Properties

Label 121.4.c.d.81.2
Level $121$
Weight $4$
Character 121.81
Analytic conductor $7.139$
Analytic rank $0$
Dimension $8$
CM no
Inner twists $4$

Related objects

Downloads

Learn more

Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms
 
[N,k,chi] = [121,4,Mod(3,121)]
 
mf = mfinit([N,k,chi],0)
 
lf = mfeigenbasis(mf)
 
from sage.modular.dirichlet import DirichletCharacter
 
H = DirichletGroup(121, base_ring=CyclotomicField(10))
 
chi = DirichletCharacter(H, H._module([8]))
 
N = Newforms(chi, 4, names="a")
 
//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code
 
chi := DirichletCharacter("121.3");
 
S:= CuspForms(chi, 4);
 
N := Newforms(S);
 
Level: \( N \) \(=\) \( 121 = 11^{2} \)
Weight: \( k \) \(=\) \( 4 \)
Character orbit: \([\chi]\) \(=\) 121.c (of order \(5\), degree \(4\), not minimal)

Newform invariants

comment: select newform
 
sage: f = N[0] # Warning: the index may be different
 
gp: f = lf[1] \\ Warning: the index may be different
 
Self dual: no
Analytic conductor: \(7.13923111069\)
Analytic rank: \(0\)
Dimension: \(8\)
Relative dimension: \(2\) over \(\Q(\zeta_{5})\)
Coefficient field: 8.0.324000000.3
comment: defining polynomial
 
gp: f.mod \\ as an extension of the character field
 
Defining polynomial: \( x^{8} + 3x^{6} + 9x^{4} + 27x^{2} + 81 \) Copy content Toggle raw display
Coefficient ring: \(\Z[a_1, a_2, a_3]\)
Coefficient ring index: \( 2^{4} \)
Twist minimal: yes
Sato-Tate group: $\mathrm{SU}(2)[C_{5}]$

Embedding invariants

Embedding label 81.2
Root \(0.535233 - 1.64728i\) of defining polynomial
Character \(\chi\) \(=\) 121.81
Dual form 121.4.c.d.3.2

$q$-expansion

comment: q-expansion
 
sage: f.q_expansion() # note that sage often uses an isomorphic number field
 
gp: mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q+(1.99350 + 1.44836i) q^{2} +(-0.165602 + 0.509670i) q^{3} +(-0.595848 - 1.83383i) q^{4} +(1.24257 - 0.902778i) q^{5} +(-1.06831 + 0.776175i) q^{6} +(8.72933 + 26.8661i) q^{7} +(7.55982 - 23.2667i) q^{8} +(21.6111 + 15.7014i) q^{9} +O(q^{10})\) \(q+(1.99350 + 1.44836i) q^{2} +(-0.165602 + 0.509670i) q^{3} +(-0.595848 - 1.83383i) q^{4} +(1.24257 - 0.902778i) q^{5} +(-1.06831 + 0.776175i) q^{6} +(8.72933 + 26.8661i) q^{7} +(7.55982 - 23.2667i) q^{8} +(21.6111 + 15.7014i) q^{9} +3.78461 q^{10} +1.03332 q^{12} +(55.3886 + 40.2422i) q^{13} +(-21.5100 + 66.2009i) q^{14} +(0.254347 + 0.782801i) q^{15} +(36.2896 - 26.3659i) q^{16} +(44.7822 - 32.5362i) q^{17} +(20.3405 + 62.6015i) q^{18} +(17.0506 - 52.4764i) q^{19} +(-2.39592 - 1.74074i) q^{20} -15.1384 q^{21} -178.315 q^{23} +(10.6064 + 7.70602i) q^{24} +(-37.8982 + 116.639i) q^{25} +(52.1319 + 160.446i) q^{26} +(-23.2872 + 16.9192i) q^{27} +(44.0666 - 32.0162i) q^{28} +(-34.9720 - 107.633i) q^{29} +(-0.626738 + 1.92890i) q^{30} +(-57.2887 - 41.6227i) q^{31} -85.1821 q^{32} +136.397 q^{34} +(35.1009 + 25.5023i) q^{35} +(15.9168 - 48.9868i) q^{36} +(-65.0988 - 200.353i) q^{37} +(109.995 - 79.9162i) q^{38} +(-29.6827 + 21.5657i) q^{39} +(-11.6111 - 35.7354i) q^{40} +(-59.3091 + 182.535i) q^{41} +(-30.1785 - 21.9259i) q^{42} +208.210 q^{43} +41.0282 q^{45} +(-355.472 - 258.265i) q^{46} +(158.376 - 487.431i) q^{47} +(7.42830 + 22.8619i) q^{48} +(-368.094 + 267.436i) q^{49} +(-244.485 + 177.629i) q^{50} +(9.16669 + 28.2122i) q^{51} +(40.7942 - 125.552i) q^{52} +(303.744 + 220.683i) q^{53} -70.9282 q^{54} +691.079 q^{56} +(23.9220 + 17.3804i) q^{57} +(86.1746 - 265.218i) q^{58} +(-156.519 - 481.717i) q^{59} +(1.28397 - 0.932860i) q^{60} +(-379.184 + 275.493i) q^{61} +(-53.9203 - 165.950i) q^{62} +(-233.185 + 717.670i) q^{63} +(-460.127 - 334.302i) q^{64} +105.154 q^{65} -289.895 q^{67} +(-86.3492 - 62.7363i) q^{68} +(29.5293 - 90.8819i) q^{69} +(33.0371 + 101.678i) q^{70} +(318.761 - 231.593i) q^{71} +(528.697 - 384.121i) q^{72} +(-89.4723 - 275.367i) q^{73} +(160.410 - 493.691i) q^{74} +(-53.1711 - 38.6311i) q^{75} -106.392 q^{76} -90.4074 q^{78} +(-137.199 - 99.6808i) q^{79} +(21.2897 - 65.5229i) q^{80} +(218.110 + 671.275i) q^{81} +(-382.609 + 277.982i) q^{82} +(-245.400 + 178.293i) q^{83} +(9.02020 + 27.7613i) q^{84} +(26.2720 - 80.8568i) q^{85} +(415.067 + 301.564i) q^{86} +60.6486 q^{87} -1146.68 q^{89} +(81.7897 + 59.4237i) q^{90} +(-597.646 + 1839.36i) q^{91} +(106.249 + 327.000i) q^{92} +(30.7009 - 22.3055i) q^{93} +(1021.70 - 742.308i) q^{94} +(-26.1880 - 80.5984i) q^{95} +(14.1063 - 43.4147i) q^{96} +(-519.065 - 377.123i) q^{97} -1121.14 q^{98} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 8 q - 2 q^{2} + 8 q^{3} - 10 q^{4} + 10 q^{5} + 32 q^{6} - 8 q^{7} - 42 q^{8} - 2 q^{9}+O(q^{10}) \) Copy content Toggle raw display \( 8 q - 2 q^{2} + 8 q^{3} - 10 q^{4} + 10 q^{5} + 32 q^{6} - 8 q^{7} - 42 q^{8} - 2 q^{9} - 136 q^{10} - 352 q^{12} + 130 q^{13} + 160 q^{14} - 64 q^{15} + 62 q^{16} - 14 q^{17} - 194 q^{18} - 48 q^{19} + 98 q^{20} + 544 q^{21} - 512 q^{23} + 144 q^{24} + 176 q^{25} + 106 q^{26} - 16 q^{27} + 296 q^{28} - 30 q^{29} - 280 q^{30} + 184 q^{31} - 1208 q^{32} + 1784 q^{34} - 128 q^{35} - 394 q^{36} - 126 q^{37} + 168 q^{38} - 496 q^{39} + 186 q^{40} + 370 q^{41} - 712 q^{42} + 1056 q^{43} - 808 q^{45} - 664 q^{46} - 256 q^{47} - 152 q^{48} - 522 q^{49} - 64 q^{50} + 488 q^{51} + 602 q^{52} + 162 q^{53} - 512 q^{54} + 1344 q^{56} - 24 q^{57} - 918 q^{58} + 1304 q^{59} - 752 q^{60} - 300 q^{61} + 1312 q^{62} + 1336 q^{63} + 262 q^{64} + 2504 q^{65} - 2624 q^{67} - 934 q^{68} + 280 q^{69} - 872 q^{70} + 1176 q^{71} + 150 q^{72} - 668 q^{73} - 2022 q^{74} - 464 q^{75} - 768 q^{76} + 7840 q^{78} + 416 q^{79} - 214 q^{80} - 26 q^{81} + 322 q^{82} - 960 q^{83} - 1832 q^{84} + 502 q^{85} + 264 q^{86} - 4032 q^{87} - 4296 q^{89} + 1186 q^{90} + 688 q^{91} - 944 q^{92} - 1864 q^{93} + 2408 q^{94} + 24 q^{95} - 1664 q^{96} + 338 q^{97} - 3288 q^{98}+O(q^{100}) \) Copy content Toggle raw display

Display 100 coefficients 10 coefficients

Character values

We give the values of \(\chi\) on generators for \(\left(\mathbb{Z}/121\mathbb{Z}\right)^\times\).

\(n\) \(2\)
\(\chi(n)\) \(e\left(\frac{1}{5}\right)\)

