Properties

Label 57.3.g.b.46.1
Level $57$
Weight $3$
Character 57.46
Analytic conductor $1.553$
Analytic rank $0$
Dimension $6$
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] = [57,3,Mod(31,57)]
 
mf = mfinit([N,k,chi],0)
 
lf = mfeigenbasis(mf)
 
from sage.modular.dirichlet import DirichletCharacter
 
H = DirichletGroup(57, base_ring=CyclotomicField(6))
 
chi = DirichletCharacter(H, H._module([0, 5]))
 
N = Newforms(chi, 3, names="a")
 
//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code
 
chi := DirichletCharacter("57.31");
 
S:= CuspForms(chi, 3);
 
N := Newforms(S);
 
Level: \( N \) \(=\) \( 57 = 3 \cdot 19 \)
Weight: \( k \) \(=\) \( 3 \)
Character orbit: \([\chi]\) \(=\) 57.g (of order \(6\), degree \(2\), 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: \(1.55313750685\)
Analytic rank: \(0\)
Dimension: \(6\)
Relative dimension: \(3\) over \(\Q(\zeta_{6})\)
Coefficient field: 6.0.92607408.1
comment: defining polynomial
 
gp: f.mod \\ as an extension of the character field
 
Defining polynomial: \( x^{6} - 3x^{5} + 20x^{4} - 35x^{3} + 94x^{2} - 77x + 43 \) Copy content Toggle raw display
Coefficient ring: \(\Z[a_1, a_2, a_3]\)
Coefficient ring index: \( 1 \)
Twist minimal: yes
Sato-Tate group: $\mathrm{SU}(2)[C_{6}]$

Embedding invariants

Embedding label 46.1
Root \(0.500000 - 2.93068i\) of defining polynomial
Character \(\chi\) \(=\) 57.46
Dual form 57.3.g.b.31.1

$q$-expansion

comment: q-expansion
 
sage: f.q_expansion() # note that sage often uses an isomorphic number field
 
gp: mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q+(-1.78805 - 1.03233i) q^{2} +(-1.50000 - 0.866025i) q^{3} +(0.131406 + 0.227602i) q^{4} +(-3.20750 + 5.55555i) q^{5} +(1.78805 + 3.09699i) q^{6} -2.26281 q^{7} +7.71601i q^{8} +(1.50000 + 2.59808i) q^{9} +O(q^{10})\) \(q+(-1.78805 - 1.03233i) q^{2} +(-1.50000 - 0.866025i) q^{3} +(0.131406 + 0.227602i) q^{4} +(-3.20750 + 5.55555i) q^{5} +(1.78805 + 3.09699i) q^{6} -2.26281 q^{7} +7.71601i q^{8} +(1.50000 + 2.59808i) q^{9} +(11.4703 - 6.62239i) q^{10} -20.0928 q^{11} -0.455204i q^{12} +(-0.135471 + 0.0782143i) q^{13} +(4.04601 + 2.33597i) q^{14} +(9.62250 - 5.55555i) q^{15} +(8.49109 - 14.7070i) q^{16} +(12.3133 - 21.3272i) q^{17} -6.19397i q^{18} +(-18.9317 + 1.60945i) q^{19} -1.68594 q^{20} +(3.39422 + 1.95965i) q^{21} +(35.9269 + 20.7424i) q^{22} +(-2.62250 - 4.54230i) q^{23} +(6.68226 - 11.5740i) q^{24} +(-8.07609 - 13.9882i) q^{25} +0.322972 q^{26} -5.19615i q^{27} +(-0.297347 - 0.515021i) q^{28} +(-31.4573 + 18.1619i) q^{29} -22.9406 q^{30} +17.1105i q^{31} +(-3.63586 + 2.09917i) q^{32} +(30.1392 + 17.4009i) q^{33} +(-44.0334 + 25.4227i) q^{34} +(7.25797 - 12.5712i) q^{35} +(-0.394218 + 0.682806i) q^{36} +42.7124i q^{37} +(35.5123 + 16.6660i) q^{38} +0.270942 q^{39} +(-42.8667 - 24.7491i) q^{40} +(30.0928 + 17.3741i) q^{41} +(-4.04601 - 7.00790i) q^{42} +(12.5553 - 21.7464i) q^{43} +(-2.64032 - 4.57316i) q^{44} -19.2450 q^{45} +10.8291i q^{46} +(-14.6778 - 25.4227i) q^{47} +(-25.4733 + 14.7070i) q^{48} -43.8797 q^{49} +33.3487i q^{50} +(-36.9398 + 21.3272i) q^{51} +(-0.0356035 - 0.0205557i) q^{52} +(48.4176 - 27.9539i) q^{53} +(-5.36414 + 9.29096i) q^{54} +(64.4476 - 111.627i) q^{55} -17.4599i q^{56} +(29.7914 + 13.9812i) q^{57} +74.9962 q^{58} +(-29.9269 - 17.2783i) q^{59} +(2.52891 + 1.46007i) q^{60} +(27.3805 + 47.4244i) q^{61} +(17.6637 - 30.5944i) q^{62} +(-3.39422 - 5.87896i) q^{63} -59.2606 q^{64} -1.00349i q^{65} +(-35.9269 - 62.2272i) q^{66} +(66.0698 - 38.1454i) q^{67} +6.47216 q^{68} +9.08459i q^{69} +(-25.9552 + 14.9852i) q^{70} +(63.6080 + 36.7241i) q^{71} +(-20.0468 + 11.5740i) q^{72} +(-45.9053 + 79.5103i) q^{73} +(44.0932 - 76.3717i) q^{74} +27.9764i q^{75} +(-2.85406 - 4.09740i) q^{76} +45.4662 q^{77} +(-0.484457 - 0.279702i) q^{78} +(-53.1300 - 30.6746i) q^{79} +(54.4703 + 94.3453i) q^{80} +(-4.50000 + 7.79423i) q^{81} +(-35.8716 - 62.1313i) q^{82} -148.793 q^{83} +1.03004i q^{84} +(78.9897 + 136.814i) q^{85} +(-44.8990 + 25.9224i) q^{86} +62.9147 q^{87} -155.036i q^{88} +(-62.7829 + 36.2477i) q^{89} +(34.4109 + 19.8672i) q^{90} +(0.306546 - 0.176984i) q^{91} +(0.689224 - 1.19377i) q^{92} +(14.8181 - 25.6657i) q^{93} +60.6093i q^{94} +(51.7820 - 110.338i) q^{95} +7.27172 q^{96} +(-70.0326 - 40.4334i) q^{97} +(78.4589 + 45.2983i) q^{98} +(-30.1392 - 52.2026i) q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 6 q + 3 q^{2} - 9 q^{3} + 5 q^{4} + 4 q^{5} - 3 q^{6} - 22 q^{7} + 9 q^{9}+O(q^{10}) \) Copy content Toggle raw display \( 6 q + 3 q^{2} - 9 q^{3} + 5 q^{4} + 4 q^{5} - 3 q^{6} - 22 q^{7} + 9 q^{9} + 54 q^{10} - 36 q^{11} - 3 q^{13} - 57 q^{14} - 12 q^{15} - 23 q^{16} + 38 q^{17} - 10 q^{19} + 32 q^{20} + 33 q^{21} + 36 q^{22} + 54 q^{23} + 39 q^{24} - 21 q^{25} + 118 q^{26} - 101 q^{28} - 102 q^{29} - 108 q^{30} - 63 q^{32} + 54 q^{33} - 150 q^{34} - 24 q^{35} - 15 q^{36} + 119 q^{38} + 6 q^{39} + 30 q^{40} + 96 q^{41} + 57 q^{42} + 107 q^{43} - 94 q^{44} + 24 q^{45} - 50 q^{47} + 69 q^{48} - 48 q^{49} - 114 q^{51} + 399 q^{52} - 90 q^{53} + 9 q^{54} + 148 q^{55} - 3 q^{57} - 116 q^{58} - 48 q^{60} + 27 q^{61} - 121 q^{62} - 33 q^{63} + 46 q^{64} - 36 q^{66} - 39 q^{67} - 388 q^{68} - 354 q^{70} + 84 q^{71} - 117 q^{72} - 77 q^{73} + 219 q^{74} + 215 q^{76} + 260 q^{77} - 177 q^{78} + 9 q^{79} + 312 q^{80} - 27 q^{81} - 4 q^{82} - 348 q^{83} + 68 q^{85} + 249 q^{86} + 204 q^{87} - 72 q^{89} + 162 q^{90} - 393 q^{91} - 118 q^{92} + 129 q^{93} + 104 q^{95} + 126 q^{96} - 228 q^{97} + 540 q^{98} - 54 q^{99}+O(q^{100}) \) Copy content Toggle raw display

Display 100 coefficients 10 coefficients

Character values

We give the values of \(\chi\) on generators for \(\left(\mathbb{Z}/57\mathbb{Z}\right)^\times\).

\(n\) \(20\) \(40\)
\(\chi(n)\) \(1\) \(e\left(\frac{1}{6}\right)\)

