.477449 1.46944i −0.842627 0.538498i \(-0.818992\pi\)
0.365178 0.930938i \(-0.381008\pi\)
\(558\) −8213.78 + 25279.4i −0.623149 + 1.91785i
\(559\) −3280.74 2383.60i −0.248230 0.180350i
\(560\) −4780.78 −0.360759
\(561\) 0 0
\(562\) 16303.5 1.22371
\(563\) 4500.68 + 3269.94i 0.336911 + 0.244780i 0.743357 0.668894i \(-0.233232\pi\)
−0.406446 + 0.913675i \(0.633232\pi\)
\(564\) −1421.71 + 4375.57i −0.106143 + 0.326675i
\(565\) −3864.78 11894.6i −0.287774 0.885678i
\(566\) 9488.08 6893.50i 0.704618 0.511935i
\(567\) 2772.90 2014.63i 0.205381 0.149218i
\(568\) 327.425 + 1007.71i 0.0241874 + 0.0744412i
\(569\) 7041.09 21670.3i 0.518766 1.59660i −0.257557 0.966263i \(-0.582917\pi\)
0.776323 0.630335i \(-0.217083\pi\)
\(570\) −1276.66 927.546i −0.0938128 0.0681590i
\(571\) 11157.6 0.817743 0.408871 0.912592i \(-0.365922\pi\)
0.408871 + 0.912592i \(0.365922\pi\)
\(572\) 0 0
\(573\) 19570.3 1.42681
\(574\) 5141.56 + 3735.56i 0.373876 + 0.271637i
\(575\) −1196.47 + 3682.34i −0.0867758 + 0.267068i
\(576\) 910.078 + 2800.93i 0.0658332 + 0.202614i
\(577\) −10055.4 + 7305.64i −0.725494 + 0.527102i −0.888135 0.459583i \(-0.847999\pi\)
0.162641 + 0.986685i \(0.447999\pi\)
\(578\) 1007.17 731.752i 0.0724788 0.0526589i
\(579\) 6082.23 + 18719.2i 0.436561 + 1.34360i
\(580\) 2004.82 6170.20i 0.143527 0.441730i
\(581\) 25804.7 + 18748.2i 1.84262 + 1.33874i
\(582\) 24174.3 1.72175
\(583\) 0 0
\(584\) −3755.91 −0.266131
\(585\) 5436.20 + 3949.63i 0.384203 + 0.279140i
\(586\) −4707.30 + 14487.6i −0.331837 + 1.02129i
\(587\) 1889.62 + 5815.66i 0.132867 + 0.408923i 0.995252 0.0973299i \(-0.0310302\pi\)
−0.862385 + 0.506253i \(0.831030\pi\)
\(588\) −5735.72 + 4167.25i −0.402274 + 0.292269i
\(589\) 1694.02 1230.77i 0.118507 0.0861005i
\(590\) 5129.35 + 15786.5i 0.357918 + 1.10156i
\(591\) 2751.09 8466.99i 0.191480 0.589315i
\(592\) 1105.47 + 803.172i 0.0767476 + 0.0557604i
\(593\) −7188.32 −0.497789 −0.248894 0.968531i \(-0.580067\pi\)
−0.248894 + 0.968531i \(0.580067\pi\)
\(594\) 0 0
\(595\) −19572.0 −1.34852
\(596\) −1406.90 1022.18i −0.0966930 0.0702516i
\(597\) 9146.41 28149.8i 0.627031 1.92980i
\(598\) 737.461 + 2269.67i 0.0504298 + 0.155207i
\(599\) 818.874 594.947i 0.0558569 0.0405824i −0.559506 0.828826i \(-0.689009\pi\)
0.615363 + 0.788244i \(0.289009\pi\)
\(600\) −2057.51 + 1494.87i −0.139996 + 0.101713i
\(601\) −4134.93 12726.0i −0.280644 0.863734i −0.987671 0.156547i \(-0.949964\pi\)
0.707026 0.707187i \(-0.250036\pi\)
\(602\) 5128.43 15783.7i 0.347208 1.06860i
\(603\) 10966.6 + 7967.68i 0.740619 + 0.538091i
\(604\) 3123.97 0.210451
\(605\) 0 0
\(606\) 3189.28 0.213788
\(607\) 442.493 + 321.490i 0.0295885 + 0.0214973i 0.602481 0.798133i \(-0.294179\pi\)
−0.572893 + 0.819630i \(0.694179\pi\)
\(608\) 71.6932 220.649i 0.00478214 0.0147179i
\(609\) −7889.42 24281.1i −0.524951 1.61563i
\(610\) 7537.83 5476.55i 0.500324 0.363507i
\(611\) −1248.55 + 907.124i −0.0826692 + 0.0600627i
\(612\) 3725.76 + 11466.7i 0.246086 + 0.757376i
