Properties

Label 70.3.l.c.23.1
Level $70$
Weight $3$
Character 70.23
Analytic conductor $1.907$
Analytic rank $0$
Dimension $16$
CM no
Inner twists $4$

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Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms
 
[N,k,chi] = [70,3,Mod(23,70)]
 
mf = mfinit([N,k,chi],0)
 
lf = mfeigenbasis(mf)
 
from sage.modular.dirichlet import DirichletCharacter
 
H = DirichletGroup(70, base_ring=CyclotomicField(12))
 
chi = DirichletCharacter(H, H._module([9, 4]))
 
N = Newforms(chi, 3, names="a")
 
//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code
 
chi := DirichletCharacter("70.23");
 
S:= CuspForms(chi, 3);
 
N := Newforms(S);
 
Level: \( N \) \(=\) \( 70 = 2 \cdot 5 \cdot 7 \)
Weight: \( k \) \(=\) \( 3 \)
Character orbit: \([\chi]\) \(=\) 70.l (of order \(12\), degree \(4\), 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: \(1.90736185052\)
Analytic rank: \(0\)
Dimension: \(16\)
Relative dimension: \(4\) over \(\Q(\zeta_{12})\)
Coefficient field: \(\mathbb{Q}[x]/(x^{16} - \cdots)\)
comment: defining polynomial
 
gp: f.mod \\ as an extension of the character field
 
Defining polynomial: \( x^{16} - 2 x^{15} + 2 x^{14} - 8 x^{13} - 722 x^{12} + 1354 x^{11} - 1232 x^{10} + 9306 x^{9} + \cdots + 52200625 \) Copy content Toggle raw display
Coefficient ring: \(\Z[a_1, \ldots, a_{5}]\)
Coefficient ring index: \( 1 \)
Twist minimal: yes
Sato-Tate group: $\mathrm{SU}(2)[C_{12}]$

Embedding invariants

Embedding label 23.1
Root \(4.90868 + 1.31528i\) of defining polynomial
Character \(\chi\) \(=\) 70.23
Dual form 70.3.l.c.67.1

$q$-expansion

comment: q-expansion
 
sage: f.q_expansion() # note that sage often uses an isomorphic number field
 
gp: mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q+(0.366025 + 1.36603i) q^{2} +(-1.31528 + 4.90868i) q^{3} +(-1.73205 + 1.00000i) q^{4} +(2.11728 - 4.52958i) q^{5} -7.18681 q^{6} +(-0.145113 + 6.99850i) q^{7} +(-2.00000 - 2.00000i) q^{8} +(-14.5710 - 8.41254i) q^{9} +O(q^{10})\) \(q+(0.366025 + 1.36603i) q^{2} +(-1.31528 + 4.90868i) q^{3} +(-1.73205 + 1.00000i) q^{4} +(2.11728 - 4.52958i) q^{5} -7.18681 q^{6} +(-0.145113 + 6.99850i) q^{7} +(-2.00000 - 2.00000i) q^{8} +(-14.5710 - 8.41254i) q^{9} +(6.96250 + 1.23432i) q^{10} +(0.474367 + 0.821627i) q^{11} +(-2.63055 - 9.81736i) q^{12} +(0.862338 + 0.862338i) q^{13} +(-9.61324 + 2.36340i) q^{14} +(19.4495 + 16.3507i) q^{15} +(2.00000 - 3.46410i) q^{16} +(29.3872 + 7.87429i) q^{17} +(6.15841 - 22.9835i) q^{18} +(20.9123 + 12.0737i) q^{19} +(0.862338 + 9.96275i) q^{20} +(-34.1625 - 9.91727i) q^{21} +(-0.948733 + 0.948733i) q^{22} +(-5.47452 + 1.46689i) q^{23} +(12.4479 - 7.18681i) q^{24} +(-16.0342 - 19.1808i) q^{25} +(-0.862338 + 1.49361i) q^{26} +(28.1187 - 28.1187i) q^{27} +(-6.74715 - 12.2669i) q^{28} +7.33636i q^{29} +(-15.2165 + 32.5532i) q^{30} +(-23.5316 - 40.7579i) q^{31} +(5.46410 + 1.46410i) q^{32} +(-4.65703 + 1.24785i) q^{33} +43.0259i q^{34} +(31.3930 + 15.4751i) q^{35} +33.6502 q^{36} +(-2.13074 - 7.95202i) q^{37} +(-8.83857 + 32.9860i) q^{38} +(-5.36716 + 3.09873i) q^{39} +(-13.2937 + 4.82460i) q^{40} +53.3601 q^{41} +(1.04290 - 50.2968i) q^{42} +(-33.0776 - 33.0776i) q^{43} +(-1.64325 - 0.948733i) q^{44} +(-68.9561 + 48.1886i) q^{45} +(-4.00763 - 6.94142i) q^{46} +(-7.87429 - 29.3872i) q^{47} +(14.3736 + 14.3736i) q^{48} +(-48.9579 - 2.03114i) q^{49} +(20.3326 - 28.9238i) q^{50} +(-77.3047 + 133.896i) q^{51} +(-2.35595 - 0.631275i) q^{52} +(3.48276 - 12.9978i) q^{53} +(48.7030 + 28.1187i) q^{54} +(4.72600 - 0.409064i) q^{55} +(14.2872 - 13.7068i) q^{56} +(-86.7715 + 86.7715i) q^{57} +(-10.0217 + 2.68529i) q^{58} +(43.5119 - 25.1216i) q^{59} +(-50.0382 - 8.87083i) q^{60} +(22.7478 - 39.4004i) q^{61} +(47.0632 - 47.0632i) q^{62} +(60.9896 - 100.754i) q^{63} +8.00000i q^{64} +(5.73185 - 2.08022i) q^{65} +(-3.40918 - 5.90487i) q^{66} +(65.9999 + 17.6846i) q^{67} +(-58.7745 + 15.7486i) q^{68} -28.8020i q^{69} +(-9.64874 + 48.5479i) q^{70} -11.9203 q^{71} +(12.3168 + 45.9670i) q^{72} +(-14.2554 + 53.2017i) q^{73} +(10.0828 - 5.82128i) q^{74} +(115.242 - 53.4788i) q^{75} -48.2949 q^{76} +(-5.81899 + 3.20062i) q^{77} +(-6.19746 - 6.19746i) q^{78} +(-61.4002 - 35.4495i) q^{79} +(-11.4564 - 16.3936i) q^{80} +(25.3289 + 43.8709i) q^{81} +(19.5312 + 72.8913i) q^{82} +(85.7452 + 85.7452i) q^{83} +(69.0885 - 16.9853i) q^{84} +(97.8884 - 116.440i) q^{85} +(33.0776 - 57.2921i) q^{86} +(-36.0118 - 9.64934i) q^{87} +(0.694521 - 2.59199i) q^{88} +(-135.750 - 78.3752i) q^{89} +(-91.0665 - 76.5576i) q^{90} +(-6.16021 + 5.90994i) q^{91} +(8.01526 - 8.01526i) q^{92} +(231.018 - 61.9011i) q^{93} +(37.2615 - 21.5130i) q^{94} +(98.9661 - 69.1604i) q^{95} +(-14.3736 + 24.8958i) q^{96} +(-87.1790 + 87.1790i) q^{97} +(-15.1452 - 67.6212i) q^{98} -15.9625i q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 16 q - 8 q^{2} + 2 q^{3} - 2 q^{5} - 8 q^{6} + 12 q^{7} - 32 q^{8}+O(q^{10}) \) Copy content Toggle raw display \( 16 q - 8 q^{2} + 2 q^{3} - 2 q^{5} - 8 q^{6} + 12 q^{7} - 32 q^{8} - 6 q^{10} + 40 q^{11} + 4 q^{12} + 16 q^{13} - 20 q^{15} + 32 q^{16} + 46 q^{17} - 52 q^{18} + 16 q^{20} - 20 q^{21} - 80 q^{22} + 54 q^{23} - 26 q^{25} - 16 q^{26} - 52 q^{27} - 36 q^{28} - 22 q^{30} - 208 q^{31} + 32 q^{32} - 22 q^{33} + 50 q^{35} + 208 q^{36} - 38 q^{37} + 36 q^{38} - 4 q^{40} - 72 q^{41} + 184 q^{42} + 144 q^{43} + 254 q^{45} + 108 q^{46} + 46 q^{47} + 16 q^{48} - 60 q^{50} - 136 q^{51} - 16 q^{52} + 30 q^{53} - 192 q^{55} - 48 q^{56} - 492 q^{57} + 132 q^{58} - 64 q^{60} - 120 q^{61} + 416 q^{62} - 292 q^{63} + 230 q^{65} - 44 q^{66} - 74 q^{67} - 92 q^{68} - 162 q^{70} + 16 q^{71} - 104 q^{72} - 54 q^{73} + 300 q^{75} - 144 q^{76} + 570 q^{77} + 168 q^{78} + 8 q^{80} + 244 q^{81} + 36 q^{82} + 64 q^{83} + 544 q^{85} - 144 q^{86} - 236 q^{87} - 80 q^{88} - 1048 q^{90} + 336 q^{91} - 216 q^{92} + 142 q^{93} - 396 q^{95} - 16 q^{96} + 136 q^{97} - 268 q^{98}+O(q^{100}) \) Copy content Toggle raw display

Display 100 coefficients 10 coefficients

Character values

We give the values of \(\chi\) on generators for \(\left(\mathbb{Z}/70\mathbb{Z}\right)^\times\).

\(n\) \(31\) \(57\)
\(\chi(n)\) \(e\left(\frac{1}{3}\right)\) \(e\left(\frac{3}{4}\right)\)