Coefficient data

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



Display \(a_p\) with \(p\) up to: 50 250 1000 (See \(a_n\) instead) (See \(a_n\) instead) (See \(a_n\) instead) Display \(a_n\) with \(n\) up to: 50 250 1000 (See only \(a_p\)) (See only \(a_p\)) (See only \(a_p\))
Significant digits:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) 1.99350 + 1.44836i 0.704809 + 0.512074i 0.881495 0.472194i \(-0.156538\pi\)
−0.176686 + 0.984267i \(0.556538\pi\)
\(3\) −0.165602 + 0.509670i −0.0318701 + 0.0980860i −0.965726 0.259563i \(-0.916422\pi\)
0.933856 + 0.357649i \(0.116422\pi\)
\(4\) −0.595848 1.83383i −0.0744809 0.229229i
\(5\) 1.24257 0.902778i 0.111139 0.0807470i −0.530828 0.847480i \(-0.678119\pi\)
0.641966 + 0.766733i \(0.278119\pi\)
\(6\) −1.06831 + 0.776175i −0.0726895 + 0.0528120i
\(7\) 8.72933 + 26.8661i 0.471340 + 1.45063i 0.850831 + 0.525439i \(0.176099\pi\)
−0.379492 + 0.925195i \(0.623901\pi\)
\(8\) 7.55982 23.2667i 0.334100 1.02825i
\(9\) 21.6111 + 15.7014i 0.800412 + 0.581533i
\(10\) 3.78461 0.119680
\(11\) 0 0
\(12\) 1.03332 0.0248578
\(13\) 55.3886 + 40.2422i 1.18170 + 0.858552i 0.992362 0.123361i \(-0.0393673\pi\)
0.189333 + 0.981913i \(0.439367\pi\)
\(14\) −21.5100 + 66.2009i −0.410627 + 1.26378i
\(15\) 0.254347 + 0.782801i 0.00437815 + 0.0134746i
\(16\) 36.2896 26.3659i 0.567025 0.411968i
\(17\) 44.7822 32.5362i 0.638899 0.464187i −0.220573 0.975370i \(-0.570793\pi\)
0.859472 + 0.511183i \(0.170793\pi\)
\(18\) 20.3405 + 62.6015i 0.266349 + 0.819739i
\(19\) 17.0506 52.4764i 0.205878 0.633627i −0.793798 0.608181i \(-0.791900\pi\)
0.999676 0.0254456i \(-0.00810047\pi\)
\(20\) −2.39592 1.74074i −0.0267872 0.0194621i
\(21\) −15.1384 −0.157308
\(22\) 0 0
\(23\) −178.315 −1.61658 −0.808290 0.588785i \(-0.799606\pi\)
−0.808290 + 0.588785i \(0.799606\pi\)
\(24\) 10.6064 + 7.70602i 0.0902095 + 0.0655411i
\(25\) −37.8982 + 116.639i −0.303185 + 0.933108i
\(26\) 52.1319 + 160.446i 0.393227 + 1.21023i
\(27\) −23.2872 + 16.9192i −0.165986 + 0.120596i
\(28\) 44.0666 32.0162i 0.297421 0.216089i
\(29\) −34.9720 107.633i −0.223936 0.689203i −0.998398 0.0565831i \(-0.981979\pi\)
0.774462 0.632620i \(-0.218021\pi\)
\(30\) −0.626738 + 1.92890i −0.00381420 + 0.0117389i
\(31\) −57.2887 41.6227i −0.331915 0.241150i 0.409328 0.912387i \(-0.365763\pi\)
−0.741243 + 0.671237i \(0.765763\pi\)
\(32\) −85.1821 −0.470569
\(33\) 0 0
\(34\) 136.397 0.687999
\(35\) 35.1009 + 25.5023i 0.169518 + 0.123162i
\(36\) 15.9168 48.9868i 0.0736887 0.226791i
\(37\) −65.0988 200.353i −0.289248 0.890213i −0.985093 0.172022i \(-0.944970\pi\)
0.695845 0.718192i \(-0.255030\pi\)
\(38\) 109.995 79.9162i 0.469568 0.341161i
\(39\) −29.6827 + 21.5657i −0.121873 + 0.0885456i
\(40\) −11.6111 35.7354i −0.0458970 0.141256i
\(41\) −59.3091 + 182.535i −0.225915 + 0.695295i 0.772282 + 0.635280i \(0.219115\pi\)
−0.998197 + 0.0600158i \(0.980885\pi\)
\(42\) −30.1785 21.9259i −0.110872 0.0805535i
\(43\) 208.210 0.738413 0.369207 0.929347i \(-0.379629\pi\)
0.369207 + 0.929347i \(0.379629\pi\)
\(44\) 0 0
\(45\) 41.0282 0.135914
\(46\) −355.472 258.265i −1.13938 0.827807i
\(47\) 158.376 487.431i 0.491521 1.51275i −0.330787 0.943705i \(-0.607314\pi\)
0.822309 0.569042i \(-0.192686\pi\)
\(48\) 7.42830 + 22.8619i 0.0223371 + 0.0687466i
\(49\) −368.094 + 267.436i −1.07316 + 0.779697i
\(50\) −244.485 + 177.629i −0.691508 + 0.502410i
\(51\) 9.16669 + 28.2122i 0.0251685 + 0.0774607i
\(52\) 40.7942 125.552i 0.108791 0.334824i
\(53\) 303.744 + 220.683i 0.787217 + 0.571947i 0.907136 0.420837i \(-0.138264\pi\)
−0.119919 + 0.992784i \(0.538264\pi\)
\(54\) −70.9282 −0.178743
\(55\) 0 0
\(56\) 691.079 1.64910
\(57\) 23.9220 + 17.3804i 0.0555885 + 0.0403874i
\(58\) 86.1746 265.218i 0.195091 0.600428i
\(59\) −156.519 481.717i −0.345375 1.06295i −0.961383 0.275214i \(-0.911251\pi\)
0.616008 0.787740i \(-0.288749\pi\)
\(60\) 1.28397 0.932860i 0.00276267 0.00200719i
\(61\) −379.184 + 275.493i −0.795894 + 0.578251i −0.909707 0.415251i \(-0.863694\pi\)
0.113812 + 0.993502i \(0.463694\pi\)
\(62\) −53.9203 165.950i −0.110450 0.339930i
\(63\) −233.185 + 717.670i −0.466326 + 1.43520i
\(64\) −460.127 334.302i −0.898686 0.652934i
\(65\) 105.154 0.200657
\(66\) 0 0
\(67\) −289.895 −0.528601 −0.264301 0.964440i \(-0.585141\pi\)
−0.264301 + 0.964440i \(0.585141\pi\)
\(68\) −86.3492 62.7363i −0.153991 0.111881i
\(69\) 29.5293 90.8819i 0.0515205 0.158564i
\(70\) 33.0371 + 101.678i 0.0564099 + 0.173612i
\(71\) 318.761 231.593i 0.532817 0.387114i −0.288594 0.957452i \(-0.593188\pi\)
0.821410 + 0.570338i \(0.193188\pi\)
\(72\) 528.697 384.121i 0.865382 0.628737i
\(73\) −89.4723 275.367i −0.143451 0.441497i 0.853357 0.521326i \(-0.174563\pi\)
−0.996809 + 0.0798290i \(0.974563\pi\)
\(74\) 160.410 493.691i 0.251990 0.775546i
\(75\) −53.1711 38.6311i −0.0818623 0.0594764i
\(76\) −106.392 −0.160579
\(77\) 0 0
\(78\) −90.4074 −0.131239
\(79\) −137.199 99.6808i −0.195393 0.141962i 0.485787 0.874077i \(-0.338533\pi\)
−0.681180 + 0.732116i \(0.738533\pi\)
\(80\) 21.2897 65.5229i 0.0297532 0.0915711i
\(81\) 218.110 + 671.275i 0.299191 + 0.920816i
\(82\) −382.609 + 277.982i −0.515269 + 0.374365i
\(83\) −245.400 + 178.293i −0.324532 + 0.235786i −0.738107 0.674684i \(-0.764280\pi\)
0.413575 + 0.910470i \(0.364280\pi\)
\(84\) 9.02020 + 27.7613i 0.0117165 + 0.0360596i
\(85\) 26.2720 80.8568i 0.0335246 0.103178i
\(86\) 415.067 + 301.564i 0.520440 + 0.378122i
\(87\) 60.6486 0.0747380
\(88\) 0 0
\(89\) −1146.68 −1.36571 −0.682854 0.730555i \(-0.739262\pi\)
−0.682854 + 0.730555i \(0.739262\pi\)
\(90\) 81.7897 + 59.4237i 0.0957932 + 0.0695978i
\(91\) −597.646 + 1839.36i −0.688465 + 2.11888i
\(92\) 106.249 + 327.000i 0.120404 + 0.370566i
\(93\) 30.7009 22.3055i 0.0342316 0.0248707i
\(94\) 1021.70 742.308i 1.12107 0.814502i
\(95\) −26.1880 80.5984i −0.0282824 0.0870444i
\(96\) 14.1063 43.4147i 0.0149971 0.0461562i
\(97\) −519.065 377.123i −0.543331 0.394753i 0.281990 0.959417i \(-0.409006\pi\)
−0.825321 + 0.564665i \(0.809006\pi\)
\(98\) −1121.14 −1.15564
\(99\) 0 0
\(100\) 236.477 0.236477
\(101\) 896.042 + 651.013i 0.882768 + 0.641368i 0.933982 0.357319i \(-0.116309\pi\)
−0.0512145 + 0.998688i \(0.516309\pi\)
\(102\) −22.5877 + 69.5176i −0.0219266 + 0.0674831i
\(103\) −92.1790 283.698i −0.0881812 0.271394i 0.897235 0.441552i \(-0.145572\pi\)
−0.985417 + 0.170158i \(0.945572\pi\)
\(104\) 1355.03 984.489i 1.27761 0.928241i
\(105\) −18.8105 + 13.6667i −0.0174831 + 0.0127022i
\(106\) 285.885 + 879.864i 0.261959 + 0.806226i
\(107\) 184.831 568.851i 0.166993 0.513953i −0.832184 0.554499i \(-0.812910\pi\)
0.999178 + 0.0405464i \(0.0129099\pi\)
\(108\) 44.9025 + 32.6236i 0.0400069 + 0.0290667i
\(109\) 1530.16 1.34461 0.672305 0.740275i \(-0.265305\pi\)
0.672305 + 0.740275i \(0.265305\pi\)
\(110\) 0 0
\(111\) 112.895 0.0965358
\(112\) 1025.13 + 744.804i 0.864876 + 0.628369i
\(113\) −46.6648 + 143.619i −0.0388482 + 0.119563i −0.968600 0.248625i \(-0.920021\pi\)
0.929752 + 0.368187i \(0.120021\pi\)
\(114\) 22.5155 + 69.2955i 0.0184979 + 0.0569308i
\(115\) −221.569 + 160.979i −0.179664 + 0.130534i
\(116\) −176.542 + 128.265i −0.141306 + 0.102665i
\(117\) 565.152 + 1739.36i 0.446566 + 1.37439i
\(118\) 385.680 1187.00i 0.300887 0.926036i
\(119\) 1265.04 + 919.105i 0.974504 + 0.708018i
\(120\) 20.1360 0.0153180
\(121\) 0 0
\(122\) −1154.92 −0.857060
\(123\) −83.2106 60.4561i −0.0609988 0.0443182i
\(124\) −42.1936 + 129.859i −0.0305572 + 0.0940455i
\(125\) 117.535 + 361.736i 0.0841012 + 0.258837i
\(126\) −1504.30 + 1092.94i −1.06360 + 0.772751i
\(127\) −562.872 + 408.951i −0.393282 + 0.285736i −0.766799 0.641887i \(-0.778152\pi\)
0.373517 + 0.927623i \(0.378152\pi\)
\(128\) −222.491 684.758i −0.153638 0.472849i
\(129\) −34.4800 + 106.118i −0.0235333 + 0.0724280i