\(613\) −4247.62 + 13072.8i −0.279869 + 0.861349i 0.708020 + 0.706192i \(0.249588\pi\)
−0.987890 + 0.155157i \(0.950412\pi\)
\(614\) 6635.04 + 4820.64i 0.436105 + 0.316849i
\(615\) 14740.1 0.966468
\(616\) 0 0
\(617\) −3323.39 −0.216847 −0.108423 0.994105i \(-0.534580\pi\)
−0.108423 + 0.994105i \(0.534580\pi\)
\(618\) 16216.8 + 11782.2i 1.05556 + 0.766909i
\(619\) −6699.20 + 20618.0i −0.434998 + 1.33879i 0.458091 + 0.888905i \(0.348533\pi\)
−0.893089 + 0.449881i \(0.851467\pi\)
\(620\) −4546.60 13993.0i −0.294509 0.906406i
\(621\) 13681.8 9940.38i 0.884107 0.642341i
\(622\) −2356.07 + 1711.79i −0.151881 + 0.110348i
\(623\) 1886.82 + 5807.03i 0.121338 + 0.373441i
\(624\) −484.401 + 1490.83i −0.0310762 + 0.0956427i
\(625\) 15283.4 + 11104.0i 0.978138 + 0.710659i
\(626\) −6923.35 −0.442033
\(627\) 0 0
\(628\) 2089.53 0.132773
\(629\) 4525.67 + 3288.09i 0.286885 + 0.208434i
\(630\) −8497.82 + 26153.6i −0.537399 + 1.65394i
\(631\) −9236.13 28425.9i −0.582702 1.79337i −0.608311 0.793699i \(-0.708153\pi\)
0.0256092 0.999672i \(-0.491847\pi\)
\(632\) 2640.84 1918.68i 0.166214 0.120761i
\(633\) 14461.9 10507.2i 0.908073 0.659753i
\(634\) 3085.42 + 9495.94i 0.193277 + 0.594845i
\(635\) 6102.83 18782.6i 0.381391 1.17380i
\(636\) −13865.7 10074.0i −0.864479 0.628081i
\(637\) −2378.21 −0.147925
\(638\) 0 0
\(639\) 6094.75 0.377316
\(640\) −1318.86 958.205i −0.0814569 0.0591819i
\(641\) 8398.45 25847.8i 0.517502 1.59271i −0.261181 0.965290i \(-0.584112\pi\)
0.778683 0.627418i \(-0.215888\pi\)
\(642\) 3763.91 + 11584.1i 0.231386 + 0.712132i
\(643\) −13247.2 + 9624.69i −0.812474 + 0.590297i −0.914547 0.404480i \(-0.867452\pi\)
0.102073 + 0.994777i \(0.467452\pi\)
\(644\) −7901.36 + 5740.67i −0.483474 + 0.351264i
\(645\) −11894.5 36607.6i −0.726119 2.23476i
\(646\) 293.504 903.312i 0.0178758 0.0550160i
\(647\) −1850.76 1344.66i −0.112459 0.0817062i 0.530134 0.847914i \(-0.322141\pi\)
−0.642593 + 0.766207i \(0.722141\pi\)
\(648\) 1168.74 0.0708526
\(649\) 0 0
\(650\) −853.107 −0.0514794
\(651\) −46841.6 34032.4i −2.82007 2.04890i
\(652\) 3143.67 9675.23i 0.188828 0.581152i
\(653\) −354.419 1090.79i −0.0212396 0.0653689i 0.939875 0.341519i \(-0.110941\pi\)
−0.961115 + 0.276150i \(0.910941\pi\)
\(654\) 17244.1 12528.6i 1.03104 0.749092i
\(655\) 7646.43 5555.45i 0.456138 0.331404i
\(656\) 669.670 + 2061.03i 0.0398571 + 0.122667i
\(657\) −6676.12 + 20547.0i −0.396439 + 1.22011i
\(658\) −5109.67 3712.40i −0.302729 0.219946i
\(659\) 377.923 0.0223396 0.0111698 0.999938i \(-0.496444\pi\)
0.0111698 + 0.999938i \(0.496444\pi\)
\(660\) 0 0
\(661\) −17500.4 −1.02978 −0.514892 0.857255i \(-0.672168\pi\)
−0.514892 + 0.857255i \(0.672168\pi\)
\(662\) −16502.8 11990.0i −0.968880 0.703932i
\(663\) −1983.08 + 6103.30i −0.116164 + 0.357515i
\(664\) 3360.97 + 10344.0i 0.196432 + 0.604556i
\(665\) 1752.60 1273.34i 0.102200 0.0742524i
\(666\) 6358.78 4619.92i 0.369967 0.268796i
\(667\) −4095.63 12605.0i −0.237756 0.731738i
\(668\) −1712.50 + 5270.53i −0.0991895 + 0.305274i
\(669\) −25602.6 18601.4i −1.47960 1.07499i
