Properties

Label 210.3.w.a.17.13
Level $210$
Weight $3$
Character 210.17
Analytic conductor $5.722$
Analytic rank $0$
Dimension $64$
CM no
Inner twists $4$

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Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms
 
[N,k,chi] = [210,3,Mod(17,210)]
 
mf = mfinit([N,k,chi],0)
 
lf = mfeigenbasis(mf)
 
from sage.modular.dirichlet import DirichletCharacter
 
H = DirichletGroup(210, base_ring=CyclotomicField(12))
 
chi = DirichletCharacter(H, H._module([6, 3, 2]))
 
N = Newforms(chi, 3, names="a")
 
//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code
 
chi := DirichletCharacter("210.17");
 
S:= CuspForms(chi, 3);
 
N := Newforms(S);
 
Level: \( N \) \(=\) \( 210 = 2 \cdot 3 \cdot 5 \cdot 7 \)
Weight: \( k \) \(=\) \( 3 \)
Character orbit: \([\chi]\) \(=\) 210.w (of order \(12\), degree \(4\), minimal)

Newform invariants

comment: select newform
 
sage: f = N[0] # Warning: the index may be different
 
gp: f = lf[1] \\ Warning: the index may be different
 
Self dual: no
Analytic conductor: \(5.72208555157\)
Analytic rank: \(0\)
Dimension: \(64\)
Relative dimension: \(16\) over \(\Q(\zeta_{12})\)
Twist minimal: yes
Sato-Tate group: $\mathrm{SU}(2)[C_{12}]$

Embedding invariants

Embedding label 17.13
Character \(\chi\) \(=\) 210.17
Dual form 210.3.w.a.173.13

$q$-expansion

comment: q-expansion
 
sage: f.q_expansion() # note that sage often uses an isomorphic number field
 
gp: mfcoefs(f, 20)
 
\(f(q)\) \(=\) \(q+(-1.36603 - 0.366025i) q^{2} +(2.42903 + 1.76063i) q^{3} +(1.73205 + 1.00000i) q^{4} +(-4.98956 + 0.322873i) q^{5} +(-2.67368 - 3.29415i) q^{6} +(-4.85698 - 5.04081i) q^{7} +(-2.00000 - 2.00000i) q^{8} +(2.80035 + 8.55325i) q^{9} +O(q^{10})\) \(q+(-1.36603 - 0.366025i) q^{2} +(2.42903 + 1.76063i) q^{3} +(1.73205 + 1.00000i) q^{4} +(-4.98956 + 0.322873i) q^{5} +(-2.67368 - 3.29415i) q^{6} +(-4.85698 - 5.04081i) q^{7} +(-2.00000 - 2.00000i) q^{8} +(2.80035 + 8.55325i) q^{9} +(6.93405 + 1.38525i) q^{10} +(-17.0019 - 9.81605i) q^{11} +(2.44657 + 5.47853i) q^{12} +(-7.73283 - 7.73283i) q^{13} +(4.78970 + 8.66365i) q^{14} +(-12.6883 - 8.00052i) q^{15} +(2.00000 + 3.46410i) q^{16} +(12.2729 - 3.28852i) q^{17} +(-0.694649 - 12.7090i) q^{18} +(0.306444 + 0.530777i) q^{19} +(-8.96505 - 4.43033i) q^{20} +(-2.92274 - 20.7956i) q^{21} +(19.6321 + 19.6321i) q^{22} +(3.26736 - 12.1940i) q^{23} +(-1.33679 - 8.37932i) q^{24} +(24.7915 - 3.22199i) q^{25} +(7.73283 + 13.3937i) q^{26} +(-8.25698 + 25.7065i) q^{27} +(-3.37173 - 13.5879i) q^{28} -29.8506 q^{29} +(14.4041 + 15.5731i) q^{30} +(-17.4831 - 10.0939i) q^{31} +(-1.46410 - 5.46410i) q^{32} +(-24.0156 - 53.7776i) q^{33} -17.9688 q^{34} +(25.8618 + 23.5832i) q^{35} +(-3.70289 + 17.6150i) q^{36} +(-3.54563 + 13.2325i) q^{37} +(-0.224333 - 0.837221i) q^{38} +(-5.16860 - 32.3979i) q^{39} +(10.6249 + 9.33338i) q^{40} -75.0186 q^{41} +(-3.61918 + 29.4771i) q^{42} +(-46.7727 + 46.7727i) q^{43} +(-19.6321 - 34.0038i) q^{44} +(-16.7342 - 41.7728i) q^{45} +(-8.92659 + 15.4613i) q^{46} +(13.4679 - 50.2630i) q^{47} +(-1.24095 + 11.9357i) q^{48} +(-1.81945 + 48.9662i) q^{49} +(-35.0452 - 4.67300i) q^{50} +(35.6011 + 13.6202i) q^{51} +(-5.66082 - 21.1265i) q^{52} +(64.3636 - 17.2462i) q^{53} +(20.6885 - 32.0934i) q^{54} +(88.0014 + 43.4884i) q^{55} +(-0.367649 + 19.7956i) q^{56} +(-0.190141 + 1.82881i) q^{57} +(40.7767 + 10.9261i) q^{58} +(64.0605 + 36.9854i) q^{59} +(-13.9762 - 26.5456i) q^{60} +(-19.2793 + 11.1309i) q^{61} +(20.1878 + 20.1878i) q^{62} +(29.5140 - 55.6590i) q^{63} +8.00000i q^{64} +(41.0802 + 36.0867i) q^{65} +(13.1220 + 82.2519i) q^{66} +(8.82719 - 2.36524i) q^{67} +(24.5458 + 6.57703i) q^{68} +(29.4056 - 23.8668i) q^{69} +(-26.6958 - 41.6814i) q^{70} +4.20881i q^{71} +(11.5058 - 22.7072i) q^{72} +(22.9693 - 6.15460i) q^{73} +(9.68684 - 16.7781i) q^{74} +(65.8920 + 35.8224i) q^{75} +1.22578i q^{76} +(33.0971 + 133.380i) q^{77} +(-4.79803 + 46.1482i) q^{78} +(-67.0631 + 38.7189i) q^{79} +(-11.0976 - 16.6386i) q^{80} +(-65.3160 + 47.9042i) q^{81} +(102.477 + 27.4587i) q^{82} +(41.1330 - 41.1330i) q^{83} +(15.7333 - 38.9418i) q^{84} +(-60.1747 + 20.3709i) q^{85} +(81.0127 - 46.7727i) q^{86} +(-72.5080 - 52.5559i) q^{87} +(14.3717 + 53.6359i) q^{88} +(-1.42979 + 0.825490i) q^{89} +(7.56938 + 63.1879i) q^{90} +(-1.42148 + 76.5379i) q^{91} +(17.8532 - 17.8532i) q^{92} +(-24.6954 - 55.2997i) q^{93} +(-36.7950 + 63.7309i) q^{94} +(-1.70040 - 2.54940i) q^{95} +(6.06393 - 15.8502i) q^{96} +(92.5224 - 92.5224i) q^{97} +(20.4083 - 66.2231i) q^{98} +(36.3478 - 172.910i) q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\) \(=\) \( 64 q - 32 q^{2} - 6 q^{3} - 12 q^{5} + 4 q^{7} - 128 q^{8} - 16 q^{9}+O(q^{10}) \) Copy content Toggle raw display \( 64 q - 32 q^{2} - 6 q^{3} - 12 q^{5} + 4 q^{7} - 128 q^{8} - 16 q^{9} + 24 q^{10} + 12 q^{12} - 16 q^{14} - 44 q^{15} + 128 q^{16} - 20 q^{18} + 36 q^{21} + 16 q^{22} - 12 q^{23} - 16 q^{25} + 8 q^{28} - 112 q^{29} + 26 q^{30} + 128 q^{32} + 30 q^{33} + 16 q^{36} - 32 q^{37} + 24 q^{38} + 64 q^{39} - 136 q^{42} + 32 q^{43} - 16 q^{44} - 114 q^{45} - 24 q^{46} - 96 q^{47} + 40 q^{50} - 84 q^{51} + 56 q^{53} - 72 q^{54} - 316 q^{57} + 56 q^{58} + 672 q^{59} + 8 q^{60} + 600 q^{61} - 210 q^{63} + 28 q^{65} + 16 q^{67} + 24 q^{72} - 624 q^{73} - 64 q^{74} + 48 q^{75} + 208 q^{77} - 8 q^{78} - 48 q^{80} - 64 q^{81} - 192 q^{82} + 160 q^{84} - 152 q^{85} + 60 q^{87} - 16 q^{88} + 144 q^{89} - 232 q^{91} + 48 q^{92} - 170 q^{93} + 136 q^{95} - 48 q^{96} + 128 q^{98} + 160 q^{99}+O(q^{100}) \) Copy content Toggle raw display

Character values

We give the values of \(\chi\) on generators for \(\left(\mathbb{Z}/210\mathbb{Z}\right)^\times\).