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:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) 0.366025 + 1.36603i 0.183013 + 0.683013i
\(3\) −1.31528 + 4.90868i −0.438426 + 1.63623i 0.294308 + 0.955711i \(0.404911\pi\)
−0.732733 + 0.680516i \(0.761756\pi\)
\(4\) −1.73205 + 1.00000i −0.433013 + 0.250000i
\(5\) 2.11728 4.52958i 0.423457 0.905916i
\(6\) −7.18681 −1.19780
\(7\) −0.145113 + 6.99850i −0.0207304 + 0.999785i
\(8\) −2.00000 2.00000i −0.250000 0.250000i
\(9\) −14.5710 8.41254i −1.61899 0.934727i
\(10\) 6.96250 + 1.23432i 0.696250 + 0.123432i
\(11\) 0.474367 + 0.821627i 0.0431242 + 0.0746934i 0.886782 0.462188i \(-0.152936\pi\)
−0.843658 + 0.536882i \(0.819602\pi\)
\(12\) −2.63055 9.81736i −0.219213 0.818113i
\(13\) 0.862338 + 0.862338i 0.0663337 + 0.0663337i 0.739495 0.673162i \(-0.235064\pi\)
−0.673162 + 0.739495i \(0.735064\pi\)
\(14\) −9.61324 + 2.36340i −0.686660 + 0.168814i
\(15\) 19.4495 + 16.3507i 1.29663 + 1.09005i
\(16\) 2.00000 3.46410i 0.125000 0.216506i
\(17\) 29.3872 + 7.87429i 1.72866 + 0.463193i 0.979874 0.199617i \(-0.0639698\pi\)
0.748787 + 0.662810i \(0.230636\pi\)
\(18\) 6.15841 22.9835i 0.342134 1.27686i
\(19\) 20.9123 + 12.0737i 1.10065 + 0.635459i 0.936391 0.350959i \(-0.114144\pi\)
0.164256 + 0.986418i \(0.447478\pi\)
\(20\) 0.862338 + 9.96275i 0.0431169 + 0.498137i
\(21\) −34.1625 9.91727i −1.62679 0.472251i
\(22\) −0.948733 + 0.948733i −0.0431242 + 0.0431242i
\(23\) −5.47452 + 1.46689i −0.238023 + 0.0637780i −0.375858 0.926677i \(-0.622652\pi\)
0.137836 + 0.990455i \(0.455985\pi\)
\(24\) 12.4479 7.18681i 0.518663 0.299450i
\(25\) −16.0342 19.1808i −0.641369 0.767233i
\(26\) −0.862338 + 1.49361i −0.0331669 + 0.0574467i
\(27\) 28.1187 28.1187i 1.04143 1.04143i
\(28\) −6.74715 12.2669i −0.240970 0.438102i
\(29\) 7.33636i 0.252978i 0.991968 + 0.126489i \(0.0403708\pi\)
−0.991968 + 0.126489i \(0.959629\pi\)
\(30\) −15.2165 + 32.5532i −0.507217 + 1.08511i
\(31\) −23.5316 40.7579i −0.759083 1.31477i −0.943319 0.331889i \(-0.892314\pi\)
0.184235 0.982882i \(-0.441019\pi\)
\(32\) 5.46410 + 1.46410i 0.170753 + 0.0457532i
\(33\) −4.65703 + 1.24785i −0.141122 + 0.0378135i
\(34\) 43.0259i 1.26547i
\(35\) 31.3930 + 15.4751i 0.896943 + 0.442146i
\(36\) 33.6502 0.934727
\(37\) −2.13074 7.95202i −0.0575875 0.214919i 0.931136 0.364672i \(-0.118819\pi\)
−0.988723 + 0.149753i \(0.952152\pi\)
\(38\) −8.83857 + 32.9860i −0.232594 + 0.868053i
\(39\) −5.36716 + 3.09873i −0.137619 + 0.0794546i
\(40\) −13.2937 + 4.82460i −0.332343 + 0.120615i
\(41\) 53.3601 1.30147 0.650733 0.759306i \(-0.274462\pi\)
0.650733 + 0.759306i \(0.274462\pi\)
\(42\) 1.04290 50.2968i 0.0248308 1.19754i
\(43\) −33.0776 33.0776i −0.769247 0.769247i 0.208727 0.977974i \(-0.433068\pi\)
−0.977974 + 0.208727i \(0.933068\pi\)
\(44\) −1.64325 0.948733i −0.0373467 0.0215621i
\(45\) −68.9561 + 48.1886i −1.53236 + 1.07086i
\(46\) −4.00763 6.94142i −0.0871224 0.150900i
\(47\) −7.87429 29.3872i −0.167538 0.625260i −0.997703 0.0677424i \(-0.978420\pi\)
0.830165 0.557518i \(-0.188246\pi\)
\(48\) 14.3736 + 14.3736i 0.299450 + 0.299450i
\(49\) −48.9579 2.03114i −0.999141 0.0414518i
\(50\) 20.3326 28.9238i 0.406651 0.578476i
\(51\) −77.3047 + 133.896i −1.51578 + 2.62541i
\(52\) −2.35595 0.631275i −0.0453068 0.0121399i
\(53\) 3.48276 12.9978i 0.0657125 0.245242i −0.925255 0.379346i \(-0.876149\pi\)
0.990967 + 0.134104i \(0.0428156\pi\)
\(54\) 48.7030 + 28.1187i 0.901907 + 0.520717i
\(55\) 4.72600 0.409064i 0.0859272 0.00743754i
\(56\) 14.2872 13.7068i 0.255129 0.244764i
\(57\) −86.7715 + 86.7715i −1.52231 + 1.52231i
\(58\) −10.0217 + 2.68529i −0.172787 + 0.0462982i
\(59\) 43.5119 25.1216i 0.737490 0.425790i −0.0836659 0.996494i \(-0.526663\pi\)
0.821156 + 0.570704i \(0.193330\pi\)
\(60\) −50.0382 8.87083i −0.833969 0.147847i
\(61\) 22.7478 39.4004i 0.372915 0.645909i −0.617097 0.786887i \(-0.711691\pi\)
0.990013 + 0.140978i \(0.0450248\pi\)
\(62\) 47.0632 47.0632i 0.759083 0.759083i
\(63\) 60.9896 100.754i 0.968089 1.59927i
\(64\) 8.00000i 0.125000i
\(65\) 5.73185 2.08022i 0.0881823 0.0320033i
\(66\) −3.40918 5.90487i −0.0516542 0.0894678i
\(67\) 65.9999 + 17.6846i 0.985073 + 0.263949i 0.715180 0.698941i \(-0.246345\pi\)
0.269893 + 0.962890i \(0.413012\pi\)
\(68\) −58.7745 + 15.7486i −0.864331 + 0.231597i
\(69\) 28.8020i 0.417421i
\(70\) −9.64874 + 48.5479i −0.137839 + 0.693542i
\(71\) −11.9203 −0.167892 −0.0839460 0.996470i \(-0.526752\pi\)
−0.0839460 + 0.996470i \(0.526752\pi\)
\(72\) 12.3168 + 45.9670i 0.171067 + 0.638430i
\(73\) −14.2554 + 53.2017i −0.195279 + 0.728791i 0.796916 + 0.604091i \(0.206464\pi\)
−0.992194 + 0.124700i \(0.960203\pi\)
\(74\) 10.0828 5.82128i 0.136253 0.0786660i
\(75\) 115.242 53.4788i 1.53656 0.713050i
\(76\) −48.2949 −0.635459
\(77\) −5.81899 + 3.20062i −0.0755713 + 0.0415665i
\(78\) −6.19746 6.19746i −0.0794546 0.0794546i
\(79\) −61.4002 35.4495i −0.777218 0.448727i 0.0582252 0.998303i \(-0.481456\pi\)
−0.835444 + 0.549576i \(0.814789\pi\)
\(80\) −11.4564 16.3936i −0.143205 0.204921i
\(81\) 25.3289 + 43.8709i 0.312702 + 0.541616i
\(82\) 19.5312 + 72.8913i 0.238185 + 0.888918i
\(83\) 85.7452 + 85.7452i 1.03307 + 1.03307i 0.999434 + 0.0336406i \(0.0107102\pi\)
0.0336406 + 0.999434i \(0.489290\pi\)
\(84\) 69.0885 16.9853i 0.822482 0.202206i
\(85\) 97.8884 116.440i 1.15163 1.36988i
\(86\) 33.0776 57.2921i 0.384624 0.666188i
\(87\) −36.0118 9.64934i −0.413929 0.110912i
\(88\) 0.694521 2.59199i 0.00789228 0.0294544i
\(89\) −135.750 78.3752i −1.52528 0.880621i −0.999551 0.0299681i \(-0.990459\pi\)
−0.525729 0.850652i \(-0.676207\pi\)
\(90\) −91.0665 76.5576i −1.01185 0.850640i
\(91\) −6.16021 + 5.90994i −0.0676946 + 0.0649443i
\(92\) 8.01526 8.01526i 0.0871224 0.0871224i
\(93\) 231.018 61.9011i 2.48406 0.665603i
\(94\) 37.2615 21.5130i 0.396399 0.228861i
\(95\) 98.9661 69.1604i 1.04175 0.728005i
\(96\) −14.3736 + 24.8958i −0.149725 + 0.259332i
\(97\) −87.1790 + 87.1790i −0.898753 + 0.898753i −0.995326 0.0965731i \(-0.969212\pi\)
0.0965731 + 0.995326i \(0.469212\pi\)
\(98\) −15.1452 67.6212i −0.154543 0.690012i
\(99\) 15.9625i 0.161238i
\(100\) 46.9529 + 17.1879i 0.469529 + 0.171879i
\(101\) 25.2261 + 43.6929i 0.249763 + 0.432603i 0.963460 0.267852i \(-0.0863138\pi\)
−0.713697 + 0.700455i \(0.752980\pi\)
\(102\) −211.200 56.5910i −2.07059 0.554813i
\(103\) −139.636 + 37.4152i −1.35569 + 0.363255i −0.862230 0.506517i \(-0.830933\pi\)
−0.493455 + 0.869771i \(0.664266\pi\)
\(104\) 3.44935i 0.0331669i
\(105\) −117.253 + 133.744i −1.11669 + 1.27375i
\(106\) 19.0302 0.179530
\(107\) −1.79591 6.70244i −0.0167842 0.0626397i 0.957026 0.290003i \(-0.0936562\pi\)
−0.973810 + 0.227363i \(0.926990\pi\)
\(108\) −20.5843 + 76.8217i −0.190595 + 0.711312i
\(109\) 42.3291 24.4387i 0.388340 0.224208i −0.293100 0.956082i \(-0.594687\pi\)
0.681441 + 0.731873i \(0.261354\pi\)
\(110\) 2.28863 + 6.30610i 0.0208057 + 0.0573282i
\(111\) 41.8364 0.376905
\(112\) 23.9533 + 14.4997i 0.213869 + 0.129461i
\(113\) −8.29274 8.29274i −0.0733871 0.0733871i 0.669461 0.742848i \(-0.266525\pi\)
−0.742848 + 0.669461i \(0.766525\pi\)
\(114\) −150.293 86.7715i −1.31836 0.761153i
\(115\) −4.94670 + 27.9031i −0.0430148 + 0.242636i
\(116\) −7.33636 12.7069i −0.0632445 0.109543i
\(117\) −5.31063 19.8196i −0.0453900 0.169398i
\(118\) 50.2432 + 50.2432i 0.425790 + 0.425790i
\(119\) −59.3726 + 204.524i −0.498930 + 1.71869i
\(120\) −6.19746 71.6003i −0.0516455 0.596670i
\(121\) 60.0500 104.010i 0.496281 0.859583i
\(122\) 62.1483 + 16.6526i 0.509412 + 0.136497i
\(123\) −70.1834 + 261.928i −0.570596 + 2.12949i
\(124\) 81.5158 + 47.0632i 0.657385 + 0.379542i
\(125\) −120.830 + 32.0171i −0.966641 + 0.256136i
\(126\) 159.956 + 46.4348i 1.26949 + 0.368530i
\(127\) −80.3440 + 80.3440i −0.632630 + 0.632630i −0.948727 0.316097i \(-0.897627\pi\)
0.316097 + 0.948727i \(0.397627\pi\)
\(128\) −10.9282 + 2.92820i −0.0853766 + 0.0228766i
\(129\) 205.874 118.861i 1.59592 0.921405i
\(130\) 4.93963 + 7.06844i 0.0379972 + 0.0543726i
\(131\) −12.5429 + 21.7250i −0.0957475 + 0.165840i −0.909920 0.414783i \(-0.863857\pi\)
0.814173 + 0.580623i \(0.197191\pi\)
\(132\) 6.81836 6.81836i 0.0516542 0.0516542i
\(133\) −87.5325 + 144.603i −0.658139 + 1.08724i
\(134\) 96.6305i 0.721123i
\(135\) −67.8307 186.901i −0.502449 1.38445i
\(136\) −43.0259 74.5231i −0.316367 0.547964i