\(670\) −7503.38 −0.432658
\(671\) 0 0
\(672\) −6415.20 −0.368261
\(673\) −11739.3 8529.08i −0.672386 0.488517i 0.198437 0.980114i \(-0.436413\pi\)
−0.870823 + 0.491597i \(0.836413\pi\)
\(674\) 1038.75 3196.95i 0.0593639 0.182703i
\(675\) 1868.16 + 5749.60i 0.106527 + 0.327855i
\(676\) 6684.24 4856.38i 0.380305 0.276308i
\(677\) 379.518 275.736i 0.0215451 0.0156534i −0.576961 0.816772i \(-0.695761\pi\)
0.598506 + 0.801119i \(0.295761\pi\)
\(678\) −5186.04 15961.0i −0.293759 0.904098i
\(679\) −10255.2 + 31562.2i −0.579614 + 1.78387i
\(680\) −5399.25 3922.78i −0.304488 0.221223i
\(681\) 41473.1 2.33370
\(682\) 0 0
\(683\) −15892.3 −0.890342 −0.445171 0.895446i \(-0.646857\pi\)
−0.445171 + 0.895446i \(0.646857\pi\)
\(684\) −1079.64 784.406i −0.0603525 0.0438487i
\(685\) 2029.51 6246.19i 0.113202 0.348401i
\(686\) 1965.82 + 6050.17i 0.109410 + 0.336730i
\(687\) 9241.67 6714.46i 0.513234 0.372886i
\(688\) 4578.27 3326.31i 0.253699 0.184323i
\(689\) −1776.58 5467.75i −0.0982326 0.302329i
\(690\) −6999.86 + 21543.3i −0.386203 + 1.18861i
\(691\) 5020.47 + 3647.58i 0.276393 + 0.200811i 0.717343 0.696721i \(-0.245358\pi\)
−0.440950 + 0.897532i \(0.645358\pi\)
\(692\) 1774.04 0.0974553
\(693\) 0 0
\(694\) −21052.5 −1.15150
\(695\) 25379.4 + 18439.2i 1.38517 + 1.00639i
\(696\) 2690.21 8279.62i 0.146512 0.450917i
\(697\) 2741.55 + 8437.64i 0.148987 + 0.458534i
\(698\) −8576.16 + 6230.95i −0.465061 + 0.337887i
\(699\) −40813.9 + 29653.1i −2.20848 + 1.60455i
\(700\) −1078.88 3320.46i −0.0582541 0.179288i
\(701\) −578.646 + 1780.89i −0.0311771 + 0.0959533i −0.965434 0.260647i \(-0.916064\pi\)
0.934257 + 0.356600i \(0.116064\pi\)
\(702\) 3014.59 + 2190.22i 0.162077 + 0.117756i
\(703\) −619.178 −0.0332187
\(704\) 0 0
\(705\) −14648.7 −0.782554
\(706\) 12035.6 + 8744.36i 0.641594 + 0.466145i
\(707\) −1352.95 + 4163.95i −0.0719702 + 0.221502i
\(708\) 6882.93 + 21183.5i 0.365362 + 1.12447i
\(709\) −4236.02 + 3077.65i −0.224383 + 0.163023i −0.694297 0.719688i \(-0.744285\pi\)
0.469915 + 0.882712i \(0.344285\pi\)
\(710\) −2729.34 + 1982.98i −0.144268 + 0.104817i
\(711\) −5802.22 17857.4i −0.306048 0.941919i
\(712\) −643.385 + 1980.14i −0.0338650 + 0.104226i
\(713\) −24316.8 17667.2i −1.27724 0.927970i
\(714\) −26263.1 −1.37657
\(715\) 0 0
\(716\) 1506.56 0.0786349
\(717\) −22949.8 16674.0i −1.19536 0.868483i
\(718\) −6273.85 + 19308.9i −0.326098 + 1.00363i
\(719\) −5338.20 16429.3i −0.276886 0.852169i −0.988714 0.149814i \(-0.952132\pi\)
0.711828 0.702354i \(-0.247868\pi\)
\(720\) −7586.20 + 5511.69i −0.392668 + 0.285290i
\(721\) −22262.4 + 16174.6i −1.14993 + 0.835470i
\(722\) −4206.61 12946.6i −0.216833 0.667345i
\(723\) 13931.4 42876.4i 0.716617 2.20552i
\(724\) −10658.8 7744.09i −0.547144 0.397523i
\(725\) 4737.89 0.242705
\(726\) 0 0
\(727\) 17292.7 0.882190 0.441095 0.897461i \(-0.354590\pi\)
0.441095 + 0.897461i \(0.354590\pi\)
\(728\) −1740.95 1264.88i −0.0886319 0.0643949i
\(729\) −9507.85 + 29262.1i −0.483049 + 1.48667i