\(n\) \(31\) \(71\) \(127\)
\(\chi(n)\) \(e\left(\frac{1}{6}\right)\) \(-1\) \(e\left(\frac{1}{4}\right)\)

Coefficient data

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



Display \(a_p\) with \(p\) up to: 50 250 1000 (See \(a_n\) instead) (See \(a_n\) instead) (See \(a_n\) instead) Display \(a_n\) with \(n\) up to: 50 250 1000 (See only \(a_p\)) (See only \(a_p\)) (See only \(a_p\))
Significant digits:
\(n\) \(a_n\) \(a_n / n^{(k-1)/2}\) \( \alpha_n \) \( \theta_n \)
\(p\) \(a_p\) \(a_p / p^{(k-1)/2}\) \( \alpha_p\) \( \theta_p \)
\(2\) −1.36603 0.366025i −0.683013 0.183013i
\(3\) 2.42903 + 1.76063i 0.809676 + 0.586877i
\(4\) 1.73205 + 1.00000i 0.433013 + 0.250000i
\(5\) −4.98956 + 0.322873i −0.997913 + 0.0645746i
\(6\) −2.67368 3.29415i −0.445613 0.549026i
\(7\) −4.85698 5.04081i −0.693855 0.720115i
\(8\) −2.00000 2.00000i −0.250000 0.250000i
\(9\) 2.80035 + 8.55325i 0.311150 + 0.950361i
\(10\) 6.93405 + 1.38525i 0.693405 + 0.138525i
\(11\) −17.0019 9.81605i −1.54563 0.892369i −0.998468 0.0553407i \(-0.982375\pi\)
−0.547160 0.837028i \(-0.684291\pi\)
\(12\) 2.44657 + 5.47853i 0.203881 + 0.456544i
\(13\) −7.73283 7.73283i −0.594833 0.594833i 0.344100 0.938933i \(-0.388184\pi\)
−0.938933 + 0.344100i \(0.888184\pi\)
\(14\) 4.78970 + 8.66365i 0.342121 + 0.618832i
\(15\) −12.6883 8.00052i −0.845883 0.533368i
\(16\) 2.00000 + 3.46410i 0.125000 + 0.216506i
\(17\) 12.2729 3.28852i 0.721936 0.193442i 0.120901 0.992665i \(-0.461422\pi\)
0.601035 + 0.799223i \(0.294755\pi\)
\(18\) −0.694649 12.7090i −0.0385916 0.706053i
\(19\) 0.306444 + 0.530777i 0.0161286 + 0.0279356i 0.873977 0.485967i \(-0.161533\pi\)
−0.857848 + 0.513903i \(0.828199\pi\)
\(20\) −8.96505 4.43033i −0.448253 0.221517i
\(21\) −2.92274 20.7956i −0.139178 0.990267i
\(22\) 19.6321 + 19.6321i 0.892369 + 0.892369i
\(23\) 3.26736 12.1940i 0.142059 0.530172i −0.857810 0.513968i \(-0.828175\pi\)
0.999869 0.0162043i \(-0.00515821\pi\)
\(24\) −1.33679 8.37932i −0.0556997 0.349138i
\(25\) 24.7915 3.22199i 0.991660 0.128880i
\(26\) 7.73283 + 13.3937i 0.297416 + 0.515140i
\(27\) −8.25698 + 25.7065i −0.305814 + 0.952091i
\(28\) −3.37173 13.5879i −0.120419 0.485283i
\(29\) −29.8506 −1.02933 −0.514666 0.857391i \(-0.672084\pi\)
−0.514666 + 0.857391i \(0.672084\pi\)
\(30\) 14.4041 + 15.5731i 0.480136 + 0.519104i
\(31\) −17.4831 10.0939i −0.563972 0.325610i 0.190766 0.981636i \(-0.438903\pi\)
−0.754738 + 0.656026i \(0.772236\pi\)
\(32\) −1.46410 5.46410i −0.0457532 0.170753i
\(33\) −24.0156 53.7776i −0.727747 1.62962i
\(34\) −17.9688 −0.528494
\(35\) 25.8618 + 23.5832i 0.738908 + 0.673807i
\(36\) −3.70289 + 17.6150i −0.102858 + 0.489306i
\(37\) −3.54563 + 13.2325i −0.0958278 + 0.357634i −0.997144 0.0755282i \(-0.975936\pi\)
0.901316 + 0.433162i \(0.142602\pi\)
\(38\) −0.224333 0.837221i −0.00590349 0.0220321i
\(39\) −5.16860 32.3979i −0.132528 0.830716i
\(40\) 10.6249 + 9.33338i 0.265622 + 0.233335i
\(41\) −75.0186 −1.82972 −0.914861 0.403768i \(-0.867700\pi\)
−0.914861 + 0.403768i \(0.867700\pi\)
\(42\) −3.61918 + 29.4771i −0.0861710 + 0.701837i
\(43\) −46.7727 + 46.7727i −1.08774 + 1.08774i −0.0919759 + 0.995761i \(0.529318\pi\)
−0.995761 + 0.0919759i \(0.970682\pi\)
\(44\) −19.6321 34.0038i −0.446184 0.772814i
\(45\) −16.7342 41.7728i −0.371870 0.928285i
\(46\) −8.92659 + 15.4613i −0.194056 + 0.336116i
\(47\) 13.4679 50.2630i 0.286552 1.06942i −0.661147 0.750257i \(-0.729930\pi\)
0.947698 0.319168i \(-0.103403\pi\)
\(48\) −1.24095 + 11.9357i −0.0258531 + 0.248660i
\(49\) −1.81945 + 48.9662i −0.0371317 + 0.999310i
\(50\) −35.0452 4.67300i −0.700903 0.0934600i
\(51\) 35.6011 + 13.6202i 0.698061 + 0.267062i
\(52\) −5.66082 21.1265i −0.108862 0.406278i
\(53\) 64.3636 17.2462i 1.21441 0.325400i 0.405918 0.913909i \(-0.366952\pi\)
0.808490 + 0.588510i \(0.200285\pi\)
\(54\) 20.6885 32.0934i 0.383120 0.594323i
\(55\) 88.0014 + 43.4884i 1.60003 + 0.790698i
\(56\) −0.367649 + 19.7956i −0.00656516 + 0.353492i
\(57\) −0.190141 + 1.82881i −0.00333580 + 0.0320843i
\(58\) 40.7767 + 10.9261i 0.703047 + 0.188381i
\(59\) 64.0605 + 36.9854i 1.08577 + 0.626871i 0.932448 0.361305i \(-0.117669\pi\)
0.153324 + 0.988176i \(0.451002\pi\)
\(60\) −13.9762 26.5456i −0.232936 0.442426i
\(61\) −19.2793 + 11.1309i −0.316055 + 0.182474i −0.649633 0.760248i \(-0.725077\pi\)
0.333578 + 0.942723i \(0.391744\pi\)
\(62\) 20.1878 + 20.1878i 0.325610 + 0.325610i
\(63\) 29.5140 55.6590i 0.468476 0.883476i
\(64\) 8.00000i 0.125000i
\(65\) 41.0802 + 36.0867i 0.632003 + 0.555180i
\(66\) 13.1220 + 82.2519i 0.198819 + 1.24624i
\(67\) 8.82719 2.36524i 0.131749 0.0353021i −0.192342 0.981328i \(-0.561608\pi\)
0.324091 + 0.946026i \(0.394942\pi\)
\(68\) 24.5458 + 6.57703i 0.360968 + 0.0967210i
\(69\) 29.4056 23.8668i 0.426168 0.345896i
\(70\) −26.6958 41.6814i −0.381368 0.595448i
\(71\) 4.20881i 0.0592790i 0.999561 + 0.0296395i \(0.00943592\pi\)
−0.999561 + 0.0296395i \(0.990564\pi\)
\(72\) 11.5058 22.7072i 0.159803 0.315378i
\(73\) 22.9693 6.15460i 0.314648 0.0843096i −0.0980391 0.995183i \(-0.531257\pi\)
0.412687 + 0.910873i \(0.364590\pi\)
\(74\) 9.68684 16.7781i 0.130903 0.226731i
\(75\) 65.8920 + 35.8224i 0.878560 + 0.477632i
\(76\) 1.22578i 0.0161286i
\(77\) 33.0971 + 133.380i 0.429833 + 1.73220i
\(78\) −4.79803 + 46.1482i −0.0615132 + 0.591644i
\(79\) −67.0631 + 38.7189i −0.848900 + 0.490113i −0.860280 0.509822i \(-0.829711\pi\)
0.0113794 + 0.999935i \(0.496378\pi\)
\(80\) −11.0976 16.6386i −0.138720 0.207983i
\(81\) −65.3160 + 47.9042i −0.806371 + 0.591410i
\(82\) 102.477 + 27.4587i 1.24972 + 0.334863i
\(83\) 41.1330 41.1330i 0.495579 0.495579i −0.414480 0.910059i \(-0.636036\pi\)
0.910059 + 0.414480i \(0.136036\pi\)
\(84\) 15.7333 38.9418i 0.187301 0.463593i
\(85\) −60.1747 + 20.3709i −0.707938 + 0.239657i
\(86\) 81.0127 46.7727i 0.942008 0.543869i
\(87\) −72.5080 52.5559i −0.833425 0.604091i
\(88\) 14.3717 + 53.6359i 0.163315 + 0.609499i