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:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) −1.78805 1.03233i −0.894023 0.516164i −0.0187668 0.999824i \(-0.505974\pi\)
−0.875256 + 0.483659i \(0.839307\pi\)
\(3\) −1.50000 0.866025i −0.500000 0.288675i
\(4\) 0.131406 + 0.227602i 0.0328515 + 0.0569005i
\(5\) −3.20750 + 5.55555i −0.641500 + 1.11111i 0.343598 + 0.939117i \(0.388354\pi\)
−0.985098 + 0.171993i \(0.944979\pi\)
\(6\) 1.78805 + 3.09699i 0.298008 + 0.516164i
\(7\) −2.26281 −0.323259 −0.161629 0.986852i \(-0.551675\pi\)
−0.161629 + 0.986852i \(0.551675\pi\)
\(8\) 7.71601i 0.964502i
\(9\) 1.50000 + 2.59808i 0.166667 + 0.288675i
\(10\) 11.4703 6.62239i 1.14703 0.662239i
\(11\) −20.0928 −1.82662 −0.913309 0.407267i \(-0.866482\pi\)
−0.913309 + 0.407267i \(0.866482\pi\)
\(12\) 0.455204i 0.0379337i
\(13\) −0.135471 + 0.0782143i −0.0104209 + 0.00601649i −0.505201 0.863001i \(-0.668582\pi\)
0.494781 + 0.869018i \(0.335248\pi\)
\(14\) 4.04601 + 2.33597i 0.289001 + 0.166855i
\(15\) 9.62250 5.55555i 0.641500 0.370370i
\(16\) 8.49109 14.7070i 0.530693 0.919187i
\(17\) 12.3133 21.3272i 0.724311 1.25454i −0.234947 0.972008i \(-0.575492\pi\)
0.959257 0.282534i \(-0.0911752\pi\)
\(18\) 6.19397i 0.344110i
\(19\) −18.9317 + 1.60945i −0.996406 + 0.0847081i
\(20\) −1.68594 −0.0842970
\(21\) 3.39422 + 1.95965i 0.161629 + 0.0933168i
\(22\) 35.9269 + 20.7424i 1.63304 + 0.942836i
\(23\) −2.62250 4.54230i −0.114022 0.197491i 0.803367 0.595485i \(-0.203040\pi\)
−0.917388 + 0.397994i \(0.869707\pi\)
\(24\) 6.68226 11.5740i 0.278428 0.482251i
\(25\) −8.07609 13.9882i −0.323044 0.559528i
\(26\) 0.322972 0.0124220
\(27\) 5.19615i 0.192450i
\(28\) −0.297347 0.515021i −0.0106195 0.0183936i
\(29\) −31.4573 + 18.1619i −1.08474 + 0.626272i −0.932170 0.362021i \(-0.882087\pi\)
−0.152566 + 0.988293i \(0.548754\pi\)
\(30\) −22.9406 −0.764687
\(31\) 17.1105i 0.551952i 0.961165 + 0.275976i \(0.0890010\pi\)
−0.961165 + 0.275976i \(0.910999\pi\)
\(32\) −3.63586 + 2.09917i −0.113621 + 0.0655989i
\(33\) 30.1392 + 17.4009i 0.913309 + 0.527299i
\(34\) −44.0334 + 25.4227i −1.29510 + 0.747727i
\(35\) 7.25797 12.5712i 0.207370 0.359176i
\(36\) −0.394218 + 0.682806i −0.0109505 + 0.0189668i
\(37\) 42.7124i 1.15439i 0.816607 + 0.577194i \(0.195852\pi\)
−0.816607 + 0.577194i \(0.804148\pi\)
\(38\) 35.5123 + 16.6660i 0.934533 + 0.438578i
\(39\) 0.270942 0.00694724
\(40\) −42.8667 24.7491i −1.07167 0.618728i
\(41\) 30.0928 + 17.3741i 0.733971 + 0.423758i 0.819873 0.572545i \(-0.194044\pi\)
−0.0859022 + 0.996304i \(0.527377\pi\)
\(42\) −4.04601 7.00790i −0.0963336 0.166855i
\(43\) 12.5553 21.7464i 0.291984 0.505731i −0.682295 0.731077i \(-0.739018\pi\)
0.974279 + 0.225346i \(0.0723512\pi\)
\(44\) −2.64032 4.57316i −0.0600072 0.103936i
\(45\) −19.2450 −0.427666
\(46\) 10.8291i 0.235415i
\(47\) −14.6778 25.4227i −0.312294 0.540909i 0.666565 0.745447i \(-0.267764\pi\)
−0.978859 + 0.204538i \(0.934431\pi\)
\(48\) −25.4733 + 14.7070i −0.530693 + 0.306396i
\(49\) −43.8797 −0.895504
\(50\) 33.3487i 0.666975i
\(51\) −36.9398 + 21.3272i −0.724311 + 0.418181i
\(52\) −0.0356035 0.0205557i −0.000684682 0.000395301i
\(53\) 48.4176 27.9539i 0.913540 0.527433i 0.0319716 0.999489i \(-0.489821\pi\)
0.881568 + 0.472056i \(0.156488\pi\)
\(54\) −5.36414 + 9.29096i −0.0993359 + 0.172055i
\(55\) 64.4476 111.627i 1.17178 2.02957i
\(56\) 17.4599i 0.311784i
\(57\) 29.7914 + 13.9812i 0.522656 + 0.245284i
\(58\) 74.9962 1.29304
\(59\) −29.9269 17.2783i −0.507235 0.292852i 0.224461 0.974483i \(-0.427938\pi\)
−0.731696 + 0.681631i \(0.761271\pi\)
\(60\) 2.52891 + 1.46007i 0.0421485 + 0.0243344i
\(61\) 27.3805 + 47.4244i 0.448860 + 0.777448i 0.998312 0.0580769i \(-0.0184968\pi\)
−0.549452 + 0.835525i \(0.685164\pi\)
\(62\) 17.6637 30.5944i 0.284898 0.493457i
\(63\) −3.39422 5.87896i −0.0538765 0.0933168i
\(64\) −59.2606 −0.925947
\(65\) 1.00349i 0.0154383i
\(66\) −35.9269 62.2272i −0.544346 0.942836i
\(67\) 66.0698 38.1454i 0.986117 0.569335i 0.0820054 0.996632i \(-0.473868\pi\)
0.904111 + 0.427297i \(0.140534\pi\)
\(68\) 6.47216 0.0951788
\(69\) 9.08459i 0.131661i
\(70\) −25.9552 + 14.9852i −0.370788 + 0.214075i
\(71\) 63.6080 + 36.7241i 0.895887 + 0.517240i 0.875863 0.482559i \(-0.160293\pi\)
0.0200233 + 0.999800i \(0.493626\pi\)
\(72\) −20.0468 + 11.5740i −0.278428 + 0.160750i
\(73\) −45.9053 + 79.5103i −0.628840 + 1.08918i 0.358945 + 0.933359i \(0.383137\pi\)
−0.987785 + 0.155824i \(0.950197\pi\)
\(74\) 44.0932 76.3717i 0.595854 1.03205i
\(75\) 27.9764i 0.373019i
\(76\) −2.85406 4.09740i −0.0375534 0.0539132i
\(77\) 45.4662 0.590471
\(78\) −0.484457 0.279702i −0.00621099 0.00358592i
\(79\) −53.1300 30.6746i −0.672531 0.388286i 0.124504 0.992219i \(-0.460266\pi\)
−0.797035 + 0.603933i \(0.793599\pi\)
\(80\) 54.4703 + 94.3453i 0.680879 + 1.17932i
\(81\) −4.50000 + 7.79423i −0.0555556 + 0.0962250i
\(82\) −35.8716 62.1313i −0.437458 0.757699i
\(83\) −148.793 −1.79268 −0.896342 0.443363i \(-0.853785\pi\)
−0.896342 + 0.443363i \(0.853785\pi\)
\(84\) 1.03004i 0.0122624i
\(85\) 78.9897 + 136.814i 0.929290 + 1.60958i
\(86\) −44.8990 + 25.9224i −0.522081 + 0.301424i
\(87\) 62.9147 0.723157
\(88\) 155.036i 1.76178i
\(89\) −62.7829 + 36.2477i −0.705426 + 0.407278i −0.809365 0.587306i \(-0.800189\pi\)
0.103939 + 0.994584i \(0.466855\pi\)
\(90\) 34.4109 + 19.8672i 0.382344 + 0.220746i
\(91\) 0.306546 0.176984i 0.00336864 0.00194488i
\(92\) 0.689224 1.19377i 0.00749156 0.0129758i
\(93\) 14.8181 25.6657i 0.159335 0.275976i
\(94\) 60.6093i 0.644780i
\(95\) 51.7820 110.338i 0.545074 1.16146i
\(96\) 7.27172 0.0757471
\(97\) −70.0326 40.4334i −0.721986 0.416839i 0.0934972 0.995620i \(-0.470195\pi\)
−0.815483 + 0.578781i \(0.803529\pi\)
\(98\) 78.4589 + 45.2983i 0.800601 + 0.462227i
\(99\) −30.1392 52.2026i −0.304436 0.527299i
\(100\) 2.12250 3.67627i 0.0212250 0.0367627i
\(101\) −76.6770 132.809i −0.759178 1.31494i −0.943270 0.332027i \(-0.892268\pi\)
0.184092 0.982909i \(-0.441066\pi\)
\(102\) 88.0669 0.863401
\(103\) 168.948i 1.64027i 0.572169 + 0.820136i \(0.306102\pi\)
−0.572169 + 0.820136i \(0.693898\pi\)
\(104\) −0.603503 1.04530i −0.00580291 0.0100509i
\(105\) −21.7739 + 12.5712i −0.207370 + 0.119725i
\(106\) −115.431 −1.08897
\(107\) 139.060i 1.29963i 0.760093 + 0.649815i \(0.225154\pi\)
−0.760093 + 0.649815i \(0.774846\pi\)
\(108\) 1.18265 0.682806i 0.0109505 0.00632228i
\(109\) −9.15888 5.28788i −0.0840264 0.0485127i 0.457398 0.889262i \(-0.348781\pi\)
−0.541424 + 0.840749i \(0.682115\pi\)
\(110\) −230.471 + 133.062i −2.09519 + 1.20966i
\(111\) 36.9900 64.0685i 0.333243 0.577194i
\(112\) −19.2137 + 33.2792i −0.171551 + 0.297135i
\(113\) 69.1581i 0.612018i −0.952029 0.306009i \(-0.901006\pi\)
0.952029 0.306009i \(-0.0989938\pi\)
\(114\) −38.8352 55.7535i −0.340660 0.489066i
\(115\) 33.6466 0.292579
\(116\) −8.26737 4.77317i −0.0712704 0.0411480i
\(117\) −0.406413 0.234643i −0.00347362 0.00200550i
\(118\) 35.6737 + 61.7887i 0.302320 + 0.523633i
\(119\) −27.8626 + 48.2595i −0.234140 + 0.405542i
\(120\) 42.8667 + 74.2473i 0.357223 + 0.618728i
\(121\) 282.721 2.33654
\(122\) 113.063i 0.926742i
\(123\) −30.0928 52.1223i −0.244657 0.423758i
\(124\) −3.89438 + 2.24842i −0.0314063 + 0.0181324i
\(125\) −56.7587 −0.454070
\(126\) 14.0158i 0.111236i
\(127\) −25.6547 + 14.8118i −0.202006 + 0.116628i −0.597591 0.801801i \(-0.703875\pi\)
0.395585 + 0.918429i \(0.370542\pi\)
\(128\) 120.504 + 69.5731i 0.941438 + 0.543540i
\(129\) −37.6659 + 21.7464i −0.291984 + 0.168577i
\(130\) −1.03593 + 1.79428i −0.00796870 + 0.0138022i
\(131\) −28.6526 + 49.6278i −0.218722 + 0.378838i −0.954418 0.298474i \(-0.903522\pi\)
0.735695 + 0.677313i \(0.236856\pi\)
\(132\) 9.14633i 0.0692903i
\(133\) 42.8389 3.64189i 0.322097 0.0273826i