\(730\) −3695.45 11373.4i −0.187363 0.576644i
\(731\) 18742.9 13617.5i 0.948333 0.689004i
\(732\) 10114.8 7348.84i 0.510729 0.371067i
\(733\) 4289.57 + 13201.9i 0.216151 + 0.665245i 0.999070 + 0.0431210i \(0.0137301\pi\)
−0.782919 + 0.622124i \(0.786270\pi\)
\(734\) 294.680 906.933i 0.0148186 0.0456069i
\(735\) −18262.4 13268.4i −0.916488 0.665868i
\(736\) −3330.32 −0.166790
\(737\) 0 0
\(738\) 12465.4 0.621757
\(739\) 5160.93 + 3749.64i 0.256898 + 0.186648i 0.708779 0.705431i \(-0.249247\pi\)
−0.451880 + 0.892079i \(0.649247\pi\)
\(740\) −1344.44 + 4137.77i −0.0667874 + 0.205550i
\(741\) −219.498 675.545i −0.0108819 0.0334909i
\(742\) 19034.8 13829.6i 0.941763 0.684231i
\(743\) 18641.9 13544.2i 0.920467 0.668758i −0.0231734 0.999731i \(-0.507377\pi\)
0.943640 + 0.330973i \(0.107377\pi\)
\(744\) −6100.96 18776.8i −0.300634 0.925257i
\(745\) 1711.04 5266.03i 0.0841443 0.258970i
\(746\) −20611.3 14975.0i −1.01157 0.734950i
\(747\) 62561.8 3.06428
\(748\) 0 0
\(749\) −16721.1 −0.815720
\(750\) 15459.9 + 11232.3i 0.752688 + 0.546860i
\(751\) −6429.44 + 19787.8i −0.312401 + 0.961473i 0.664409 + 0.747369i \(0.268683\pi\)
−0.976811 + 0.214104i \(0.931317\pi\)
\(752\) −665.517 2048.25i −0.0322725 0.0993245i
\(753\) 13562.4 9853.63i 0.656361 0.476874i
\(754\) 2362.55 1716.49i 0.114110 0.0829059i
\(755\) 3073.68 + 9459.83i 0.148163 + 0.455998i
\(756\) −4712.38 + 14503.2i −0.226703 + 0.697720i
\(757\) 17667.1 + 12835.9i 0.848246 + 0.616287i 0.924662 0.380789i \(-0.124348\pi\)
−0.0764161 + 0.997076i \(0.524348\pi\)
\(758\) −2597.38 −0.124460
\(759\) 0 0
\(760\) 738.696 0.0352570
\(761\) −5775.94 4196.47i −0.275135 0.199897i 0.441658 0.897184i \(-0.354391\pi\)
−0.716793 + 0.697286i \(0.754391\pi\)
\(762\) 8189.22 25203.8i 0.389323 1.19821i
\(763\) 9042.17 + 27828.9i 0.429028 + 1.32041i
\(764\) −7411.45 + 5384.73i −0.350964 + 0.254990i
\(765\) −31057.0 + 22564.2i −1.46780 + 1.06642i
\(766\) −414.434 1275.50i −0.0195484 0.0601639i
\(767\) −2308.84 + 7105.86i −0.108693 + 0.334521i
\(768\) −1769.74 1285.79i −0.0831509 0.0604127i
\(769\) −15473.8 −0.725618 −0.362809 0.931864i \(-0.618182\pi\)
−0.362809 + 0.931864i \(0.618182\pi\)
\(770\) 0 0
\(771\) 50774.0 2.37170
\(772\) −7453.96 5415.62i −0.347505 0.252477i
\(773\) 4709.69 14494.9i 0.219141 0.674446i −0.779693 0.626162i \(-0.784625\pi\)
0.998834 0.0482840i \(-0.0153753\pi\)
\(774\) −10058.9 30958.2i −0.467133 1.43769i
\(775\) 8692.69 6315.61i 0.402904 0.292727i
\(776\) −9155.04 + 6651.52i −0.423514 + 0.307701i
\(777\) 5290.69 + 16283.1i 0.244276 + 0.751804i
\(778\) 3235.97 9959.28i 0.149120 0.458943i
\(779\) −794.442 577.196i −0.0365389 0.0265471i
\(780\) −4991.05 −0.229113
\(781\) 0 0
\(782\) −13633.9 −0.623464
\(783\) −16742.1 12163.8i −0.764129 0.555172i
\(784\) 1025.56 3156.35i 0.0467183 0.143784i
\(785\) 2055.89 + 6327.39i 0.0934751 + 0.287687i
\(786\) 10260.5 7454.71i 0.465625 0.338296i
\(787\) 29190.5 21208.1i 1.32215 0.960595i 0.322243 0.946657i \(-0.395563\pi\)
0.999903 0.0139380i \(-0.00443675\pi\)