\(130\) 209.624 + 152.301i 0.141425 + 0.102751i
\(131\) −1665.68 −1.11093 −0.555463 0.831541i \(-0.687459\pi\)
−0.555463 + 0.831541i \(0.687459\pi\)
\(132\) 0 0
\(133\) 1558.68 1.01620
\(134\) −577.905 419.873i −0.372563 0.270683i
\(135\) −13.6617 + 42.0464i −0.00870973 + 0.0268058i
\(136\) −418.465 1287.90i −0.263846 0.812035i
\(137\) 1298.86 943.675i 0.809992 0.588494i −0.103836 0.994594i \(-0.533112\pi\)
0.913828 + 0.406101i \(0.133112\pi\)
\(138\) 190.497 138.404i 0.117508 0.0853748i
\(139\) 330.432 + 1016.96i 0.201632 + 0.620560i 0.999835 + 0.0181710i \(0.00578432\pi\)
−0.798203 + 0.602389i \(0.794216\pi\)
\(140\) 25.8521 79.5647i 0.0156065 0.0480317i
\(141\) 222.201 + 161.439i 0.132714 + 0.0964227i
\(142\) 970.881 0.573765
\(143\) 0 0
\(144\) 1198.24 0.693426
\(145\) −140.624 102.169i −0.0805390 0.0585150i
\(146\) 220.469 678.533i 0.124973 0.384629i
\(147\) −75.3471 231.894i −0.0422757 0.130111i
\(148\) −328.625 + 238.760i −0.182519 + 0.132608i
\(149\) −287.340 + 208.765i −0.157985 + 0.114783i −0.663969 0.747760i \(-0.731129\pi\)
0.505984 + 0.862543i \(0.331129\pi\)
\(150\) −50.0448 154.022i −0.0272410 0.0838390i
\(151\) −580.814 + 1787.56i −0.313020 + 0.963375i 0.663542 + 0.748139i \(0.269052\pi\)
−0.976562 + 0.215237i \(0.930948\pi\)
\(152\) −1092.05 793.424i −0.582746 0.423389i
\(153\) 1478.66 0.781322
\(154\) 0 0
\(155\) −108.761 −0.0563607
\(156\) 57.2342 + 41.5831i 0.0293744 + 0.0213417i
\(157\) 772.539 2377.63i 0.392709 1.20863i −0.538022 0.842931i \(-0.680828\pi\)
0.930731 0.365704i \(-0.119172\pi\)
\(158\) −129.132 397.427i −0.0650202 0.200112i
\(159\) −162.776 + 118.264i −0.0811886 + 0.0589870i
\(160\) −105.845 + 76.9005i −0.0522984 + 0.0379970i
\(161\) −1556.57 4790.64i −0.761958 2.34507i
\(162\) −537.446 + 1654.09i −0.260653 + 0.802207i
\(163\) −1507.22 1095.06i −0.724260 0.526206i 0.163482 0.986546i \(-0.447727\pi\)
−0.887742 + 0.460341i \(0.847727\pi\)
\(164\) 370.077 0.176208
\(165\) 0 0
\(166\) −747.438 −0.349473
\(167\) −2141.68 1556.02i −0.992386 0.721011i −0.0319436 0.999490i \(-0.510170\pi\)
−0.960442 + 0.278479i \(0.910170\pi\)
\(168\) −114.444 + 352.222i −0.0525568 + 0.161753i
\(169\) 769.555 + 2368.45i 0.350276 + 1.07804i
\(170\) 169.483 123.137i 0.0764633 0.0555538i
\(171\) 1192.43 866.355i 0.533262 0.387437i
\(172\) −124.062 381.822i −0.0549977 0.169266i
\(173\) 651.836 2006.14i 0.286463 0.881643i −0.699493 0.714639i \(-0.746591\pi\)
0.985956 0.167004i \(-0.0534092\pi\)
\(174\) 120.903 + 87.8411i 0.0526760 + 0.0382714i
\(175\) −3464.45 −1.49650
\(176\) 0 0
\(177\) 271.437 0.115268
\(178\) −2285.91 1660.81i −0.962563 0.699343i
\(179\) 429.919 1323.15i 0.179517 0.552498i −0.820294 0.571943i \(-0.806190\pi\)
0.999811 + 0.0194450i \(0.00618992\pi\)
\(180\) −24.4465 75.2387i −0.0101230 0.0311553i
\(181\) −2994.50 + 2175.63i −1.22972 + 0.893443i −0.996869 0.0790692i \(-0.974805\pi\)
−0.232850 + 0.972513i \(0.574805\pi\)
\(182\) −3855.47 + 2801.17i −1.57026 + 1.14086i
\(183\) −77.6171 238.881i −0.0313531 0.0964950i
\(184\) −1348.03 + 4148.82i −0.540099 + 1.66225i
\(185\) −261.764 190.183i −0.104029 0.0755812i
\(186\) 93.5088 0.0368624
\(187\) 0 0
\(188\) −988.234 −0.383374
\(189\) −657.834 477.945i −0.253177 0.183944i
\(190\) 64.5299 198.603i 0.0246394 0.0758323i
\(191\) −1091.77 3360.11i −0.413599 1.27293i −0.913498 0.406844i \(-0.866629\pi\)
0.499899 0.866084i \(-0.333371\pi\)
\(192\) 246.581 179.152i 0.0926848 0.0673395i
\(193\) 2108.02 1531.57i 0.786212 0.571216i −0.120625 0.992698i \(-0.538490\pi\)
0.906837 + 0.421482i \(0.138490\pi\)
\(194\) −488.546 1503.59i −0.180802 0.556451i
\(195\) −17.4137 + 53.5938i −0.00639497 + 0.0196817i
\(196\) 709.761 + 515.671i 0.258659 + 0.187927i
\(197\) 719.202 0.260107 0.130053 0.991507i \(-0.458485\pi\)
0.130053 + 0.991507i \(0.458485\pi\)
\(198\) 0 0
\(199\) 1035.15 0.368744 0.184372 0.982857i \(-0.440975\pi\)
0.184372 + 0.982857i \(0.440975\pi\)
\(200\) 2427.30 + 1763.53i 0.858179 + 0.623503i
\(201\) 48.0071 147.751i 0.0168466 0.0518484i
\(202\) 843.358 + 2595.59i 0.293755 + 0.904084i
\(203\) 2586.39 1879.12i 0.894232 0.649698i
\(204\) 46.2744 33.6203i 0.0158816 0.0115387i
\(205\) 91.0927 + 280.355i 0.0310351 + 0.0955162i
\(206\) 227.138 699.060i 0.0768227 0.236436i
\(207\) −3853.59 2799.80i −1.29393 0.940095i
\(208\) 3071.05 1.02375
\(209\) 0 0
\(210\) −57.2931 −0.0188267
\(211\) 288.250 + 209.426i 0.0940472 + 0.0683293i 0.633815 0.773485i \(-0.281488\pi\)
−0.539768 + 0.841814i \(0.681488\pi\)
\(212\) 223.710 688.509i 0.0724739 0.223052i
\(213\) 65.2488 + 200.815i 0.0209895 + 0.0645992i
\(214\) 1192.36 866.303i 0.380880 0.276725i
\(215\) 258.715 187.968i 0.0820662 0.0596246i
\(216\) 217.607 + 669.724i 0.0685475 + 0.210967i
\(217\) 618.148 1902.46i 0.193376 0.595151i
\(218\) 3050.37 + 2216.22i 0.947692 + 0.688539i
\(219\) 155.163 0.0478765
\(220\) 0 0
\(221\) 3789.75 1.15351
\(222\) 225.055 + 163.512i 0.0680393 + 0.0494334i
\(223\) −90.4011 + 278.226i −0.0271467 + 0.0835489i −0.963712 0.266944i \(-0.913986\pi\)
0.936565 + 0.350493i \(0.113986\pi\)
\(224\) −743.583 2288.51i −0.221798 0.682623i
\(225\) −2650.41 + 1925.64i −0.785307 + 0.570559i
\(226\) −301.039 + 218.718i −0.0886054 + 0.0643756i
\(227\) 1731.74 + 5329.75i 0.506343 + 1.55836i 0.798502 + 0.601993i \(0.205626\pi\)
−0.292159 + 0.956370i \(0.594374\pi\)
\(228\) 17.6187 54.2249i 0.00511768 0.0157506i
\(229\) 4574.49 + 3323.56i 1.32005 + 0.959070i 0.999932 + 0.0116906i \(0.00372132\pi\)
0.320114 + 0.947379i \(0.396279\pi\)
\(230\) −674.854 −0.193472
\(231\) 0 0
\(232\) −2768.65 −0.783493
\(233\) 2065.49 + 1500.66i 0.580749 + 0.421939i 0.838994 0.544141i \(-0.183144\pi\)
−0.258245 + 0.966079i \(0.583144\pi\)
\(234\) −1392.59 + 4285.95i −0.389045 + 1.19736i
\(235\) −243.249 748.644i −0.0675227 0.207814i
\(236\) −790.126 + 574.060i −0.217936 + 0.158340i
\(237\) 73.5246 53.4188i 0.0201516 0.0146410i
\(238\) 1190.66 + 3664.47i 0.324281 + 0.998035i
\(239\) 1636.95 5038.00i 0.443034 1.36352i −0.441591 0.897217i \(-0.645586\pi\)
0.884625 0.466303i \(-0.154414\pi\)
\(240\) 29.8694 + 21.7014i 0.00803360 + 0.00583675i
\(241\) −4145.14 −1.10793 −0.553966 0.832539i \(-0.686886\pi\)
−0.553966 + 0.832539i \(0.686886\pi\)
\(242\) 0 0
\(243\) −1155.43 −0.305025
\(244\) 731.144 + 531.207i 0.191831 + 0.139373i
\(245\) −215.947 + 664.615i −0.0563115 + 0.173309i
\(246\) −78.3181 241.038i −0.0202983 0.0624717i
\(247\) 3056.17 2220.44i 0.787286 0.571997i
\(248\) −1401.52 + 1018.26i −0.358857 + 0.260725i
\(249\) −50.2321 154.599i −0.0127845 0.0393465i
\(250\) −289.618 + 891.354i −0.0732683 + 0.225497i
\(251\) 1446.63 + 1051.04i 0.363786 + 0.264306i 0.754630 0.656151i \(-0.227817\pi\)
−0.390843 + 0.920457i \(0.627817\pi\)
\(252\) 1455.03 0.363723
\(253\) 0 0
\(254\) −1714.40 −0.423507
\(255\) 36.8596 + 26.7800i 0.00905190 + 0.00657659i
\(256\) −857.782 + 2639.98i −0.209419 + 0.644527i
\(257\) 1596.69 + 4914.12i 0.387545 + 1.19274i 0.934617 + 0.355655i \(0.115742\pi\)
−0.547072 + 0.837085i \(0.684258\pi\)
\(258\) −222.434 + 161.608i −0.0536749 + 0.0389971i
\(259\) 4814.45 3497.90i 1.15504 0.839186i
\(260\) −62.6557 192.834i −0.0149452 0.0459965i
\(261\) 934.200 2875.17i 0.221554 0.681873i
\(262\) −3320.54 2412.51i −0.782990 0.568876i
\(263\) 57.6791 0.0135234 0.00676169 0.999977i \(-0.497848\pi\)
0.00676169 + 0.999977i \(0.497848\pi\)
\(264\) 0 0
\(265\) 576.651 0.133673
\(266\) 3107.22 + 2257.53i 0.716226 + 0.520368i
\(267\) 189.892 584.429i 0.0435252 0.133957i
\(268\) 172.733 + 531.618i 0.0393707 + 0.121171i
\(269\) 2449.75 1779.85i 0.555256 0.403417i −0.274463 0.961598i \(-0.588500\pi\)
0.829720 + 0.558180i \(0.188500\pi\)
\(270\) −88.1331 + 64.0325i −0.0198652 + 0.0144329i
\(271\) 459.767 + 1415.02i 0.103058 + 0.317181i 0.989270 0.146100i \(-0.0466720\pi\)
−0.886211 + 0.463281i \(0.846672\pi\)