\(89\) −1.42979 + 0.825490i −0.0160651 + 0.00927517i −0.508011 0.861351i \(-0.669619\pi\)
0.491946 + 0.870626i \(0.336286\pi\)
\(90\) 7.56938 + 63.1879i 0.0841042 + 0.702087i
\(91\) −1.42148 + 76.5379i −0.0156207 + 0.841076i
\(92\) 17.8532 17.8532i 0.194056 0.194056i
\(93\) −24.6954 55.2997i −0.265542 0.594621i
\(94\) −36.7950 + 63.7309i −0.391437 + 0.677988i
\(95\) −1.70040 2.54940i −0.0178989 0.0268358i
\(96\) 6.06393 15.8502i 0.0631659 0.165106i
\(97\) 92.5224 92.5224i 0.953839 0.953839i −0.0451414 0.998981i \(-0.514374\pi\)
0.998981 + 0.0451414i \(0.0143738\pi\)
\(98\) 20.4083 66.2231i 0.208248 0.675746i
\(99\) 36.3478 172.910i 0.367149 1.74656i
\(100\) 46.1621 + 19.2109i 0.461621 + 0.192109i
\(101\) −51.1520 + 88.5979i −0.506456 + 0.877207i 0.493516 + 0.869737i \(0.335711\pi\)
−0.999972 + 0.00747054i \(0.997622\pi\)
\(102\) −43.6467 31.6364i −0.427909 0.310161i
\(103\) 37.9157 141.503i 0.368114 1.37382i −0.495036 0.868872i \(-0.664845\pi\)
0.863150 0.504947i \(-0.168488\pi\)
\(104\) 30.9313i 0.297416i
\(105\) 21.2976 + 102.817i 0.202834 + 0.979213i
\(106\) −94.2349 −0.889009
\(107\) −58.5462 15.6874i −0.547160 0.146611i −0.0253594 0.999678i \(-0.508073\pi\)
−0.521801 + 0.853067i \(0.674740\pi\)
\(108\) −40.0080 + 36.2679i −0.370444 + 0.335814i
\(109\) 24.8552 + 14.3502i 0.228029 + 0.131653i 0.609663 0.792661i \(-0.291305\pi\)
−0.381633 + 0.924314i \(0.624638\pi\)
\(110\) −104.294 91.6170i −0.948130 0.832882i
\(111\) −31.9099 + 25.8995i −0.287477 + 0.233329i
\(112\) 7.74790 26.9067i 0.0691777 0.240238i
\(113\) 14.6106 + 14.6106i 0.129297 + 0.129297i 0.768794 0.639497i \(-0.220857\pi\)
−0.639497 + 0.768794i \(0.720857\pi\)
\(114\) 0.929127 2.42860i 0.00815023 0.0213035i
\(115\) −12.3656 + 61.8975i −0.107527 + 0.538239i
\(116\) −51.7028 29.8506i −0.445714 0.257333i
\(117\) 44.4861 87.7954i 0.380223 0.750388i
\(118\) −73.9707 73.9707i −0.626871 0.626871i
\(119\) −76.1861 45.8931i −0.640219 0.385656i
\(120\) 9.37547 + 41.3775i 0.0781289 + 0.344813i
\(121\) 132.210 + 228.994i 1.09264 + 1.89251i
\(122\) 30.4103 8.14841i 0.249265 0.0667902i
\(123\) −182.222 132.080i −1.48148 1.07382i
\(124\) −20.1878 34.9663i −0.162805 0.281986i
\(125\) −122.659 + 24.0808i −0.981268 + 0.192647i
\(126\) −60.6895 + 65.2287i −0.481662 + 0.517688i
\(127\) −8.36779 8.36779i −0.0658881 0.0658881i 0.673395 0.739283i \(-0.264835\pi\)
−0.739283 + 0.673395i \(0.764835\pi\)
\(128\) 2.92820 10.9282i 0.0228766 0.0853766i
\(129\) −195.962 + 31.2627i −1.51908 + 0.242347i
\(130\) −42.9079 64.3318i −0.330061 0.494860i
\(131\) −84.5571 146.457i −0.645474 1.11799i −0.984192 0.177105i \(-0.943327\pi\)
0.338718 0.940888i \(-0.390007\pi\)
\(132\) 12.1812 117.161i 0.0922821 0.887584i
\(133\) 1.18715 4.12270i 0.00892593 0.0309977i
\(134\) −12.9239 −0.0964471
\(135\) 32.8988 130.930i 0.243695 0.969852i
\(136\) −31.1228 17.9688i −0.228844 0.132123i
\(137\) 64.7708 + 241.728i 0.472780 + 1.76444i 0.629713 + 0.776828i \(0.283173\pi\)
−0.156933 + 0.987609i \(0.550161\pi\)
\(138\) −48.9046 + 21.8395i −0.354381 + 0.158257i
\(139\) −229.593 −1.65175 −0.825875 0.563853i \(-0.809318\pi\)
−0.825875 + 0.563853i \(0.809318\pi\)
\(140\) 21.2107 + 66.7091i 0.151505 + 0.476494i
\(141\) 121.209 98.3781i 0.859635 0.697717i
\(142\) 1.54053 5.74934i 0.0108488 0.0404883i
\(143\) 55.5670 + 207.379i 0.388580 + 1.45020i
\(144\) −24.0286 + 26.8072i −0.166865 + 0.186161i
\(145\) 148.942 9.63796i 1.02718 0.0664687i
\(146\) −33.6294 −0.230338
\(147\) −90.6310 + 115.737i −0.616537 + 0.787326i
\(148\) −19.3737 + 19.3737i −0.130903 + 0.130903i
\(149\) 42.3960 + 73.4319i 0.284537 + 0.492832i 0.972497 0.232917i \(-0.0748269\pi\)
−0.687960 + 0.725749i \(0.741494\pi\)
\(150\) −76.8982 73.0524i −0.512655 0.487016i
\(151\) 139.651 241.882i 0.924838 1.60187i 0.133017 0.991114i \(-0.457533\pi\)
0.791821 0.610753i \(-0.209133\pi\)
\(152\) 0.448665 1.67444i 0.00295174 0.0110161i
\(153\) 62.4960 + 95.7642i 0.408470 + 0.625910i
\(154\) 3.60886 194.314i 0.0234342 1.26178i
\(155\) 90.4923 + 44.7193i 0.583821 + 0.288512i
\(156\) 23.4456 61.2834i 0.150293 0.392843i
\(157\) −66.9415 249.829i −0.426379 1.59127i −0.760894 0.648877i \(-0.775239\pi\)
0.334515 0.942390i \(-0.391428\pi\)
\(158\) 105.782 28.3442i 0.669507 0.179394i
\(159\) 186.705 + 71.4292i 1.17425 + 0.449240i
\(160\) 9.06944 + 26.7908i 0.0566840 + 0.167442i
\(161\) −77.3369 + 42.7557i −0.480353 + 0.265563i
\(162\) 106.758 41.5311i 0.658997 0.256365i
\(163\) 18.3932 + 4.92845i 0.112842 + 0.0302359i 0.314798 0.949159i \(-0.398063\pi\)
−0.201956 + 0.979395i \(0.564730\pi\)
\(164\) −129.936 75.0186i −0.792293 0.457431i
\(165\) 137.191 + 260.573i 0.831460 + 1.57923i
\(166\) −71.2445 + 41.1330i −0.429184 + 0.247789i
\(167\) −72.3691 72.3691i −0.433348 0.433348i 0.456418 0.889766i \(-0.349132\pi\)
−0.889766 + 0.456418i \(0.849132\pi\)
\(168\) −35.7457 + 47.4367i −0.212772 + 0.282361i
\(169\) 49.4067i 0.292348i
\(170\) 89.6564 5.80164i 0.527391 0.0341273i
\(171\) −3.68171 + 4.10745i −0.0215305 + 0.0240202i
\(172\) −127.785 + 34.2400i −0.742938 + 0.199070i
\(173\) −160.959 43.1289i −0.930401 0.249300i −0.238375 0.971173i \(-0.576615\pi\)
−0.692026 + 0.721873i \(0.743282\pi\)
\(174\) 79.8109 + 98.3325i 0.458684 + 0.565129i
\(175\) −136.653 109.320i −0.780876 0.624686i
\(176\) 78.5284i 0.446184i
\(177\) 90.4872 + 202.625i 0.511227 + 1.14478i
\(178\) 2.25528 0.604300i 0.0126701 0.00339495i
\(179\) 35.9900 62.3366i 0.201062 0.348249i −0.747809 0.663914i \(-0.768894\pi\)
0.948871 + 0.315665i \(0.102228\pi\)
\(180\) 12.7884 89.0868i 0.0710467 0.494927i
\(181\) 134.777i 0.744624i −0.928108 0.372312i \(-0.878565\pi\)
0.928108 0.372312i \(-0.121435\pi\)
\(182\) 29.9566 104.032i 0.164597 0.571607i
\(183\) −66.4275 6.90647i −0.362992 0.0377403i
\(184\) −30.9226 + 17.8532i −0.168058 + 0.0970282i
\(185\) 13.4187 67.1690i 0.0725337 0.363076i
\(186\) 13.4934 + 84.5800i 0.0725454 + 0.454731i