\(788\) 1287.82 + 3963.49i 0.0582189 + 0.179179i
\(789\) 4499.78 13848.9i 0.203037 0.624885i
\(790\) 8408.39 + 6109.05i 0.378680 + 0.275127i
\(791\) 23038.9 1.03561
\(792\) 0 0
\(793\) 4193.91 0.187806
\(794\) −2834.22 2059.18i −0.126678 0.0920373i
\(795\) 16863.0 51899.0i 0.752288 2.31531i
\(796\) 4281.53 + 13177.2i 0.190647 + 0.586751i
\(797\) −2737.30 + 1988.76i −0.121656 + 0.0883885i −0.646950 0.762533i \(-0.723956\pi\)
0.525293 + 0.850921i \(0.323956\pi\)
\(798\) 2351.76 1708.65i 0.104325 0.0757966i
\(799\) −2724.55 8385.31i −0.120635 0.371278i
\(800\) 367.887 1132.24i 0.0162585 0.0500385i
\(801\) 9688.86 + 7039.37i 0.427390 + 0.310517i
\(802\) 7225.55 0.318134
\(803\) 0 0
\(804\) −10068.6 −0.441656
\(805\) −25157.7 18278.2i −1.10148 0.800274i
\(806\) 2046.53 6298.56i 0.0894365 0.275257i
\(807\) −15434.9 47503.6i −0.673275 2.07213i
\(808\) −1207.81 + 877.525i −0.0525874 + 0.0382070i
\(809\) 10905.8 7923.49i 0.473950 0.344345i −0.325028 0.945704i \(-0.605374\pi\)
0.798979 + 0.601359i \(0.205374\pi\)
\(810\) 1149.93 + 3539.12i 0.0498819 + 0.153521i
\(811\) 6620.10 20374.6i 0.286638 0.882180i −0.699265 0.714862i \(-0.746489\pi\)
0.985903 0.167318i \(-0.0535106\pi\)
\(812\) 9668.72 + 7024.74i 0.417864 + 0.303596i
\(813\) −50465.3 −2.17699
\(814\) 0 0
\(815\) 32391.1 1.39216
\(816\) −7245.11 5263.88i −0.310820 0.225824i
\(817\) −792.413 + 2438.80i −0.0339327 + 0.104434i
\(818\) 6980.68 + 21484.3i 0.298379 + 0.918315i
\(819\) −10014.1 + 7275.70i −0.427256 + 0.310419i
\(820\) −5582.21 + 4055.71i −0.237731 + 0.172722i
\(821\) −3295.61 10142.8i −0.140094 0.431166i 0.856253 0.516556i \(-0.172786\pi\)
−0.996348 + 0.0853901i \(0.972786\pi\)
\(822\) 2723.34 8381.59i 0.115557 0.355647i
\(823\) 9705.69 + 7051.60i 0.411080 + 0.298667i 0.774039 0.633138i \(-0.218233\pi\)
−0.362959 + 0.931805i \(0.618233\pi\)
\(824\) −9383.31 −0.396703
\(825\) 0 0
\(826\) −30577.2 −1.28804
\(827\) 33073.2 + 24029.1i 1.39065 + 1.01037i 0.995794 + 0.0916236i \(0.0292057\pi\)
0.394856 + 0.918743i \(0.370794\pi\)
\(828\) −5919.63 + 18218.7i −0.248456 + 0.764668i
\(829\) −10270.8 31610.2i −0.430301 1.32433i −0.897826 0.440350i \(-0.854855\pi\)
0.467526 0.883979i \(-0.345145\pi\)
\(830\) −28016.3 + 20355.0i −1.17164 + 0.851244i
\(831\) 61404.3 44612.8i 2.56329 1.86234i
\(832\) −226.753 697.874i −0.00944862 0.0290799i
\(833\) 4198.53 12921.7i 0.174634 0.537469i
\(834\) 34055.9 + 24743.1i 1.41398 + 1.02732i
\(835\) −17644.9 −0.731288
\(836\) 0 0
\(837\) −46931.4 −1.93809
\(838\) 5955.09 + 4326.62i 0.245483 + 0.178354i
\(839\) −1968.00 + 6056.87i −0.0809806 + 0.249233i −0.983347 0.181736i \(-0.941828\pi\)
0.902367 + 0.430969i \(0.141828\pi\)
\(840\) −6311.93 19426.1i −0.259265 0.797935i
\(841\) 6610.24 4802.62i 0.271034 0.196917i
\(842\) −14976.8 + 10881.3i −0.612987 + 0.445361i
\(843\) 21525.1 + 66247.5i 0.879436 + 2.70663i
\(844\) −2585.83 + 7958.36i −0.105460 + 0.324571i
\(845\) 21282.5 + 15462.6i 0.866437 + 0.629503i
\(846\) −12388.1 −0.503440
\(847\) 0 0