\(137\) 66.0647 + 17.7020i 0.482224 + 0.129212i 0.491738 0.870743i \(-0.336362\pi\)
−0.00951399 + 0.999955i \(0.503028\pi\)
\(138\) 39.3443 10.5423i 0.285104 0.0763933i
\(139\) 67.3054i 0.484212i 0.970250 + 0.242106i \(0.0778381\pi\)
−0.970250 + 0.242106i \(0.922162\pi\)
\(140\) −69.8494 + 4.58935i −0.498924 + 0.0327811i
\(141\) 154.609 1.09652
\(142\) −4.36314 16.2835i −0.0307264 0.114672i
\(143\) −0.299456 + 1.11758i −0.00209410 + 0.00781528i
\(144\) −58.2838 + 33.6502i −0.404749 + 0.233682i
\(145\) 33.2306 + 15.5332i 0.229177 + 0.107125i
\(146\) −77.8927 −0.533512
\(147\) 74.3634 237.647i 0.505873 1.61665i
\(148\) 11.6426 + 11.6426i 0.0786660 + 0.0786660i
\(149\) 51.9776 + 30.0093i 0.348843 + 0.201404i 0.664175 0.747577i \(-0.268783\pi\)
−0.315333 + 0.948981i \(0.602116\pi\)
\(150\) 115.235 + 137.849i 0.768232 + 0.918992i
\(151\) −23.9018 41.3992i −0.158290 0.274167i 0.775962 0.630780i \(-0.217265\pi\)
−0.934252 + 0.356613i \(0.883932\pi\)
\(152\) −17.6771 65.9720i −0.116297 0.434026i
\(153\) −361.957 361.957i −2.36573 2.36573i
\(154\) −6.50203 6.77738i −0.0422210 0.0440089i
\(155\) −234.439 + 20.2922i −1.51251 + 0.130917i
\(156\) 6.19746 10.7343i 0.0397273 0.0688097i
\(157\) −101.024 27.0694i −0.643466 0.172416i −0.0776933 0.996977i \(-0.524755\pi\)
−0.565773 + 0.824561i \(0.691422\pi\)
\(158\) 25.9508 96.8497i 0.164246 0.612973i
\(159\) 59.2214 + 34.1915i 0.372462 + 0.215041i
\(160\) 18.2008 21.6502i 0.113755 0.135314i
\(161\) −9.47163 38.5263i −0.0588300 0.239294i
\(162\) −50.6578 + 50.6578i −0.312702 + 0.312702i
\(163\) 39.7089 10.6400i 0.243613 0.0652759i −0.134946 0.990853i \(-0.543086\pi\)
0.378559 + 0.925577i \(0.376420\pi\)
\(164\) −92.4225 + 53.3601i −0.563552 + 0.325367i
\(165\) −4.20802 + 23.7364i −0.0255032 + 0.143857i
\(166\) −85.7452 + 148.515i −0.516537 + 0.894669i
\(167\) 26.4354 26.4354i 0.158296 0.158296i −0.623515 0.781811i \(-0.714296\pi\)
0.781811 + 0.623515i \(0.214296\pi\)
\(168\) 48.4905 + 88.1596i 0.288634 + 0.524759i
\(169\) 167.513i 0.991200i
\(170\) 194.889 + 91.0981i 1.14641 + 0.535871i
\(171\) −203.141 351.851i −1.18796 2.05761i
\(172\) 90.3698 + 24.2145i 0.525406 + 0.140782i
\(173\) 242.480 64.9724i 1.40162 0.375563i 0.522693 0.852521i \(-0.324927\pi\)
0.878926 + 0.476958i \(0.158261\pi\)
\(174\) 52.7250i 0.303017i
\(175\) 136.564 109.432i 0.780364 0.625326i
\(176\) 3.79493 0.0215621
\(177\) 66.0838 + 246.628i 0.373355 + 1.39338i
\(178\) 57.3746 214.125i 0.322329 1.20295i
\(179\) 46.8192 27.0311i 0.261560 0.151012i −0.363486 0.931600i \(-0.618414\pi\)
0.625046 + 0.780588i \(0.285080\pi\)
\(180\) 71.2470 152.421i 0.395817 0.846785i
\(181\) 201.453 1.11300 0.556501 0.830847i \(-0.312143\pi\)
0.556501 + 0.830847i \(0.312143\pi\)
\(182\) −10.3279 6.25181i −0.0567468 0.0343506i
\(183\) 163.484 + 163.484i 0.893357 + 0.893357i
\(184\) 13.8828 + 8.01526i 0.0754502 + 0.0435612i
\(185\) −40.5307 7.18534i −0.219085 0.0388397i
\(186\) 169.117 + 292.919i 0.909231 + 1.57483i
\(187\) 7.47060 + 27.8807i 0.0399497 + 0.149094i
\(188\) 43.0259 + 43.0259i 0.228861 + 0.228861i
\(189\) 192.708 + 200.869i 1.01962 + 1.06280i
\(190\) 130.699 + 109.876i 0.687890 + 0.578294i
\(191\) −87.8707 + 152.197i −0.460056 + 0.796841i −0.998963 0.0455246i \(-0.985504\pi\)
0.538907 + 0.842365i \(0.318837\pi\)
\(192\) −39.2694 10.5222i −0.204528 0.0548032i
\(193\) −13.5073 + 50.4101i −0.0699862 + 0.261192i −0.992050 0.125846i \(-0.959835\pi\)
0.922064 + 0.387039i \(0.126502\pi\)
\(194\) −150.998 87.1790i −0.778343 0.449376i
\(195\) 2.67215 + 30.8719i 0.0137033 + 0.158317i
\(196\) 86.8287 45.4398i 0.443003 0.231836i
\(197\) −62.8178 + 62.8178i −0.318872 + 0.318872i −0.848334 0.529462i \(-0.822394\pi\)
0.529462 + 0.848334i \(0.322394\pi\)
\(198\) 21.8052 5.84269i 0.110127 0.0295085i
\(199\) 22.4632 12.9692i 0.112881 0.0651717i −0.442497 0.896770i \(-0.645907\pi\)
0.555377 + 0.831598i \(0.312574\pi\)
\(200\) −6.29320 + 70.4301i −0.0314660 + 0.352150i
\(201\) −173.616 + 300.712i −0.863762 + 1.49608i
\(202\) −50.4522 + 50.4522i −0.249763 + 0.249763i
\(203\) −51.3435 1.06460i −0.252924 0.00524432i
\(204\) 309.219i 1.51578i
\(205\) 112.979 241.699i 0.551115 1.17902i
\(206\) −102.220 177.051i −0.496215 0.859470i
\(207\) 92.1093 + 24.6806i 0.444973 + 0.119230i
\(208\) 4.71190 1.26255i 0.0226534 0.00606996i
\(209\) 22.9095i 0.109615i
\(210\) −225.615 111.217i −1.07436 0.529603i
\(211\) −223.675 −1.06007 −0.530036 0.847975i \(-0.677822\pi\)
−0.530036 + 0.847975i \(0.677822\pi\)
\(212\) 6.96552 + 25.9957i 0.0328562 + 0.122621i
\(213\) 15.6785 58.5131i 0.0736081 0.274709i
\(214\) 8.49836 4.90653i 0.0397119 0.0229277i
\(215\) −219.863 + 79.7931i −1.02262 + 0.371131i
\(216\) −112.475 −0.520717
\(217\) 288.659 158.771i 1.33022 0.731664i
\(218\) 48.8774 + 48.8774i 0.224208 + 0.224208i
\(219\) −242.400 139.950i −1.10685 0.639041i
\(220\) −7.77660 + 5.43452i −0.0353482 + 0.0247023i
\(221\) 18.5514 + 32.1320i 0.0839432 + 0.145394i
\(222\) 15.3132 + 57.1496i 0.0689784 + 0.257431i
\(223\) −131.856 131.856i −0.591282 0.591282i 0.346696 0.937978i \(-0.387304\pi\)
−0.937978 + 0.346696i \(0.887304\pi\)
\(224\) −11.0394 + 38.0280i −0.0492831 + 0.169768i
\(225\) 72.2744 + 414.371i 0.321219 + 1.84165i
\(226\) 8.29274 14.3634i 0.0366935 0.0635551i
\(227\) −366.184 98.1186i −1.61314 0.432241i −0.664166 0.747585i \(-0.731213\pi\)
−0.948977 + 0.315344i \(0.897880\pi\)
\(228\) 63.5211 237.064i 0.278601 1.03975i
\(229\) 39.8456 + 23.0049i 0.173998 + 0.100458i 0.584470 0.811415i \(-0.301303\pi\)
−0.410471 + 0.911873i \(0.634636\pi\)
\(230\) −39.9270 + 3.45593i −0.173596 + 0.0150258i
\(231\) −8.05726 32.7733i −0.0348799 0.141876i
\(232\) 14.6727 14.6727i 0.0632445 0.0632445i
\(233\) −100.854 + 27.0237i −0.432849 + 0.115981i −0.468663 0.883377i \(-0.655264\pi\)
0.0358143 + 0.999358i \(0.488598\pi\)
\(234\) 25.1302 14.5089i 0.107394 0.0620039i
\(235\) −149.784 26.5539i −0.637379 0.112995i
\(236\) −50.2432 + 87.0238i −0.212895 + 0.368745i
\(237\) 254.768 254.768i 1.07497 1.07497i
\(238\) −301.117 6.24360i −1.26520 0.0262336i
\(239\) 4.00351i 0.0167511i 0.999965 + 0.00837554i \(0.00266605\pi\)
−0.999965 + 0.00837554i \(0.997334\pi\)
\(240\) 95.5395 34.6734i 0.398081 0.144473i
\(241\) 148.899 + 257.901i 0.617839 + 1.07013i 0.989879 + 0.141912i \(0.0453249\pi\)
−0.372041 + 0.928216i \(0.621342\pi\)
\(242\) 164.060 + 43.9596i 0.677932 + 0.181651i
\(243\) 97.0348 26.0004i 0.399320 0.106998i
\(244\) 90.9914i 0.372915i
\(245\) −112.858 + 217.458i −0.460645 + 0.887585i
\(246\) −383.489 −1.55890
\(247\) 7.62184 + 28.4451i 0.0308577 + 0.115162i
\(248\) −34.4526 + 128.579i −0.138922 + 0.518463i
\(249\) −533.674 + 308.117i −2.14327 + 1.23742i
\(250\) −87.9630 153.338i −0.351852 0.613352i
\(251\) 300.624 1.19770 0.598852 0.800860i \(-0.295624\pi\)
0.598852 + 0.800860i \(0.295624\pi\)
\(252\) −4.88306 + 235.501i −0.0193772 + 0.934526i
\(253\) −3.80217 3.80217i −0.0150283 0.0150283i
\(254\) −139.160 80.3440i −0.547873 0.316315i
\(255\) 442.815 + 633.653i 1.73653 + 2.48491i
\(256\) −8.00000 13.8564i −0.0312500 0.0541266i
\(257\) −85.5296 319.201i −0.332800 1.24203i −0.906235 0.422775i \(-0.861056\pi\)
0.573435 0.819251i \(-0.305611\pi\)
\(258\) 237.723 + 237.723i 0.921405 + 0.921405i
\(259\) 55.9614 13.7580i 0.216067 0.0531198i
\(260\) −7.84763 + 9.33489i −0.0301832 + 0.0359034i
\(261\) 61.7175 106.898i 0.236465 0.409570i
\(262\) −34.2679 9.18206i −0.130794 0.0350460i
\(263\) 97.9751 365.648i 0.372529 1.39030i −0.484393 0.874851i \(-0.660959\pi\)
0.856922 0.515446i \(-0.172374\pi\)
\(264\) 11.8097 + 6.81836i 0.0447339 + 0.0258271i
\(265\) −51.5008 43.2956i −0.194343 0.163379i
\(266\) −229.570 66.6434i −0.863044 0.250539i
\(267\) 563.268 563.268i 2.10962 2.10962i
\(268\) −132.000 + 35.3692i −0.492536 + 0.131975i
\(269\) 125.485 72.4489i 0.466488 0.269327i −0.248280 0.968688i \(-0.579865\pi\)
0.714768 + 0.699361i \(0.246532\pi\)
\(270\) 230.484 161.069i 0.853644 0.596552i
\(271\) 165.311 286.326i 0.610002 1.05655i −0.381237 0.924477i \(-0.624502\pi\)
0.991239 0.132078i \(-0.0421648\pi\)
\(272\) 86.0518 86.0518i 0.316367 0.316367i
\(273\) −20.9076 38.0117i −0.0765846 0.139237i
\(274\) 96.7254i 0.353012i
\(275\) 8.15338 22.2729i 0.0296487 0.0809923i
\(276\) 28.8020 + 49.8866i 0.104355 + 0.180749i
\(277\) −75.9189 20.3424i −0.274075 0.0734383i 0.119163 0.992875i \(-0.461979\pi\)
−0.393239 + 0.919436i \(0.628645\pi\)