\(272\) 767.281 2361.45i 0.171041 0.526411i
\(273\) −838.497 609.204i −0.185891 0.135058i
\(274\) 3956.06 0.872241
\(275\) 0 0
\(276\) −184.257 −0.0401847
\(277\) 6035.64 + 4385.15i 1.30919 + 0.951185i 1.00000 0.000185599i \(5.90779e-5\pi\)
0.309194 + 0.950999i \(0.399941\pi\)
\(278\) −814.218 + 2505.90i −0.175660 + 0.540626i
\(279\) −584.539 1799.03i −0.125432 0.386039i
\(280\) 858.713 623.892i 0.183278 0.133159i
\(281\) 728.240 529.098i 0.154602 0.112325i −0.507795 0.861478i \(-0.669539\pi\)
0.662397 + 0.749153i \(0.269539\pi\)
\(282\) 209.137 + 643.657i 0.0441628 + 0.135919i
\(283\) −2004.57 + 6169.42i −0.421057 + 1.29588i 0.485662 + 0.874146i \(0.338578\pi\)
−0.906720 + 0.421734i \(0.861422\pi\)
\(284\) −614.636 446.559i −0.128422 0.0933043i
\(285\) 45.4153 0.00943920
\(286\) 0 0
\(287\) −5421.72 −1.11510
\(288\) −1840.88 1337.48i −0.376649 0.273651i
\(289\) −571.358 + 1758.46i −0.116295 + 0.357920i
\(290\) −132.355 407.348i −0.0268006 0.0824838i
\(291\) 278.166 202.100i 0.0560357 0.0407123i
\(292\) −451.665 + 328.154i −0.0905195 + 0.0657663i
\(293\) −1894.08 5829.39i −0.377657 1.16231i −0.941668 0.336542i \(-0.890743\pi\)
0.564011 0.825767i \(-0.309257\pi\)
\(294\) 185.663 571.411i 0.0368302 0.113352i
\(295\) −629.370 457.264i −0.124215 0.0902473i
\(296\) −5153.71 −1.01200
\(297\) 0 0
\(298\) −875.179 −0.170127
\(299\) −9876.64 7175.80i −1.91030 1.38792i
\(300\) −39.1610 + 120.525i −0.00753653 + 0.0231951i
\(301\) 1817.54 + 5593.80i 0.348043 + 1.07117i
\(302\) −3746.89 + 2722.27i −0.713938 + 0.518706i
\(303\) −480.188 + 348.877i −0.0910431 + 0.0661467i
\(304\) −764.829 2353.90i −0.144296 0.444097i
\(305\) −222.453 + 684.638i −0.0417626 + 0.128532i
\(306\) 2947.70 + 2141.63i 0.550683 + 0.400094i
\(307\) −5377.67 −0.999740 −0.499870 0.866101i \(-0.666619\pi\)
−0.499870 + 0.866101i \(0.666619\pi\)
\(308\) 0 0
\(309\) 159.857 0.0294303
\(310\) −216.816 157.526i −0.0397235 0.0288608i
\(311\) −1874.63 + 5769.50i −0.341801 + 1.05196i 0.621473 + 0.783436i \(0.286535\pi\)
−0.963274 + 0.268521i \(0.913465\pi\)
\(312\) 277.368 + 853.652i 0.0503298 + 0.154899i
\(313\) −2622.17 + 1905.12i −0.473526 + 0.344037i −0.798814 0.601578i \(-0.794539\pi\)
0.325288 + 0.945615i \(0.394539\pi\)
\(314\) 4983.73 3620.89i 0.895695 0.650760i
\(315\) 358.148 + 1102.27i 0.0640615 + 0.197161i
\(316\) −101.048 + 310.994i −0.0179886 + 0.0553632i
\(317\) −5274.24 3831.96i −0.934482 0.678941i 0.0126037 0.999921i \(-0.495988\pi\)
−0.947086 + 0.320979i \(0.895988\pi\)
\(318\) −495.783 −0.0874281
\(319\) 0 0
\(320\) −873.540 −0.152601
\(321\) 259.318 + 188.406i 0.0450895 + 0.0327594i
\(322\) 3835.56 11804.6i 0.663811 2.04300i
\(323\) −943.816 2904.77i −0.162586 0.500389i
\(324\) 1101.04 799.955i 0.188794 0.137167i
\(325\) −6792.92 + 4935.34i −1.15939 + 0.842349i
\(326\) −1418.60 4365.99i −0.241009 0.741749i
\(327\) −253.396 + 779.874i −0.0428528 + 0.131887i
\(328\) 3798.62 + 2759.86i 0.639462 + 0.464597i
\(329\) 14477.9 2.42612
\(330\) 0 0
\(331\) 5879.55 0.976343 0.488171 0.872748i \(-0.337664\pi\)
0.488171 + 0.872748i \(0.337664\pi\)
\(332\) 473.181 + 343.786i 0.0782204 + 0.0568304i
\(333\) 1738.97 5352.00i 0.286171 0.880745i
\(334\) −2015.76 6203.87i −0.330232 1.01635i
\(335\) −360.214 + 261.711i −0.0587481 + 0.0426830i
\(336\) −549.368 + 399.139i −0.0891978 + 0.0648060i
\(337\) −414.906 1276.95i −0.0670663 0.206409i 0.911907 0.410397i \(-0.134610\pi\)
−0.978973 + 0.203988i \(0.934610\pi\)
\(338\) −1896.26 + 5836.10i −0.305157 + 0.939177i
\(339\) −65.4707 47.5672i −0.0104893 0.00762093i
\(340\) −163.932 −0.0261484
\(341\) 0 0
\(342\) 3631.91 0.574244
\(343\) −2559.38 1859.50i −0.402896 0.292721i
\(344\) 1574.03 4844.37i 0.246704 0.759277i
\(345\) −45.3540 139.585i −0.00707762 0.0217827i
\(346\) 4205.06 3055.15i 0.653368 0.474700i
\(347\) −4570.97 + 3321.01i −0.707155 + 0.513778i −0.882255 0.470773i \(-0.843975\pi\)
0.175100 + 0.984551i \(0.443975\pi\)
\(348\) −36.1373 111.219i −0.00556656 0.0171321i
\(349\) 386.133 1188.39i 0.0592241 0.182273i −0.917068 0.398731i \(-0.869451\pi\)
0.976292 + 0.216458i \(0.0694506\pi\)
\(350\) −6906.38 5017.78i −1.05475 0.766319i
\(351\) −1970.71 −0.299683
\(352\) 0 0
\(353\) 5984.25 0.902293 0.451147 0.892450i \(-0.351015\pi\)
0.451147 + 0.892450i \(0.351015\pi\)
\(354\) 541.109 + 393.139i 0.0812419 + 0.0590257i
\(355\) 187.005 575.541i 0.0279582 0.0860466i
\(356\) 683.248 + 2102.82i 0.101719 + 0.313060i
\(357\) −677.932 + 492.547i −0.100504 + 0.0730206i
\(358\) 2773.45 2015.03i 0.409445 0.297479i
\(359\) 672.424 + 2069.51i 0.0988557 + 0.304247i 0.988239 0.152915i \(-0.0488661\pi\)
−0.889384 + 0.457162i \(0.848866\pi\)
\(360\) 310.166 954.592i 0.0454088 0.139754i
\(361\) 3086.00 + 2242.11i 0.449920 + 0.326886i
\(362\) −9120.63 −1.32423
\(363\) 0 0
\(364\) 3729.19 0.536985
\(365\) −359.771 261.389i −0.0515925 0.0374842i
\(366\) 191.256 588.627i 0.0273146 0.0840656i
\(367\) −2615.64 8050.11i −0.372031 1.14499i −0.945460 0.325738i \(-0.894387\pi\)
0.573430 0.819255i \(-0.305613\pi\)
\(368\) −6470.99 + 4701.45i −0.916641 + 0.665978i
\(369\) −4147.78 + 3013.54i −0.585163 + 0.425145i
\(370\) −246.373 758.259i −0.0346171 0.106541i
\(371\) −3277.42 + 10086.8i −0.458639 + 1.41154i
\(372\) −59.1977 43.0096i −0.00825069 0.00599447i
\(373\) 4248.93 0.589816 0.294908 0.955526i \(-0.404711\pi\)
0.294908 + 0.955526i \(0.404711\pi\)
\(374\) 0 0
\(375\) −203.830 −0.0280686
\(376\) −10143.6 7369.78i −1.39127 1.01082i
\(377\) 2394.33 7368.98i 0.327093 1.00669i
\(378\) −619.156 1905.57i −0.0842485 0.259290i
\(379\) −3926.11 + 2852.48i −0.532112 + 0.386602i −0.821147 0.570716i \(-0.806666\pi\)
0.289035 + 0.957318i \(0.406666\pi\)
\(380\) −132.200 + 96.0487i −0.0178466 + 0.0129663i
\(381\) −115.217 354.602i −0.0154928 0.0476819i
\(382\) 2690.22 8279.66i 0.360324 1.10896i
\(383\) 6619.22 + 4809.15i 0.883098 + 0.641608i 0.934069 0.357092i \(-0.116232\pi\)
−0.0509713 + 0.998700i \(0.516232\pi\)
\(384\) 385.846 0.0512763
\(385\) 0 0
\(386\) 6420.61 0.846634
\(387\) 4499.66 + 3269.19i 0.591035 + 0.429412i
\(388\) −382.296 + 1176.59i −0.0500209 + 0.153949i
\(389\) 387.760 + 1193.40i 0.0505404 + 0.155547i 0.973141 0.230208i \(-0.0739407\pi\)
−0.922601 + 0.385756i \(0.873941\pi\)
\(390\) −112.337 + 81.6178i −0.0145857 + 0.0105971i
\(391\) −7985.35 + 5801.70i −1.03283 + 0.750395i
\(392\) 3439.64 + 10586.1i 0.443184 + 1.36398i
\(393\) 275.840 848.948i 0.0354053 0.108966i
\(394\) 1433.73 + 1041.67i 0.183325 + 0.133194i
\(395\) −260.469 −0.0331787
\(396\) 0 0
\(397\) −11519.3 −1.45627 −0.728133 0.685436i \(-0.759612\pi\)
−0.728133 + 0.685436i \(0.759612\pi\)
\(398\) 2063.58 + 1499.28i 0.259894 + 0.188824i
\(399\) −258.120 + 794.410i −0.0323863 + 0.0996748i
\(400\) 1699.98 + 5231.99i 0.212497 + 0.653998i
\(401\) 1214.06 882.069i 0.151191 0.109846i −0.509618 0.860401i \(-0.670213\pi\)
0.660809 + 0.750554i \(0.270213\pi\)
\(402\) 309.699 225.009i 0.0384238 0.0279165i
\(403\) −1498.16 4610.85i −0.185182 0.569932i
\(404\) 659.942 2031.09i 0.0812707 0.250125i
\(405\) 877.030 + 637.199i 0.107605 + 0.0781795i
\(406\) 7877.63 0.962956
\(407\) 0 0
\(408\) 725.704 0.0880581
\(409\) 73.9390 + 53.7198i 0.00893899 + 0.00649456i 0.592246 0.805757i \(-0.298241\pi\)
−0.583307 + 0.812252i \(0.698241\pi\)
\(410\) −224.462 + 690.822i −0.0270375 + 0.0832129i
\(411\) 265.870 + 818.263i 0.0319085 + 0.0982042i
\(412\) −465.329 + 338.081i −0.0556435 + 0.0404274i
\(413\) 11575.6 8410.14i 1.37917 1.00202i
\(414\) −3627.01 11162.8i −0.430575 1.32517i
\(415\) −143.966 + 443.083i −0.0170290 + 0.0524099i
\(416\) −4718.12 3427.91i −0.556069 0.404008i
\(417\) −573.036 −0.0672942
\(418\) 0 0
\(419\) −1880.83 −0.219295 −0.109648 0.993971i \(-0.534972\pi\)
−0.109648 + 0.993971i \(0.534972\pi\)
\(420\) 36.2705 + 26.3521i 0.00421386 + 0.00306155i