\(848\) 8022.90 0.324891
\(849\) 40537.8 + 29452.4i 1.63870 + 1.19058i
\(850\) 1506.09 4635.27i 0.0607746 0.187045i
\(851\) 2746.55 + 8453.01i 0.110635 + 0.340500i
\(852\) −3662.43 + 2660.91i −0.147268 + 0.106997i
\(853\) 2456.51 1784.76i 0.0986040 0.0716400i −0.537391 0.843333i \(-0.680590\pi\)
0.635995 + 0.771693i \(0.280590\pi\)
\(854\) 5303.83 + 16323.5i 0.212521 + 0.654074i
\(855\) 1313.03 4041.09i 0.0525201 0.161640i
\(856\) −4612.78 3351.38i −0.184184 0.133818i
\(857\) 10184.8 0.405959 0.202979 0.979183i \(-0.434938\pi\)
0.202979 + 0.979183i \(0.434938\pi\)
\(858\) 0 0
\(859\) −34929.8 −1.38742 −0.693708 0.720256i \(-0.744024\pi\)
−0.693708 + 0.720256i \(0.744024\pi\)
\(860\) 14577.1 + 10590.9i 0.577994 + 0.419937i
\(861\) −8390.76 + 25824.1i −0.332121 + 1.02216i
\(862\) −2215.06 6817.25i −0.0875234 0.269369i
\(863\) 9937.36 7219.91i 0.391972 0.284784i −0.374291 0.927311i \(-0.622114\pi\)
0.766263 + 0.642527i \(0.222114\pi\)
\(864\) −4206.85 + 3056.45i −0.165648 + 0.120350i
\(865\) 1745.49 + 5372.06i 0.0686108 + 0.211162i
\(866\) −5133.89 + 15800.5i −0.201451 + 0.620003i
\(867\) 4303.13 + 3126.41i 0.168560 + 0.122466i
\(868\) 27103.3 1.05985
\(869\) 0 0
\(870\) 27718.8 1.08018
\(871\) −2732.41 1985.21i −0.106296 0.0772288i
\(872\) −3083.29 + 9489.38i −0.119740 + 0.368522i
\(873\) 20114.6 + 61906.4i 0.779812 + 2.40001i
\(874\) 1220.87 887.012i 0.0472500 0.0343291i
\(875\) −21223.4 + 15419.7i −0.819977 + 0.595748i
\(876\) −4958.83 15261.7i −0.191259 0.588636i
\(877\) −5913.93 + 18201.2i −0.227707 + 0.700811i 0.770298 + 0.637684i \(0.220107\pi\)
−0.998005 + 0.0631273i \(0.979893\pi\)
\(878\) 19307.0 + 14027.3i 0.742117 + 0.539179i
\(879\) −65083.5 −2.49740
\(880\) 0 0
\(881\) −16737.0 −0.640049 −0.320024 0.947409i \(-0.603691\pi\)
−0.320024 + 0.947409i \(0.603691\pi\)
\(882\) −15444.1 11220.8i −0.589604 0.428372i
\(883\) −5749.02 + 17693.7i −0.219105 + 0.674336i 0.779731 + 0.626114i \(0.215356\pi\)
−0.998837 + 0.0482222i \(0.984644\pi\)
\(884\) −928.301 2857.02i −0.0353192 0.108701i
\(885\) −57374.5 + 41685.0i −2.17923 + 1.58331i
\(886\) −1745.57 + 1268.23i −0.0661891 + 0.0480892i
\(887\) −4917.33 15134.0i −0.186142 0.572886i 0.813824 0.581111i \(-0.197382\pi\)
−0.999966 + 0.00822537i \(0.997382\pi\)
\(888\) −1804.07 + 5552.36i −0.0681764 + 0.209825i
\(889\) 29432.4 + 21383.9i 1.11038 + 0.806740i
\(890\) −6629.16 −0.249674
\(891\) 0 0
\(892\) 14814.1 0.556068
\(893\) 789.514 + 573.616i 0.0295858 + 0.0214953i
\(894\) 2295.99 7066.34i 0.0858943 0.264356i
\(895\) 1482.30 + 4562.06i 0.0553609 + 0.170383i
\(896\) 2429.50 1765.13i 0.0905846 0.0658135i
\(897\) −8248.89 + 5993.17i −0.307048 + 0.223084i
\(898\) 7889.78 + 24282.3i 0.293191 + 0.902349i
\(899\) −11365.8 + 34980.3i −0.421657 + 1.29773i
\(900\) −5540.09 4025.11i −0.205188 0.149078i
\(901\) 32844.8 1.21445
\(902\) 0 0
\(903\) 70906.1 2.61308
\(904\) 6355.65 + 4617.65i 0.233834 + 0.169890i
\(905\) 12963.0 39895.9i 0.476136 1.46540i
\(906\) 4124.49 + 12693.9i 0.151244 + 0.465481i