\(278\) −91.9409 + 24.6355i −0.330723 + 0.0886169i
\(279\) 791.842i 2.83814i
\(280\) −31.8358 93.7362i −0.113699 0.334772i
\(281\) −342.866 −1.22016 −0.610081 0.792339i \(-0.708863\pi\)
−0.610081 + 0.792339i \(0.708863\pi\)
\(282\) 56.5910 + 211.200i 0.200677 + 0.748938i
\(283\) −24.0385 + 89.7129i −0.0849417 + 0.317007i −0.995303 0.0968072i \(-0.969137\pi\)
0.910361 + 0.413814i \(0.135804\pi\)
\(284\) 20.6466 11.9203i 0.0726994 0.0419730i
\(285\) 209.319 + 576.758i 0.734451 + 2.02371i
\(286\) −1.63626 −0.00572118
\(287\) −7.74323 + 373.441i −0.0269799 + 1.30119i
\(288\) −67.3004 67.3004i −0.233682 0.233682i
\(289\) 551.324 + 318.307i 1.90770 + 1.10141i
\(290\) −9.05543 + 51.0794i −0.0312256 + 0.176136i
\(291\) −313.269 542.598i −1.07653 1.86460i
\(292\) −28.5107 106.403i −0.0976394 0.364395i
\(293\) −345.276 345.276i −1.17842 1.17842i −0.980147 0.198270i \(-0.936468\pi\)
−0.198270 0.980147i \(-0.563532\pi\)
\(294\) 351.851 + 14.5974i 1.19677 + 0.0496510i
\(295\) −21.6633 250.280i −0.0734350 0.848408i
\(296\) −11.6426 + 20.1655i −0.0393330 + 0.0681267i
\(297\) 36.4416 + 9.76451i 0.122699 + 0.0328771i
\(298\) −21.9683 + 81.9868i −0.0737191 + 0.275124i
\(299\) −5.98585 3.45593i −0.0200196 0.0115583i
\(300\) −146.126 + 207.870i −0.487087 + 0.692899i
\(301\) 236.294 226.694i 0.785029 0.753135i
\(302\) 47.8037 47.8037i 0.158290 0.158290i
\(303\) −247.654 + 66.3586i −0.817339 + 0.219005i
\(304\) 83.6492 48.2949i 0.275162 0.158865i
\(305\) −130.304 186.460i −0.427225 0.611345i
\(306\) 361.957 626.929i 1.18287 2.04879i
\(307\) −344.100 + 344.100i −1.12085 + 1.12085i −0.129233 + 0.991614i \(0.541252\pi\)
−0.991614 + 0.129233i \(0.958748\pi\)
\(308\) 6.87816 11.3626i 0.0223317 0.0368917i
\(309\) 734.638i 2.37747i
\(310\) −113.530 312.822i −0.366227 1.00910i
\(311\) 165.159 + 286.064i 0.531059 + 0.919821i 0.999343 + 0.0362433i \(0.0115391\pi\)
−0.468284 + 0.883578i \(0.655128\pi\)
\(312\) 16.9318 + 4.53685i 0.0542685 + 0.0145412i
\(313\) −82.7090 + 22.1618i −0.264246 + 0.0708045i −0.388509 0.921445i \(-0.627010\pi\)
0.124263 + 0.992249i \(0.460343\pi\)
\(314\) 147.910i 0.471050i
\(315\) −327.241 489.582i −1.03886 1.55423i
\(316\) 141.798 0.448727
\(317\) −45.6055 170.202i −0.143866 0.536915i −0.999803 0.0198354i \(-0.993686\pi\)
0.855937 0.517080i \(-0.172981\pi\)
\(318\) −25.0299 + 93.4129i −0.0787104 + 0.293751i
\(319\) −6.02775 + 3.48012i −0.0188958 + 0.0109095i
\(320\) 36.2367 + 16.9383i 0.113240 + 0.0529321i
\(321\) 35.2623 0.109851
\(322\) 49.1610 27.0401i 0.152674 0.0839754i
\(323\) 519.483 + 519.483i 1.60831 + 1.60831i
\(324\) −87.7419 50.6578i −0.270808 0.156351i
\(325\) 2.71344 30.3673i 0.00834903 0.0934378i
\(326\) 29.0689 + 50.3489i 0.0891685 + 0.154444i
\(327\) 64.2873 + 239.924i 0.196597 + 0.733711i
\(328\) −106.720 106.720i −0.325367 0.325367i
\(329\) 206.809 50.8437i 0.628599 0.154540i
\(330\) −33.9648 + 2.93987i −0.102924 + 0.00890869i
\(331\) −160.736 + 278.404i −0.485608 + 0.841098i −0.999863 0.0165391i \(-0.994735\pi\)
0.514255 + 0.857637i \(0.328069\pi\)
\(332\) −234.260 62.7698i −0.705603 0.189066i
\(333\) −35.8498 + 133.793i −0.107657 + 0.401782i
\(334\) 45.7874 + 26.4354i 0.137088 + 0.0791479i
\(335\) 219.844 261.509i 0.656252 0.780622i
\(336\) −102.679 + 98.5079i −0.305594 + 0.293178i
\(337\) −77.9872 + 77.9872i −0.231416 + 0.231416i −0.813284 0.581868i \(-0.802322\pi\)
0.581868 + 0.813284i \(0.302322\pi\)
\(338\) 228.827 61.3139i 0.677002 0.181402i
\(339\) 51.6137 29.7992i 0.152253 0.0879031i
\(340\) −53.1078 + 299.568i −0.156199 + 0.881082i
\(341\) 22.3252 38.6684i 0.0654698 0.113397i
\(342\) 406.283 406.283i 1.18796 1.18796i
\(343\) 21.3193 342.337i 0.0621555 0.998066i
\(344\) 132.311i 0.384624i
\(345\) −130.461 60.9821i −0.378148 0.176760i
\(346\) 177.508 + 307.453i 0.513028 + 0.888591i
\(347\) 325.624 + 87.2508i 0.938398 + 0.251443i 0.695432 0.718592i \(-0.255213\pi\)
0.242966 + 0.970035i \(0.421880\pi\)
\(348\) 72.0237 19.2987i 0.206965 0.0554560i
\(349\) 287.505i 0.823797i 0.911230 + 0.411899i \(0.135134\pi\)
−0.911230 + 0.411899i \(0.864866\pi\)
\(350\) 199.473 + 146.495i 0.569922 + 0.418556i
\(351\) 48.4957 0.138164
\(352\) 1.38904 + 5.18397i 0.00394614 + 0.0147272i
\(353\) 42.9263 160.203i 0.121604 0.453834i −0.878092 0.478493i \(-0.841183\pi\)
0.999696 + 0.0246589i \(0.00784998\pi\)
\(354\) −312.712 + 180.544i −0.883366 + 0.510012i
\(355\) −25.2387 + 53.9941i −0.0710950 + 0.152096i
\(356\) 313.501 0.880621
\(357\) −925.851 560.447i −2.59342 1.56988i
\(358\) 54.0621 + 54.0621i 0.151012 + 0.151012i
\(359\) −324.332 187.253i −0.903432 0.521597i −0.0251201 0.999684i \(-0.507997\pi\)
−0.878312 + 0.478088i \(0.841330\pi\)
\(360\) 234.289 + 41.5351i 0.650804 + 0.115375i
\(361\) 111.049 + 192.343i 0.307616 + 0.532806i
\(362\) 73.7371 + 275.191i 0.203694 + 0.760195i
\(363\) 431.567 + 431.567i 1.18889 + 1.18889i
\(364\) 4.75986 16.3965i 0.0130765 0.0450454i
\(365\) 210.799 + 177.214i 0.577531 + 0.485518i
\(366\) −163.484 + 283.163i −0.446678 + 0.773670i
\(367\) −31.5361 8.45008i −0.0859295 0.0230247i 0.215598 0.976482i \(-0.430830\pi\)
−0.301528 + 0.953457i \(0.597497\pi\)
\(368\) −5.86758 + 21.8981i −0.0159445 + 0.0595057i
\(369\) −777.508 448.895i −2.10707 1.21652i
\(370\) −5.01992 57.9960i −0.0135673 0.156746i
\(371\) 90.4599 + 26.2602i 0.243827 + 0.0707823i
\(372\) −338.234 + 338.234i −0.909231 + 0.909231i
\(373\) −711.719 + 190.704i −1.90809 + 0.511272i −0.913580 + 0.406658i \(0.866694\pi\)
−0.994513 + 0.104614i \(0.966639\pi\)
\(374\) −35.3512 + 20.4101i −0.0945221 + 0.0545723i
\(375\) 1.76351 635.227i 0.00470268 1.69394i
\(376\) −43.0259 + 74.5231i −0.114431 + 0.198200i
\(377\) −6.32643 + 6.32643i −0.0167810 + 0.0167810i
\(378\) −203.856 + 336.767i −0.539301 + 0.890919i
\(379\) 287.166i 0.757693i 0.925460 + 0.378846i \(0.123679\pi\)
−0.925460 + 0.378846i \(0.876321\pi\)
\(380\) −102.254 + 218.756i −0.269089 + 0.575672i
\(381\) −288.708 500.057i −0.757764 1.31249i
\(382\) −240.067 64.3258i −0.628448 0.168392i
\(383\) 441.247 118.232i 1.15208 0.308699i 0.368283 0.929714i \(-0.379946\pi\)
0.783799 + 0.621014i \(0.213279\pi\)
\(384\) 57.4944i 0.149725i
\(385\) 2.17703 + 33.1342i 0.00565464 + 0.0860629i
\(386\) −73.8055 −0.191206
\(387\) 203.706 + 760.240i 0.526371 + 1.96444i
\(388\) 63.8195 238.178i 0.164483 0.613860i
\(389\) 470.416 271.595i 1.20930 0.698187i 0.246690 0.969094i \(-0.420657\pi\)
0.962605 + 0.270907i \(0.0873237\pi\)
\(390\) −41.1937 + 14.9501i −0.105625 + 0.0383336i
\(391\) −172.432 −0.441002
\(392\) 93.8535 + 101.978i 0.239422 + 0.260148i
\(393\) −90.1435 90.1435i −0.229373 0.229373i
\(394\) −108.804 62.8178i −0.276151 0.159436i
\(395\) −290.573 + 203.061i −0.735628 + 0.514078i
\(396\) 15.9625 + 27.6479i 0.0403094 + 0.0698179i
\(397\) 165.368 + 617.160i 0.416543 + 1.55456i 0.781725 + 0.623623i \(0.214340\pi\)
−0.365182 + 0.930936i \(0.618993\pi\)
\(398\) 25.9383 + 25.9383i 0.0651717 + 0.0651717i
\(399\) −594.678 619.861i −1.49042 1.55354i
\(400\) −98.5127 + 17.1825i −0.246282 + 0.0429563i
\(401\) −223.636 + 387.349i −0.557696 + 0.965958i 0.439992 + 0.898002i \(0.354981\pi\)
−0.997688 + 0.0679566i \(0.978352\pi\)
\(402\) −474.328 127.096i −1.17992 0.316159i
\(403\) 14.8549 55.4393i 0.0368608 0.137566i
\(404\) −87.3858 50.4522i −0.216302 0.124882i
\(405\) 252.345 21.8421i 0.623075 0.0539311i
\(406\) −17.3388 70.5262i −0.0427063 0.173710i
\(407\) 5.52284 5.52284i 0.0135696 0.0135696i
\(408\) 422.401 113.182i 1.03530 0.277407i
\(409\) −19.9762 + 11.5333i −0.0488417 + 0.0281988i −0.524222 0.851582i \(-0.675644\pi\)
0.475380 + 0.879780i \(0.342310\pi\)
\(410\) 371.520 + 65.8636i 0.906147 + 0.160643i
\(411\) −173.787 + 301.007i −0.422839 + 0.732378i
\(412\) 204.441 204.441i 0.496215 0.496215i
\(413\) 169.499 + 308.163i 0.410410 + 0.746158i
\(414\) 134.857i 0.325743i
\(415\) 569.937 206.843i 1.37334 0.498417i
\(416\) 3.44935 + 5.97446i 0.00829172 + 0.0143617i
\(417\) −330.381 88.5253i −0.792280 0.212291i
\(418\) −31.2949 + 8.38545i −0.0748682 + 0.0200609i
\(419\) 502.792i 1.19998i −0.800007 0.599990i \(-0.795171\pi\)
0.800007 0.599990i \(-0.204829\pi\)
\(420\) 69.3436 348.905i 0.165104 0.830725i
\(421\) 48.4897 0.115177 0.0575887 0.998340i \(-0.481659\pi\)
0.0575887 + 0.998340i \(0.481659\pi\)
\(422\) −81.8708 305.546i −0.194007 0.724043i
\(423\) −132.486 + 494.443i −0.313205 + 1.16890i
\(424\) −32.9612 + 19.0302i −0.0777387 + 0.0448824i