\(421\) −2249.59 + 6923.53i −0.260424 + 0.801501i 0.732289 + 0.680994i \(0.238452\pi\)
−0.992712 + 0.120507i \(0.961548\pi\)
\(422\) 271.302 + 834.981i 0.0312957 + 0.0963181i
\(423\) 11076.0 8047.21i 1.27313 0.924985i
\(424\) 7430.83 5398.82i 0.851116 0.618372i
\(425\) 2097.81 + 6456.39i 0.239432 + 0.736896i
\(426\) −160.780 + 494.829i −0.0182859 + 0.0562782i
\(427\) −10711.5 7782.33i −1.21397 0.881999i
\(428\) −1153.31 −0.130251
\(429\) 0 0
\(430\) 787.994 0.0883732
\(431\) 5558.44 + 4038.44i 0.621208 + 0.451334i 0.853343 0.521350i \(-0.174571\pi\)
−0.232135 + 0.972684i \(0.574571\pi\)
\(432\) −398.995 + 1227.98i −0.0444367 + 0.136762i
\(433\) 346.508 + 1066.44i 0.0384575 + 0.118360i 0.968442 0.249238i \(-0.0801802\pi\)
−0.929985 + 0.367598i \(0.880180\pi\)
\(434\) 3987.74 2897.26i 0.441054 0.320445i
\(435\) 75.3600 54.7522i 0.00830628 0.00603487i
\(436\) −911.740 2806.05i −0.100148 0.308223i
\(437\) −3040.38 + 9357.34i −0.332818 + 1.02431i
\(438\) 309.318 + 224.732i 0.0337438 + 0.0245163i
\(439\) −7114.94 −0.773525 −0.386763 0.922179i \(-0.626407\pi\)
−0.386763 + 0.922179i \(0.626407\pi\)
\(440\) 0 0
\(441\) −12154.1 −1.31239
\(442\) 7554.87 + 5488.93i 0.813005 + 0.590683i
\(443\) −4343.97 + 13369.4i −0.465888 + 1.43385i 0.391975 + 0.919976i \(0.371792\pi\)
−0.857863 + 0.513879i \(0.828208\pi\)
\(444\) −67.2679 207.029i −0.00719008 0.0221288i
\(445\) −1424.83 + 1035.20i −0.151783 + 0.110277i
\(446\) −583.187 + 423.710i −0.0619164 + 0.0449849i
\(447\) −58.8171 181.020i −0.00622360 0.0191543i
\(448\) 4964.79 15280.1i 0.523581 1.61142i
\(449\) 12397.3 + 9007.14i 1.30304 + 0.946711i 0.999980 0.00626255i \(-0.00199345\pi\)
0.303055 + 0.952973i \(0.401993\pi\)
\(450\) −8072.61 −0.845659
\(451\) 0 0
\(452\) 291.179 0.0303006
\(453\) −814.882 592.046i −0.0845177 0.0614057i
\(454\) −4267.19 + 13133.1i −0.441121 + 1.35763i
\(455\) 917.923 + 2825.08i 0.0945778 + 0.291081i
\(456\) 585.230 425.195i 0.0601007 0.0436657i
\(457\) −5834.80 + 4239.23i −0.597243 + 0.433923i −0.844899 0.534925i \(-0.820340\pi\)
0.247656 + 0.968848i \(0.420340\pi\)
\(458\) 4305.52 + 13251.0i 0.439266 + 1.35192i
\(459\) −492.369 + 1515.35i −0.0500693 + 0.154097i
\(460\) 427.230 + 310.401i 0.0433037 + 0.0314620i
\(461\) 10159.6 1.02642 0.513212 0.858262i \(-0.328456\pi\)
0.513212 + 0.858262i \(0.328456\pi\)
\(462\) 0 0
\(463\) −10292.0 −1.03306 −0.516532 0.856268i \(-0.672777\pi\)
−0.516532 + 0.856268i \(0.672777\pi\)
\(464\) −4106.96 2983.88i −0.410907 0.298541i
\(465\) 18.0110 55.4323i 0.00179622 0.00552820i
\(466\) 1944.04 + 5983.15i 0.193253 + 0.594772i
\(467\) −14580.9 + 10593.6i −1.44480 + 1.04971i −0.457792 + 0.889059i \(0.651360\pi\)
−0.987011 + 0.160652i \(0.948640\pi\)
\(468\) 2852.94 2072.78i 0.281789 0.204732i
\(469\) −2530.59 7788.35i −0.249151 0.766807i
\(470\) 599.391 1844.74i 0.0588252 0.181045i
\(471\) 1083.87 + 787.480i 0.106034 + 0.0770385i
\(472\) −12391.3 −1.20838
\(473\) 0 0
\(474\) 223.941 0.0217003
\(475\) 5474.58 + 3977.52i 0.528823 + 0.384212i
\(476\) 931.712 2867.51i 0.0897162 0.276118i
\(477\) 3099.22 + 9538.42i 0.297492 + 0.915586i
\(478\) 10560.1 7672.37i 1.01048 0.734154i
\(479\) 13821.1 10041.6i 1.31837 0.957855i 0.318424 0.947948i \(-0.396846\pi\)
0.999951 0.00990707i \(-0.00315357\pi\)
\(480\) −21.6658 66.6806i −0.00206022 0.00634071i
\(481\) 4456.93 13717.0i 0.422492 1.30030i
\(482\) −8263.33 6003.66i −0.780881 0.567343i
\(483\) 2699.42 0.254302
\(484\) 0 0
\(485\) −985.432 −0.0922601
\(486\) −2303.35 1673.49i −0.214984 0.156195i
\(487\) 142.705 439.202i 0.0132784 0.0408668i −0.944198 0.329379i \(-0.893161\pi\)
0.957476 + 0.288512i \(0.0931606\pi\)
\(488\) 3543.27 + 10905.1i 0.328681 + 1.01158i
\(489\) 807.715 586.840i 0.0746956 0.0542695i
\(490\) −1393.09 + 1012.14i −0.128436 + 0.0933141i
\(491\) 3875.92 + 11928.9i 0.356248 + 1.09642i 0.955282 + 0.295696i \(0.0955515\pi\)
−0.599034 + 0.800724i \(0.704448\pi\)
\(492\) −61.2853 + 188.617i −0.00561576 + 0.0172835i
\(493\) −5068.08 3682.17i −0.462991 0.336383i
\(494\) 9308.48 0.847790
\(495\) 0 0
\(496\) −3176.41 −0.287550
\(497\) 9004.59 + 6542.22i 0.812698 + 0.590460i
\(498\) 123.777 380.946i 0.0111377 0.0342783i
\(499\) −5647.90 17382.4i −0.506682 1.55941i −0.797924 0.602759i \(-0.794068\pi\)
0.291241 0.956650i \(-0.405932\pi\)
\(500\) 593.329 431.079i 0.0530690 0.0385569i
\(501\) 1147.72 833.871i 0.102348 0.0743605i
\(502\) 1361.57 + 4190.48i 0.121056 + 0.372571i
\(503\) 820.496 2525.23i 0.0727319 0.223846i −0.908082 0.418793i \(-0.862453\pi\)
0.980814 + 0.194947i \(0.0624534\pi\)
\(504\) 14935.0 + 10850.9i 1.31996 + 0.959004i
\(505\) 1701.11 0.149898
\(506\) 0 0
\(507\) −1334.57 −0.116904
\(508\) 1085.33 + 788.540i 0.0947910 + 0.0688697i
\(509\) −1510.21 + 4647.96i −0.131511 + 0.404749i −0.995031 0.0995653i \(-0.968255\pi\)
0.863520 + 0.504315i \(0.168255\pi\)
\(510\) 34.6923 + 106.772i 0.00301216 + 0.00927048i
\(511\) 6617.02 4807.54i 0.572837 0.416190i
\(512\) −10193.6 + 7406.06i −0.879875 + 0.639267i
\(513\) 490.795 + 1510.51i 0.0422400 + 0.130001i
\(514\) −3934.42 + 12108.9i −0.337626 + 1.03911i
\(515\) −370.655 269.297i −0.0317146 0.0230420i
\(516\) 215.148 0.0183554
\(517\) 0 0
\(518\) 14663.8 1.24381
\(519\) 914.526 + 664.442i 0.0773472 + 0.0561961i
\(520\) 794.945 2446.59i 0.0670397 0.206327i
\(521\) −6780.17 20867.2i −0.570144 1.75472i −0.652150 0.758090i \(-0.726133\pi\)
0.0820064 0.996632i \(-0.473867\pi\)
\(522\) 6026.62 4378.60i 0.505322 0.367138i
\(523\) −4936.85 + 3586.83i −0.412759 + 0.299887i −0.774718 0.632307i \(-0.782108\pi\)
0.361959 + 0.932194i \(0.382108\pi\)
\(524\) 992.492 + 3054.58i 0.0827428 + 0.254656i
\(525\) 573.719 1765.73i 0.0476936 0.146786i
\(526\) 114.983 + 83.5403i 0.00953139 + 0.00692496i
\(527\) −3919.76 −0.323999
\(528\) 0 0
\(529\) 19629.4 1.61333
\(530\) 1149.55 + 835.200i 0.0942140 + 0.0684505i
\(531\) 4181.08 12868.0i 0.341701 1.05165i
\(532\) −928.734 2858.35i −0.0756874 0.232942i
\(533\) −10630.6 + 7723.61i −0.863910 + 0.627667i
\(534\) 1225.02 890.026i 0.0992727 0.0721258i
\(535\) −283.882 873.698i −0.0229407 0.0706042i
\(536\) −2191.55 + 6744.91i −0.176606 + 0.543537i
\(537\) 603.176 + 438.233i 0.0484711 + 0.0352163i
\(538\) 7461.44 0.597929
\(539\) 0 0
\(540\) 85.2463 0.00679337
\(541\) −1698.41 1233.97i −0.134973 0.0980636i 0.518250 0.855229i \(-0.326584\pi\)
−0.653223 + 0.757165i \(0.726584\pi\)
\(542\) −1132.91 + 3486.74i −0.0897837 + 0.276326i
\(543\) −612.958 1886.49i −0.0484430 0.149092i
\(544\) −3814.64 + 2771.50i −0.300646 + 0.218432i
\(545\) 1901.32 1381.39i 0.149438 0.108573i
\(546\) −789.196 2428.90i −0.0618580 0.190379i
\(547\) 2790.13 8587.15i 0.218094 0.671225i −0.780825 0.624749i \(-0.785201\pi\)
0.998919 0.0464753i \(-0.0147989\pi\)
\(548\) −2504.46 1819.60i −0.195229 0.141842i
\(549\) −12520.2 −0.973315
\(550\) 0 0
\(551\) −6244.47 −0.482801
\(552\) −1891.29 1374.10i −0.145831 0.105952i
\(553\) 1480.38 4556.15i 0.113838 0.350356i
\(554\) 5680.76 + 17483.6i 0.435654 + 1.34081i
\(555\) 140.279 101.919i 0.0107289 0.00779497i
\(556\) 1668.05 1211.91i 0.127232 0.0924398i
\(557\) −2439.55 7508.15i −0.185578 0.571150i 0.814380 0.580332i \(-0.197077\pi\)
−0.999958 + 0.00918192i \(0.997077\pi\)
\(558\) 1440.36 4432.98i 0.109275 0.336314i
\(559\) 11532.5 + 8378.84i 0.872579 + 0.633966i
\(560\) 1946.19 0.146860
\(561\) 0 0
\(562\) 2218.07 0.166484
\(563\) −18103.8 13153.2i −1.35521 0.984621i −0.998733 0.0503183i \(-0.983976\pi\)
−0.356481 0.934303i \(-0.616024\pi\)
\(564\) 163.653 503.673i 0.0122182 0.0376036i
\(565\) 71.6723 + 220.585i 0.00533677 + 0.0164249i
\(566\) −12931.7 + 9395.41i −0.960351 + 0.697736i
\(567\) −16130.6 + 11719.6i −1.19475 + 0.868034i
\(568\) −2978.65 9167.34i −0.220038 0.677206i
\(569\) −5228.72 + 16092.4i −0.385236 + 1.18564i 0.551072 + 0.834457i \(0.314219\pi\)