\(187\) −240.943 64.5605i −1.28847 0.345243i
\(188\) 73.5901 73.5901i 0.391437 0.391437i
\(189\) 169.685 83.2340i 0.897806 0.440392i
\(190\) 1.38964 + 4.10493i 0.00731388 + 0.0216049i
\(191\) 161.123 93.0244i 0.843575 0.487038i −0.0149025 0.999889i \(-0.504744\pi\)
0.858478 + 0.512850i \(0.171410\pi\)
\(192\) −14.0851 + 19.4322i −0.0733596 + 0.101209i
\(193\) 34.2952 + 127.992i 0.177696 + 0.663169i 0.996077 + 0.0884931i \(0.0282051\pi\)
−0.818381 + 0.574676i \(0.805128\pi\)
\(194\) −160.253 + 92.5224i −0.826049 + 0.476920i
\(195\) 36.2495 + 159.983i 0.185895 + 0.820424i
\(196\) −52.1176 + 82.9925i −0.265906 + 0.423431i
\(197\) −193.225 + 193.225i −0.980838 + 0.980838i −0.999820 0.0189815i \(-0.993958\pi\)
0.0189815 + 0.999820i \(0.493958\pi\)
\(198\) −112.941 + 222.895i −0.570411 + 1.12573i
\(199\) 65.1380 112.822i 0.327326 0.566946i −0.654654 0.755929i \(-0.727186\pi\)
0.981980 + 0.188983i \(0.0605190\pi\)
\(200\) −56.0270 43.1390i −0.280135 0.215695i
\(201\) 25.6058 + 9.79620i 0.127392 + 0.0487373i
\(202\) 102.304 102.304i 0.506456 0.506456i
\(203\) 144.984 + 150.471i 0.714206 + 0.741237i
\(204\) 48.0427 + 59.1919i 0.235504 + 0.290156i
\(205\) 374.310 24.2215i 1.82590 0.118154i
\(206\) −103.588 + 179.419i −0.502853 + 0.870967i
\(207\) 113.448 6.20085i 0.548056 0.0299558i
\(208\) 11.3216 42.2530i 0.0544310 0.203139i
\(209\) 12.0323i 0.0575707i
\(210\) 8.54077 148.247i 0.0406703 0.705936i
\(211\) 134.658 0.638191 0.319095 0.947723i \(-0.396621\pi\)
0.319095 + 0.947723i \(0.396621\pi\)
\(212\) 128.727 + 34.4924i 0.607204 + 0.162700i
\(213\) −7.41016 + 10.2233i −0.0347895 + 0.0479968i
\(214\) 74.2336 + 42.8588i 0.346886 + 0.200275i
\(215\) 218.274 248.477i 1.01523 1.15571i
\(216\) 67.9269 34.8990i 0.314476 0.161569i
\(217\) 34.0339 + 137.155i 0.156838 + 0.632051i
\(218\) −28.7003 28.7003i −0.131653 0.131653i
\(219\) 66.6290 + 25.4907i 0.304242 + 0.116396i
\(220\) 108.935 + 163.326i 0.495157 + 0.742389i
\(221\) −120.334 69.4748i −0.544497 0.314365i
\(222\) 53.0696 23.6995i 0.239052 0.106755i
\(223\) −247.996 247.996i −1.11209 1.11209i −0.992867 0.119223i \(-0.961960\pi\)
−0.119223 0.992867i \(-0.538040\pi\)
\(224\) −20.4324 + 33.9193i −0.0912159 + 0.151425i
\(225\) 96.9835 + 203.025i 0.431038 + 0.902334i
\(226\) −14.6106 25.3063i −0.0646486 0.111975i
\(227\) −71.7681 + 19.2302i −0.316159 + 0.0847146i −0.413409 0.910545i \(-0.635662\pi\)
0.0972500 + 0.995260i \(0.468995\pi\)
\(228\) −2.15814 + 2.97744i −0.00946552 + 0.0130590i
\(229\) 34.0586 + 58.9912i 0.148727 + 0.257603i 0.930757 0.365637i \(-0.119149\pi\)
−0.782030 + 0.623241i \(0.785816\pi\)
\(230\) 39.5478 80.0274i 0.171947 0.347945i
\(231\) −154.439 + 382.255i −0.668566 + 1.65478i
\(232\) 59.7012 + 59.7012i 0.257333 + 0.257333i
\(233\) 67.0823 250.355i 0.287907 1.07448i −0.658782 0.752334i \(-0.728928\pi\)
0.946689 0.322150i \(-0.104405\pi\)
\(234\) −92.9045 + 103.648i −0.397028 + 0.442939i
\(235\) −50.9705 + 255.139i −0.216896 + 1.08570i
\(236\) 73.9707 + 128.121i 0.313435 + 0.542886i
\(237\) −231.068 24.0241i −0.974970 0.101368i
\(238\) 87.2741 + 90.5772i 0.366698 + 0.380576i
\(239\) 33.1697 0.138785 0.0693927 0.997589i \(-0.477894\pi\)
0.0693927 + 0.997589i \(0.477894\pi\)
\(240\) 2.33810 59.9544i 0.00974207 0.249810i
\(241\) −246.276 142.188i −1.02189 0.589990i −0.107242 0.994233i \(-0.534202\pi\)
−0.914652 + 0.404243i \(0.867535\pi\)
\(242\) −96.7843 361.204i −0.399935 1.49258i
\(243\) −242.996 + 1.36326i −0.999984 + 0.00561011i
\(244\) −44.5237 −0.182474
\(245\) −6.73158 244.908i −0.0274759 0.999622i
\(246\) 200.576 + 247.123i 0.815348 + 1.00456i
\(247\) 1.73473 6.47408i 0.00702318 0.0262109i
\(248\) 14.7785 + 55.1541i 0.0595907 + 0.222395i
\(249\) 172.333 27.4932i 0.692102 0.110414i
\(250\) 176.369 + 12.0011i 0.705475 + 0.0480043i
\(251\) 134.588 0.536205 0.268103 0.963390i \(-0.413603\pi\)
0.268103 + 0.963390i \(0.413603\pi\)
\(252\) 106.779 66.8902i 0.423725 0.265437i
\(253\) −175.248 + 175.248i −0.692679 + 0.692679i
\(254\) 8.36779 + 14.4934i 0.0329441 + 0.0570608i
\(255\) −182.032 56.4641i −0.713849 0.221428i
\(256\) −8.00000 + 13.8564i −0.0312500 + 0.0541266i
\(257\) −32.7685 + 122.294i −0.127504 + 0.475852i −0.999917 0.0129187i \(-0.995888\pi\)
0.872412 + 0.488770i \(0.162554\pi\)
\(258\) 279.132 + 29.0213i 1.08191 + 0.112486i
\(259\) 83.9234 46.3970i 0.324028 0.179139i
\(260\) 35.0662 + 103.584i 0.134870 + 0.398401i
\(261\) −83.5923 255.320i −0.320277 0.978236i
\(262\) 61.9001 + 231.014i 0.236260 + 0.881733i
\(263\) 77.5522 20.7801i 0.294875 0.0790116i −0.108348 0.994113i \(-0.534556\pi\)
0.403224 + 0.915101i \(0.367890\pi\)
\(264\) −59.5238 + 155.586i −0.225469 + 0.589343i
\(265\) −315.578 + 106.832i −1.19086 + 0.403141i
\(266\) −3.13069 + 5.19718i −0.0117695 + 0.0195383i
\(267\) −4.92638 0.512196i −0.0184509 0.00191834i
\(268\) 17.6544 + 4.73048i 0.0658746 + 0.0176510i
\(269\) 160.113 + 92.4410i 0.595214 + 0.343647i 0.767156 0.641460i \(-0.221671\pi\)
−0.171943 + 0.985107i \(0.555004\pi\)
\(270\) −92.8643 + 166.812i −0.343942 + 0.617822i
\(271\) −166.881 + 96.3488i −0.615797 + 0.355531i −0.775231 0.631678i \(-0.782367\pi\)
0.159434 + 0.987209i \(0.449033\pi\)
\(272\) 35.9376 + 35.9376i 0.132123 + 0.132123i
\(273\) −138.208 + 183.410i −0.506256 + 0.671831i
\(274\) 353.914i 1.29166i
\(275\) −453.130 188.575i −1.64775 0.685726i
\(276\) 74.7988 11.9330i 0.271010 0.0432355i
\(277\) −422.843 + 113.301i −1.52651 + 0.409027i −0.921879 0.387478i \(-0.873346\pi\)
−0.604631 + 0.796505i \(0.706680\pi\)
\(278\) 313.630 + 84.0370i 1.12817 + 0.302291i
\(279\) 37.3766 177.804i 0.133966 0.637291i
\(280\) −4.55705 98.8900i −0.0162752 0.353179i
\(281\) 221.523i 0.788340i −0.919038 0.394170i \(-0.871032\pi\)
0.919038 0.394170i \(-0.128968\pi\)
\(282\) −201.583 + 90.0216i −0.714833 + 0.319226i
\(283\) 383.117 102.656i 1.35377 0.362741i 0.492245 0.870457i \(-0.336177\pi\)
0.861525 + 0.507715i \(0.169510\pi\)