\(134\) −157.514 −1.17548
\(135\) 28.8675 + 16.6667i 0.213833 + 0.123457i
\(136\) 164.561 + 95.0094i 1.21001 + 0.698599i
\(137\) 47.4499 + 82.1856i 0.346349 + 0.599895i 0.985598 0.169105i \(-0.0540879\pi\)
−0.639249 + 0.769000i \(0.720755\pi\)
\(138\) 9.37829 16.2437i 0.0679586 0.117708i
\(139\) −91.2747 158.092i −0.656652 1.13736i −0.981477 0.191581i \(-0.938639\pi\)
0.324824 0.945774i \(-0.394695\pi\)
\(140\) 3.81496 0.0272497
\(141\) 50.8454i 0.360606i
\(142\) −75.8226 131.329i −0.533962 0.924850i
\(143\) 2.72200 1.57155i 0.0190349 0.0109898i
\(144\) 50.9465 0.353795
\(145\) 233.017i 1.60701i
\(146\) 164.162 94.7788i 1.12439 0.649170i
\(147\) 65.8195 + 38.0009i 0.447752 + 0.258510i
\(148\) −9.72142 + 5.61266i −0.0656852 + 0.0379234i
\(149\) −5.50439 + 9.53389i −0.0369422 + 0.0639858i −0.883905 0.467666i \(-0.845095\pi\)
0.846963 + 0.531652i \(0.178428\pi\)
\(150\) 28.8809 50.0231i 0.192539 0.333487i
\(151\) 238.846i 1.58176i −0.611968 0.790882i \(-0.709622\pi\)
0.611968 0.790882i \(-0.290378\pi\)
\(152\) −12.4186 146.077i −0.0817011 0.961035i
\(153\) 73.8797 0.482874
\(154\) −81.2957 46.9361i −0.527894 0.304780i
\(155\) −95.0582 54.8819i −0.613279 0.354077i
\(156\) 0.0356035 + 0.0616670i 0.000228227 + 0.000395301i
\(157\) 22.8125 39.5124i 0.145303 0.251671i −0.784183 0.620529i \(-0.786918\pi\)
0.929486 + 0.368858i \(0.120251\pi\)
\(158\) 63.3326 + 109.695i 0.400839 + 0.694273i
\(159\) −96.8353 −0.609027
\(160\) 26.9323i 0.168327i
\(161\) 5.93421 + 10.2784i 0.0368585 + 0.0638407i
\(162\) 16.0924 9.29096i 0.0993359 0.0573516i
\(163\) 5.89159 0.0361447 0.0180724 0.999837i \(-0.494247\pi\)
0.0180724 + 0.999837i \(0.494247\pi\)
\(164\) 9.13224i 0.0556844i
\(165\) −193.343 + 111.627i −1.17178 + 0.676525i
\(166\) 266.048 + 153.603i 1.60270 + 0.925320i
\(167\) 142.140 82.0646i 0.851138 0.491405i −0.00989689 0.999951i \(-0.503150\pi\)
0.861035 + 0.508546i \(0.169817\pi\)
\(168\) −15.1207 + 26.1898i −0.0900042 + 0.155892i
\(169\) −84.4878 + 146.337i −0.499928 + 0.865900i
\(170\) 326.173i 1.91867i
\(171\) −32.5790 46.7718i −0.190521 0.273520i
\(172\) 6.59938 0.0383685
\(173\) 234.355 + 135.305i 1.35465 + 0.782109i 0.988897 0.148603i \(-0.0474775\pi\)
0.365755 + 0.930711i \(0.380811\pi\)
\(174\) −112.494 64.9486i −0.646519 0.373268i
\(175\) 18.2747 + 31.6527i 0.104427 + 0.180872i
\(176\) −170.610 + 295.505i −0.969374 + 1.67900i
\(177\) 29.9269 + 51.8349i 0.169078 + 0.292852i
\(178\) 149.678 0.840890
\(179\) 186.439i 1.04156i 0.853691 + 0.520779i \(0.174359\pi\)
−0.853691 + 0.520779i \(0.825641\pi\)
\(180\) −2.52891 4.38020i −0.0140495 0.0243344i
\(181\) −40.1939 + 23.2059i −0.222066 + 0.128210i −0.606906 0.794773i \(-0.707590\pi\)
0.384841 + 0.922983i \(0.374256\pi\)
\(182\) −0.730824 −0.00401552
\(183\) 94.8487i 0.518299i
\(184\) 35.0484 20.2352i 0.190481 0.109974i
\(185\) −237.291 137.000i −1.28265 0.740539i
\(186\) −52.9910 + 30.5944i −0.284898 + 0.164486i
\(187\) −247.408 + 428.524i −1.32304 + 2.29157i
\(188\) 3.85751 6.68140i 0.0205187 0.0355393i
\(189\) 11.7579i 0.0622112i
\(190\) −206.494 + 143.834i −1.08681 + 0.757021i
\(191\) −36.7222 −0.192263 −0.0961315 0.995369i \(-0.530647\pi\)
−0.0961315 + 0.995369i \(0.530647\pi\)
\(192\) 88.8909 + 51.3212i 0.462973 + 0.267298i
\(193\) −173.472 100.154i −0.898817 0.518932i −0.0220009 0.999758i \(-0.507004\pi\)
−0.876816 + 0.480826i \(0.840337\pi\)
\(194\) 83.4811 + 144.593i 0.430315 + 0.745327i
\(195\) −0.869047 + 1.50523i −0.00445665 + 0.00771915i
\(196\) −5.76606 9.98710i −0.0294187 0.0509546i
\(197\) −171.512 −0.870620 −0.435310 0.900281i \(-0.643361\pi\)
−0.435310 + 0.900281i \(0.643361\pi\)
\(198\) 124.454i 0.628557i
\(199\) −43.7500 75.7772i −0.219849 0.380790i 0.734913 0.678162i \(-0.237223\pi\)
−0.954762 + 0.297372i \(0.903890\pi\)
\(200\) 107.933 62.3152i 0.539666 0.311576i
\(201\) −132.140 −0.657411
\(202\) 316.624i 1.56744i
\(203\) 71.1820 41.0970i 0.350650 0.202448i
\(204\) −9.70824 5.60505i −0.0475894 0.0274758i
\(205\) −193.045 + 111.455i −0.941684 + 0.543682i
\(206\) 174.410 302.087i 0.846650 1.46644i
\(207\) 7.86749 13.6269i 0.0380072 0.0658304i
\(208\) 2.65650i 0.0127716i
\(209\) 380.391 32.3384i 1.82005 0.154729i
\(210\) 51.9103 0.247192
\(211\) 16.3950 + 9.46566i 0.0777014 + 0.0448609i 0.538347 0.842723i \(-0.319049\pi\)
−0.460646 + 0.887584i \(0.652382\pi\)
\(212\) 12.7247 + 7.34663i 0.0600224 + 0.0346539i
\(213\) −63.6080 110.172i −0.298629 0.517240i
\(214\) 143.556 248.646i 0.670823 1.16190i
\(215\) 80.5423 + 139.503i 0.374615 + 0.648853i
\(216\) 40.0936 0.185618
\(217\) 38.7178i 0.178423i
\(218\) 10.9177 + 18.9100i 0.0500810 + 0.0867429i
\(219\) 137.716 79.5103i 0.628840 0.363061i
\(220\) 33.8752 0.153978
\(221\) 3.85230i 0.0174312i
\(222\) −132.280 + 76.3717i −0.595854 + 0.344016i
\(223\) −224.162 129.420i −1.00521 0.580358i −0.0954244 0.995437i \(-0.530421\pi\)
−0.909786 + 0.415078i \(0.863754\pi\)
\(224\) 8.22727 4.75002i 0.0367289 0.0212054i
\(225\) 24.2283 41.9646i 0.107681 0.186509i
\(226\) −71.3939 + 123.658i −0.315902 + 0.547159i
\(227\) 129.054i 0.568522i 0.958747 + 0.284261i \(0.0917482\pi\)
−0.958747 + 0.284261i \(0.908252\pi\)
\(228\) 0.732630 + 8.61779i 0.00321329 + 0.0377973i
\(229\) −98.8946 −0.431854 −0.215927 0.976409i \(-0.569277\pi\)
−0.215927 + 0.976409i \(0.569277\pi\)
\(230\) −60.1617 34.7344i −0.261572 0.151019i
\(231\) −68.1994 39.3749i −0.295235 0.170454i
\(232\) −140.137 242.725i −0.604041 1.04623i
\(233\) 174.731 302.644i 0.749920 1.29890i −0.197941 0.980214i \(-0.563425\pi\)
0.947861 0.318685i \(-0.103241\pi\)
\(234\) 0.484457 + 0.839105i 0.00207033 + 0.00358592i
\(235\) 188.316 0.801346
\(236\) 9.08189i 0.0384826i
\(237\) 53.1300 + 92.0238i 0.224177 + 0.388286i
\(238\) 99.6394 57.5268i 0.418653 0.241709i
\(239\) 301.091 1.25979 0.629897 0.776679i \(-0.283097\pi\)
0.629897 + 0.776679i \(0.283097\pi\)
\(240\) 188.691i 0.786211i
\(241\) 110.242 63.6485i 0.457438 0.264102i −0.253529 0.967328i \(-0.581591\pi\)
0.710966 + 0.703226i \(0.248258\pi\)
\(242\) −505.518 291.861i −2.08892 1.20604i
\(243\) 13.5000 7.79423i 0.0555556 0.0320750i
\(244\) −7.19592 + 12.4637i −0.0294915 + 0.0510807i
\(245\) 140.744 243.776i 0.574465 0.995003i
\(246\) 124.263i 0.505133i
\(247\) 2.43882 1.69877i 0.00987376 0.00687759i
\(248\) −132.025 −0.532358
\(249\) 223.189 + 128.858i 0.896342 + 0.517503i
\(250\) 101.487 + 58.5937i 0.405949 + 0.234375i
\(251\) 177.023 + 306.613i 0.705271 + 1.22157i 0.966594 + 0.256314i \(0.0825081\pi\)
−0.261322 + 0.965252i \(0.584159\pi\)
\(252\) 0.892042 1.54506i 0.00353985 0.00613120i
\(253\) 52.6933 + 91.2675i 0.208274 + 0.360741i
\(254\) 61.1625 0.240797
\(255\) 273.628i 1.07305i
\(256\) −25.1234 43.5151i −0.0981384 0.169981i
\(257\) −236.669 + 136.641i −0.920889 + 0.531676i −0.883919 0.467641i \(-0.845104\pi\)
−0.0369706 + 0.999316i \(0.511771\pi\)
\(258\) 89.7979 0.348054
\(259\) 96.6500i 0.373166i
\(260\) 0.228396 0.131865i 0.000878447 0.000507171i
\(261\) −94.3720 54.4857i −0.361579 0.208757i
\(262\) 102.464 59.1579i 0.391086 0.225793i
\(263\) −75.5642 + 130.881i −0.287316 + 0.497646i −0.973168 0.230095i \(-0.926096\pi\)
0.685852 + 0.727741i \(0.259430\pi\)
\(264\) −134.265 + 232.555i −0.508581 + 0.880889i
\(265\) 358.649i 1.35339i
\(266\) −80.3576 37.7120i −0.302096 0.141774i
\(267\) 125.566 0.470284
\(268\) 17.3639 + 10.0251i 0.0647909 + 0.0374070i
\(269\) 58.9364 + 34.0269i 0.219094 + 0.126494i 0.605531 0.795822i \(-0.292961\pi\)
−0.386437 + 0.922316i \(0.626294\pi\)
\(270\) −34.4109 59.6015i −0.127448 0.220746i
\(271\) 56.8991 98.5521i 0.209960 0.363661i −0.741742 0.670685i \(-0.766000\pi\)
0.951702 + 0.307025i \(0.0993334\pi\)
\(272\) −209.106 362.183i −0.768773 1.33155i
\(273\) −0.613092 −0.00224576
\(274\) 195.935i 0.715093i