−0.936309 + 0.351178i \(0.885781\pi\)
\(570\) 90.5354 + 65.7778i 0.00665283 + 0.00483356i
\(571\) 16320.0 1.19609 0.598047 0.801461i \(-0.295944\pi\)
0.598047 + 0.801461i \(0.295944\pi\)
\(572\) 0 0
\(573\) 1893.35 0.138038
\(574\) −10808.2 7852.62i −0.785934 0.571014i
\(575\) 6757.82 20798.4i 0.490123 1.50844i
\(576\) −4694.86 14449.3i −0.339616 1.04523i
\(577\) −671.696 + 488.016i −0.0484629 + 0.0352103i −0.611753 0.791049i \(-0.709535\pi\)
0.563290 + 0.826259i \(0.309535\pi\)
\(578\) −3685.89 + 2677.96i −0.265247 + 0.192713i
\(579\) 431.502 + 1328.03i 0.0309717 + 0.0953211i
\(580\) −103.570 + 318.757i −0.00741470 + 0.0228201i
\(581\) −6932.23 5036.56i −0.495004 0.359641i
\(582\) 847.238 0.0603422
\(583\) 0 0
\(584\) −7083.29 −0.501899
\(585\) 2272.49 + 1651.06i 0.160609 + 0.116689i
\(586\) 4667.21 14364.2i 0.329012 1.01259i
\(587\) 6773.45 + 20846.5i 0.476270 + 1.46581i 0.844238 + 0.535969i \(0.180054\pi\)
−0.367968 + 0.929839i \(0.619946\pi\)
\(588\) −380.360 + 276.347i −0.0266765 + 0.0193816i
\(589\) −3161.02 + 2296.61i −0.221133 + 0.160663i
\(590\) −592.365 1823.11i −0.0413344 0.127214i
\(591\) −119.101 + 366.555i −0.00828962 + 0.0255128i
\(592\) −7644.91 5554.35i −0.530750 0.385612i
\(593\) −8236.51 −0.570376 −0.285188 0.958472i \(-0.592056\pi\)
−0.285188 + 0.958472i \(0.592056\pi\)
\(594\) 0 0
\(595\) 2401.64 0.165475
\(596\) 554.050 + 402.541i 0.0380785 + 0.0276656i
\(597\) −171.423 + 527.586i −0.0117519 + 0.0361686i
\(598\) −9295.93 28609.9i −0.635683 1.95643i
\(599\) 8836.08 6419.79i 0.602725 0.437906i −0.244120 0.969745i \(-0.578499\pi\)
0.846845 + 0.531839i \(0.178499\pi\)
\(600\) −1300.78 + 945.075i −0.0885071 + 0.0643042i
\(601\) −428.432 1318.58i −0.0290784 0.0894941i 0.935464 0.353422i \(-0.114982\pi\)
−0.964542 + 0.263928i \(0.914982\pi\)
\(602\) −4478.59 + 13783.7i −0.303212 + 0.933192i
\(603\) −6264.95 4551.75i −0.423099 0.307399i
\(604\) 3624.16 0.244147
\(605\) 0 0
\(606\) −1462.55 −0.0980399
\(607\) −1147.00 833.347i −0.0766976 0.0557241i 0.548776 0.835970i \(-0.315094\pi\)
−0.625473 + 0.780246i \(0.715094\pi\)
\(608\) −1452.41 + 4470.05i −0.0968797 + 0.298165i
\(609\) 529.421 + 1629.39i 0.0352270 + 0.108418i
\(610\) −1435.06 + 1042.63i −0.0952525 + 0.0692050i
\(611\) 28387.5 20624.7i 1.87960 1.36561i
\(612\) −881.054 2711.60i −0.0581936 0.179102i
\(613\) −4766.56 + 14670.0i −0.314061 + 0.966582i 0.662078 + 0.749435i \(0.269675\pi\)
−0.976139 + 0.217146i \(0.930325\pi\)
\(614\) −10720.4 7788.82i −0.704625 0.511940i
\(615\) −157.973 −0.0103579
\(616\) 0 0
\(617\) 15169.5 0.989793 0.494897 0.868952i \(-0.335206\pi\)
0.494897 + 0.868952i \(0.335206\pi\)
\(618\) 318.675 + 231.531i 0.0207427 + 0.0150705i
\(619\) −643.239 + 1979.69i −0.0417673 + 0.128547i −0.969766 0.244037i \(-0.921528\pi\)
0.927999 + 0.372584i \(0.121528\pi\)
\(620\) 64.8051 + 199.450i 0.00419780 + 0.0129195i
\(621\) 4152.47 3016.95i 0.268330 0.194953i
\(622\) −12093.4 + 8786.37i −0.779584 + 0.566401i
\(623\) −10009.8 30806.9i −0.643712 1.98114i
\(624\) −508.572 + 1565.22i −0.0326269 + 0.100415i
\(625\) −11929.7 8667.45i −0.763502 0.554717i
\(626\) −7986.59 −0.509918
\(627\) 0 0
\(628\) −4820.49 −0.306303
\(629\) −9434.00 6854.20i −0.598026 0.434491i
\(630\) −882.514 + 2716.10i −0.0558099 + 0.171765i
\(631\) 7802.57 + 24013.8i 0.492259 + 1.51502i 0.821185 + 0.570662i \(0.193313\pi\)
−0.328926 + 0.944356i \(0.606687\pi\)
\(632\) −3356.45 + 2438.60i −0.211254 + 0.153485i
\(633\) −154.473 + 112.231i −0.00969943 + 0.00704705i
\(634\) −4964.13 15278.0i −0.310964 0.957047i
\(635\) −330.215 + 1016.30i −0.0206365 + 0.0635127i
\(636\) 313.865 + 228.037i 0.0195685 + 0.0142174i
\(637\) −31150.5 −1.93756
\(638\) 0 0
\(639\) 10525.1 0.651592
\(640\) −894.646 649.998i −0.0552562 0.0401460i
\(641\) −811.656 + 2498.02i −0.0500132 + 0.153925i −0.972944 0.231041i \(-0.925787\pi\)
0.922931 + 0.384966i \(0.125787\pi\)
\(642\) 244.071 + 751.173i 0.0150042 + 0.0461782i
\(643\) −7466.91 + 5425.03i −0.457957 + 0.332725i −0.792729 0.609574i \(-0.791341\pi\)
0.334772 + 0.942299i \(0.391341\pi\)
\(644\) −7857.74 + 5708.98i −0.480805 + 0.349325i
\(645\) 52.9577 + 162.987i 0.00323288 + 0.00994979i
\(646\) 2325.66 7157.64i 0.141644 0.435935i
\(647\) −256.379 186.270i −0.0155785 0.0113184i 0.579969 0.814639i \(-0.303065\pi\)
−0.595547 + 0.803320i \(0.703065\pi\)
\(648\) 17267.3 1.04679
\(649\) 0 0
\(650\) −20689.8 −1.24850
\(651\) 867.262 + 630.103i 0.0522130 + 0.0379350i
\(652\) −1110.08 + 3416.47i −0.0666779 + 0.205214i
\(653\) −1552.09 4776.83i −0.0930136 0.286266i 0.893717 0.448631i \(-0.148088\pi\)
−0.986731 + 0.162364i \(0.948088\pi\)
\(654\) −1634.69 + 1187.67i −0.0977390 + 0.0710115i
\(655\) −2069.72 + 1503.74i −0.123467 + 0.0897039i
\(656\) 2660.39 + 8187.84i 0.158340 + 0.487320i
\(657\) 2390.06 7355.83i 0.141925 0.436801i
\(658\) 28861.7 + 20969.2i 1.70995 + 1.24235i
\(659\) 24927.5 1.47350 0.736752 0.676163i \(-0.236358\pi\)
0.736752 + 0.676163i \(0.236358\pi\)
\(660\) 0 0
\(661\) −16440.5 −0.967418 −0.483709 0.875229i \(-0.660711\pi\)
−0.483709 + 0.875229i \(0.660711\pi\)
\(662\) 11720.9 + 8515.72i 0.688135 + 0.499959i
\(663\) −627.589 + 1931.52i −0.0367625 + 0.113143i
\(664\) 2293.13 + 7057.52i 0.134022 + 0.412477i
\(665\) 1936.76 1407.14i 0.112939 0.0820549i
\(666\) 11218.3 8150.56i 0.652702 0.474216i
\(667\) 6236.04 + 19192.6i 0.362010 + 1.11415i
\(668\) −1577.37 + 4854.64i −0.0913625 + 0.281185i
\(669\) −126.833 92.1494i −0.00732980 0.00532541i
\(670\) −1097.14 −0.0632630
\(671\) 0 0
\(672\) 1289.52 0.0740245
\(673\) −9528.14 6922.60i −0.545740 0.396503i 0.280472 0.959862i \(-0.409509\pi\)
−0.826212 + 0.563359i \(0.809509\pi\)
\(674\) 1022.37 3146.53i 0.0584276 0.179822i
\(675\) −1090.88 3357.39i −0.0622046 0.191446i
\(676\) 3884.79 2822.47i 0.221028 0.160586i
\(677\) −2280.21 + 1656.67i −0.129447 + 0.0940486i −0.650625 0.759400i \(-0.725493\pi\)
0.521178 + 0.853448i \(0.325493\pi\)
\(678\) −61.6212 189.650i −0.00349048 0.0107426i
\(679\) 5600.74 17237.3i 0.316549 0.974237i
\(680\) −1682.66 1222.53i −0.0948929 0.0689437i
\(681\) −3003.19 −0.168991
\(682\) 0 0
\(683\) 15803.2 0.885346 0.442673 0.896683i \(-0.354030\pi\)
0.442673 + 0.896683i \(0.354030\pi\)
\(684\) −2299.26 1670.51i −0.128530 0.0933823i
\(685\) 761.989 2345.16i 0.0425023 0.130809i
\(686\) −2408.89 7413.81i −0.134070 0.412625i
\(687\) −2451.46 + 1781.09i −0.136141 + 0.0989124i
\(688\) 7555.87 5489.66i 0.418699 0.304202i
\(689\) 7943.21 + 24446.7i 0.439205 + 1.35173i
\(690\) 111.757 343.953i 0.00616596 0.0189769i
\(691\) −2670.34 1940.12i −0.147011 0.106810i 0.511849 0.859076i \(-0.328961\pi\)
−0.658860 + 0.752266i \(0.728961\pi\)
\(692\) −4067.32 −0.223434
\(693\) 0 0
\(694\) −13922.3 −0.761501
\(695\) 1328.68 + 965.341i 0.0725174 + 0.0526870i
\(696\) 458.492 1411.09i 0.0249700 0.0768497i
\(697\) 3282.98 + 10104.0i 0.178410 + 0.549090i
\(698\) 2490.98 1809.80i 0.135079 0.0981405i
\(699\) −1106.89 + 804.203i −0.0598948 + 0.0435161i
\(700\) 2064.28 + 6353.21i 0.111461 + 0.343041i
\(701\) 9200.43 28316.0i 0.495714 1.52565i −0.320127 0.947375i \(-0.603726\pi\)
0.815841 0.578276i \(-0.196274\pi\)
\(702\) −3928.62 2854.31i −0.211219 0.153460i
\(703\) −11623.8 −0.623612
\(704\) 0 0
\(705\) 421.844 0.0225355
\(706\) 11929.6 + 8667.36i 0.635944 + 0.462040i
\(707\) −9668.34 + 29756.1i −0.514307 + 1.58288i
\(708\) −161.735 497.769i −0.00858527 0.0264227i
\(709\) 19418.4 14108.3i 1.02860 0.747318i 0.0605683 0.998164i \(-0.480709\pi\)
0.968027 + 0.250846i \(0.0807087\pi\)
\(710\) 1206.39 876.491i 0.0637674 0.0463297i
\(711\) −1399.89 4308.43i −0.0738398 0.227255i
\(712\) −8668.71 + 26679.6i −0.456283 + 1.40430i
\(713\) 10215.5 + 7421.97i 0.536567 + 0.389839i
\(714\) −2064.84 −0.108228
\(715\) 0 0
\(716\) −2682.60 −0.140019
\(717\) 2296.64 + 1668.60i 0.119623 + 0.0869109i