\(284\) −4.20881 + 7.28987i −0.0148197 + 0.0256685i
\(285\) 0.358248 9.18634i 0.00125701 0.0322328i
\(286\) 303.623i 1.06162i
\(287\) 364.364 + 378.154i 1.26956 + 1.31761i
\(288\) 42.6358 27.8242i 0.148041 0.0966119i
\(289\) −110.471 + 63.7807i −0.382254 + 0.220694i
\(290\) −206.986 41.3507i −0.713744 0.142589i
\(291\) 387.637 61.8417i 1.33209 0.212514i
\(292\) 45.9386 + 12.3092i 0.157324 + 0.0421548i
\(293\) 156.018 156.018i 0.532484 0.532484i −0.388827 0.921311i \(-0.627120\pi\)
0.921311 + 0.388827i \(0.127120\pi\)
\(294\) 166.167 124.926i 0.565193 0.424919i
\(295\) −331.576 163.857i −1.12399 0.555449i
\(296\) 33.5562 19.3737i 0.113366 0.0654516i
\(297\) 392.720 356.008i 1.32229 1.19868i
\(298\) −31.0360 115.828i −0.104148 0.388684i
\(299\) −119.560 + 69.0278i −0.399865 + 0.230862i
\(300\) 78.3059 + 127.938i 0.261020 + 0.426461i
\(301\) 462.946 + 8.59796i 1.53803 + 0.0285647i
\(302\) −279.301 + 279.301i −0.924838 + 0.924838i
\(303\) −280.238 + 125.147i −0.924878 + 0.413026i
\(304\) −1.22578 + 2.12311i −0.00403216 + 0.00698390i
\(305\) 92.6016 61.7633i 0.303612 0.202503i
\(306\) −50.3190 153.691i −0.164441 0.502260i
\(307\) −47.9690 + 47.9690i −0.156251 + 0.156251i −0.780903 0.624652i \(-0.785241\pi\)
0.624652 + 0.780903i \(0.285241\pi\)
\(308\) −76.0538 + 264.118i −0.246928 + 0.857525i
\(309\) 341.234 276.960i 1.10432 0.896311i
\(310\) −107.246 94.2102i −0.345956 0.303904i
\(311\) 217.116 376.057i 0.698124 1.20919i −0.270993 0.962581i \(-0.587352\pi\)
0.969116 0.246604i \(-0.0793147\pi\)
\(312\) −54.4586 + 75.1330i −0.174547 + 0.240811i
\(313\) −65.8692 + 245.827i −0.210445 + 0.785390i 0.777276 + 0.629160i \(0.216601\pi\)
−0.987721 + 0.156230i \(0.950066\pi\)
\(314\) 365.775i 1.16489i
\(315\) −129.291 + 287.243i −0.410448 + 0.911884i
\(316\) −154.876 −0.490113
\(317\) −121.640 32.5934i −0.383723 0.102818i 0.0618007 0.998089i \(-0.480316\pi\)
−0.445523 + 0.895270i \(0.646982\pi\)
\(318\) −228.899 165.913i −0.719809 0.521739i
\(319\) 507.517 + 293.015i 1.59096 + 0.918543i
\(320\) −2.58298 39.9165i −0.00807183 0.124739i
\(321\) −114.591 141.183i −0.356980 0.439824i
\(322\) 121.294 30.0981i 0.376689 0.0934723i
\(323\) 5.50643 + 5.50643i 0.0170478 + 0.0170478i
\(324\) −161.035 + 17.6565i −0.497021 + 0.0544955i
\(325\) −216.624 166.793i −0.666534 0.513210i
\(326\) −23.3217 13.4648i −0.0715389 0.0413030i
\(327\) 35.1086 + 78.6178i 0.107366 + 0.240421i
\(328\) 150.037 + 150.037i 0.457431 + 0.457431i
\(329\) −318.779 + 176.237i −0.968934 + 0.535675i
\(330\) −92.0301 406.164i −0.278879 1.23080i
\(331\) −147.637 255.715i −0.446034 0.772554i 0.552089 0.833785i \(-0.313831\pi\)
−0.998124 + 0.0612308i \(0.980497\pi\)
\(332\) 112.378 30.1115i 0.338487 0.0906972i
\(333\) −123.110 + 6.72895i −0.369698 + 0.0202071i
\(334\) 72.3691 + 125.347i 0.216674 + 0.375290i
\(335\) −43.2802 + 14.6516i −0.129195 + 0.0437360i
\(336\) 66.1926 51.7159i 0.197002 0.153916i
\(337\) 348.075 + 348.075i 1.03286 + 1.03286i 0.999441 + 0.0334221i \(0.0106406\pi\)
0.0334221 + 0.999441i \(0.489359\pi\)
\(338\) −18.0841 + 67.4908i −0.0535033 + 0.199677i
\(339\) 9.76566 + 61.2134i 0.0288073 + 0.180570i
\(340\) −124.596 24.8913i −0.366460 0.0732098i
\(341\) 198.164 + 343.231i 0.581127 + 1.00654i
\(342\) 6.53274 4.26329i 0.0191016 0.0124657i
\(343\) 255.666 228.656i 0.745383 0.666637i
\(344\) 187.091 0.543869
\(345\) −139.015 + 128.579i −0.402942 + 0.372694i
\(346\) 204.088 + 117.830i 0.589851 + 0.340550i
\(347\) −148.840 555.480i −0.428935 1.60081i −0.755177 0.655521i \(-0.772449\pi\)
0.326242 0.945286i \(-0.394217\pi\)
\(348\) −73.0316 163.538i −0.209861 0.469935i
\(349\) −106.667 −0.305637 −0.152818 0.988254i \(-0.548835\pi\)
−0.152818 + 0.988254i \(0.548835\pi\)
\(350\) 146.658 + 199.353i 0.419023 + 0.569579i
\(351\) 262.633 134.934i 0.748243 0.384427i
\(352\) −28.7434 + 107.272i −0.0816574 + 0.304750i
\(353\) 6.93139 + 25.8683i 0.0196357 + 0.0732813i 0.975048 0.221992i \(-0.0712559\pi\)
−0.955413 + 0.295273i \(0.904589\pi\)
\(354\) −49.4418 309.912i −0.139666 0.875458i
\(355\) −1.35891 21.0001i −0.00382792 0.0591553i
\(356\) −3.30196 −0.00927517
\(357\) −104.257 245.611i −0.292037 0.687986i
\(358\) −71.9801 + 71.9801i −0.201062 + 0.201062i
\(359\) 182.112 + 315.427i 0.507275 + 0.878625i 0.999965 + 0.00842047i \(0.00268035\pi\)
−0.492690 + 0.870205i \(0.663986\pi\)
\(360\) −50.0773 + 117.014i −0.139104 + 0.325039i
\(361\) 180.312 312.310i 0.499480 0.865124i
\(362\) −49.3318 + 184.109i −0.136276 + 0.508588i
\(363\) −82.0329 + 789.006i −0.225986 + 2.17357i
\(364\) −79.0000 + 131.146i −0.217033 + 0.360291i
\(365\) −112.620 + 38.1249i −0.308547 + 0.104452i
\(366\) 88.2137 + 33.7486i 0.241021 + 0.0922092i
\(367\) −56.7738 211.883i −0.154697 0.577337i −0.999131 0.0416774i \(-0.986730\pi\)
0.844434 0.535659i \(-0.179937\pi\)
\(368\) 48.7758 13.0694i 0.132543 0.0355148i
\(369\) −210.079 641.653i −0.569319 1.73890i
\(370\) −42.9159 + 86.8430i −0.115989 + 0.234711i
\(371\) −399.548 240.680i −1.07695 0.648734i
\(372\) 12.5260 120.477i 0.0336721 0.323864i
\(373\) 372.463 + 99.8013i 0.998561 + 0.267564i 0.720843 0.693099i \(-0.243755\pi\)
0.277719 + 0.960662i \(0.410422\pi\)
\(374\) 305.504 + 176.383i 0.816854 + 0.471611i
\(375\) −340.338 157.463i −0.907569 0.419902i
\(376\) −127.462 + 73.5901i −0.338994 + 0.195718i
\(377\) 230.830 + 230.830i 0.612280 + 0.612280i
\(378\) −262.260 + 51.5907i −0.693810 + 0.136483i
\(379\) 381.328i 1.00614i 0.864245 + 0.503071i \(0.167797\pi\)
−0.864245 + 0.503071i \(0.832203\pi\)
\(380\) −0.395770 6.11609i −0.00104150 0.0160950i
\(381\) −5.59300 35.0582i −0.0146798 0.0920163i
\(382\) −254.147 + 68.0986i −0.665307 + 0.178268i
\(383\) −595.841 159.655i −1.55572 0.416854i −0.624414 0.781093i \(-0.714662\pi\)
−0.931305 + 0.364240i \(0.881329\pi\)
\(384\) 26.3532 21.3894i 0.0686282 0.0557016i
\(385\) −208.205 654.820i −0.540792 1.70083i
\(386\) 187.393i 0.485473i
\(387\) −531.039 269.078i −1.37219 0.695293i