\(275\) 162.271 + 281.062i 0.590078 + 1.02204i
\(276\) −2.06767 + 1.19377i −0.00749156 + 0.00432526i
\(277\) 440.910 1.59173 0.795867 0.605472i \(-0.207016\pi\)
0.795867 + 0.605472i \(0.207016\pi\)
\(278\) 376.902i 1.35576i
\(279\) −44.4544 + 25.6657i −0.159335 + 0.0919919i
\(280\) 96.9993 + 56.0026i 0.346426 + 0.200009i
\(281\) 78.0928 45.0869i 0.277910 0.160452i −0.354567 0.935031i \(-0.615372\pi\)
0.632477 + 0.774579i \(0.282038\pi\)
\(282\) 52.4892 90.9140i 0.186132 0.322390i
\(283\) 34.5331 59.8131i 0.122025 0.211354i −0.798541 0.601940i \(-0.794394\pi\)
0.920566 + 0.390587i \(0.127728\pi\)
\(284\) 19.3031i 0.0679685i
\(285\) −173.229 + 120.663i −0.607821 + 0.423379i
\(286\) −6.48941 −0.0226902
\(287\) −68.0944 39.3143i −0.237263 0.136984i
\(288\) −10.9076 6.29750i −0.0378736 0.0218663i
\(289\) −158.734 274.935i −0.549252 0.951332i
\(290\) −240.550 + 416.645i −0.829484 + 1.43671i
\(291\) 70.0326 + 121.300i 0.240662 + 0.416839i
\(292\) −24.1289 −0.0826334
\(293\) 410.238i 1.40013i −0.714079 0.700065i \(-0.753154\pi\)
0.714079 0.700065i \(-0.246846\pi\)
\(294\) −78.4589 135.895i −0.266867 0.462227i
\(295\) 191.981 110.840i 0.650782 0.375729i
\(296\) −329.569 −1.11341
\(297\) 104.405i 0.351533i
\(298\) 19.6842 11.3647i 0.0660544 0.0381365i
\(299\) 0.710545 + 0.410233i 0.00237640 + 0.00137202i
\(300\) −6.36749 + 3.67627i −0.0212250 + 0.0122542i
\(301\) −28.4103 + 49.2081i −0.0943864 + 0.163482i
\(302\) −246.568 + 427.068i −0.816451 + 1.41413i
\(303\) 265.617i 0.876624i
\(304\) −137.081 + 292.095i −0.450923 + 0.960838i
\(305\) −351.291 −1.15177
\(306\) −132.100 76.2681i −0.431700 0.249242i
\(307\) −201.882 116.556i −0.657595 0.379663i 0.133765 0.991013i \(-0.457293\pi\)
−0.791360 + 0.611350i \(0.790627\pi\)
\(308\) 5.97454 + 10.3482i 0.0193979 + 0.0335981i
\(309\) 146.313 253.422i 0.473506 0.820136i
\(310\) 113.312 + 196.263i 0.365524 + 0.633106i
\(311\) −441.280 −1.41891 −0.709454 0.704752i \(-0.751058\pi\)
−0.709454 + 0.704752i \(0.751058\pi\)
\(312\) 2.09059i 0.00670062i
\(313\) −60.6339 105.021i −0.193719 0.335530i 0.752761 0.658294i \(-0.228722\pi\)
−0.946480 + 0.322763i \(0.895388\pi\)
\(314\) −81.5796 + 47.1000i −0.259808 + 0.150000i
\(315\) 43.5478 0.138247
\(316\) 16.1233i 0.0510232i
\(317\) 286.409 165.358i 0.903499 0.521635i 0.0251649 0.999683i \(-0.491989\pi\)
0.878334 + 0.478048i \(0.158656\pi\)
\(318\) 173.146 + 99.9658i 0.544484 + 0.314358i
\(319\) 632.066 364.924i 1.98140 1.14396i
\(320\) 190.078 329.225i 0.593995 1.02883i
\(321\) 120.430 208.591i 0.375171 0.649815i
\(322\) 24.5042i 0.0761001i
\(323\) −198.786 + 423.579i −0.615437 + 1.31139i
\(324\) −2.36531 −0.00730034
\(325\) 2.18816 + 1.26333i 0.00673279 + 0.00388718i
\(326\) −10.5344 6.08206i −0.0323142 0.0186566i
\(327\) 9.15888 + 15.8636i 0.0280088 + 0.0485127i
\(328\) −134.059 + 232.197i −0.408716 + 0.707916i
\(329\) 33.2131 + 57.5268i 0.100952 + 0.174854i
\(330\) 460.941 1.39679
\(331\) 436.308i 1.31815i 0.752077 + 0.659075i \(0.229052\pi\)
−0.752077 + 0.659075i \(0.770948\pi\)
\(332\) −19.5523 33.8655i −0.0588924 0.102005i
\(333\) −110.970 + 64.0685i −0.333243 + 0.192398i
\(334\) −338.870 −1.01458
\(335\) 489.406i 1.46091i
\(336\) 57.6412 33.2792i 0.171551 0.0990452i
\(337\) −217.027 125.301i −0.643997 0.371812i 0.142156 0.989844i \(-0.454597\pi\)
−0.786153 + 0.618033i \(0.787930\pi\)
\(338\) 302.136 174.438i 0.893894 0.516090i
\(339\) −59.8927 + 103.737i −0.176675 + 0.306009i
\(340\) −20.7594 + 35.9564i −0.0610572 + 0.105754i
\(341\) 343.798i 1.00821i
\(342\) 9.96891 + 117.263i 0.0291489 + 0.342873i
\(343\) 210.169 0.612738
\(344\) 167.796 + 96.8770i 0.487779 + 0.281619i
\(345\) −50.4699 29.1388i −0.146290 0.0844603i
\(346\) −279.358 483.862i −0.807393 1.39845i
\(347\) −83.6670 + 144.915i −0.241115 + 0.417624i −0.961032 0.276436i \(-0.910846\pi\)
0.719917 + 0.694060i \(0.244180\pi\)
\(348\) 8.26737 + 14.3195i 0.0237568 + 0.0411480i
\(349\) −486.776 −1.39477 −0.697387 0.716695i \(-0.745654\pi\)
−0.697387 + 0.716695i \(0.745654\pi\)
\(350\) 75.4619i 0.215605i
\(351\) 0.406413 + 0.703929i 0.00115787 + 0.00200550i
\(352\) 73.0547 42.1781i 0.207542 0.119824i
\(353\) 30.1507 0.0854128 0.0427064 0.999088i \(-0.486402\pi\)
0.0427064 + 0.999088i \(0.486402\pi\)
\(354\) 123.577i 0.349089i
\(355\) −408.045 + 235.585i −1.14942 + 0.663619i
\(356\) −16.5001 9.52635i −0.0463486 0.0267594i
\(357\) 83.5879 48.2595i 0.234140 0.135181i
\(358\) 192.466 333.361i 0.537615 0.931177i
\(359\) −75.0088 + 129.919i −0.208938 + 0.361891i −0.951380 0.308019i \(-0.900334\pi\)
0.742442 + 0.669910i \(0.233667\pi\)
\(360\) 148.495i 0.412485i
\(361\) 355.819 60.9394i 0.985649 0.168807i
\(362\) 95.8247 0.264709
\(363\) −424.081 244.843i −1.16827 0.674500i
\(364\) 0.0805640 + 0.0465136i 0.000221330 + 0.000127785i
\(365\) −294.482 510.058i −0.806801 1.39742i
\(366\) −97.9151 + 169.594i −0.267527 + 0.463371i
\(367\) 248.090 + 429.704i 0.675994 + 1.17086i 0.976177 + 0.216975i \(0.0696189\pi\)
−0.300183 + 0.953882i \(0.597048\pi\)
\(368\) −89.0714 −0.242042
\(369\) 104.245i 0.282506i
\(370\) 282.858 + 489.924i 0.764480 + 1.32412i
\(371\) −109.560 + 63.2545i −0.295310 + 0.170497i
\(372\) 7.78877 0.0209375
\(373\) 449.613i 1.20540i −0.797969 0.602698i \(-0.794092\pi\)
0.797969 0.602698i \(-0.205908\pi\)
\(374\) 884.755 510.814i 2.36566 1.36581i
\(375\) 85.1381 + 49.1545i 0.227035 + 0.131079i
\(376\) 196.162 113.254i 0.521707 0.301208i
\(377\) 2.84104 4.92083i 0.00753592 0.0130526i
\(378\) 12.1380 21.0237i 0.0321112 0.0556182i
\(379\) 471.336i 1.24363i 0.783163 + 0.621816i \(0.213605\pi\)
−0.783163 + 0.621816i \(0.786395\pi\)
\(380\) 31.9177 2.71344i 0.0839940 0.00714064i
\(381\) 51.3095 0.134670
\(382\) 65.6611 + 37.9094i 0.171888 + 0.0992393i
\(383\) −23.4258 13.5249i −0.0611641 0.0353131i 0.469106 0.883142i \(-0.344576\pi\)
−0.530270 + 0.847829i \(0.677910\pi\)
\(384\) −120.504 208.719i −0.313813 0.543540i
\(385\) −145.833 + 252.590i −0.378787 + 0.656078i
\(386\) 206.784 + 358.160i 0.535709 + 0.927875i
\(387\) 75.3319 0.194656
\(388\) 21.2528i 0.0547752i
\(389\) 177.144 + 306.822i 0.455382 + 0.788745i 0.998710 0.0507758i \(-0.0161694\pi\)
−0.543328 + 0.839520i \(0.682836\pi\)
\(390\) 3.10779 1.79428i 0.00796870 0.00460073i
\(391\) −129.166 −0.330348
\(392\) 338.576i 0.863715i
\(393\) 85.9579 49.6278i 0.218722 0.126279i
\(394\) 306.672 + 177.057i 0.778354 + 0.449383i
\(395\) 340.829 196.777i 0.862857 0.498171i
\(396\) 7.92095 13.7195i 0.0200024 0.0346452i
\(397\) −79.5105 + 137.716i −0.200278 + 0.346892i −0.948618 0.316423i \(-0.897518\pi\)
0.748340 + 0.663316i \(0.230851\pi\)
\(398\) 180.657i 0.453913i
\(399\) −67.4123 31.6367i −0.168953 0.0792901i
\(400\) −274.299 −0.685748
\(401\) −277.534 160.234i −0.692105 0.399587i 0.112295 0.993675i \(-0.464180\pi\)
−0.804400 + 0.594088i \(0.797513\pi\)
\(402\) 236.272 + 136.412i 0.587741 + 0.339332i
\(403\) −1.33829 2.31798i −0.00332081 0.00575181i
\(404\) 20.1517 34.9037i 0.0498803 0.0863953i
\(405\) −28.8675 50.0000i −0.0712777 0.123457i
\(406\) −169.702 −0.417986
\(407\) 858.211i 2.10863i
\(408\) −164.561 285.028i −0.403336 0.698599i
\(409\) −251.776 + 145.363i −0.615590 + 0.355411i −0.775150 0.631777i \(-0.782326\pi\)
0.159560 + 0.987188i \(0.448992\pi\)
\(410\) 460.232 1.12252
\(411\) 164.371i 0.399930i
\(412\) −38.4529 + 22.2008i −0.0933323 + 0.0538854i
\(413\) 67.7189 + 39.0975i 0.163968 + 0.0946671i
\(414\) −28.1349 + 16.2437i −0.0679586 + 0.0392359i
\(415\) 477.253 826.626i 1.15001 1.99187i
\(416\) 0.328370 0.568753i 0.000789350 0.00136719i
\(417\) 316.185i 0.758237i
\(418\) −713.541 334.866i −1.70704 0.801115i
\(419\) −141.846 −0.338535 −0.169267 0.985570i \(-0.554140\pi\)
−0.169267 + 0.985570i \(0.554140\pi\)