\(425\) −320.166 689.929i −0.753332 1.62336i
\(426\) 85.6691 0.201101
\(427\) 272.443 + 164.918i 0.638039 + 0.386225i
\(428\) 9.81306 + 9.81306i 0.0229277 + 0.0229277i
\(429\) −5.09200 2.93987i −0.0118695 0.00685284i
\(430\) −189.475 271.132i −0.440639 0.630539i
\(431\) 185.726 + 321.686i 0.430918 + 0.746372i 0.996953 0.0780097i \(-0.0248565\pi\)
−0.566035 + 0.824381i \(0.691523\pi\)
\(432\) −41.1686 153.643i −0.0952977 0.355656i
\(433\) 449.707 + 449.707i 1.03858 + 1.03858i 0.999225 + 0.0393595i \(0.0125318\pi\)
0.0393595 + 0.999225i \(0.487468\pi\)
\(434\) 322.542 + 336.201i 0.743184 + 0.774656i
\(435\) −119.955 + 142.688i −0.275758 + 0.328019i
\(436\) −48.8774 + 84.6582i −0.112104 + 0.194170i
\(437\) −132.196 35.4217i −0.302507 0.0810566i
\(438\) 102.450 382.350i 0.233905 0.872946i
\(439\) 508.790 + 293.750i 1.15897 + 0.669134i 0.951058 0.309012i \(-0.0999984\pi\)
0.207917 + 0.978147i \(0.433332\pi\)
\(440\) −10.2701 8.63386i −0.0233412 0.0196224i
\(441\) 696.276 + 441.456i 1.57886 + 1.00103i
\(442\) −37.1029 + 37.1029i −0.0839432 + 0.0839432i
\(443\) −4.58686 + 1.22904i −0.0103541 + 0.00277437i −0.263992 0.964525i \(-0.585039\pi\)
0.253638 + 0.967299i \(0.418373\pi\)
\(444\) −72.4628 + 41.8364i −0.163205 + 0.0942262i
\(445\) −642.428 + 448.948i −1.44366 + 1.00887i
\(446\) 131.856 228.381i 0.295641 0.512065i
\(447\) −215.671 + 215.671i −0.482485 + 0.482485i
\(448\) −55.9880 1.16090i −0.124973 0.00259130i
\(449\) 40.6375i 0.0905067i 0.998976 + 0.0452533i \(0.0144095\pi\)
−0.998976 + 0.0452533i \(0.985590\pi\)
\(450\) −539.588 + 250.399i −1.19908 + 0.556442i
\(451\) 25.3123 + 43.8421i 0.0561248 + 0.0972109i
\(452\) 22.6562 + 6.07071i 0.0501243 + 0.0134308i
\(453\) 234.653 62.8750i 0.517997 0.138797i
\(454\) 536.130i 1.18090i
\(455\) 13.7266 + 40.4162i 0.0301684 + 0.0888268i
\(456\) 347.086 0.761153
\(457\) 85.0810 + 317.526i 0.186173 + 0.694806i 0.994376 + 0.105903i \(0.0337734\pi\)
−0.808204 + 0.588903i \(0.799560\pi\)
\(458\) −16.8407 + 62.8505i −0.0367702 + 0.137228i
\(459\) 1047.75 604.916i 2.28267 1.31790i
\(460\) −19.3352 53.2763i −0.0420330 0.115818i
\(461\) 64.7559 0.140468 0.0702341 0.997531i \(-0.477625\pi\)
0.0702341 + 0.997531i \(0.477625\pi\)
\(462\) 41.8199 23.0023i 0.0905194 0.0497884i
\(463\) −604.400 604.400i −1.30540 1.30540i −0.924698 0.380701i \(-0.875683\pi\)
−0.380701 0.924698i \(-0.624317\pi\)
\(464\) 25.4139 + 14.6727i 0.0547713 + 0.0316222i
\(465\) 208.745 1177.48i 0.448913 2.53221i
\(466\) −73.8301 127.877i −0.158434 0.274415i
\(467\) −92.4995 345.213i −0.198072 0.739214i −0.991450 0.130485i \(-0.958347\pi\)
0.793379 0.608729i \(-0.208320\pi\)
\(468\) 29.0178 + 29.0178i 0.0620039 + 0.0620039i
\(469\) −133.343 + 459.334i −0.284314 + 0.979389i
\(470\) −18.5514 214.328i −0.0394712 0.456017i
\(471\) 265.750 460.292i 0.564224 0.977265i
\(472\) −137.267 36.7806i −0.290820 0.0779250i
\(473\) 11.4866 42.8684i 0.0242845 0.0906309i
\(474\) 441.272 + 254.768i 0.930953 + 0.537486i
\(475\) −103.728 594.707i −0.218376 1.25202i
\(476\) −101.687 413.618i −0.213629 0.868946i
\(477\) −160.092 + 160.092i −0.335623 + 0.335623i
\(478\) −5.46889 + 1.46539i −0.0114412 + 0.00306566i
\(479\) 508.668 293.679i 1.06194 0.613109i 0.135969 0.990713i \(-0.456585\pi\)
0.925967 + 0.377604i \(0.123252\pi\)
\(480\) 82.3347 + 117.818i 0.171531 + 0.245454i
\(481\) 5.01992 8.69475i 0.0104364 0.0180764i
\(482\) −297.798 + 297.798i −0.617839 + 0.617839i
\(483\) 201.571 + 4.17954i 0.417331 + 0.00865329i
\(484\) 240.200i 0.496281i
\(485\) 210.302 + 579.467i 0.433612 + 1.19478i
\(486\) 71.0344 + 123.035i 0.146161 + 0.253159i
\(487\) −549.440 147.222i −1.12821 0.302304i −0.354010 0.935242i \(-0.615182\pi\)
−0.774202 + 0.632938i \(0.781849\pi\)
\(488\) −124.297 + 33.3052i −0.254706 + 0.0682483i
\(489\) 208.913i 0.427224i
\(490\) −338.362 74.5716i −0.690535 0.152187i
\(491\) 485.037 0.987856 0.493928 0.869503i \(-0.335561\pi\)
0.493928 + 0.869503i \(0.335561\pi\)
\(492\) −140.367 523.856i −0.285298 1.06475i
\(493\) −57.7686 + 215.595i −0.117178 + 0.437313i
\(494\) −36.0669 + 20.8233i −0.0730100 + 0.0421523i
\(495\) −72.3035 33.7972i −0.146068 0.0682771i
\(496\) −188.253 −0.379542
\(497\) 1.72979 83.4244i 0.00348046 0.167856i
\(498\) −616.234 616.234i −1.23742 1.23742i
\(499\) −500.231 288.808i −1.00247 0.578774i −0.0934891 0.995620i \(-0.529802\pi\)
−0.908977 + 0.416846i \(0.863135\pi\)
\(500\) 177.267 176.285i 0.354534 0.352571i
\(501\) 94.9930 + 164.533i 0.189607 + 0.328409i
\(502\) 110.036 + 410.660i 0.219195 + 0.818047i
\(503\) −417.802 417.802i −0.830620 0.830620i 0.156981 0.987602i \(-0.449824\pi\)
−0.987602 + 0.156981i \(0.949824\pi\)
\(504\) −323.487 + 79.5288i −0.641840 + 0.157795i
\(505\) 251.321 21.7534i 0.497666 0.0430761i
\(506\) 3.80217 6.58555i 0.00751417 0.0130149i
\(507\) 822.266 + 220.326i 1.62183 + 0.434567i
\(508\) 58.8159 219.504i 0.115779 0.432094i
\(509\) −136.905 79.0420i −0.268968 0.155289i 0.359451 0.933164i \(-0.382964\pi\)
−0.628419 + 0.777875i \(0.716297\pi\)
\(510\) −703.505 + 836.830i −1.37942 + 1.64084i
\(511\) −370.263 107.486i −0.724586 0.210345i
\(512\) 16.0000 16.0000i 0.0312500 0.0312500i
\(513\) 927.523 248.529i 1.80804 0.484462i
\(514\) 404.730 233.671i 0.787413 0.454613i
\(515\) −126.173 + 711.709i −0.244996 + 1.38196i
\(516\) −237.723 + 411.748i −0.460703 + 0.797960i
\(517\) 20.4101 20.4101i 0.0394779 0.0394779i
\(518\) 39.2771 + 71.4089i 0.0758245 + 0.137855i
\(519\) 1275.71i 2.45802i
\(520\) −15.6241 7.30326i −0.0300464 0.0140447i
\(521\) 58.2493 + 100.891i 0.111803 + 0.193648i 0.916497 0.400041i \(-0.131004\pi\)
−0.804694 + 0.593689i \(0.797671\pi\)
\(522\) 168.615 + 45.1803i 0.323018 + 0.0865523i
\(523\) 244.396 65.4858i 0.467297 0.125212i −0.0174845 0.999847i \(-0.505566\pi\)
0.484782 + 0.874635i \(0.338899\pi\)
\(524\) 50.1717i 0.0957475i
\(525\) 357.548 + 814.281i 0.681043 + 1.55101i
\(526\) 535.346 1.01777
\(527\) −370.589 1383.06i −0.703205 2.62440i
\(528\) −4.99139 + 18.6281i −0.00945338 + 0.0352805i
\(529\) −430.309 + 248.439i −0.813438 + 0.469639i
\(530\) 40.2922 86.1986i 0.0760231 0.162639i
\(531\) −845.347 −1.59199
\(532\) 7.00819 337.991i 0.0131733 0.635322i
\(533\) 46.0145 + 46.0145i 0.0863311 + 0.0863311i
\(534\) 975.608 + 563.268i 1.82698 + 1.05481i
\(535\) −34.1617 6.05623i −0.0638537 0.0113201i
\(536\) −96.6305 167.369i −0.180281 0.312256i
\(537\) 71.1067 + 265.374i 0.132415 + 0.494178i
\(538\) 144.898 + 144.898i 0.269327 + 0.269327i
\(539\) −21.5551 41.1886i −0.0399910 0.0764167i
\(540\) 304.387 + 255.892i 0.563680 + 0.473873i
\(541\) 420.568 728.445i 0.777390 1.34648i −0.156052 0.987749i \(-0.549877\pi\)
0.933442 0.358730i \(-0.116790\pi\)
\(542\) 451.637 + 121.016i 0.833279 + 0.223276i
\(543\) −264.967 + 988.871i −0.487969 + 1.82112i
\(544\) 149.046 + 86.0518i 0.273982 + 0.158183i
\(545\) −21.0744 243.477i −0.0386687 0.446746i
\(546\) 44.2722 42.4736i 0.0810846 0.0777904i
\(547\) 228.297 228.297i 0.417362 0.417362i −0.466931 0.884294i \(-0.654640\pi\)
0.884294 + 0.466931i \(0.154640\pi\)
\(548\) −132.129 + 35.4040i −0.241112 + 0.0646058i
\(549\) −662.916 + 382.734i −1.20750 + 0.697148i
\(550\) 33.4097 + 2.98529i 0.0607449 + 0.00542779i
\(551\) −88.5771 + 153.420i −0.160757 + 0.278439i
\(552\) −57.6041 + 57.6041i −0.104355 + 0.104355i
\(553\) 257.003 424.565i 0.464743 0.767749i
\(554\) 111.153i 0.200637i
\(555\) 88.5796 189.502i 0.159603 0.341444i
\(556\) −67.3054 116.576i −0.121053 0.209670i
\(557\) 925.810 + 248.070i 1.66214 + 0.445368i 0.962974 0.269595i \(-0.0868900\pi\)
0.699162 + 0.714963i \(0.253557\pi\)
\(558\) −1081.68 + 289.834i −1.93849 + 0.519416i
\(559\) 57.0482i 0.102054i
\(560\) 116.393 77.7984i 0.207845 0.138926i
\(561\) −146.683 −0.261467
\(562\) −125.497 468.363i −0.223305 0.833386i
\(563\) −240.016 + 895.754i −0.426317 + 1.59104i 0.334713 + 0.942320i \(0.391361\pi\)
−0.761030 + 0.648717i \(0.775306\pi\)
\(564\) −267.791 + 154.609i −0.474807 + 0.274130i
\(565\) −55.1207 + 20.0046i −0.0975588 + 0.0354063i
\(566\) −131.349 −0.232065
\(567\) −310.706 + 170.898i −0.547982 + 0.301407i
\(568\) 23.8407 + 23.8407i 0.0419730 + 0.0419730i
\(569\) −391.524 226.046i −0.688091 0.397270i 0.114805 0.993388i \(-0.463376\pi\)
−0.802897 + 0.596118i \(0.796709\pi\)
\(570\) −711.250 + 497.043i −1.24781 + 0.872005i
\(571\) −195.371 338.393i −0.342157 0.592633i 0.642676 0.766138i \(-0.277824\pi\)