\(907\) 18247.6 13257.7i 0.668029 0.485351i −0.201336 0.979522i \(-0.564528\pi\)
0.869365 + 0.494171i \(0.164528\pi\)
\(908\) −15706.3 + 11411.3i −0.574042 + 0.417066i
\(909\) 2653.69 + 8167.21i 0.0968287 + 0.298008i
\(910\) 2117.30 6516.37i 0.0771294 0.237380i
\(911\) −39123.8 28425.1i −1.42286 1.03377i −0.991291 0.131692i \(-0.957959\pi\)
−0.431572 0.902078i \(-0.642041\pi\)
\(912\) 991.236 0.0359902
\(913\) 0 0
\(914\) 22453.6 0.812583
\(915\) 32205.3 + 23398.5i 1.16358 + 0.845390i
\(916\) −1652.43 + 5085.66i −0.0596047 + 0.183444i
\(917\) 5380.24 + 16558.7i 0.193753 + 0.596310i
\(918\) −17222.3 + 12512.8i −0.619196 + 0.449872i
\(919\) 17000.9 12351.9i 0.610238 0.443364i −0.239260 0.970955i \(-0.576905\pi\)
0.849498 + 0.527592i \(0.176905\pi\)
\(920\) −3276.71 10084.7i −0.117424 0.361393i
\(921\) −10828.0 + 33325.3i −0.387401 + 1.19230i
\(922\) −3495.90 2539.92i −0.124871 0.0907243i
\(923\) −1518.56 −0.0541537
\(924\) 0 0
\(925\) −3177.26 −0.112938
\(926\) −18558.0 13483.2i −0.658588 0.478492i
\(927\) −16678.8 + 51332.1i −0.590943 + 1.81874i
\(928\) 1259.32 + 3875.78i 0.0445464 + 0.137100i
\(929\) −3980.09 + 2891.71i −0.140563 + 0.102125i −0.655844 0.754896i \(-0.727687\pi\)
0.515282 + 0.857021i \(0.327687\pi\)
\(930\) 50856.1 36949.1i 1.79316 1.30281i
\(931\) 464.715 + 1430.25i 0.0163592 + 0.0503485i
\(932\) 7297.63 22459.8i 0.256483 0.789372i
\(933\) −10066.3 7313.59i −0.353222 0.256630i
\(934\) 4036.78 0.141421
\(935\) 0 0
\(936\) −4220.83 −0.147395
\(937\) −13899.1 10098.3i −0.484594 0.352078i 0.318507 0.947920i \(-0.396818\pi\)
−0.803102 + 0.595842i \(0.796818\pi\)
\(938\) 4271.28 13145.6i 0.148680 0.457591i
\(939\) −9140.72 28132.2i −0.317674 0.977701i
\(940\) 5547.59 4030.56i 0.192492 0.139854i
\(941\) −41653.8 + 30263.2i −1.44301 + 1.04841i −0.455609 + 0.890180i \(0.650579\pi\)
−0.987402 + 0.158230i \(0.949421\pi\)
\(942\) 2758.75 + 8490.55i 0.0954192 + 0.293670i
\(943\) −4355.89 + 13406.0i −0.150421 + 0.462949i
\(944\) −8435.24 6128.56i −0.290830 0.211300i
\(945\) −48554.3 −1.67140
\(946\) 0 0
\(947\) 45107.8 1.54784 0.773920 0.633283i \(-0.218293\pi\)
0.773920 + 0.633283i \(0.218293\pi\)
\(948\) 11283.0 + 8197.57i 0.386555 + 0.280849i
\(949\) 1663.41 5119.44i 0.0568983 0.175115i
\(950\) 166.702 + 513.056i 0.00569318 + 0.0175218i
\(951\) −34512.0 + 25074.5i −1.17679 + 0.854990i
\(952\) 9946.08 7226.25i 0.338608 0.246013i
\(953\) −7844.63 24143.3i −0.266645 0.820648i −0.991310 0.131547i \(-0.958006\pi\)
0.724665 0.689101i \(-0.241994\pi\)
\(954\) 14260.7 43889.8i 0.483969 1.48950i
\(955\) −23597.9 17144.9i −0.799591 0.580937i
\(956\) 13279.1 0.449245
\(957\) 0 0
\(958\) 14654.0 0.494206
\(959\) 9787.80 + 7111.25i 0.329577 + 0.239452i
\(960\) 2152.30 6624.11i 0.0723597 0.222700i
\(961\) 16569.8 + 50996.6i 0.556201 + 1.71181i
\(962\) −1584.34 + 1151.09i −0.0530989 + 0.0385786i
\(963\) −26533.2 + 19277.5i −0.887871 + 0.645076i
\(964\) 6521.44 + 20070.9i 0.217885 + 0.670582i
\(965\) 9065.29 27900.1i 0.302406 0.930710i