\(420\) −5.72245 3.30386i −0.0136249 0.00786632i
\(421\) 98.6666 + 56.9652i 0.234362 + 0.135309i 0.612583 0.790406i \(-0.290131\pi\)
−0.378220 + 0.925716i \(0.623464\pi\)
\(422\) −19.5433 33.8501i −0.0463112 0.0802134i
\(423\) 44.0334 76.2681i 0.104098 0.180303i
\(424\) 215.693 + 373.591i 0.508710 + 0.881111i
\(425\) −397.773 −0.935936
\(426\) 262.657i 0.616567i
\(427\) −61.9568 107.312i −0.145098 0.251317i
\(428\) −31.6504 + 18.2734i −0.0739496 + 0.0426948i
\(429\) −5.44399 −0.0126900
\(430\) 332.585i 0.773453i
\(431\) 229.263 132.365i 0.531932 0.307111i −0.209871 0.977729i \(-0.567304\pi\)
0.741803 + 0.670618i \(0.233971\pi\)
\(432\) −76.4198 44.1210i −0.176898 0.102132i
\(433\) −631.333 + 364.500i −1.45804 + 0.841802i −0.998915 0.0465669i \(-0.985172\pi\)
−0.459129 + 0.888369i \(0.651839\pi\)
\(434\) −39.9695 + 69.2293i −0.0920957 + 0.159514i
\(435\) −201.799 + 349.526i −0.463905 + 0.803507i
\(436\) 2.77944i 0.00637486i
\(437\) 56.9589 + 81.7726i 0.130341 + 0.187123i
\(438\) −328.323 −0.749596
\(439\) 319.591 + 184.516i 0.727998 + 0.420310i 0.817689 0.575660i \(-0.195255\pi\)
−0.0896911 + 0.995970i \(0.528588\pi\)
\(440\) 861.312 + 497.279i 1.95753 + 1.13018i
\(441\) −65.8195 114.003i −0.149251 0.258510i
\(442\) 3.97684 6.88809i 0.00899738 0.0155839i
\(443\) −291.547 504.975i −0.658120 1.13990i −0.981102 0.193492i \(-0.938019\pi\)
0.322982 0.946405i \(-0.395315\pi\)
\(444\) 19.4428 0.0437902
\(445\) 465.058i 1.04507i
\(446\) 267.208 + 462.818i 0.599121 + 1.03771i
\(447\) 16.5132 9.53389i 0.0369422 0.0213286i
\(448\) 134.096 0.299321
\(449\) 314.423i 0.700273i 0.936699 + 0.350137i \(0.113865\pi\)
−0.936699 + 0.350137i \(0.886135\pi\)
\(450\) −86.6426 + 50.0231i −0.192539 + 0.111162i
\(451\) −604.649 349.094i −1.34068 0.774045i
\(452\) 15.7405 9.08779i 0.0348242 0.0201057i
\(453\) −206.847 + 358.270i −0.456616 + 0.790882i
\(454\) 133.227 230.755i 0.293451 0.508272i
\(455\) 2.27071i 0.00499057i
\(456\) −107.879 + 229.871i −0.236576 + 0.504103i
\(457\) 505.253 1.10559 0.552793 0.833319i \(-0.313562\pi\)
0.552793 + 0.833319i \(0.313562\pi\)
\(458\) 176.828 + 102.092i 0.386088 + 0.222908i
\(459\) −110.820 63.9817i −0.241437 0.139394i
\(460\) 4.42137 + 7.65803i 0.00961167 + 0.0166479i
\(461\) 136.902 237.122i 0.296968 0.514364i −0.678473 0.734626i \(-0.737358\pi\)
0.975441 + 0.220262i \(0.0706912\pi\)
\(462\) 81.2957 + 140.808i 0.175965 + 0.304780i
\(463\) 319.780 0.690669 0.345334 0.938480i \(-0.387765\pi\)
0.345334 + 0.938480i \(0.387765\pi\)
\(464\) 616.857i 1.32943i
\(465\) 95.0582 + 164.646i 0.204426 + 0.354077i
\(466\) −624.855 + 360.760i −1.34089 + 0.774164i
\(467\) −295.510 −0.632785 −0.316392 0.948628i \(-0.602472\pi\)
−0.316392 + 0.948628i \(0.602472\pi\)
\(468\) 0.123334i 0.000263534i
\(469\) −149.504 + 86.3159i −0.318771 + 0.184042i
\(470\) −336.718 194.404i −0.716421 0.413626i
\(471\) −68.4375 + 39.5124i −0.145303 + 0.0838905i
\(472\) 133.319 230.916i 0.282457 0.489229i
\(473\) −252.271 + 436.947i −0.533344 + 0.923778i
\(474\) 219.390i 0.462849i
\(475\) 175.408 + 251.822i 0.369279 + 0.530153i
\(476\) −14.6453 −0.0307674
\(477\) 145.253 + 83.8618i 0.304513 + 0.175811i
\(478\) −538.364 310.825i −1.12629 0.650261i
\(479\) 204.559 + 354.306i 0.427054 + 0.739679i 0.996610 0.0822735i \(-0.0262181\pi\)
−0.569556 + 0.821953i \(0.692885\pi\)
\(480\) −23.3240 + 40.3984i −0.0485917 + 0.0841634i
\(481\) −3.34072 5.78629i −0.00694536 0.0120297i
\(482\) −262.825 −0.545280
\(483\) 20.5567i 0.0425605i
\(484\) 37.1512 + 64.3478i 0.0767588 + 0.132950i
\(485\) 449.259 259.380i 0.926308 0.534804i
\(486\) −32.1848 −0.0662239
\(487\) 638.208i 1.31049i 0.755417 + 0.655244i \(0.227434\pi\)
−0.755417 + 0.655244i \(0.772566\pi\)
\(488\) −365.927 + 211.268i −0.749850 + 0.432926i
\(489\) −8.83738 5.10227i −0.0180724 0.0104341i
\(490\) −503.314 + 290.588i −1.02717 + 0.593037i
\(491\) −173.278 + 300.126i −0.352908 + 0.611255i −0.986758 0.162202i \(-0.948141\pi\)
0.633850 + 0.773456i \(0.281474\pi\)
\(492\) 7.90876 13.6984i 0.0160747 0.0278422i
\(493\) 894.530i 1.81446i
\(494\) −6.11440 + 0.519808i −0.0123773 + 0.00105224i
\(495\) 386.686 0.781184
\(496\) 251.644 + 145.287i 0.507347 + 0.292917i
\(497\) −143.933 83.0997i −0.289603 0.167203i
\(498\) −266.048 460.809i −0.534234 0.925320i
\(499\) −40.3510 + 69.8900i −0.0808638 + 0.140060i −0.903621 0.428333i \(-0.859101\pi\)
0.822757 + 0.568393i \(0.192435\pi\)
\(500\) −7.45844 12.9184i −0.0149169 0.0258368i
\(501\) −284.280 −0.567425
\(502\) 730.984i 1.45614i
\(503\) −247.050 427.903i −0.491153 0.850701i 0.508796 0.860887i \(-0.330091\pi\)
−0.999948 + 0.0101862i \(0.996758\pi\)
\(504\) 45.3621 26.1898i 0.0900042 0.0519640i
\(505\) 983.766 1.94805
\(506\) 217.587i 0.430014i
\(507\) 253.463 146.337i 0.499928 0.288633i
\(508\) −6.74237 3.89271i −0.0132724 0.00766282i
\(509\) 63.9084 36.8975i 0.125557 0.0724902i −0.435906 0.899992i \(-0.643572\pi\)
0.561463 + 0.827502i \(0.310239\pi\)
\(510\) −282.474 + 489.260i −0.553871 + 0.959333i
\(511\) 103.875 179.917i 0.203278 0.352088i
\(512\) 452.842i 0.884457i
\(513\) 8.36297 + 98.3721i 0.0163021 + 0.191758i
\(514\) 564.232 1.09773
\(515\) −938.599 541.900i −1.82252 1.05223i
\(516\) −9.89907 5.71523i −0.0191842 0.0110760i
\(517\) 294.918 + 510.814i 0.570442 + 0.988034i
\(518\) −99.7746 + 172.815i −0.192615 + 0.333619i
\(519\) −234.355 405.914i −0.451551 0.782109i
\(520\) 7.74294 0.0148903
\(521\) 357.582i 0.686337i 0.939274 + 0.343169i \(0.111500\pi\)
−0.939274 + 0.343169i \(0.888500\pi\)
\(522\) 112.494 + 194.846i 0.215506 + 0.373268i
\(523\) 382.935 221.088i 0.732190 0.422730i −0.0870328 0.996205i \(-0.527739\pi\)
0.819223 + 0.573475i \(0.194405\pi\)
\(524\) −15.0605 −0.0287415
\(525\) 63.3053i 0.120582i
\(526\) 270.225 156.014i 0.513735 0.296605i
\(527\) 364.919 + 210.686i 0.692447 + 0.399784i
\(528\) 511.829 295.505i 0.969374 0.559668i
\(529\) 250.745 434.303i 0.473998 0.820989i
\(530\) 370.243 641.281i 0.698573 1.20996i
\(531\) 103.670i 0.195235i
\(532\) 6.45819 + 9.27165i 0.0121395 + 0.0174279i
\(533\) −5.43561 −0.0101981
\(534\) −224.518 129.625i −0.420445 0.242744i
\(535\) −772.557 446.036i −1.44403 0.833712i
\(536\) 294.331 + 509.796i 0.549124 + 0.951111i
\(537\) 161.461 279.658i 0.300672 0.520779i
\(538\) −70.2539 121.683i −0.130584 0.226177i
\(539\) 881.666 1.63574
\(540\) 8.76040i 0.0162230i
\(541\) −487.737 844.785i −0.901547 1.56152i −0.825487 0.564421i \(-0.809099\pi\)
−0.0760596 0.997103i \(-0.524234\pi\)
\(542\) −203.476 + 117.477i −0.375418 + 0.216747i
\(543\) 80.3877 0.148044
\(544\) 103.390i 0.190056i
\(545\) 58.7542 33.9217i 0.107806 0.0622417i
\(546\) 1.09624 + 0.632912i 0.00200776 + 0.00115918i
\(547\) 350.050 202.102i 0.639945 0.369473i −0.144648 0.989483i \(-0.546205\pi\)
0.784594 + 0.620010i \(0.212872\pi\)
\(548\) −12.4704 + 21.5994i −0.0227562 + 0.0394149i
\(549\) −82.1414 + 142.273i −0.149620 + 0.259149i
\(550\) 670.070i 1.21831i
\(551\) 566.310 394.465i 1.02779 0.715907i
\(552\) −70.0968 −0.126987
\(553\) 120.223 + 69.4109i 0.217402 + 0.125517i
\(554\) −788.368 455.164i −1.42305 0.821596i
\(555\) 237.291 + 410.999i 0.427551 + 0.740539i
\(556\) 23.9881 41.5486i 0.0431441 0.0747277i
\(557\) −29.9352 51.8492i −0.0537435 0.0930866i 0.837902 0.545821i \(-0.183782\pi\)
−0.891646 + 0.452734i \(0.850449\pi\)
\(558\) 105.982 0.189932
\(559\) 3.92802i 0.00702687i
\(560\) −123.256 213.486i −0.220100 0.381225i
\(561\) 742.225 428.524i 1.32304 0.763857i
\(562\) −186.178 −0.331278
\(563\) 247.579i 0.439749i −0.975528 0.219874i \(-0.929435\pi\)
0.975528 0.219874i \(-0.0705648\pi\)
\(564\) −11.5725 + 6.68140i −0.0205187 + 0.0118464i
\(565\) 384.211 + 221.824i 0.680020 + 0.392610i
\(566\) −123.494 + 71.2990i −0.218186 + 0.125970i
\(567\) 10.1827 17.6369i 0.0179588 0.0311056i