\(718\) −1656.92 + 5099.48i −0.0861223 + 0.265057i
\(719\) −6386.99 19657.1i −0.331286 1.01959i −0.968523 0.248925i \(-0.919923\pi\)
0.637237 0.770668i \(-0.280077\pi\)
\(720\) 1488.90 1081.75i 0.0770665 0.0559921i
\(721\) 6817.20 4952.98i 0.352130 0.255837i
\(722\) 2904.55 + 8939.30i 0.149718 + 0.460784i
\(723\) 686.442 2112.65i 0.0353099 0.108673i
\(724\) 5774.00 + 4195.06i 0.296394 + 0.215343i
\(725\) 13879.5 0.710995
\(726\) 0 0
\(727\) 21928.9 1.11870 0.559351 0.828931i \(-0.311050\pi\)
0.559351 + 0.828931i \(0.311050\pi\)
\(728\) 38277.9 + 27810.5i 1.94873 + 1.41583i
\(729\) −5697.64 + 17535.5i −0.289470 + 0.890898i
\(730\) −338.618 1042.16i −0.0171682 0.0528383i
\(731\) 9324.11 6774.36i 0.471771 0.342762i
\(732\) −391.819 + 284.673i −0.0197842 + 0.0143741i
\(733\) 7763.76 + 23894.4i 0.391215 + 1.20404i 0.931870 + 0.362792i \(0.118177\pi\)
−0.540655 + 0.841245i \(0.681823\pi\)
\(734\) 6445.20 19836.3i 0.324110 0.997508i
\(735\) −302.973 220.123i −0.0152045 0.0110467i
\(736\) 15189.3 0.760712
\(737\) 0 0
\(738\) −12633.3 −0.630133
\(739\) 29964.5 + 21770.5i 1.49156 + 1.08368i 0.973597 + 0.228274i \(0.0733083\pi\)
0.517960 + 0.855405i \(0.326692\pi\)
\(740\) −192.792 + 593.351i −0.00957724 + 0.0294757i
\(741\) 625.583 + 1925.35i 0.0310140 + 0.0954513i
\(742\) −21142.9 + 15361.2i −1.04607 + 0.760012i
\(743\) −20062.0 + 14575.9i −0.990582 + 0.719700i −0.960048 0.279834i \(-0.909721\pi\)
−0.0305332 + 0.999534i \(0.509721\pi\)
\(744\) −286.884 882.937i −0.0141366 0.0435081i
\(745\) −168.571 + 518.809i −0.00828989 + 0.0255137i
\(746\) 8470.25 + 6153.99i 0.415707 + 0.302029i
\(747\) −8102.82 −0.396876
\(748\) 0 0
\(749\) 16896.3 0.824268
\(750\) −406.335 295.219i −0.0197830 0.0143732i
\(751\) 4316.09 13283.6i 0.209716 0.645439i −0.789771 0.613402i \(-0.789801\pi\)
0.999487 0.0320368i \(-0.0101994\pi\)
\(752\) −7104.18 21864.4i −0.344498 1.06026i
\(753\) −775.246 + 563.249i −0.0375186 + 0.0272589i
\(754\) 15446.0 11222.2i 0.746037 0.542027i
\(755\) 892.071 + 2745.51i 0.0430011 + 0.132344i
\(756\) −484.500 + 1491.14i −0.0233083 + 0.0717357i
\(757\) 6889.14 + 5005.26i 0.330766 + 0.240316i 0.740756 0.671774i \(-0.234468\pi\)
−0.409989 + 0.912090i \(0.634468\pi\)
\(758\) −11958.1 −0.573006
\(759\) 0 0
\(760\) −2073.24 −0.0989530
\(761\) −25611.8 18608.1i −1.22001 0.886390i −0.223910 0.974610i \(-0.571882\pi\)
−0.996101 + 0.0882195i \(0.971882\pi\)
\(762\) 283.907 873.775i 0.0134972 0.0415401i
\(763\) 13357.2 + 41109.4i 0.633768 + 1.95054i
\(764\) −5511.35 + 4004.23i −0.260986 + 0.189618i
\(765\) 1837.33 1334.90i 0.0868351 0.0630894i
\(766\) 6230.03 + 19174.1i 0.293865 + 0.904422i
\(767\) 10716.0 32980.4i 0.504473 1.55261i
\(768\) −1203.47 874.371i −0.0565448 0.0410822i
\(769\) 606.519 0.0284416 0.0142208 0.999899i \(-0.495473\pi\)
0.0142208 + 0.999899i \(0.495473\pi\)
\(770\) 0 0
\(771\) −2768.99 −0.129342
\(772\) −4064.70 2953.18i −0.189497 0.137678i
\(773\) −1452.31 + 4469.74i −0.0675754 + 0.207976i −0.979142 0.203176i \(-0.934874\pi\)
0.911567 + 0.411152i \(0.134874\pi\)
\(774\) 4235.09 + 13034.3i 0.196676 + 0.605306i
\(775\) 7025.95 5104.65i 0.325651 0.236599i
\(776\) −12698.5 + 9225.97i −0.587433 + 0.426795i
\(777\) 985.494 + 3033.04i 0.0455011 + 0.140038i
\(778\) −955.481 + 2940.67i −0.0440304 + 0.135512i
\(779\) 8567.49 + 6224.65i 0.394047 + 0.286292i
\(780\) 108.658 0.00498791
\(781\) 0 0
\(782\) −24321.8 −1.11221
\(783\) 2635.46 + 1914.77i 0.120286 + 0.0873926i
\(784\) −6306.79 + 19410.3i −0.287299 + 0.884216i
\(785\) −1186.54 3651.80i −0.0539484 0.166036i
\(786\) 1779.47 1292.86i 0.0807527 0.0586703i
\(787\) 19479.6 14152.8i 0.882303 0.641031i −0.0515565 0.998670i \(-0.516418\pi\)
0.933860 + 0.357639i \(0.116418\pi\)
\(788\) −428.535 1318.89i −0.0193730 0.0596239i
\(789\) −9.55176 + 29.3973i −0.000430991 + 0.00132645i
\(790\) −519.244 377.253i −0.0233846 0.0169899i
\(791\) −4265.85 −0.191752
\(792\) 0 0
\(793\) −32088.9 −1.43696
\(794\) −22963.8 16684.1i −1.02639 0.745716i
\(795\) −95.4944 + 293.901i −0.00426017 + 0.0131115i
\(796\) −616.794 1898.30i −0.0274644 0.0845268i
\(797\) 15353.3 11154.8i 0.682360 0.495764i −0.191780 0.981438i \(-0.561426\pi\)
0.874140 + 0.485674i \(0.161426\pi\)
\(798\) −1665.16 + 1209.81i −0.0738670 + 0.0536675i
\(799\) −8766.71 26981.2i −0.388165 1.19465i
\(800\) 3228.24 9935.51i 0.142670 0.439092i
\(801\) −24781.1 18004.5i −1.09313 0.794205i
\(802\) 3697.79 0.162810
\(803\) 0 0
\(804\) −299.554 −0.0131399
\(805\) −6259.04 4547.46i −0.274040 0.199102i
\(806\) 3691.61 11361.6i 0.161329 0.496520i
\(807\) 501.452 + 1543.31i 0.0218735 + 0.0673198i
\(808\) 21920.9 15926.4i 0.954423 0.693429i
\(809\) 7378.80 5361.01i 0.320674 0.232983i −0.415789 0.909461i \(-0.636495\pi\)
0.736463 + 0.676478i \(0.236495\pi\)
\(810\) 825.463 + 2540.51i 0.0358072 + 0.110203i
\(811\) −12321.8 + 37922.6i −0.533511 + 1.64198i 0.213334 + 0.976979i \(0.431568\pi\)
−0.746845 + 0.664999i \(0.768432\pi\)
\(812\) −4987.09 3623.33i −0.215533 0.156594i
\(813\) −797.329 −0.0343955
\(814\) 0 0
\(815\) −2861.41 −0.122983
\(816\) 1076.50 + 782.120i 0.0461825 + 0.0335535i
\(817\) 3550.11 10926.1i 0.152023 0.467878i
\(818\) 69.5916 + 214.181i 0.00297459 + 0.00915484i
\(819\) −41796.4 + 30366.9i −1.78325 + 1.29561i
\(820\) 459.845 334.097i 0.0195835 0.0142283i
\(821\) −1518.49 4673.43i −0.0645501 0.198665i 0.913580 0.406659i \(-0.133306\pi\)
−0.978130 + 0.207994i \(0.933306\pi\)
\(822\) −655.130 + 2016.28i −0.0277984 + 0.0855546i
\(823\) −2247.11 1632.62i −0.0951752 0.0691488i 0.539180 0.842191i \(-0.318734\pi\)
−0.634355 + 0.773042i \(0.718734\pi\)
\(824\) −7297.58 −0.308523
\(825\) 0 0
\(826\) 35256.8 1.48516
\(827\) 16428.3 + 11935.9i 0.690773 + 0.501876i 0.876914 0.480647i \(-0.159598\pi\)
−0.186141 + 0.982523i \(0.559598\pi\)
\(828\) −2838.20 + 8735.09i −0.119124 + 0.366625i
\(829\) −10992.6 33831.7i −0.460540 1.41740i −0.864506 0.502623i \(-0.832368\pi\)
0.403965 0.914774i \(-0.367632\pi\)
\(830\) −928.742 + 674.771i −0.0388399 + 0.0282188i
\(831\) −3234.49 + 2350.00i −0.135022 + 0.0980992i
\(832\) −12032.8 37033.1i −0.501396 1.54314i
\(833\) −7782.72 + 23952.8i −0.323716 + 0.996295i
\(834\) −1142.35 829.964i −0.0474296 0.0344596i
\(835\) −4065.93 −0.168512
\(836\) 0 0
\(837\) 2038.32 0.0841751
\(838\) −3749.44 2724.13i −0.154561 0.112295i
\(839\) 2193.01 6749.38i 0.0902396 0.277729i −0.895744 0.444570i \(-0.853357\pi\)
0.985984 + 0.166841i \(0.0533566\pi\)
\(840\) 175.774 + 540.977i 0.00721998 + 0.0222208i
\(841\) 9369.35 6807.23i 0.384163 0.279111i
\(842\) −14512.3 + 10543.8i −0.593976 + 0.431549i
\(843\) 149.067 + 458.782i 0.00609033 + 0.0187441i
\(844\) 212.299 653.388i 0.00865831 0.0266476i
\(845\) 3094.41 + 2248.22i 0.125977 + 0.0915279i
\(846\) 33735.3 1.37097
\(847\) 0 0
\(848\) 16841.3 0.681995
\(849\) −2812.41 2043.33i −0.113689 0.0825996i
\(850\) −5169.21 + 15909.2i −0.208591 + 0.641978i
\(851\) 11608.1 + 35726.1i 0.467592 + 1.43910i
\(852\) 329.382 239.310i 0.0132447 0.00962281i
\(853\) 19543.9 14199.5i 0.784490 0.569965i −0.121834 0.992551i \(-0.538877\pi\)
0.906323 + 0.422586i \(0.138877\pi\)
\(854\) −10081.7 31028.2i −0.403966 1.24328i
\(855\) 699.555 2153.01i 0.0279816 0.0861185i
\(856\) −11838.0 8600.83i −0.472682 0.343423i
\(857\) −28806.8 −1.14822 −0.574108 0.818779i \(-0.694651\pi\)
−0.574108 + 0.818779i \(0.694651\pi\)
\(858\) 0 0
\(859\) 11244.4 0.446628 0.223314 0.974747i \(-0.428312\pi\)
0.223314 + 0.974747i \(0.428312\pi\)
\(860\) −498.856 362.440i −0.0197800 0.0143710i
\(861\) 897.847 2763.29i 0.0355384 0.109376i
\(862\) 5231.62 + 16101.3i 0.206717 + 0.636208i
\(863\) 1045.19 759.373i 0.0412266 0.0299529i −0.566981 0.823731i \(-0.691889\pi\)
0.608208 + 0.793778i \(0.291889\pi\)
\(864\) 1983.66 1441.21i 0.0781080 0.0567488i