\(388\) 252.776 67.7311i 0.651484 0.174565i
\(389\) −362.523 + 627.909i −0.931937 + 1.61416i −0.151929 + 0.988391i \(0.548549\pi\)
−0.780008 + 0.625770i \(0.784785\pi\)
\(390\) 9.04005 231.809i 0.0231796 0.594381i
\(391\) 160.400i 0.410230i
\(392\) 101.571 94.2935i 0.259111 0.240545i
\(393\) 52.4655 504.622i 0.133500 1.28403i
\(394\) 334.676 193.225i 0.849431 0.490419i
\(395\) 322.114 214.843i 0.815480 0.543907i
\(396\) 235.866 263.141i 0.595621 0.664497i
\(397\) 79.9252 + 21.4159i 0.201323 + 0.0539443i 0.358071 0.933694i \(-0.383434\pi\)
−0.156748 + 0.987639i \(0.550101\pi\)
\(398\) −130.276 + 130.276i −0.327326 + 0.327326i
\(399\) 10.1422 7.92401i 0.0254190 0.0198597i
\(400\) 60.7443 + 79.4363i 0.151861 + 0.198591i
\(401\) −471.040 + 271.955i −1.17466 + 0.678193i −0.954774 0.297332i \(-0.903903\pi\)
−0.219890 + 0.975525i \(0.570570\pi\)
\(402\) −31.3925 22.7542i −0.0780909 0.0566026i
\(403\) 57.1398 + 213.248i 0.141786 + 0.529153i
\(404\) −177.196 + 102.304i −0.438604 + 0.253228i
\(405\) 310.432 260.110i 0.766498 0.642247i
\(406\) −142.975 258.615i −0.352156 0.636983i
\(407\) 190.173 190.173i 0.467256 0.467256i
\(408\) −43.9619 98.4425i −0.107750 0.241281i
\(409\) −186.164 + 322.446i −0.455170 + 0.788377i −0.998698 0.0510136i \(-0.983755\pi\)
0.543528 + 0.839391i \(0.317088\pi\)
\(410\) −520.183 103.920i −1.26874 0.253463i
\(411\) −268.264 + 701.201i −0.652710 + 1.70609i
\(412\) 207.175 207.175i 0.502853 0.502853i
\(413\) −124.705 502.554i −0.301949 1.21684i
\(414\) −157.242 33.0542i −0.379812 0.0798411i
\(415\) −191.955 + 218.517i −0.462543 + 0.526546i
\(416\) −30.9313 + 53.5746i −0.0743541 + 0.128785i
\(417\) −557.688 404.229i −1.33738 0.969374i
\(418\) −4.40412 + 16.4364i −0.0105362 + 0.0393215i
\(419\) 289.110i 0.690000i −0.938603 0.345000i \(-0.887879\pi\)
0.938603 0.345000i \(-0.112121\pi\)
\(420\) −65.9289 + 199.382i −0.156974 + 0.474720i
\(421\) −680.094 −1.61543 −0.807713 0.589576i \(-0.799295\pi\)
−0.807713 + 0.589576i \(0.799295\pi\)
\(422\) −183.947 49.2883i −0.435892 0.116797i
\(423\) 467.627 25.5597i 1.10550 0.0604247i
\(424\) −163.220 94.2349i −0.384952 0.222252i
\(425\) 293.668 121.070i 0.690984 0.284872i
\(426\) 13.8645 11.2530i 0.0325457 0.0264155i
\(427\) 149.748 + 43.1207i 0.350699 + 0.100985i
\(428\) −85.7175 85.7175i −0.200275 0.200275i
\(429\) −230.144 + 601.562i −0.536466 + 1.40224i
\(430\) −389.116 + 259.532i −0.904922 + 0.603563i
\(431\) 432.391 + 249.641i 1.00323 + 0.579214i 0.909202 0.416356i \(-0.136693\pi\)
0.0940260 + 0.995570i \(0.470026\pi\)
\(432\) −105.564 + 22.8099i −0.244361 + 0.0528008i
\(433\) −62.7615 62.7615i −0.144946 0.144946i 0.630910 0.775856i \(-0.282682\pi\)
−0.775856 + 0.630910i \(0.782682\pi\)
\(434\) 3.71101 199.814i 0.00855071 0.460402i
\(435\) 378.752 + 238.820i 0.870695 + 0.549012i
\(436\) 28.7003 + 49.7104i 0.0658264 + 0.114015i
\(437\) 7.47353 2.00253i 0.0171019 0.00458244i
\(438\) −81.6867 59.2089i −0.186499 0.135180i
\(439\) 6.32464 + 10.9546i 0.0144069 + 0.0249535i 0.873139 0.487471i \(-0.162081\pi\)
−0.858732 + 0.512425i \(0.828747\pi\)
\(440\) −89.0261 262.980i −0.202332 0.597681i
\(441\) −423.915 + 121.560i −0.961259 + 0.275647i
\(442\) 138.950 + 138.950i 0.314365 + 0.314365i
\(443\) −21.4772 + 80.1541i −0.0484813 + 0.180935i −0.985921 0.167214i \(-0.946523\pi\)
0.937439 + 0.348149i \(0.113190\pi\)
\(444\) −81.1691 + 12.9493i −0.182813 + 0.0291651i
\(445\) 6.86750 4.58047i 0.0154326 0.0102932i
\(446\) 247.996 + 429.542i 0.556045 + 0.963099i
\(447\) −26.3056 + 253.012i −0.0588493 + 0.566022i
\(448\) 40.3264 38.8559i 0.0900144 0.0867318i
\(449\) −554.557 −1.23509 −0.617547 0.786534i \(-0.711874\pi\)
−0.617547 + 0.786534i \(0.711874\pi\)
\(450\) −58.1695 312.836i −0.129266 0.695191i
\(451\) 1275.46 + 736.387i 2.82807 + 1.63279i
\(452\) 10.6957 + 39.9168i 0.0236630 + 0.0883116i
\(453\) 765.080 341.665i 1.68892 0.754227i
\(454\) 105.076 0.231445
\(455\) −17.6194 382.350i −0.0387241 0.840329i
\(456\) 4.03789 3.27733i 0.00885503 0.00718713i
\(457\) 130.979 488.822i 0.286607 1.06963i −0.661050 0.750342i \(-0.729889\pi\)
0.947657 0.319290i \(-0.103445\pi\)
\(458\) −24.9326 93.0497i −0.0544380 0.203165i
\(459\) −16.8010 + 342.646i −0.0366035 + 0.746506i
\(460\) −83.3153 + 94.8440i −0.181120 + 0.206183i
\(461\) 364.645 0.790987 0.395494 0.918469i \(-0.370573\pi\)
0.395494 + 0.918469i \(0.370573\pi\)
\(462\) 350.882 465.641i 0.759485 1.00788i
\(463\) −568.862 + 568.862i −1.22864 + 1.22864i −0.264166 + 0.964477i \(0.585097\pi\)
−0.964477 + 0.264166i \(0.914903\pi\)
\(464\) −59.7012 103.406i −0.128666 0.222857i
\(465\) 141.074 + 267.948i 0.303385 + 0.576232i
\(466\) −183.272 + 317.437i −0.393288 + 0.681195i
\(467\) −14.8228 + 55.3194i −0.0317405 + 0.118457i −0.979978 0.199104i \(-0.936197\pi\)
0.948238 + 0.317561i \(0.102864\pi\)
\(468\) 164.848 107.580i 0.352239 0.229872i
\(469\) −54.7962 33.0082i −0.116836 0.0703800i
\(470\) 163.014 329.870i 0.346839 0.701850i
\(471\) 277.254 724.701i 0.588650 1.53864i
\(472\) −54.1503 202.092i −0.114725 0.428161i
\(473\) 1254.35 336.102i 2.65190 0.710574i
\(474\) 306.851 + 117.394i 0.647365 + 0.247667i
\(475\) 9.30737 + 12.1714i 0.0195945 + 0.0256240i
\(476\) −86.0650 155.675i −0.180809 0.327049i
\(477\) 327.752 + 502.223i 0.687111 + 1.05288i
\(478\) −45.3107 12.1410i −0.0947922 0.0253995i
\(479\) −129.731 74.9002i −0.270837 0.156368i 0.358431 0.933556i \(-0.383312\pi\)
−0.629268 + 0.777188i \(0.716645\pi\)
\(480\) −25.1387 + 81.0435i −0.0523724 + 0.168841i
\(481\) 129.742 74.9067i 0.269734 0.155731i
\(482\) 284.375 + 284.375i 0.589990 + 0.589990i
\(483\) −263.130 32.3070i −0.544784 0.0668881i
\(484\) 528.839i 1.09264i
\(485\) −431.773 + 491.519i −0.890255 + 1.01344i
\(486\) 332.438 + 87.0805i 0.684029 + 0.179178i
\(487\) 105.168 28.1798i 0.215952 0.0578641i −0.149221 0.988804i \(-0.547677\pi\)
0.365173 + 0.930940i \(0.381010\pi\)
\(488\) 60.8205 + 16.2968i 0.124632 + 0.0333951i