\(966\) −33758.5 24527.0i −1.12439 0.816918i
\(967\) −26837.3 −0.892482 −0.446241 0.894913i \(-0.647238\pi\)
−0.446241 + 0.894913i \(0.647238\pi\)
\(968\) 0 0
\(969\) 4058.01 0.134532
\(970\) −29149.4 21178.3i −0.964878 0.701025i
\(971\) −1684.71 + 5185.01i −0.0556797 + 0.171364i −0.975029 0.222078i \(-0.928716\pi\)
0.919349 + 0.393443i \(0.128716\pi\)
\(972\) −3880.14 11941.8i −0.128041 0.394068i
\(973\) −46752.0 + 33967.3i −1.54039 + 1.11916i
\(974\) 10015.3 7276.55i 0.329478 0.239379i
\(975\) −1126.33 3466.50i −0.0369965 0.113863i
\(976\) −1808.55 + 5566.15i −0.0593138 + 0.182549i
\(977\) 2919.12 + 2120.87i 0.0955896 + 0.0694499i 0.634553 0.772879i \(-0.281184\pi\)
−0.538964 + 0.842329i \(0.681184\pi\)
\(978\) 43464.7 1.42111
\(979\) 0 0
\(980\) 10566.9 0.344437
\(981\) 46431.8 + 33734.7i 1.51117 + 1.09793i
\(982\) 6255.08 19251.1i 0.203266 0.625589i
\(983\) 17937.1 + 55204.6i 0.581997 + 1.79120i 0.611009 + 0.791624i \(0.290764\pi\)
−0.0290114 + 0.999579i \(0.509236\pi\)
\(984\) −7490.62 + 5442.25i −0.242675 + 0.176314i
\(985\) −10734.9 + 7799.38i −0.347252 + 0.252293i
\(986\) 5155.50 + 15867.0i 0.166516 + 0.512483i
\(987\) 8338.72 25663.9i 0.268920 0.827652i
\(988\) 269.001 + 195.441i 0.00866201 + 0.00629332i
\(989\) 36809.4 1.18349
\(990\) 0 0
\(991\) −18977.5 −0.608315 −0.304157 0.952622i \(-0.598375\pi\)
−0.304157 + 0.952622i \(0.598375\pi\)
\(992\) 7476.90 + 5432.29i 0.239306 + 0.173866i
\(993\) 26931.7 82887.1i 0.860675 2.64888i
\(994\) −1920.44 5910.51i −0.0612803 0.188602i
\(995\) −35689.8 + 25930.2i −1.13713 + 0.826173i
\(996\) −37594.3 + 27313.8i −1.19600 + 0.868948i
\(997\) 7496.82 + 23072.8i 0.238141 + 0.732923i 0.996689 + 0.0813060i \(0.0259091\pi\)
−0.758548 + 0.651617i \(0.774091\pi\)
\(998\) 1583.90 4874.76i 0.0502381 0.154617i
\(999\) 11227.3 + 8157.13i 0.355573 + 0.258339i
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 242.4.c.q.81.2 8
11.2 odd 10 242.4.c.r.27.1 8
11.3 even 5 inner 242.4.c.q.3.2 8
11.4 even 5 242.4.c.n.9.1 8
11.5 even 5 242.4.a.o.1.4 4
11.6 odd 10 242.4.a.n.1.4 4
11.7 odd 10 242.4.c.r.9.1 8
11.8 odd 10 22.4.c.b.3.2 8
11.9 even 5 242.4.c.n.27.1 8
11.10 odd 2 22.4.c.b.15.2 yes 8
33.5 odd 10 2178.4.a.bt.1.2 4
33.8 even 10 198.4.f.d.91.2 8
33.17 even 10 2178.4.a.by.1.2 4
33.32 even 2 198.4.f.d.37.2 8
44.19 even 10 176.4.m.b.113.1 8
44.27 odd 10 1936.4.a.bm.1.1 4
44.39 even 10 1936.4.a.bn.1.1 4
44.43 even 2 176.4.m.b.81.1 8
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
22.4.c.b.3.2 8 11.8 odd 10
22.4.c.b.15.2 yes 8 11.10 odd 2
176.4.m.b.81.1 8 44.43 even 2
176.4.m.b.113.1 8 44.19 even 10
198.4.f.d.37.2 8 33.32 even 2
198.4.f.d.91.2 8 33.8 even 10
242.4.a.n.1.4 4 11.6 odd 10
242.4.a.o.1.4 4 11.5 even 5
242.4.c.n.9.1 8 11.4 even 5
242.4.c.n.27.1 8 11.9 even 5
242.4.c.q.3.2 8 11.3 even 5 inner
242.4.c.q.81.2 8 1.1 even 1 trivial
242.4.c.r.9.1 8 11.7 odd 10
242.4.c.r.27.1 8 11.2 odd 10
1936.4.a.bm.1.1 4 44.27 odd 10
1936.4.a.bn.1.1 4 44.39 even 10
2178.4.a.bt.1.2 4 33.5 odd 10
2178.4.a.by.1.2 4 33.17 even 10