\(568\) −283.363 + 490.800i −0.498879 + 0.864084i
\(569\) 76.4991i 0.134445i 0.997738 + 0.0672224i \(0.0214137\pi\)
−0.997738 + 0.0672224i \(0.978586\pi\)
\(570\) 434.305 36.9219i 0.761939 0.0647752i
\(571\) −624.523 −1.09373 −0.546867 0.837219i \(-0.684180\pi\)
−0.546867 + 0.837219i \(0.684180\pi\)
\(572\) 0.715374 + 0.413021i 0.00125065 + 0.000722065i
\(573\) 55.0834 + 31.8024i 0.0961315 + 0.0555016i
\(574\) 81.1706 + 140.592i 0.141412 + 0.244933i
\(575\) −42.3590 + 73.3680i −0.0736679 + 0.127597i
\(576\) −88.8909 153.964i −0.154324 0.267298i
\(577\) 185.550 0.321577 0.160789 0.986989i \(-0.448596\pi\)
0.160789 + 0.986989i \(0.448596\pi\)
\(578\) 655.462i 1.13402i
\(579\) 173.472 + 300.462i 0.299606 + 0.518932i
\(580\) 53.0352 30.6199i 0.0914399 0.0527929i
\(581\) 336.690 0.579501
\(582\) 289.187i 0.496885i
\(583\) −972.846 + 561.673i −1.66869 + 0.963418i
\(584\) −613.503 354.206i −1.05052 0.606517i
\(585\) 2.60714 1.50523i 0.00445665 0.00257305i
\(586\) −423.501 + 733.525i −0.722698 + 1.25175i
\(587\) −130.891 + 226.710i −0.222983 + 0.386218i −0.955712 0.294302i \(-0.904913\pi\)
0.732729 + 0.680520i \(0.238246\pi\)
\(588\) 19.9742i 0.0339697i
\(589\) −27.5386 323.931i −0.0467548 0.549968i
\(590\) −457.694 −0.775752
\(591\) 257.268 + 148.534i 0.435310 + 0.251326i
\(592\) 628.170 + 362.674i 1.06110 + 0.612626i
\(593\) −124.254 215.215i −0.209535 0.362925i 0.742033 0.670363i \(-0.233862\pi\)
−0.951568 + 0.307438i \(0.900528\pi\)
\(594\) 107.781 186.681i 0.181449 0.314279i
\(595\) −178.739 309.585i −0.300401 0.520310i
\(596\) −2.89324 −0.00485443
\(597\) 151.554i 0.253860i
\(598\) −0.846992 1.46703i −0.00141637 0.00245323i
\(599\) −167.646 + 96.7905i −0.279877 + 0.161587i −0.633368 0.773851i \(-0.718328\pi\)
0.353491 + 0.935438i \(0.384995\pi\)
\(600\) −215.866 −0.359777
\(601\) 675.975i 1.12475i 0.826882 + 0.562375i \(0.190112\pi\)
−0.826882 + 0.562375i \(0.809888\pi\)
\(602\) 101.598 58.6576i 0.168767 0.0974378i
\(603\) 198.209 + 114.436i 0.328706 + 0.189778i
\(604\) 54.3619 31.3859i 0.0900032 0.0519634i
\(605\) −906.827 + 1570.67i −1.49889 + 2.59615i
\(606\) 274.204 474.935i 0.452482 0.783722i
\(607\) 383.052i 0.631057i −0.948916 0.315528i \(-0.897818\pi\)
0.948916 0.315528i \(-0.102182\pi\)
\(608\) 65.4546 45.5925i 0.107656 0.0749877i
\(609\) −142.364 −0.233767
\(610\) 628.125 + 362.648i 1.02971 + 0.594505i
\(611\) 3.97684 + 2.29603i 0.00650874 + 0.00375782i
\(612\) 9.70824 + 16.8152i 0.0158631 + 0.0274758i
\(613\) −27.5410 + 47.7025i −0.0449283 + 0.0778180i −0.887615 0.460586i \(-0.847639\pi\)
0.842687 + 0.538404i \(0.180973\pi\)
\(614\) 240.649 + 416.817i 0.391937 + 0.678854i
\(615\) 386.091 0.627789
\(616\) 350.818i 0.569510i
\(617\) −51.7851 89.6944i −0.0839305 0.145372i 0.821004 0.570922i \(-0.193414\pi\)
−0.904935 + 0.425550i \(0.860081\pi\)
\(618\) −523.230 + 302.087i −0.846650 + 0.488814i
\(619\) −263.102 −0.425043 −0.212521 0.977156i \(-0.568168\pi\)
−0.212521 + 0.977156i \(0.568168\pi\)
\(620\) 28.8473i 0.0465278i
\(621\) −23.6025 + 13.6269i −0.0380072 + 0.0219435i
\(622\) 789.030 + 455.547i 1.26854 + 0.732390i
\(623\) 142.066 82.0218i 0.228035 0.131656i
\(624\) 2.30060 3.98475i 0.00368685 0.00638581i
\(625\) 383.956 665.031i 0.614329 1.06405i
\(626\) 250.377i 0.399963i
\(627\) −598.593 280.921i −0.954693 0.448039i
\(628\) 11.9908 0.0190936
\(629\) 910.936 + 525.929i 1.44823 + 0.836135i
\(630\) −77.8655 44.9557i −0.123596 0.0713582i
\(631\) 72.5474 + 125.656i 0.114972 + 0.199137i 0.917769 0.397116i \(-0.129989\pi\)
−0.802797 + 0.596253i \(0.796655\pi\)
\(632\) 236.686 409.952i 0.374503 0.648658i
\(633\) −16.3950 28.3970i −0.0259005 0.0448609i
\(634\) −682.817 −1.07700
\(635\) 190.035i 0.299267i
\(636\) −12.7247 22.0399i −0.0200075 0.0346539i
\(637\) 5.94443 3.43202i 0.00933192 0.00538779i
\(638\) −1506.88 −2.36189
\(639\) 220.344i 0.344827i
\(640\) −773.034 + 446.311i −1.20787 + 0.697361i
\(641\) −583.796 337.055i −0.910758 0.525826i −0.0300832 0.999547i \(-0.509577\pi\)
−0.880675 + 0.473721i \(0.842911\pi\)
\(642\) −430.668 + 248.646i −0.670823 + 0.387300i
\(643\) 0.719856 1.24683i 0.00111953 0.00193908i −0.865465 0.500969i \(-0.832977\pi\)
0.866585 + 0.499030i \(0.166310\pi\)
\(644\) −1.55958 + 2.70128i −0.00242171 + 0.00419453i
\(645\) 279.007i 0.432569i
\(646\) 792.711 552.165i 1.22711 0.854745i
\(647\) −614.044 −0.949063 −0.474532 0.880239i \(-0.657383\pi\)
−0.474532 + 0.880239i \(0.657383\pi\)
\(648\) −60.1404 34.7221i −0.0928092 0.0535834i
\(649\) 601.315 + 347.169i 0.926525 + 0.534929i
\(650\) −2.60835 4.51779i −0.00401284 0.00695045i
\(651\) −33.5306 + 58.0768i −0.0515064 + 0.0892116i
\(652\) 0.774191 + 1.34094i 0.00118741 + 0.00205665i
\(653\) 822.374 1.25938 0.629689 0.776847i \(-0.283182\pi\)
0.629689 + 0.776847i \(0.283182\pi\)
\(654\) 37.8199i 0.0578286i
\(655\) −183.807 318.362i −0.280621 0.486049i
\(656\) 511.041 295.050i 0.779027 0.449771i
\(657\) −275.432 −0.419227
\(658\) 137.147i 0.208431i
\(659\) −549.386 + 317.188i −0.833666 + 0.481317i −0.855106 0.518453i \(-0.826508\pi\)
0.0214404 + 0.999770i \(0.493175\pi\)
\(660\) −50.8129 29.3368i −0.0769892 0.0444497i
\(661\) −818.470 + 472.544i −1.23823 + 0.714893i −0.968732 0.248108i \(-0.920191\pi\)
−0.269498 + 0.963001i \(0.586858\pi\)
\(662\) 450.413 780.138i 0.680382 1.17846i
\(663\) 3.33619 5.77845i 0.00503196 0.00871561i
\(664\) 1148.09i 1.72905i
\(665\) −117.173 + 249.675i −0.176200 + 0.375451i
\(666\) 264.559 0.397236
\(667\) 164.993 + 95.2590i 0.247366 + 0.142817i
\(668\) 37.3561 + 21.5676i 0.0559223 + 0.0322868i
\(669\) 224.162 + 388.260i 0.335070 + 0.580358i
\(670\) 505.228 875.080i 0.754071 1.30609i
\(671\) −550.150 952.888i −0.819896 1.42010i
\(672\) −16.4545 −0.0244859
\(673\) 570.803i 0.848147i 0.905628 + 0.424074i \(0.139400\pi\)
−0.905628 + 0.424074i \(0.860600\pi\)
\(674\) 258.703 + 448.086i 0.383832 + 0.664817i
\(675\) −72.6848 + 41.9646i −0.107681 + 0.0621698i
\(676\) −44.4088 −0.0656935
\(677\) 275.976i 0.407646i 0.979008 + 0.203823i \(0.0653367\pi\)
−0.979008 + 0.203823i \(0.934663\pi\)
\(678\) 214.182 123.658i 0.315902 0.182386i
\(679\) 158.471 + 91.4931i 0.233388 + 0.134747i
\(680\) −1055.66 + 609.485i −1.55244 + 0.896302i
\(681\) 111.764 193.582i 0.164118 0.284261i
\(682\) −354.913 + 614.727i −0.520400 + 0.901359i
\(683\) 106.224i 0.155525i −0.996972 0.0777627i \(-0.975222\pi\)
0.996972 0.0777627i \(-0.0247776\pi\)
\(684\) 6.36428 13.5612i 0.00930450 0.0198263i
\(685\) −608.781 −0.888732
\(686\) −375.792 216.964i −0.547802 0.316274i
\(687\) 148.342 + 85.6453i 0.215927 + 0.124666i
\(688\) −213.217 369.302i −0.309908 0.536776i
\(689\) −4.37279 + 7.57390i −0.00634658 + 0.0109926i
\(690\) 60.1617 + 104.203i 0.0871908 + 0.151019i
\(691\) 244.177 0.353367 0.176684 0.984268i \(-0.443463\pi\)
0.176684 + 0.984268i \(0.443463\pi\)
\(692\) 71.1195i 0.102774i
\(693\) 68.1994 + 118.125i 0.0984118 + 0.170454i
\(694\) 299.201 172.744i 0.431125 0.248910i
\(695\) 1171.05 1.68497
\(696\) 485.450i 0.697486i
\(697\) 741.082 427.864i 1.06325 0.613865i
\(698\) 870.378 + 502.513i 1.24696 + 0.719932i
\(699\) −524.194 + 302.644i −0.749920 + 0.432966i
\(700\) −4.80281 + 8.31871i −0.00686115 + 0.0118839i
\(701\) 143.276 248.161i 0.204388 0.354010i −0.745550 0.666450i \(-0.767813\pi\)
0.949938 + 0.312440i \(0.101146\pi\)
\(702\) 1.67821i 0.00239061i
\(703\) −68.7436 808.618i −0.0977860 1.15024i
\(704\) 1190.71 1.69135
\(705\) −282.474 163.087i −0.400673 0.231329i
\(706\) −53.9108 31.1254i −0.0763610 0.0440870i
\(707\) 173.506 + 300.521i 0.245411 + 0.425065i
\(708\) −7.86514 + 13.6228i −0.0111090 + 0.0192413i
\(709\) −5.70585 9.88282i −0.00804774 0.0139391i 0.861973 0.506953i \(-0.169228\pi\)
−0.870021 + 0.493014i \(0.835895\pi\)
\(710\) 972.804 1.37015