\(489\) 36.0005 + 44.3550i 0.0736206 + 0.0907056i
\(490\) −80.4469 + 337.014i −0.164177 + 0.687783i
\(491\) 156.181i 0.318087i −0.987272 0.159043i \(-0.949159\pi\)
0.987272 0.159043i \(-0.0508410\pi\)
\(492\) −183.538 410.992i −0.373045 0.835349i
\(493\) −366.354 + 98.1642i −0.743111 + 0.199116i
\(494\) −4.73936 + 8.20881i −0.00959384 + 0.0166170i
\(495\) −125.532 + 874.481i −0.253599 + 1.76663i
\(496\) 80.7512i 0.162805i
\(497\) 21.2158 20.4421i 0.0426877 0.0411310i
\(498\) −245.475 25.5220i −0.492922 0.0512491i
\(499\) 601.874 347.492i 1.20616 0.696377i 0.244242 0.969714i \(-0.421461\pi\)
0.961918 + 0.273337i \(0.0881274\pi\)
\(500\) −236.532 80.9493i −0.473063 0.161899i
\(501\) −48.3712 303.202i −0.0965494 0.605193i
\(502\) −183.850 49.2625i −0.366235 0.0981324i
\(503\) −159.128 + 159.128i −0.316358 + 0.316358i −0.847366 0.531009i \(-0.821813\pi\)
0.531009 + 0.847366i \(0.321813\pi\)
\(504\) −170.346 + 52.2900i −0.337988 + 0.103750i
\(505\) 226.620 458.581i 0.448753 0.908080i
\(506\) 303.538 175.248i 0.599878 0.346340i
\(507\) 86.9870 120.010i 0.171572 0.236707i
\(508\) −6.12565 22.8612i −0.0120584 0.0450024i
\(509\) 303.860 175.434i 0.596974 0.344663i −0.170876 0.985293i \(-0.554660\pi\)
0.767850 + 0.640629i \(0.221326\pi\)
\(510\) 227.992 + 143.760i 0.447044 + 0.281881i
\(511\) −142.586 85.8909i −0.279032 0.168084i
\(512\) 16.0000 16.0000i 0.0312500 0.0312500i
\(513\) −16.1747 + 3.49498i −0.0315296 + 0.00681283i
\(514\) 89.5253 155.062i 0.174174 0.301678i
\(515\) −143.495 + 718.282i −0.278632 + 1.39472i
\(516\) −370.678 141.813i −0.718369 0.274832i
\(517\) −722.364 + 722.364i −1.39722 + 1.39722i
\(518\) −131.624 + 32.6614i −0.254100 + 0.0630530i
\(519\) −315.041 388.152i −0.607015 0.747884i
\(520\) −9.98689 154.334i −0.0192056 0.296796i
\(521\) −27.9815 + 48.4653i −0.0537072 + 0.0930237i −0.891629 0.452767i \(-0.850437\pi\)
0.837922 + 0.545790i \(0.183770\pi\)
\(522\) 20.7357 + 379.370i 0.0397236 + 0.726763i
\(523\) −226.661 + 845.912i −0.433387 + 1.61742i 0.311510 + 0.950243i \(0.399165\pi\)
−0.744897 + 0.667180i \(0.767501\pi\)
\(524\) 338.228i 0.645474i
\(525\) −139.463 506.138i −0.265643 0.964072i
\(526\) −113.544 −0.215864
\(527\) −247.763 66.3879i −0.470138 0.125973i
\(528\) 138.260 190.748i 0.261855 0.361265i
\(529\) 320.111 + 184.816i 0.605124 + 0.349368i
\(530\) 470.191 30.4259i 0.887153 0.0574074i
\(531\) −136.953 + 651.498i −0.257915 + 1.22693i
\(532\) 6.17890 5.95357i 0.0116145 0.0111909i
\(533\) 580.106 + 580.106i 1.08838 + 1.08838i
\(534\) 6.54209 + 2.50285i 0.0122511 + 0.00468699i
\(535\) 297.185 + 59.3703i 0.555486 + 0.110973i
\(536\) −22.3849 12.9239i −0.0417628 0.0241118i
\(537\) 197.173 88.0521i 0.367174 0.163970i
\(538\) −184.882 184.882i −0.343647 0.343647i
\(539\) 511.589 814.659i 0.949145 1.51143i
\(540\) 187.912 193.879i 0.347986 0.359035i
\(541\) 325.449 + 563.694i 0.601569 + 1.04195i 0.992584 + 0.121564i \(0.0387909\pi\)
−0.391014 + 0.920385i \(0.627876\pi\)
\(542\) 263.230 70.5322i 0.485664 0.130133i
\(543\) 237.293 327.377i 0.437003 0.602904i
\(544\) −35.9376 62.2457i −0.0660617 0.114422i
\(545\) −128.650 63.5759i −0.236055 0.116653i
\(546\) 255.928 199.955i 0.468733 0.366218i
\(547\) 155.700 + 155.700i 0.284644 + 0.284644i 0.834958 0.550314i \(-0.185492\pi\)
−0.550314 + 0.834958i \(0.685492\pi\)
\(548\) −129.542 + 483.456i −0.236390 + 0.882219i
\(549\) −149.195 133.730i −0.271757 0.243589i
\(550\) 549.964 + 423.455i 0.999935 + 0.769918i
\(551\) −9.14754 15.8440i −0.0166017 0.0287550i
\(552\) −106.545 11.0775i −0.193016 0.0200679i
\(553\) 520.899 + 149.995i 0.941951 + 0.271239i
\(554\) 619.086 1.11748
\(555\) 150.854 139.530i 0.271810 0.251405i
\(556\) −397.667 229.593i −0.715229 0.412938i
\(557\) 68.9573 + 257.352i 0.123801 + 0.462033i 0.999794 0.0202914i \(-0.00645939\pi\)
−0.875993 + 0.482324i \(0.839793\pi\)
\(558\) −116.138 + 229.204i −0.208133 + 0.410760i
\(559\) 723.371 1.29404
\(560\) −29.9712 + 136.754i −0.0535200 + 0.244204i
\(561\) −471.590 581.031i −0.840624 1.03571i
\(562\) −81.0832 + 302.607i −0.144276 + 0.538446i
\(563\) 109.570 + 408.921i 0.194618 + 0.726324i 0.992365 + 0.123332i \(0.0393581\pi\)
−0.797747 + 0.602992i \(0.793975\pi\)
\(564\) 308.317 49.1874i 0.546662 0.0872116i
\(565\) −77.6178 68.1831i −0.137377 0.120678i
\(566\) −560.922 −0.991028
\(567\) 558.715 + 96.5755i 0.985388 + 0.170327i
\(568\) 8.41761 8.41761i 0.0148197 0.0148197i
\(569\) −102.317 177.219i −0.179819 0.311456i 0.761999 0.647578i \(-0.224218\pi\)
−0.941819 + 0.336122i \(0.890885\pi\)
\(570\) −3.85181 + 12.4176i −0.00675756 + 0.0217853i
\(571\) −10.0374 + 17.3853i −0.0175786 + 0.0304471i −0.874681 0.484699i \(-0.838929\pi\)
0.857102 + 0.515146i \(0.172262\pi\)
\(572\) −111.134 + 414.757i −0.194290 + 0.725100i
\(573\) 555.154 + 57.7193i 0.968855 + 0.100732i
\(574\) −359.317 649.935i −0.625987 1.13229i
\(575\) 41.7140 312.834i 0.0725460 0.544059i
\(576\) −68.4260 + 22.4028i −0.118795 + 0.0388938i
\(577\) −71.5200 266.916i −0.123952 0.462593i 0.875849 0.482586i \(-0.160302\pi\)
−0.999800 + 0.0199925i \(0.993636\pi\)
\(578\) 174.252 46.6907i 0.301474 0.0807798i
\(579\) −142.042 + 371.276i −0.245323 + 0.641237i
\(580\) 267.612 + 132.248i 0.461401 + 0.228014i
\(581\) −407.126 7.56126i −0.700734 0.0130142i
\(582\) −552.158 57.4078i −0.948725 0.0986389i
\(583\) −1263.59 338.579i −2.16740 0.580753i
\(584\) −58.2478 33.6294i −0.0997393 0.0575845i
\(585\) −193.620 + 452.424i −0.330974 + 0.773375i
\(586\) −270.231 + 156.018i −0.461144 + 0.266242i
\(587\) −384.403 384.403i −0.654860 0.654860i 0.299299 0.954159i \(-0.403247\pi\)
−0.954159 + 0.299299i \(0.903247\pi\)
\(588\) −272.714 + 109.831i −0.463800 + 0.186788i
\(589\) 12.3729i 0.0210065i
\(590\) 392.965 + 345.199i 0.666042 + 0.585082i
\(591\) −809.548 + 129.151i −1.36979 + 0.218530i
\(592\) −52.9299 + 14.1825i −0.0894086 + 0.0239570i
\(593\) 82.9396 + 22.2236i 0.139864 + 0.0374766i 0.328072 0.944653i \(-0.393601\pi\)