−0.984833 + 0.173505i \(0.944491\pi\)
\(572\) −0.598912 2.23517i −0.00104705 0.00390764i
\(573\) −631.510 631.510i −1.10211 1.10211i
\(574\) −512.964 + 126.111i −0.893665 + 0.219706i
\(575\) 115.916 + 81.4853i 0.201593 + 0.141714i
\(576\) 67.3004 116.568i 0.116841 0.202374i
\(577\) 438.134 + 117.398i 0.759330 + 0.203462i 0.617653 0.786451i \(-0.288084\pi\)
0.141677 + 0.989913i \(0.454750\pi\)
\(578\) −233.017 + 869.631i −0.403144 + 1.50455i
\(579\) −229.681 132.606i −0.396686 0.229027i
\(580\) −73.0903 + 6.32643i −0.126018 + 0.0109076i
\(581\) −612.530 + 587.645i −1.05427 + 1.01144i
\(582\) 626.539 626.539i 1.07653 1.07653i
\(583\) 12.3315 3.30421i 0.0211518 0.00566760i
\(584\) 134.914 77.8927i 0.231017 0.133378i
\(585\) −101.018 17.9087i −0.172681 0.0306131i
\(586\) 345.276 598.036i 0.589209 1.02054i
\(587\) −132.759 + 132.759i −0.226165 + 0.226165i −0.811088 0.584924i \(-0.801124\pi\)
0.584924 + 0.811088i \(0.301124\pi\)
\(588\) 108.846 + 485.980i 0.185112 + 0.826497i
\(589\) 1136.45i 1.92946i
\(590\) 333.960 121.202i 0.566034 0.205427i
\(591\) −225.730 390.975i −0.381946 0.661549i
\(592\) −31.8081 8.52295i −0.0537299 0.0143969i
\(593\) −132.343 + 35.4612i −0.223176 + 0.0597997i −0.368674 0.929559i \(-0.620188\pi\)
0.145498 + 0.989358i \(0.453521\pi\)
\(594\) 53.3543i 0.0898220i
\(595\) 800.699 + 701.968i 1.34571 + 1.17978i
\(596\) −120.037 −0.201404
\(597\) 34.1161 + 127.323i 0.0571458 + 0.213271i
\(598\) 2.52992 9.44178i 0.00423063 0.0157889i
\(599\) −533.617 + 308.084i −0.890847 + 0.514331i −0.874220 0.485531i \(-0.838626\pi\)
−0.0166277 + 0.999862i \(0.505293\pi\)
\(600\) −337.441 123.526i −0.562402 0.205877i
\(601\) −660.812 −1.09952 −0.549760 0.835322i \(-0.685281\pi\)
−0.549760 + 0.835322i \(0.685281\pi\)
\(602\) 396.159 + 239.808i 0.658071 + 0.398351i
\(603\) −812.909 812.909i −1.34811 1.34811i
\(604\) 82.7984 + 47.8037i 0.137083 + 0.0791451i
\(605\) −343.977 492.219i −0.568557 0.813585i
\(606\) −181.295 314.012i −0.299167 0.518172i
\(607\) −100.052 373.398i −0.164830 0.615153i −0.998062 0.0622299i \(-0.980179\pi\)
0.833232 0.552924i \(-0.186488\pi\)
\(608\) 96.5897 + 96.5897i 0.158865 + 0.158865i
\(609\) 72.7567 250.628i 0.119469 0.411541i
\(610\) 207.015 246.247i 0.339368 0.403684i
\(611\) 18.5514 32.1320i 0.0303624 0.0525893i
\(612\) 988.886 + 264.971i 1.61583 + 0.432959i
\(613\) −13.3884 + 49.9662i −0.0218408 + 0.0815109i −0.975986 0.217833i \(-0.930101\pi\)
0.954145 + 0.299344i \(0.0967678\pi\)
\(614\) −595.999 344.100i −0.970683 0.560424i
\(615\) 1037.83 + 872.477i 1.68752 + 1.41866i
\(616\) 18.0392 + 5.23673i 0.0292845 + 0.00850119i
\(617\) −616.887 + 616.887i −0.999816 + 0.999816i −1.00000 0.000183933i \(-0.999941\pi\)
0.000183933 1.00000i \(0.499941\pi\)
\(618\) 1003.53 268.896i 1.62384 0.435107i
\(619\) −449.823 + 259.705i −0.726693 + 0.419556i −0.817211 0.576339i \(-0.804481\pi\)
0.0905183 + 0.995895i \(0.471148\pi\)
\(620\) 385.768 269.586i 0.622207 0.434817i
\(621\) −112.689 + 195.184i −0.181464 + 0.314305i
\(622\) −330.319 + 330.319i −0.531059 + 0.531059i
\(623\) 568.208 938.672i 0.912051 1.50670i
\(624\) 24.7898i 0.0397273i
\(625\) −110.808 + 615.099i −0.177292 + 0.984158i
\(626\) −60.5472 104.871i −0.0967208 0.167525i
\(627\) −112.455 30.1323i −0.179354 0.0480579i
\(628\) 202.048 54.1387i 0.321733 0.0862081i
\(629\) 250.466i 0.398197i
\(630\) 549.003 626.219i 0.871433 0.993999i
\(631\) −427.140 −0.676925 −0.338463 0.940980i \(-0.609907\pi\)
−0.338463 + 0.940980i \(0.609907\pi\)
\(632\) 51.9016 + 193.699i 0.0821228 + 0.306486i
\(633\) 294.195 1097.95i 0.464763 1.73452i
\(634\) 215.808 124.597i 0.340390 0.196525i
\(635\) 193.814 + 534.036i 0.305218 + 0.841001i
\(636\) −136.766 −0.215041
\(637\) −40.4667 43.9698i −0.0635271 0.0690264i
\(638\) −6.96025 6.96025i −0.0109095 0.0109095i
\(639\) 173.691 + 100.280i 0.271816 + 0.156933i
\(640\) −9.87457 + 55.7000i −0.0154290 + 0.0870313i
\(641\) −135.063 233.937i −0.210707 0.364956i 0.741229 0.671252i \(-0.234243\pi\)
−0.951936 + 0.306297i \(0.900910\pi\)
\(642\) 12.9069 + 48.1692i 0.0201042 + 0.0750298i
\(643\) 192.668 + 192.668i 0.299639 + 0.299639i 0.840872 0.541234i \(-0.182043\pi\)
−0.541234 + 0.840872i \(0.682043\pi\)
\(644\) 54.9316 + 57.2579i 0.0852976 + 0.0889097i
\(645\) −102.499 1184.19i −0.158913 1.83595i
\(646\) −519.483 + 899.770i −0.804153 + 1.39283i
\(647\) −237.128 63.5381i −0.366503 0.0982042i 0.0708670 0.997486i \(-0.477423\pi\)
−0.437370 + 0.899282i \(0.644090\pi\)
\(648\) 37.0841 138.400i 0.0572285 0.213580i
\(649\) 41.2812 + 23.8337i 0.0636074 + 0.0367237i
\(650\) 42.4757 7.40857i 0.0653472 0.0113978i
\(651\) 399.691 + 1625.76i 0.613964 + 2.49733i
\(652\) −58.1379 + 58.1379i −0.0891685 + 0.0891685i
\(653\) 440.504 118.033i 0.674585 0.180755i 0.0947659 0.995500i \(-0.469790\pi\)
0.579819 + 0.814745i \(0.303123\pi\)
\(654\) −304.211 + 175.636i −0.465154 + 0.268557i
\(655\) 71.8481 + 102.812i 0.109692 + 0.156965i
\(656\) 106.720 184.845i 0.162683 0.281776i
\(657\) 655.276 655.276i 0.997376 0.997376i
\(658\) 145.151 + 263.896i 0.220595 + 0.401058i
\(659\) 973.026i 1.47652i 0.674517 + 0.738259i \(0.264352\pi\)
−0.674517 + 0.738259i \(0.735648\pi\)
\(660\) −16.4479 45.3207i −0.0249211 0.0686678i
\(661\) 152.550 + 264.224i 0.230787 + 0.399734i 0.958040 0.286635i \(-0.0925367\pi\)
−0.727253 + 0.686369i \(0.759203\pi\)
\(662\) −439.140 117.667i −0.663353 0.177745i
\(663\) −182.126 + 48.8006i −0.274700 + 0.0736057i
\(664\) 342.981i 0.516537i
\(665\) 469.658 + 702.650i 0.706252 + 1.05662i
\(666\) −195.887 −0.294125
\(667\) −10.7617 40.1631i −0.0161344 0.0602145i
\(668\) −19.3520 + 72.2228i −0.0289701 + 0.108118i
\(669\) 820.666 473.811i 1.22670 0.708238i
\(670\) 437.696 + 204.594i 0.653277 + 0.305365i
\(671\) 43.1633 0.0643268
\(672\) −172.148 104.206i −0.256172 0.155069i
\(673\) 567.081 + 567.081i 0.842616 + 0.842616i 0.989198 0.146582i \(-0.0468273\pi\)
−0.146582 + 0.989198i \(0.546827\pi\)
\(674\) −135.078 77.9872i −0.200412 0.115708i
\(675\) −990.201 88.4783i −1.46696 0.131079i
\(676\) 167.513 + 290.141i 0.247800 + 0.429202i
\(677\) 103.404 + 385.908i 0.152738 + 0.570027i 0.999288 + 0.0377179i \(0.0120088\pi\)
−0.846550 + 0.532309i \(0.821324\pi\)
\(678\) 59.5983 + 59.5983i 0.0879031 + 0.0879031i
\(679\) −597.471 622.773i −0.879928 0.917191i
\(680\) −428.656 + 37.1029i −0.630377 + 0.0545631i
\(681\) 963.266 1668.42i 1.41449 2.44996i
\(682\) 60.9936 + 16.3432i 0.0894334 + 0.0239636i
\(683\) 246.473 919.851i 0.360869 1.34678i −0.512067 0.858945i \(-0.671120\pi\)
0.872936 0.487835i \(-0.162213\pi\)
\(684\) 703.702 + 406.283i 1.02880 + 0.593980i
\(685\) 220.060 261.765i 0.321256 0.382139i
\(686\) 475.444 96.1812i 0.693067 0.140206i
\(687\) −165.332 + 165.332i −0.240657 + 0.240657i
\(688\) −180.740 + 48.4290i −0.262703 + 0.0703910i
\(689\) 14.2119 8.20522i 0.0206268 0.0119089i
\(690\) 35.5510 200.534i 0.0515232 0.290629i
\(691\) 235.417 407.754i 0.340690 0.590093i −0.643871 0.765134i \(-0.722673\pi\)
0.984561 + 0.175042i \(0.0560060\pi\)
\(692\) −355.016 + 355.016i −0.513028 + 0.513028i
\(693\) 111.714 + 2.31636i 0.161203 + 0.00334251i
\(694\) 476.747i 0.686955i
\(695\) 304.865 + 142.505i 0.438655 + 0.205043i
\(696\) 52.7250 + 91.3224i 0.0757543 + 0.131210i
\(697\) 1568.11 + 420.173i 2.24980 + 0.602831i
\(698\) −392.740 + 105.234i −0.562664 + 0.150765i
\(699\) 530.602i 0.759088i
\(700\) −127.103 + 326.105i −0.181576 + 0.465865i
\(701\) −1335.50 −1.90514 −0.952569 0.304322i \(-0.901570\pi\)
−0.952569 + 0.304322i \(0.901570\pi\)
\(702\) 17.7506 + 66.2463i 0.0252858 + 0.0943679i
\(703\) 51.4518 192.021i 0.0731890 0.273145i
\(704\) −6.57302 + 3.79493i −0.00933667 + 0.00539053i
\(705\) 327.352 700.316i 0.464329 0.993356i
\(706\) 234.554 0.332229
\(707\) −309.445 + 170.204i −0.437688 + 0.240742i
\(708\) −361.088 361.088i −0.510012 0.510012i
\(709\) 1150.06 + 663.986i 1.62208 + 0.936510i 0.986362 + 0.164592i \(0.0526307\pi\)
0.635722 + 0.771918i \(0.280703\pi\)
\(710\) −82.9954 14.7135i −0.116895 0.0207233i
\(711\) 596.440 + 1033.06i 0.838875 + 1.45297i
\(712\) 114.749 + 428.250i 0.161165 + 0.601475i
\(713\) 188.612 + 188.612i 0.264532 + 0.264532i
\(714\) 426.700 1469.87i 0.597618 2.05865i
\(715\) 4.42816 + 3.72265i 0.00619323 + 0.00520651i
\(716\) −54.0621 + 93.6384i −0.0755058 + 0.130780i
\(717\) −19.6519 5.26572i −0.0274086 0.00734410i