\(865\) −1001.15 3081.23i −0.0393529 0.121116i
\(866\) −853.830 + 2627.82i −0.0335038 + 0.103114i
\(867\) −801.616 582.408i −0.0314006 0.0228138i
\(868\) −3857.12 −0.150829
\(869\) 0 0
\(870\) 229.531 0.00894464
\(871\) −16056.9 11666.0i −0.624646 0.453832i
\(872\) 11567.7 35601.8i 0.449234 1.38260i
\(873\) −5296.22 16300.1i −0.205326 0.631930i
\(874\) −19613.8 + 14250.3i −0.759093 + 0.551514i
\(875\) −8692.43 + 6315.42i −0.335838 + 0.244000i
\(876\) −92.4536 284.543i −0.00356589 0.0109747i
\(877\) −8288.78 + 25510.3i −0.319147 + 0.982235i 0.654866 + 0.755745i \(0.272725\pi\)
−0.974014 + 0.226490i \(0.927275\pi\)
\(878\) −14183.6 10305.0i −0.545187 0.396102i
\(879\) 3284.73 0.126042
\(880\) 0 0
\(881\) −28515.7 −1.09049 −0.545243 0.838278i \(-0.683563\pi\)
−0.545243 + 0.838278i \(0.683563\pi\)
\(882\) −24229.1 17603.5i −0.924985 0.672041i
\(883\) 12881.8 39646.1i 0.490948 1.51098i −0.332229 0.943199i \(-0.607801\pi\)
0.823177 0.567784i \(-0.192199\pi\)
\(884\) −2258.11 6949.76i −0.0859147 0.264418i
\(885\) 337.278 245.047i 0.0128107 0.00930754i
\(886\) −28023.4 + 20360.2i −1.06260 + 0.772025i
\(887\) −15197.2 46772.3i −0.575280 1.77053i −0.635226 0.772327i \(-0.719093\pi\)
0.0599460 0.998202i \(-0.480907\pi\)
\(888\) 853.463 2626.69i 0.0322526 0.0992634i
\(889\) −15900.4 11552.3i −0.599868 0.435830i
\(890\) −4339.74 −0.163448
\(891\) 0 0
\(892\) 564.085 0.0211737
\(893\) −22878.2 16622.0i −0.857323 0.622882i
\(894\) 144.931 446.052i 0.00542195 0.0166870i
\(895\) −660.311 2032.23i −0.0246612 0.0758993i
\(896\) 16454.6 11955.0i 0.613515 0.445745i
\(897\) 5292.88 3845.50i 0.197017 0.143141i
\(898\) 11668.3 + 35911.5i 0.433605 + 1.33450i
\(899\) −2476.46 + 7621.77i −0.0918740 + 0.282759i
\(900\) 5110.53 + 3713.02i 0.189279 + 0.137519i
\(901\) 20782.5 0.768442
\(902\) 0 0
\(903\) −3151.98 −0.116159
\(904\) 2988.78 + 2171.47i 0.109962 + 0.0798917i
\(905\) −1756.75 + 5406.73i −0.0645265 + 0.198592i
\(906\) −766.969 2360.49i −0.0281246 0.0865585i
\(907\) −42859.9 + 31139.5i −1.56906 + 1.13999i −0.641016 + 0.767528i \(0.721487\pi\)
−0.928047 + 0.372463i \(0.878513\pi\)
\(908\) 8742.01 6351.44i 0.319509 0.232137i
\(909\) 9142.67 + 28138.2i 0.333601 + 1.02672i
\(910\) −2261.86 + 6961.28i −0.0823954 + 0.253587i
\(911\) 25459.6 + 18497.5i 0.925922 + 0.672722i 0.944991 0.327096i \(-0.106070\pi\)
−0.0190689 + 0.999818i \(0.506070\pi\)
\(912\) 1326.37 0.0481584
\(913\) 0 0
\(914\) −17771.6 −0.643143
\(915\) −312.101 226.755i −0.0112762 0.00819265i
\(916\) 3369.15 10369.2i 0.121528 0.374025i
\(917\) −14540.3 44750.4i −0.523623 1.61155i
\(918\) −3176.32 + 2307.73i −0.114198 + 0.0829700i
\(919\) −34675.2 + 25193.0i −1.24465 + 0.904289i −0.997899 0.0647909i \(-0.979362\pi\)
−0.246748 + 0.969080i \(0.579362\pi\)
\(920\) 2070.44 + 6372.16i 0.0741961 + 0.228352i
\(921\) 890.552 2740.84i 0.0318618 0.0980604i
\(922\) 20253.2 + 14714.8i 0.723432 + 0.525604i
\(923\) 26975.6 0.961984
\(924\) 0 0
\(925\) 25836.1 0.918361
\(926\) −20517.0 14906.5i −0.728112 0.529004i
\(927\) 2462.36 7578.37i 0.0872433 0.268507i
\(928\) 2978.99 + 9168.38i 0.105377 + 0.324318i
\(929\) 16963.7 12324.9i 0.599097 0.435270i −0.246461 0.969153i \(-0.579268\pi\)
0.845558 + 0.533883i \(0.179268\pi\)
\(930\) 116.191 84.4178i 0.00409683 0.00297652i
\(931\) 7757.85 + 23876.2i 0.273097 + 0.840506i
\(932\) 1521.25 4681.92i 0.0534658 0.164551i
\(933\) −2630.10 1910.88i −0.0922889 0.0670518i
\(934\) −44410.4 −1.55584
\(935\) 0 0
\(936\) 44741.6 1.56242
\(937\) 13855.9 + 10066.9i 0.483086 + 0.350982i 0.802519 0.596626i \(-0.203493\pi\)
−0.319433 + 0.947609i \(0.603493\pi\)
\(938\) 6235.63 19191.3i 0.217058 0.668036i
\(939\) −536.745 1651.93i −0.0186539 0.0574108i
\(940\) −1227.95 + 892.156i −0.0426077 + 0.0309563i
\(941\) −35613.9 + 25875.0i −1.23377 + 0.896387i −0.997167 0.0752188i \(-0.976034\pi\)
−0.236604 + 0.971606i \(0.576034\pi\)
\(942\) 1020.14 + 3139.68i 0.0352846 + 0.108595i
\(943\) 10575.7 32548.7i 0.365210 1.12400i
\(944\) −18381.0 13354.5i −0.633739 0.460438i
\(945\) −1248.88 −0.0429906
\(946\) 0 0
\(947\) 8692.03 0.298261 0.149130 0.988818i \(-0.452353\pi\)
0.149130 + 0.988818i \(0.452353\pi\)
\(948\) −141.770 103.002i −0.00485706 0.00352886i
\(949\) 6125.64 18852.8i 0.209533 0.644876i
\(950\) 5152.69 + 15858.4i 0.175974 + 0.541593i
\(951\) 2826.46 2053.54i 0.0963766 0.0700217i
\(952\) 30948.0 22485.1i 1.05360 0.765489i
\(953\) −17893.9 55071.8i −0.608228 1.87193i −0.472861 0.881137i \(-0.656779\pi\)
−0.135367 0.990796i \(-0.543221\pi\)
\(954\) −7636.79 + 23503.6i −0.259172 + 0.797650i
\(955\) −4390.03 3189.54i −0.148752 0.108075i
\(956\) −10214.2 −0.345556
\(957\) 0 0
\(958\) 42096.2 1.41969
\(959\) 36691.1 + 26657.6i 1.23547 + 0.897622i
\(960\) 144.660 445.217i 0.00486341 0.0149680i
\(961\) −7656.38 23563.9i −0.257003 0.790974i
\(962\) 28752.1 20889.6i 0.963623 0.700113i
\(963\) 12926.2 9391.41i 0.432544 0.314262i
\(964\) 2469.87 + 7601.48i 0.0825199 + 0.253970i
\(965\) 1236.70 3806.16i 0.0412545 0.126968i
\(966\) 5381.29 + 3909.73i 0.179234 + 0.130221i
\(967\) 56564.3 1.88106 0.940530 0.339711i \(-0.110329\pi\)
0.940530 + 0.339711i \(0.110329\pi\)
\(968\) 0 0
\(969\) 1636.77 0.0542628
\(970\) −1964.46 1427.26i −0.0650257 0.0472440i
\(971\) −9546.98 + 29382.6i −0.315528 + 0.971094i 0.660009 + 0.751258i \(0.270552\pi\)
−0.975537 + 0.219836i \(0.929448\pi\)
\(972\) 688.462 + 2118.87i 0.0227185 + 0.0699205i
\(973\) −24437.4 + 17754.8i −0.805168 + 0.584989i
\(974\) 920.607 668.860i 0.0302856 0.0220038i
\(975\) −1390.48 4279.44i −0.0456727 0.140566i
\(976\) −6496.80 + 19995.1i −0.213071 + 0.655766i
\(977\) 24269.6 + 17632.9i 0.794732 + 0.577406i 0.909364 0.416002i \(-0.136569\pi\)
−0.114632 + 0.993408i \(0.536569\pi\)
\(978\) 2460.14 0.0804361
\(979\) 0 0
\(980\) 1347.46 0.0439216
\(981\) 33068.4 + 24025.6i 1.07624 + 0.781935i
\(982\) −9550.67 + 29393.9i −0.310361 + 0.955192i
\(983\) −7566.56 23287.5i −0.245509 0.755600i −0.995552 0.0942108i \(-0.969967\pi\)
0.750043 0.661389i \(-0.230033\pi\)
\(984\) −2035.67 + 1479.00i −0.0659501 + 0.0479156i
\(985\) 893.657 649.280i 0.0289079 0.0210028i
\(986\) −4770.09 14680.8i −0.154068 0.474171i
\(987\) −2397.56 + 7378.94i −0.0773205 + 0.237968i
\(988\) −5892.92 4281.46i −0.189756 0.137866i
\(989\) −37127.1 −1.19370
\(990\) 0 0
\(991\) −52661.1 −1.68803 −0.844014 0.536321i \(-0.819814\pi\)
−0.844014 + 0.536321i \(0.819814\pi\)
\(992\) 4879.97 + 3545.51i 0.156189 + 0.113478i
\(993\) −973.664 + 2996.63i −0.0311161 + 0.0957655i
\(994\) 8475.15 + 26083.8i 0.270438 + 0.832322i
\(995\) 1286.25 934.514i 0.0409817 0.0297750i
\(996\) −253.577 + 184.234i −0.00806716 + 0.00586113i
\(997\) 16918.2 + 52069.0i 0.537418 + 1.65400i 0.738365 + 0.674401i \(0.235598\pi\)
−0.200947 + 0.979602i \(0.564402\pi\)
\(998\) 13917.0 42832.1i 0.441417 1.35854i
\(999\) 4905.78 + 3564.26i 0.155367 + 0.112881i
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 121.4.c.d.81.2 8
11.2 odd 10 121.4.c.g.27.2 8
11.3 even 5 inner 121.4.c.d.3.2 8
11.4 even 5 inner 121.4.c.d.9.1 8
11.5 even 5 121.4.a.e.1.1 yes 2
11.6 odd 10 121.4.a.b.1.2 2
11.7 odd 10 121.4.c.g.9.2 8
11.8 odd 10 121.4.c.g.3.1 8
11.9 even 5 inner 121.4.c.d.27.1 8
11.10 odd 2 121.4.c.g.81.1 8
33.5 odd 10 1089.4.a.k.1.2 2
33.17 even 10 1089.4.a.x.1.1 2
44.27 odd 10 1936.4.a.y.1.1 2
44.39 even 10 1936.4.a.z.1.1 2
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
121.4.a.b.1.2 2 11.6 odd 10
121.4.a.e.1.1 yes 2 11.5 even 5
121.4.c.d.3.2 8 11.3 even 5 inner
121.4.c.d.9.1 8 11.4 even 5 inner
121.4.c.d.27.1 8 11.9 even 5 inner
121.4.c.d.81.2 8 1.1 even 1 trivial
121.4.c.g.3.1 8 11.8 odd 10
121.4.c.g.9.2 8 11.7 odd 10
121.4.c.g.27.2 8 11.2 odd 10
121.4.c.g.81.1 8 11.10 odd 2
1089.4.a.k.1.2 2 33.5 odd 10
1089.4.a.x.1.1 2 33.17 even 10
1936.4.a.y.1.1 2 44.27 odd 10
1936.4.a.z.1.1 2 44.39 even 10