\(711\) 184.048i 0.258857i
\(712\) −279.688 484.434i −0.392820 0.680385i
\(713\) 77.7209 44.8722i 0.109006 0.0629344i
\(714\) −199.279 −0.279102
\(715\) 20.1629i 0.0281999i
\(716\) −42.4339 + 24.4992i −0.0592652 + 0.0342168i
\(717\) −451.636 260.752i −0.629897 0.363671i
\(718\) 268.238 154.867i 0.373591 0.215693i
\(719\) 438.491 759.488i 0.609862 1.05631i −0.381401 0.924410i \(-0.624558\pi\)
0.991263 0.131902i \(-0.0421084\pi\)
\(720\) −163.411 + 283.036i −0.226960 + 0.393106i
\(721\) 382.298i 0.530232i
\(722\) −699.131 258.360i −0.968325 0.357839i
\(723\) −220.485 −0.304958
\(724\) −10.5634 6.09880i −0.0145904 0.00842376i
\(725\) 508.105 + 293.354i 0.700834 + 0.404627i
\(726\) 505.518 + 875.583i 0.696306 + 1.20604i
\(727\) −360.167 + 623.827i −0.495415 + 0.858084i −0.999986 0.00528653i \(-0.998317\pi\)
0.504571 + 0.863370i \(0.331651\pi\)
\(728\) 1.36561 + 2.36531i 0.00187584 + 0.00324905i
\(729\) −27.0000 −0.0370370
\(730\) 1216.01i 1.66577i
\(731\) −309.194 535.540i −0.422974 0.732613i
\(732\) 21.5878 12.4637i 0.0294915 0.0170269i
\(733\) −170.651 −0.232812 −0.116406 0.993202i \(-0.537137\pi\)
−0.116406 + 0.993202i \(0.537137\pi\)
\(734\) 1024.44i 1.39570i
\(735\) −422.232 + 243.776i −0.574465 + 0.331668i
\(736\) 19.0701 + 11.0101i 0.0259104 + 0.0149594i
\(737\) −1327.53 + 766.449i −1.80126 + 1.03996i
\(738\) 107.615 186.394i 0.145819 0.252566i
\(739\) 530.334 918.566i 0.717637 1.24298i −0.244296 0.969701i \(-0.578557\pi\)
0.961933 0.273284i \(-0.0881098\pi\)
\(740\) 72.0104i 0.0973114i
\(741\) −5.12940 + 0.436069i −0.00692227 + 0.000588487i
\(742\) 261.198 0.352019
\(743\) 290.537 + 167.742i 0.391033 + 0.225763i 0.682607 0.730785i \(-0.260846\pi\)
−0.291575 + 0.956548i \(0.594179\pi\)
\(744\) 198.037 + 114.337i 0.266179 + 0.153679i
\(745\) −35.3107 61.1599i −0.0473969 0.0820938i
\(746\) −464.148 + 803.928i −0.622182 + 1.07765i
\(747\) −223.189 386.575i −0.298781 0.517503i
\(748\) −130.044 −0.173855
\(749\) 314.668i 0.420117i
\(750\) −101.487 175.781i −0.135316 0.234375i
\(751\) −1128.41 + 651.490i −1.50255 + 0.867497i −0.502554 + 0.864546i \(0.667606\pi\)
−0.999996 + 0.00295120i \(0.999061\pi\)
\(752\) −498.522 −0.662929
\(753\) 613.226i 0.814377i
\(754\) −10.1598 + 5.86578i −0.0134746 + 0.00777955i
\(755\) 1326.92 + 766.100i 1.75751 + 1.01470i
\(756\) −2.67613 + 1.54506i −0.00353985 + 0.00204373i
\(757\) −60.1511 + 104.185i −0.0794598 + 0.137628i −0.903017 0.429605i \(-0.858653\pi\)
0.823557 + 0.567233i \(0.191986\pi\)
\(758\) 486.574 842.771i 0.641919 1.11184i
\(759\) 182.535i 0.240494i
\(760\) 851.373 + 399.551i 1.12023 + 0.525725i
\(761\) 1346.45 1.76932 0.884658 0.466240i \(-0.154392\pi\)
0.884658 + 0.466240i \(0.154392\pi\)
\(762\) −91.7437 52.9682i −0.120399 0.0695121i
\(763\) 20.7248 + 11.9655i 0.0271623 + 0.0156822i
\(764\) −4.82553 8.35805i −0.00631613 0.0109399i
\(765\) −236.969 + 410.442i −0.309763 + 0.536526i
\(766\) 27.9243 + 48.3663i 0.0364547 + 0.0631414i
\(767\) 5.40564 0.00704777
\(768\) 87.0301i 0.113320i
\(769\) 109.016 + 188.821i 0.141763 + 0.245541i 0.928161 0.372180i \(-0.121390\pi\)
−0.786398 + 0.617721i \(0.788056\pi\)
\(770\) 521.512 301.095i 0.677288 0.391033i
\(771\) 473.337 0.613926
\(772\) 52.6433i 0.0681909i
\(773\) −48.6422 + 28.0836i −0.0629266 + 0.0363307i −0.531133 0.847288i \(-0.678234\pi\)
0.468207 + 0.883619i \(0.344900\pi\)
\(774\) −134.697 77.7673i −0.174027 0.100475i
\(775\) 239.345 138.186i 0.308832 0.178304i
\(776\) 311.984 540.373i 0.402042 0.696357i
\(777\) −83.7014 + 144.975i −0.107724 + 0.186583i
\(778\) 731.482i 0.940208i
\(779\) −597.671 280.488i −0.767229 0.360062i
\(780\) −0.456792 −0.000585631
\(781\) −1278.06 737.890i −1.63644 0.944801i
\(782\) 230.955 + 133.342i 0.295339 + 0.170514i
\(783\) 94.3720 + 163.457i 0.120526 + 0.208757i
\(784\) −372.586 + 645.338i −0.475238 + 0.823136i
\(785\) 146.342 + 253.472i 0.186423 + 0.322894i
\(786\) −204.929 −0.260724
\(787\) 170.104i 0.216142i 0.994143 + 0.108071i \(0.0344674\pi\)
−0.994143 + 0.108071i \(0.965533\pi\)
\(788\) −22.5377 39.0365i −0.0286012 0.0495387i
\(789\) 226.693 130.881i 0.287316 0.165882i
\(790\) −812.556 −1.02855
\(791\) 156.492i 0.197840i
\(792\) 402.796 232.555i 0.508581 0.293630i
\(793\) −7.41853 4.28309i −0.00935501 0.00540112i
\(794\) 284.337 164.162i 0.358107 0.206753i
\(795\) 310.599 537.973i 0.390690 0.676696i
\(796\) 11.4980 19.9152i 0.0144448 0.0250190i
\(797\) 740.226i 0.928765i −0.885635 0.464383i \(-0.846276\pi\)
0.885635 0.464383i \(-0.153724\pi\)
\(798\) 87.8768 + 126.160i 0.110121 + 0.158095i
\(799\) −722.928 −0.904791
\(800\) 58.7271 + 33.9061i 0.0734089 + 0.0423826i
\(801\) −188.349 108.743i −0.235142 0.135759i
\(802\) 330.829 + 573.013i 0.412505 + 0.714480i
\(803\) 922.366 1597.59i 1.14865 1.98952i
\(804\) −17.3639 30.0752i −0.0215970 0.0374070i
\(805\) −76.1359 −0.0945788
\(806\) 5.52620i 0.00685633i
\(807\) −58.9364 102.081i −0.0730314 0.126494i
\(808\) 1024.75 591.641i 1.26826 0.732229i
\(809\) −1489.01 −1.84056 −0.920280 0.391260i \(-0.872039\pi\)
−0.920280 + 0.391260i \(0.872039\pi\)
\(810\) 119.203i 0.147164i
\(811\) 823.672 475.547i 1.01563 0.586372i 0.102792 0.994703i \(-0.467223\pi\)
0.912834 + 0.408331i \(0.133889\pi\)
\(812\) 18.7075 + 10.8008i 0.0230388 + 0.0133015i
\(813\) −170.697 + 98.5521i −0.209960 + 0.121220i
\(814\) −885.956 + 1534.52i −1.08840 + 1.88516i
\(815\) −18.8973 + 32.7310i −0.0231868 + 0.0401608i
\(816\) 724.366i 0.887703i
\(817\) −202.694 + 431.905i −0.248095 + 0.528647i
\(818\) 600.250 0.733802
\(819\) 0.919637 + 0.530953i 0.00112288 + 0.000648294i
\(820\) −50.7346 29.2917i −0.0618715 0.0357215i
\(821\) 790.459 + 1369.12i 0.962801 + 1.66762i 0.715411 + 0.698704i \(0.246240\pi\)
0.247390 + 0.968916i \(0.420427\pi\)
\(822\) −169.685 + 293.903i −0.206430 + 0.357546i
\(823\) 734.523 + 1272.23i 0.892494 + 1.54585i 0.836875 + 0.547394i \(0.184380\pi\)
0.0556192 + 0.998452i \(0.482287\pi\)
\(824\) −1303.61 −1.58204
\(825\) 562.124i 0.681363i
\(826\) −80.7230 139.816i −0.0977276 0.169269i
\(827\) −13.7499 + 7.93854i −0.0166263 + 0.00959920i −0.508290 0.861186i \(-0.669722\pi\)
0.491664 + 0.870785i \(0.336389\pi\)
\(828\) 4.13534 0.00499437
\(829\) 460.891i 0.555960i −0.960587 0.277980i \(-0.910335\pi\)
0.960587 0.277980i \(-0.0896649\pi\)
\(830\) −1706.70 + 985.363i −2.05626 + 1.18718i
\(831\) −661.365 381.839i −0.795867 0.459494i
\(832\) 8.02810 4.63503i 0.00964916 0.00557095i
\(833\) −540.303 + 935.832i −0.648623 + 1.12345i
\(834\) 326.407 565.353i 0.391375 0.677881i
\(835\) 1052.89i 1.26094i
\(836\) 57.3460 + 82.3283i 0.0685957 + 0.0984789i
\(837\) 88.9088 0.106223
\(838\) 253.627 + 146.432i 0.302658 + 0.174740i
\(839\) −11.1163 6.41800i −0.0132495 0.00764959i 0.493361 0.869825i \(-0.335768\pi\)
−0.506610 + 0.862175i \(0.669102\pi\)
\(840\) −96.9993 168.008i −0.115475 0.200009i
\(841\) 239.209 414.323i 0.284434 0.492655i
\(842\) −117.614 203.713i −0.139684 0.241939i
\(843\) −156.186 −0.185274
\(844\) 4.97538i 0.00589500i
\(845\) −541.989 938.752i −0.641407 1.11095i
\(846\) −157.468 + 90.9140i −0.186132 + 0.107463i
\(847\) −639.744 −0.755306
\(848\) 949.437i 1.11962i
\(849\) −103.599 + 59.8131i −0.122025 + 0.0704512i
\(850\) 711.236 + 410.632i 0.836748 + 0.483097i
\(851\) 194.012 112.013i 0.227981 0.131625i
\(852\) 16.7169 28.9546i 0.0196208 0.0339843i
\(853\) 321.717 557.231i 0.377160 0.653260i −0.613488 0.789704i \(-0.710234\pi\)
0.990648 + 0.136444i \(0.0435674\pi\)
\(854\) 255.839i 0.299578i
\(855\) 364.341 30.9739i 0.426129 0.0362268i
\(856\) −1072.99 −1.25350
\(857\) −115.805 66.8603i −0.135129 0.0780167i 0.430912 0.902394i \(-0.358192\pi\)
−0.566040 + 0.824377i \(0.691525\pi\)
\(858\) 9.73411 + 5.61999i 0.0113451 + 0.00655011i