\(718\) 137.079 511.585i 0.190918 0.712515i
\(719\) 244.147 + 140.958i 0.339564 + 0.196048i 0.660079 0.751196i \(-0.270523\pi\)
−0.320515 + 0.947243i \(0.603856\pi\)
\(720\) 29.0178 + 335.248i 0.0403026 + 0.465623i
\(721\) −241.588 982.668i −0.335073 1.36292i
\(722\) −222.098 + 222.098i −0.307616 + 0.307616i
\(723\) −1461.80 + 391.687i −2.02185 + 0.541753i
\(724\) −348.928 + 201.453i −0.481944 + 0.278251i
\(725\) 140.717 117.633i 0.194093 0.162252i
\(726\) −431.567 + 747.497i −0.594445 + 1.02961i
\(727\) 830.098 830.098i 1.14181 1.14181i 0.153694 0.988118i \(-0.450883\pi\)
0.988118 0.153694i \(-0.0491171\pi\)
\(728\) 24.1403 + 0.500544i 0.0331597 + 0.000687561i
\(729\) 966.430i 1.32569i
\(730\) −164.921 + 352.821i −0.225919 + 0.483317i
\(731\) −711.598 1232.52i −0.973458 1.68608i
\(732\) −446.647 119.679i −0.610174 0.163496i
\(733\) −1152.36 + 308.773i −1.57211 + 0.421245i −0.936472 0.350743i \(-0.885929\pi\)
−0.635637 + 0.771988i \(0.719263\pi\)
\(734\) 46.1721i 0.0629048i
\(735\) −918.993 840.001i −1.25033 1.14286i
\(736\) −32.0610 −0.0435612
\(737\) 16.7780 + 62.6163i 0.0227652 + 0.0849610i
\(738\) 328.614 1226.40i 0.445276 1.66179i
\(739\) −491.205 + 283.597i −0.664688 + 0.383758i −0.794061 0.607838i \(-0.792037\pi\)
0.129373 + 0.991596i \(0.458704\pi\)
\(740\) 77.3866 28.0853i 0.104576 0.0379532i
\(741\) −149.653 −0.201960
\(742\) −2.76151 + 133.182i −0.00372172 + 0.179491i
\(743\) −121.240 121.240i −0.163176 0.163176i 0.620796 0.783972i \(-0.286810\pi\)
−0.783972 + 0.620796i \(0.786810\pi\)
\(744\) −585.838 338.234i −0.787417 0.454615i
\(745\) 245.981 171.898i 0.330175 0.230736i
\(746\) −521.014 902.423i −0.698411 1.20968i
\(747\) −528.054 1970.72i −0.706900 2.63819i
\(748\) −40.8201 40.8201i −0.0545723 0.0545723i
\(749\) 47.1676 11.5961i 0.0629741 0.0154821i
\(750\) 868.382 230.100i 1.15784 0.306801i
\(751\) −499.516 + 865.187i −0.665135 + 1.15205i 0.314114 + 0.949385i \(0.398293\pi\)
−0.979249 + 0.202662i \(0.935041\pi\)
\(752\) −117.549 31.4972i −0.156315 0.0418845i
\(753\) −395.404 + 1475.67i −0.525104 + 1.95972i
\(754\) −10.9577 6.32643i −0.0145327 0.00839048i
\(755\) −238.128 + 20.6115i −0.315401 + 0.0273000i
\(756\) −534.649 155.207i −0.707208 0.205300i
\(757\) 290.904 290.904i 0.384285 0.384285i −0.488358 0.872643i \(-0.662404\pi\)
0.872643 + 0.488358i \(0.162404\pi\)
\(758\) −392.275 + 105.110i −0.517514 + 0.138667i
\(759\) 23.6645 13.6627i 0.0311786 0.0180010i
\(760\) −336.253 59.6114i −0.442438 0.0784360i
\(761\) 185.178 320.737i 0.243335 0.421468i −0.718327 0.695705i \(-0.755092\pi\)
0.961662 + 0.274237i \(0.0884253\pi\)
\(762\) 577.416 577.416i 0.757764 0.757764i
\(763\) 164.892 + 299.786i 0.216110 + 0.392905i
\(764\) 351.483i 0.460056i
\(765\) −2405.88 + 873.149i −3.14494 + 1.14137i
\(766\) 323.016 + 559.479i 0.421691 + 0.730391i
\(767\) 59.1853 + 15.8587i 0.0771647 + 0.0206762i
\(768\) 78.5389 21.0444i 0.102264 0.0274016i
\(769\) 615.359i 0.800207i 0.916470 + 0.400103i \(0.131026\pi\)
−0.916470 + 0.400103i \(0.868974\pi\)
\(770\) −44.4653 + 15.1018i −0.0577472 + 0.0196128i
\(771\) 1679.35 2.17814
\(772\) −27.0147 100.820i −0.0349931 0.130596i
\(773\) −218.298 + 814.698i −0.282403 + 1.05394i 0.668313 + 0.743880i \(0.267017\pi\)
−0.950716 + 0.310063i \(0.899650\pi\)
\(774\) −963.945 + 556.534i −1.24541 + 0.719036i
\(775\) −404.459 + 1104.88i −0.521883 + 1.42565i
\(776\) 348.716 0.449376
\(777\) −6.07099 + 292.792i −0.00781337 + 0.376824i
\(778\) 543.189 + 543.189i 0.698187 + 0.698187i
\(779\) 1115.88 + 644.255i 1.43246 + 0.827029i
\(780\) −35.5002 50.7995i −0.0455130 0.0651275i
\(781\) −5.65461 9.79407i −0.00724021 0.0125404i
\(782\) −63.1144 235.546i −0.0807090 0.301210i
\(783\) 206.289 + 206.289i 0.263460 + 0.263460i
\(784\) −104.952 + 165.533i −0.133867 + 0.211139i
\(785\) −336.510 + 400.284i −0.428675 + 0.509916i
\(786\) 90.1435 156.133i 0.114686 0.198643i
\(787\) −440.137 117.934i −0.559259 0.149853i −0.0318931 0.999491i \(-0.510154\pi\)
−0.527366 + 0.849638i \(0.676820\pi\)
\(788\) 45.9858 171.622i 0.0583577 0.217794i
\(789\) 1665.99 + 961.857i 2.11151 + 1.21908i
\(790\) −383.743 322.605i −0.485751 0.408360i
\(791\) 59.2401 56.8333i 0.0748927 0.0718500i
\(792\) −31.9250 + 31.9250i −0.0403094 + 0.0403094i
\(793\) 53.5928 14.3602i 0.0675824 0.0181086i
\(794\) −782.528 + 451.793i −0.985551 + 0.569008i
\(795\) 280.262 195.855i 0.352531 0.246359i
\(796\) −25.9383 + 44.9265i −0.0325858 + 0.0564403i
\(797\) −1040.82 + 1040.82i −1.30592 + 1.30592i −0.381592 + 0.924331i \(0.624624\pi\)
−0.924331 + 0.381592i \(0.875376\pi\)
\(798\) 629.079 1039.23i 0.788319 1.30229i
\(799\) 925.614i 1.15847i
\(800\) −59.5299 128.282i −0.0744124 0.160352i
\(801\) 1318.67 + 2284.00i 1.64628 + 2.85144i
\(802\) −610.985 163.713i −0.761827 0.204131i
\(803\) −50.4742 + 13.5245i −0.0628571 + 0.0168425i
\(804\) 694.465i 0.863762i
\(805\) −194.562 38.6686i −0.241692 0.0480355i
\(806\) 81.1687 0.100706
\(807\) 190.581 + 711.257i 0.236160 + 0.881360i
\(808\) 36.9336 137.838i 0.0457099 0.170592i
\(809\) 192.279 111.012i 0.237674 0.137221i −0.376433 0.926444i \(-0.622850\pi\)
0.614107 + 0.789222i \(0.289516\pi\)
\(810\) 122.202 + 336.715i 0.150866 + 0.415698i
\(811\) 1418.65 1.74926 0.874632 0.484788i \(-0.161103\pi\)
0.874632 + 0.484788i \(0.161103\pi\)
\(812\) 89.9941 49.4996i 0.110830 0.0609600i
\(813\) 1188.06 + 1188.06i 1.46132 + 1.46132i
\(814\) 9.56585 + 5.52284i 0.0117517 + 0.00678482i
\(815\) 35.8804 202.393i 0.0440250 0.248334i
\(816\) 309.219 + 535.583i 0.378945 + 0.656351i
\(817\) −292.359 1091.10i −0.357845 1.33549i
\(818\) −23.0666 23.0666i −0.0281988 0.0281988i
\(819\) 139.478 34.2904i 0.170302 0.0418686i
\(820\) 46.0145 + 531.614i 0.0561152 + 0.648309i
\(821\) 192.277 333.033i 0.234198 0.405643i −0.724841 0.688916i \(-0.758087\pi\)
0.959039 + 0.283273i \(0.0914202\pi\)
\(822\) −474.794 127.221i −0.577608 0.154770i
\(823\) 17.2796 64.4885i 0.0209959 0.0783578i −0.954633 0.297785i \(-0.903752\pi\)
0.975629 + 0.219427i \(0.0704188\pi\)
\(824\) 354.102 + 204.441i 0.429735 + 0.248108i
\(825\) 98.6065 + 69.3173i 0.119523 + 0.0840210i
\(826\) −358.918 + 344.336i −0.434525 + 0.416872i
\(827\) 595.969 595.969i 0.720639 0.720639i −0.248096 0.968735i \(-0.579805\pi\)
0.968735 + 0.248096i \(0.0798048\pi\)
\(828\) −184.219 + 49.3612i −0.222486 + 0.0596150i
\(829\) −609.282 + 351.769i −0.734960 + 0.424329i −0.820234 0.572028i \(-0.806157\pi\)
0.0852739 + 0.996358i \(0.472823\pi\)
\(830\) 491.164 + 702.838i 0.591764 + 0.846793i
\(831\) 199.709 345.905i 0.240323 0.416252i
\(832\) −6.89871 + 6.89871i −0.00829172 + 0.00829172i
\(833\) −1422.74 445.198i −1.70798 0.534451i
\(834\) 483.711i 0.579989i
\(835\) −63.7700 175.712i −0.0763713 0.210434i
\(836\) −22.9095 39.6804i −0.0274037 0.0474645i
\(837\) −1807.74 484.381i −2.15978 0.578711i
\(838\) 686.826 184.035i 0.819602 0.219612i
\(839\) 3.00042i 0.00357618i −0.999998 0.00178809i \(-0.999431\pi\)
0.999998 0.00178809i \(-0.000569167\pi\)
\(840\) 501.994 32.9828i 0.597612 0.0392652i
\(841\) 787.178 0.936002
\(842\) 17.7485 + 66.2382i 0.0210789 + 0.0786677i
\(843\) 450.963 1683.02i 0.534950 1.99646i
\(844\) 387.417 223.675i 0.459025 0.265018i
\(845\) −758.763 354.672i −0.897944 0.419730i
\(846\) −723.915 −0.855691
\(847\) 719.197 + 435.352i 0.849110 + 0.513993i
\(848\) −38.0603 38.0603i −0.0448824 0.0448824i
\(849\) −408.755 235.995i −0.481454 0.277968i
\(850\) 825.272 689.887i 0.970908 0.811632i
\(851\) 23.3295 + 40.4079i 0.0274143 + 0.0474829i
\(852\) 31.3571 + 117.026i 0.0368041 + 0.137355i
\(853\) 657.357 + 657.357i 0.770641 + 0.770641i 0.978219 0.207577i \(-0.0665579\pi\)
−0.207577 + 0.978219i \(0.566558\pi\)
\(854\) −125.561 + 432.528i −0.147027 + 0.506473i
\(855\) −2023.85 + 175.177i −2.36707 + 0.204885i
\(856\) −9.81306 + 16.9967i −0.0114639 + 0.0198560i
\(857\) 1022.44 + 273.963i 1.19305 + 0.319677i 0.800091 0.599879i \(-0.204784\pi\)
0.392960 + 0.919556i \(0.371451\pi\)
\(858\) 2.15213 8.03187i 0.00250831 0.00936115i
\(859\) −747.383 431.502i −0.870062 0.502331i −0.00269328 0.999996i \(-0.500857\pi\)
−0.867369 + 0.497666i \(0.834191\pi\)
\(860\) 301.020 358.068i 0.350023 0.416359i
\(861\) −1822.92 529.187i −2.11721 0.614619i
\(862\) −371.451 + 371.451i −0.430918 + 0.430918i
\(863\) −1176.48 + 315.238i −1.36325 + 0.365282i −0.865009 0.501757i \(-0.832687\pi\)
−0.498241 + 0.867039i \(0.666020\pi\)
\(864\) 194.812 112.475i 0.225477 0.130179i
\(865\) 219.102 1235.90i 0.253297 1.42878i
\(866\) −449.707 + 778.916i −0.519292 + 0.899441i
\(867\) −2287.61 + 2287.61i −2.63854 + 2.63854i
\(868\) −341.200 + 563.658i −0.393088 + 0.649376i
\(869\) 67.2641i 0.0774041i
\(870\) −238.822 111.634i −0.274508 0.128315i
\(871\) 41.6641 + 72.1644i 0.0478348 + 0.0828523i
\(872\) −133.536 35.7808i −0.153137 0.0410330i
\(873\) 2003.68 536.884i 2.29516 0.614988i
\(874\) 193.548i 0.221451i
\(875\) −206.537 850.275i −0.236043 0.971743i
\(876\) 559.800 0.639041
\(877\) −350.753 1309.03i −0.399946 1.49262i −0.813190 0.581999i \(-0.802271\pi\)
0.413244 0.910620i \(-0.364396\pi\)
\(878\) −215.040 + 802.540i −0.244920 + 0.914055i
\(879\) 2148.98 1240.72i 2.44481 1.41151i
\(880\) 8.03495 17.1895i 0.00913062 0.0195335i
\(881\) 906.106 1.02850 0.514248 0.857641i \(-0.328071\pi\)
0.514248 + 0.857641i \(0.328071\pi\)
\(882\) −348.185 + 1112.71i −0.394768 + 1.26158i
\(883\) −479.615 479.615i −0.543166 0.543166i 0.381290 0.924455i \(-0.375480\pi\)
−0.924455 + 0.381290i \(0.875480\pi\)
\(884\) −64.2641 37.1029i −0.0726969 0.0419716i
\(885\) 1257.04 + 222.850i 1.42038 + 0.251807i
\(886\) −3.35781 5.81590i −0.00378986 0.00656422i
\(887\) 99.6947 + 372.066i 0.112395 + 0.419465i 0.999079 0.0429116i \(-0.0136634\pi\)
−0.886683 + 0.462377i \(0.846997\pi\)
\(888\) −83.6729 83.6729i −0.0942262 0.0942262i
\(889\) −550.628 573.946i −0.619379 0.645608i
\(890\) −848.419 713.247i −0.953279 0.801401i
\(891\) −24.0304 + 41.6218i −0.0269701 + 0.0467136i
\(892\) 360.237 + 96.5252i 0.403853 + 0.108212i
\(893\) 190.144 709.626i 0.212927 0.794654i
\(894\) −373.553 215.671i −0.417844 0.241242i
\(895\) −23.3099 269.304i −0.0260446 0.300898i
\(896\) −18.9072 76.9059i −0.0211018 0.0858325i
\(897\) 24.8371 24.8371i 0.0276891 0.0276891i
\(898\) −55.5119 + 14.8744i −0.0618172 + 0.0165639i
\(899\) 299.015 172.636i 0.332608 0.192031i
\(900\) −539.554 645.438i −0.599505 0.717153i
\(901\) 204.697 354.546i 0.227189 0.393503i
\(902\) −50.6245 + 50.6245i −0.0561248 + 0.0561248i
\(903\) 801.975 + 1458.05i 0.888123 + 1.61468i
\(904\) 33.1710i 0.0366935i
\(905\) 426.534 912.500i 0.471308 1.00829i
\(906\) 171.778 + 297.528i 0.189600 + 0.328397i
\(907\) −790.213 211.737i −0.871238 0.233448i −0.204615 0.978842i \(-0.565594\pi\)
−0.666623 + 0.745395i \(0.732261\pi\)
\(908\) 732.367 196.237i 0.806572 0.216120i
\(909\) 848.863i 0.933843i
\(910\) −50.1852 + 33.5443i −0.0551486 + 0.0368618i
\(911\) 719.634 0.789939 0.394969 0.918694i \(-0.370755\pi\)
0.394969 + 0.918694i \(0.370755\pi\)
\(912\) 127.042 + 474.128i 0.139301 + 0.519877i
\(913\) −29.7759 + 111.125i −0.0326133 + 0.121714i
\(914\) −402.607 + 232.446i −0.440490 + 0.254317i
\(915\) 1086.66 394.373i 1.18760 0.431009i
\(916\) −92.0195 −0.100458
\(917\) −150.222 90.9341i −0.163819 0.0991648i
\(918\) 1209.83 + 1209.83i 1.31790 + 1.31790i
\(919\) 395.313 + 228.234i 0.430156 + 0.248351i 0.699413 0.714718i \(-0.253445\pi\)
−0.269257 + 0.963068i \(0.586778\pi\)
\(920\) 65.6997 45.9128i 0.0714127 0.0499053i
\(921\) −1236.49 2141.66i −1.34255 2.32537i
\(922\) 23.7023 + 88.4582i 0.0257075 + 0.0959416i
\(923\) −10.2794 10.2794i −0.0111369 0.0111369i
\(924\) 46.7288 + 48.7077i 0.0505723 + 0.0527140i
\(925\) −118.362 + 168.374i −0.127958 + 0.182026i
\(926\) 604.400 1046.85i 0.652700 1.13051i
\(927\) 2349.38 + 629.515i 2.53439 + 0.679088i
\(928\) −10.7412 + 40.0866i −0.0115745 + 0.0431968i
\(929\) −260.770 150.556i −0.280700 0.162062i 0.353040 0.935608i \(-0.385148\pi\)
−0.633740 + 0.773546i \(0.718481\pi\)
\(930\) 1684.87 145.836i 1.81169 0.156813i
\(931\) −999.298 633.579i −1.07336 0.680536i
\(932\) 147.660 147.660i 0.158434 0.158434i
\(933\) −1621.43 + 434.461i −1.73787 + 0.465660i
\(934\) 437.712 252.713i 0.468643 0.270571i
\(935\) 142.105 + 25.1926i 0.151984 + 0.0269439i
\(936\) −29.0178 + 50.2604i −0.0310020 + 0.0536970i
\(937\) 201.407 201.407i 0.214949 0.214949i −0.591417 0.806366i \(-0.701431\pi\)
0.806366 + 0.591417i \(0.201431\pi\)
\(938\) −676.268 14.0223i −0.720968 0.0149491i
\(939\) 435.141i 0.463409i
\(940\) 285.987 103.791i 0.304242 0.110416i
\(941\) 235.272 + 407.502i 0.250023 + 0.433052i 0.963532 0.267594i \(-0.0862285\pi\)
−0.713509 + 0.700646i \(0.752895\pi\)
\(942\) 726.041 + 194.542i 0.770745 + 0.206520i
\(943\) −292.121 + 78.2737i −0.309779 + 0.0830050i
\(944\) 200.973i 0.212895i
\(945\) 1317.87 447.591i 1.39457 0.473641i
\(946\) 62.7637 0.0663464
\(947\) 73.4049 + 273.951i 0.0775131 + 0.289283i 0.993791 0.111259i \(-0.0354885\pi\)
−0.916278 + 0.400542i \(0.868822\pi\)
\(948\) −186.503 + 696.040i −0.196733 + 0.734219i
\(949\) −58.1708 + 33.5849i −0.0612970 + 0.0353898i
\(950\) 774.418 359.374i 0.815177 0.378288i
\(951\) 895.451 0.941589
\(952\) 527.793 290.302i 0.554404 0.304940i
\(953\) 627.876 + 627.876i 0.658842 + 0.658842i 0.955106 0.296264i \(-0.0957409\pi\)
−0.296264 + 0.955106i \(0.595741\pi\)
\(954\) −277.288 160.092i −0.290658 0.167811i
\(955\) 503.339 + 720.261i 0.527057 + 0.754200i
\(956\) −4.00351 6.93428i −0.00418777 0.00725343i
\(957\) −9.15465 34.1656i −0.00956599 0.0357008i
\(958\) 587.359 + 587.359i 0.613109 + 0.613109i
\(959\) −133.474 + 459.785i −0.139180 + 0.479442i
\(960\) −130.806 + 155.596i −0.136256 + 0.162079i
\(961\) −626.971 + 1085.94i −0.652415 + 1.13002i
\(962\) 13.7147 + 3.67483i 0.0142564 + 0.00381999i
\(963\) −30.2164 + 112.769i −0.0313774 + 0.117102i
\(964\) −515.802 297.798i −0.535064 0.308919i
\(965\) 199.738 + 167.915i 0.206982 + 0.174005i
\(966\) 68.0708 + 276.881i 0.0704666 + 0.286626i
\(967\) −929.872 + 929.872i −0.961604 + 0.961604i −0.999290 0.0376852i \(-0.988002\pi\)
0.0376852 + 0.999290i \(0.488002\pi\)
\(968\) −328.119 + 87.9192i −0.338966 + 0.0908257i
\(969\) −3233.24 + 1866.71i −3.33667 + 1.92643i
\(970\) −714.591 + 499.377i −0.736692 + 0.514822i
\(971\) −628.982 + 1089.43i −0.647767 + 1.12196i 0.335888 + 0.941902i \(0.390964\pi\)
−0.983655 + 0.180063i \(0.942370\pi\)
\(972\) −142.069 + 142.069i −0.146161 + 0.146161i
\(973\) −471.037 9.76686i −0.484108 0.0100379i
\(974\) 804.435i 0.825909i
\(975\) 145.494 + 53.2608i 0.149225 + 0.0546264i
\(976\) −90.9914 157.602i −0.0932289 0.161477i
\(977\) −182.799 48.9808i −0.187102 0.0501339i 0.164051 0.986452i \(-0.447544\pi\)
−0.351153 + 0.936318i \(0.614210\pi\)
\(978\) −285.380 + 76.4674i −0.291800 + 0.0781875i
\(979\) 148.714i 0.151904i
\(980\) −21.9825 489.507i −0.0224312 0.499497i
\(981\) −822.367 −0.838295
\(982\) 177.536 + 662.573i 0.180790 + 0.674718i
\(983\) 363.301 1355.86i 0.369583 1.37930i −0.491516 0.870868i \(-0.663557\pi\)
0.861100 0.508436i \(-0.169776\pi\)
\(984\) 664.222 383.489i 0.675023 0.389725i
\(985\) 151.535 + 417.542i 0.153843 + 0.423900i
\(986\) −315.654 −0.320135
\(987\) −22.4358 + 1082.03i −0.0227313 + 1.09629i
\(988\) −41.6465 41.6465i −0.0421523 0.0421523i
\(989\) 229.606 + 132.563i 0.232159 + 0.134037i
\(990\) 19.7029 111.139i 0.0199019 0.112262i
\(991\) 258.071 + 446.992i 0.260414 + 0.451051i 0.966352 0.257223i \(-0.0828075\pi\)
−0.705938 + 0.708274i \(0.749474\pi\)
\(992\) −68.9052 257.158i −0.0694609 0.259232i
\(993\) −1155.18 1155.18i −1.16332 1.16332i
\(994\) 114.593 28.1725i 0.115285 0.0283426i
\(995\) −11.1838 129.208i −0.0112400 0.129858i
\(996\) 616.234 1067.35i 0.618709 1.07164i
\(997\) −1276.18 341.950i −1.28002 0.342979i −0.446155 0.894955i \(-0.647207\pi\)
−0.833860 + 0.551976i \(0.813874\pi\)
\(998\) 211.422 789.039i 0.211846 0.790620i
\(999\) −283.514 163.687i −0.283798 0.163851i
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 70.3.l.c.23.1 16
5.2 odd 4 inner 70.3.l.c.37.4 yes 16
5.3 odd 4 350.3.p.e.107.1 16
5.4 even 2 350.3.p.e.93.4 16
7.2 even 3 490.3.f.o.393.1 8
7.4 even 3 inner 70.3.l.c.53.4 yes 16
7.5 odd 6 490.3.f.p.393.4 8
35.2 odd 12 490.3.f.o.197.1 8
35.4 even 6 350.3.p.e.193.1 16
35.12 even 12 490.3.f.p.197.4 8
35.18 odd 12 350.3.p.e.207.4 16
35.32 odd 12 inner 70.3.l.c.67.1 yes 16
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
70.3.l.c.23.1 16 1.1 even 1 trivial
70.3.l.c.37.4 yes 16 5.2 odd 4 inner
70.3.l.c.53.4 yes 16 7.4 even 3 inner
70.3.l.c.67.1 yes 16 35.32 odd 12 inner
350.3.p.e.93.4 16 5.4 even 2
350.3.p.e.107.1 16 5.3 odd 4
350.3.p.e.193.1 16 35.4 even 6
350.3.p.e.207.4 16 35.18 odd 12
490.3.f.o.197.1 8 35.2 odd 12
490.3.f.o.393.1 8 7.2 even 3
490.3.f.p.197.4 8 35.12 even 12
490.3.f.p.393.4 8 7.5 odd 6