\(859\) −49.3229 85.4297i −0.0574189 0.0994525i 0.835887 0.548901i \(-0.184954\pi\)
−0.893306 + 0.449449i \(0.851620\pi\)
\(860\) −21.1675 + 36.6632i −0.0246134 + 0.0426316i
\(861\) 68.0944 + 117.943i 0.0790875 + 0.136984i
\(862\) −546.576 −0.634079
\(863\) 829.585i 0.961280i 0.876918 + 0.480640i \(0.159596\pi\)
−0.876918 + 0.480640i \(0.840404\pi\)
\(864\) 10.9076 + 18.8925i 0.0126245 + 0.0218663i
\(865\) −1503.39 + 867.980i −1.73802 + 1.00344i
\(866\) 1505.14 1.73803
\(867\) 549.870i 0.634221i
\(868\) 8.81226 5.08776i 0.0101524 0.00586147i
\(869\) 1067.53 + 616.339i 1.22846 + 0.709251i
\(870\) 721.651 416.645i 0.829484 0.478903i
\(871\) −5.96704 + 10.3352i −0.00685079 + 0.0118659i
\(872\) 40.8014 70.6700i 0.0467906 0.0810436i
\(873\) 242.600i 0.277893i
\(874\) −17.4290 205.014i −0.0199416 0.234569i
\(875\) 128.434 0.146782
\(876\) 36.1934 + 20.8963i 0.0413167 + 0.0238542i
\(877\) 157.383 + 90.8649i 0.179456 + 0.103609i 0.587037 0.809560i \(-0.300294\pi\)
−0.407581 + 0.913169i \(0.633628\pi\)
\(878\) −380.963 659.847i −0.433898 0.751534i
\(879\) −355.277 + 615.358i −0.404183 + 0.700065i
\(880\) −1094.46 1895.66i −1.24371 2.15416i
\(881\) −517.816 −0.587759 −0.293880 0.955842i \(-0.594946\pi\)
−0.293880 + 0.955842i \(0.594946\pi\)
\(882\) 271.790i 0.308151i
\(883\) 782.367 + 1355.10i 0.886033 + 1.53465i 0.844525 + 0.535516i \(0.179883\pi\)
0.0415084 + 0.999138i \(0.486784\pi\)
\(884\) −0.876791 + 0.506216i −0.000991845 + 0.000572642i
\(885\) −383.961 −0.433855
\(886\) 1203.89i 1.35879i
\(887\) −620.266 + 358.111i −0.699285 + 0.403732i −0.807081 0.590441i \(-0.798954\pi\)
0.107796 + 0.994173i \(0.465621\pi\)
\(888\) 494.354 + 285.415i 0.556705 + 0.321414i
\(889\) 58.0518 33.5162i 0.0653001 0.0377011i
\(890\) −480.093 + 831.546i −0.539431 + 0.934321i
\(891\) 90.4176 156.608i 0.101479 0.175766i
\(892\) 68.0262i 0.0762626i
\(893\) 318.793 + 457.672i 0.356991 + 0.512511i
\(894\) −39.3684 −0.0440363
\(895\) −1035.77 598.003i −1.15729 0.668159i
\(896\) −272.678 157.431i −0.304328 0.175704i
\(897\) −0.710545 1.23070i −0.000792135 0.00137202i
\(898\) 324.588 562.202i 0.361456 0.626061i
\(899\) −310.759 538.251i −0.345672 0.598722i
\(900\) 12.7350 0.0141500
\(901\) 1376.82i 1.52810i
\(902\) 720.760 + 1248.39i 0.799069 + 1.38403i
\(903\) 85.2309 49.2081i 0.0943864 0.0544940i
\(904\) 533.625 0.590293
\(905\) 297.732i 0.328986i
\(906\) 739.704 427.068i 0.816451 0.471378i
\(907\) 240.379 + 138.783i 0.265026 + 0.153013i 0.626625 0.779321i \(-0.284436\pi\)
−0.361599 + 0.932334i \(0.617769\pi\)
\(908\) −29.3731 + 16.9585i −0.0323492 + 0.0186768i
\(909\) 230.031 398.426i 0.253059 0.438312i
\(910\) 2.34412 4.06013i 0.00257595 0.00446168i
\(911\) 1630.56i 1.78986i 0.446207 + 0.894930i \(0.352774\pi\)
−0.446207 + 0.894930i \(0.647226\pi\)
\(912\) 458.582 319.427i 0.502831 0.350249i
\(913\) 2989.66 3.27455
\(914\) −903.415 521.587i −0.988419 0.570664i
\(915\) 526.937 + 304.227i 0.575887 + 0.332489i
\(916\) −12.9954 22.5086i −0.0141871 0.0245727i
\(917\) 64.8355 112.298i 0.0707040 0.122463i
\(918\) 132.100 + 228.804i 0.143900 + 0.249242i
\(919\) −48.0409 −0.0522752 −0.0261376 0.999658i \(-0.508321\pi\)
−0.0261376 + 0.999658i \(0.508321\pi\)
\(920\) 259.618i 0.282193i
\(921\) 201.882 + 349.669i 0.219198 + 0.379663i
\(922\) −489.575 + 282.656i −0.530993 + 0.306569i
\(923\) −11.4894 −0.0124479
\(924\) 20.6964i 0.0223987i
\(925\) 597.469 344.949i 0.645912 0.372918i
\(926\) −571.781 330.118i −0.617474 0.356499i
\(927\) −438.940 + 253.422i −0.473506 + 0.273379i
\(928\) 76.2497 132.068i 0.0821656 0.142315i
\(929\) −641.727 + 1111.50i −0.690772 + 1.19645i 0.280813 + 0.959763i \(0.409396\pi\)
−0.971585 + 0.236690i \(0.923937\pi\)
\(930\) 392.525i 0.422070i
\(931\) 830.717 70.6223i 0.892285 0.0758564i
\(932\) 91.8430 0.0985440
\(933\) 661.921 + 382.160i 0.709454 + 0.409604i
\(934\) 528.386 + 305.064i 0.565724 + 0.326621i
\(935\) −1587.12 2748.98i −1.69746 2.94008i
\(936\) 1.81051 3.13589i 0.00193430 0.00335031i
\(937\) −769.568 1332.93i −0.821311 1.42255i −0.904706 0.426036i \(-0.859910\pi\)
0.0833953 0.996517i \(-0.473424\pi\)
\(938\) 356.426 0.379985
\(939\) 210.042i 0.223687i
\(940\) 24.7459 + 42.8611i 0.0263254 + 0.0455970i
\(941\) −1281.05 + 739.617i −1.36138 + 0.785990i −0.989807 0.142415i \(-0.954513\pi\)
−0.371568 + 0.928406i \(0.621180\pi\)
\(942\) 163.159 0.173205
\(943\) 182.254i 0.193270i
\(944\) −508.223 + 293.423i −0.538372 + 0.310829i
\(945\) −65.3217 37.7135i −0.0691235 0.0399085i
\(946\) 902.146 520.854i 0.953643 0.550586i
\(947\) 349.924 606.086i 0.369508 0.640006i −0.619981 0.784617i \(-0.712860\pi\)
0.989489 + 0.144611i \(0.0461930\pi\)
\(948\) −13.9632 + 24.1850i −0.0147291 + 0.0255116i
\(949\) 14.3618i 0.0151336i
\(950\) −53.6733 631.349i −0.0564982 0.664577i
\(951\) −572.818 −0.602332
\(952\) −372.371 214.989i −0.391146 0.225828i
\(953\) −354.907 204.906i −0.372411 0.215011i 0.302100 0.953276i \(-0.402312\pi\)
−0.674511 + 0.738265i \(0.735646\pi\)
\(954\) −173.146 299.898i −0.181495 0.314358i
\(955\) 117.787 204.012i 0.123337 0.213625i
\(956\) 39.5652 + 68.5289i 0.0413862 + 0.0716829i
\(957\) −1264.13 −1.32093
\(958\) 844.688i 0.881720i
\(959\) −107.370 185.971i −0.111960 0.193921i
\(960\) −570.235 + 329.225i −0.593995 + 0.342943i
\(961\) 668.231 0.695349
\(962\) 13.7949i 0.0143398i
\(963\) −361.289 + 208.591i −0.375171 + 0.216605i
\(964\) 28.9731 + 16.7276i 0.0300550 + 0.0173523i
\(965\) 1112.82 642.487i 1.15318 0.665790i
\(966\) −21.2213 + 36.7564i −0.0219682 + 0.0380501i
\(967\) 92.4602 160.146i 0.0956155 0.165611i −0.814250 0.580515i \(-0.802851\pi\)
0.909865 + 0.414904i \(0.136185\pi\)
\(968\) 2181.48i 2.25359i
\(969\) 665.009 463.214i 0.686284 0.478033i
\(970\) −1071.06 −1.10419
\(971\) 218.148 + 125.948i 0.224663 + 0.129709i 0.608107 0.793855i \(-0.291929\pi\)
−0.383445 + 0.923564i \(0.625262\pi\)
\(972\) 3.54796 + 2.04842i 0.00365017 + 0.00210743i
\(973\) 206.537 + 357.733i 0.212269 + 0.367660i
\(974\) 658.840 1141.14i 0.676427 1.17161i
\(975\) −2.18816 3.79000i −0.00224426 0.00388718i
\(976\) 929.960 0.952828
\(977\) 372.639i 0.381411i 0.981647 + 0.190706i \(0.0610776\pi\)
−0.981647 + 0.190706i \(0.938922\pi\)
\(978\) 10.5344 + 18.2462i 0.0107714 + 0.0186566i
\(979\) 1261.49 728.319i 1.28854 0.743942i
\(980\) 73.9785 0.0754882
\(981\) 31.7273i 0.0323418i
\(982\) 619.658 357.760i 0.631016 0.364317i
\(983\) 137.328 + 79.2861i 0.139702 + 0.0806573i 0.568222 0.822875i \(-0.307631\pi\)
−0.428520 + 0.903532i \(0.640965\pi\)
\(984\) 402.176 232.197i 0.408716 0.235972i
\(985\) 550.125 952.844i 0.558503 0.967355i
\(986\) 923.450 1599.46i 0.936561 1.62217i
\(987\) 115.054i 0.116569i
\(988\) 0.707118 + 0.331852i 0.000715706 + 0.000335882i
\(989\) −131.705 −0.133170
\(990\) −691.412 399.187i −0.698396 0.403219i
\(991\) 1489.96 + 860.227i 1.50349 + 0.868039i 0.999992 + 0.00404127i \(0.00128638\pi\)
0.503496 + 0.863998i \(0.332047\pi\)
\(992\) −35.9178 62.2114i −0.0362074 0.0627131i
\(993\) 377.854 654.462i 0.380517 0.659075i
\(994\) 171.572 + 297.172i 0.172608 + 0.298966i
\(995\) 561.312 0.564132
\(996\) 67.7311i 0.0680031i
\(997\) −261.532 452.987i −0.262319 0.454350i 0.704539 0.709666i \(-0.251154\pi\)
−0.966858 + 0.255316i \(0.917821\pi\)
\(998\) 144.299 83.3111i 0.144588 0.0834780i
\(999\) 221.940 0.222162
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 57.3.g.b.46.1 yes 6
3.2 odd 2 171.3.p.c.46.3 6
4.3 odd 2 912.3.be.f.673.1 6
19.12 odd 6 inner 57.3.g.b.31.1 6
57.50 even 6 171.3.p.c.145.3 6
76.31 even 6 912.3.be.f.145.1 6
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
57.3.g.b.31.1 6 19.12 odd 6 inner
57.3.g.b.46.1 yes 6 1.1 even 1 trivial
171.3.p.c.46.3 6 3.2 odd 2
171.3.p.c.145.3 6 57.50 even 6
912.3.be.f.145.1 6 76.31 even 6
912.3.be.f.673.1 6 4.3 odd 2