−0.188208 + 0.982129i \(0.560268\pi\)
\(594\) −666.774 + 342.570i −1.12252 + 0.576718i
\(595\) 394.953 + 204.388i 0.663786 + 0.343509i
\(596\) 169.584i 0.284537i
\(597\) 356.860 159.365i 0.597756 0.266942i
\(598\) 188.588 50.5319i 0.315364 0.0845015i
\(599\) −261.754 + 453.371i −0.436985 + 0.756880i −0.997455 0.0712942i \(-0.977287\pi\)
0.560470 + 0.828175i \(0.310620\pi\)
\(600\) −60.1392 203.429i −0.100232 0.339048i
\(601\) 135.446i 0.225368i 0.993631 + 0.112684i \(0.0359448\pi\)
−0.993631 + 0.112684i \(0.964055\pi\)
\(602\) −629.249 181.195i −1.04526 0.300989i
\(603\) 44.9497 + 68.8776i 0.0745435 + 0.114225i
\(604\) 483.764 279.301i 0.800934 0.462419i
\(605\) −733.606 1099.89i −1.21257 1.81801i
\(606\) 428.619 68.3797i 0.707292 0.112838i
\(607\) 490.637 + 131.466i 0.808298 + 0.216583i 0.639224 0.769021i \(-0.279256\pi\)
0.169074 + 0.985603i \(0.445922\pi\)
\(608\) 2.45155 2.45155i 0.00403216 0.00403216i
\(609\) 87.2457 + 620.762i 0.143261 + 1.01931i
\(610\) −149.103 + 50.4757i −0.244431 + 0.0827470i
\(611\) −492.820 + 284.530i −0.806580 + 0.465679i
\(612\) 12.4820 + 228.364i 0.0203954 + 0.373144i
\(613\) −182.131 679.722i −0.297114 1.10885i −0.939524 0.342484i \(-0.888732\pi\)
0.642410 0.766361i \(-0.277935\pi\)
\(614\) 83.0848 47.9690i 0.135317 0.0781254i
\(615\) 951.855 + 600.188i 1.54773 + 0.975915i
\(616\) 200.565 332.954i 0.325593 0.540509i
\(617\) 61.9920 61.9920i 0.100473 0.100473i −0.655083 0.755557i \(-0.727366\pi\)
0.755557 + 0.655083i \(0.227366\pi\)
\(618\) −567.508 + 253.434i −0.918298 + 0.410088i
\(619\) −55.8546 + 96.7431i −0.0902337 + 0.156289i −0.907609 0.419816i \(-0.862095\pi\)
0.817376 + 0.576105i \(0.195428\pi\)
\(620\) 112.018 + 167.948i 0.180674 + 0.270885i
\(621\) 286.485 + 184.677i 0.461328 + 0.297387i
\(622\) −434.233 + 434.233i −0.698124 + 0.698124i
\(623\) 11.1056 + 3.19791i 0.0178260 + 0.00513308i
\(624\) 101.892 82.7004i 0.163289 0.132533i
\(625\) 604.238 159.756i 0.966780 0.255610i
\(626\) 179.958 311.696i 0.287473 0.497917i
\(627\) 21.1844 29.2268i 0.0337869 0.0466136i
\(628\) 133.883 499.658i 0.213189 0.795634i
\(629\) 174.061i 0.276726i
\(630\) 281.753 345.058i 0.447228 0.547711i
\(631\) −231.667 −0.367143 −0.183571 0.983006i \(-0.558766\pi\)
−0.183571 + 0.983006i \(0.558766\pi\)
\(632\) 211.564 + 56.6884i 0.334753 + 0.0896969i
\(633\) 327.089 + 237.083i 0.516728 + 0.374539i
\(634\) 154.233 + 89.0467i 0.243270 + 0.140452i
\(635\) 44.4534 + 39.0499i 0.0700053 + 0.0614959i
\(636\) 251.954 + 310.424i 0.396154 + 0.488088i
\(637\) 392.717 364.578i 0.616510 0.572336i
\(638\) −586.031 586.031i −0.918543 0.918543i
\(639\) −35.9990 + 11.7862i −0.0563364 + 0.0184447i
\(640\) −11.0820 + 55.4724i −0.0173157 + 0.0866756i
\(641\) 471.706 + 272.339i 0.735890 + 0.424866i 0.820573 0.571542i \(-0.193654\pi\)
−0.0846830 + 0.996408i \(0.526988\pi\)
\(642\) 104.857 + 234.803i 0.163329 + 0.365737i
\(643\) −521.820 521.820i −0.811539 0.811539i 0.173326 0.984865i \(-0.444549\pi\)
−0.984865 + 0.173326i \(0.944549\pi\)
\(644\) −176.707 3.28185i −0.274390 0.00509604i
\(645\) 967.670 219.258i 1.50026 0.339935i
\(646\) −5.50643 9.53741i −0.00852388 0.0147638i
\(647\) 258.810 69.3479i 0.400016 0.107184i −0.0532020 0.998584i \(-0.516943\pi\)
0.453218 + 0.891400i \(0.350276\pi\)
\(648\) 226.441 + 34.8236i 0.349445 + 0.0537401i
\(649\) −726.101 1257.64i −1.11880 1.93782i
\(650\) 234.863 + 307.134i 0.361327 + 0.472513i
\(651\) −158.810 + 393.074i −0.243948 + 0.603801i
\(652\) 26.9296 + 26.9296i 0.0413030 + 0.0413030i
\(653\) −22.9450 + 85.6319i −0.0351378 + 0.131136i −0.981267 0.192654i \(-0.938291\pi\)
0.946129 + 0.323790i \(0.104957\pi\)
\(654\) −19.1832 120.245i −0.0293321 0.183860i
\(655\) 469.190 + 703.456i 0.716320 + 1.07398i
\(656\) −150.037 259.872i −0.228715 0.396147i
\(657\) 116.964 + 179.227i 0.178027 + 0.272796i
\(658\) 499.968 124.063i 0.759830 0.188546i
\(659\) 80.5689 0.122259 0.0611297 0.998130i \(-0.480530\pi\)
0.0611297 + 0.998130i \(0.480530\pi\)
\(660\) −22.9509 + 588.516i −0.0347741 + 0.891691i
\(661\) 697.809 + 402.880i 1.05569 + 0.609501i 0.924236 0.381822i \(-0.124703\pi\)
0.131450 + 0.991323i \(0.458037\pi\)
\(662\) 108.078 + 403.353i 0.163260 + 0.609294i
\(663\) −169.975 380.620i −0.256372 0.574087i
\(664\) −164.532 −0.247789
\(665\) −4.59225 + 20.9538i −0.00690564 + 0.0315094i
\(666\) 170.634 + 35.8693i 0.256207 + 0.0538578i
\(667\) −97.5327 + 363.997i −0.146226 + 0.545723i
\(668\) −52.9778 197.716i −0.0793081 0.295982i
\(669\) −165.760 1039.02i −0.247772 1.55309i
\(670\) 64.4847 4.17278i 0.0962458 0.00622803i
\(671\) 437.047 0.651337
\(672\) −109.350 + 46.4171i −0.162723 + 0.0690730i
\(673\) 231.974 231.974i 0.344687 0.344687i −0.513439 0.858126i \(-0.671629\pi\)
0.858126 + 0.513439i \(0.171629\pi\)
\(674\) −348.075 602.884i −0.516432 0.894486i
\(675\) −121.877 + 663.906i −0.180558 + 0.983564i
\(676\) 49.4067 85.5750i 0.0730869 0.126590i
\(677\) 108.064 403.300i 0.159622 0.595717i −0.839043 0.544065i \(-0.816885\pi\)
0.998665 0.0516521i \(-0.0164487\pi\)
\(678\) 9.06550 87.1935i 0.0133709 0.128604i
\(679\) −915.767 17.0079i −1.34870 0.0250484i
\(680\) 161.091 + 79.6077i 0.236899 + 0.117070i
\(681\) −208.184 79.6465i −0.305703 0.116955i
\(682\) −145.066 541.395i −0.212707 0.793835i
\(683\) −830.156 + 222.440i −1.21546 + 0.325680i −0.808900 0.587946i \(-0.799937\pi\)
−0.406555 + 0.913626i \(0.633270\pi\)
\(684\) −10.4844 + 3.43261i −0.0153280 + 0.00501843i
\(685\) −401.226 1185.20i −0.585731 1.73023i
\(686\) −432.941 + 218.770i −0.631109 + 0.318907i
\(687\) −21.1325 + 203.256i −0.0307605 + 0.295860i
\(688\) −255.571 68.4800i −0.371469 0.0995349i
\(689\) −631.075 364.351i −0.915929 0.528812i
\(690\) 236.961 124.760i 0.343422 0.180811i
\(691\) −242.414 + 139.958i −0.350816 + 0.202544i −0.665045 0.746804i \(-0.731587\pi\)
0.314229 + 0.949347i \(0.398254\pi\)
\(692\) −235.661 235.661i −0.340550 0.340550i
\(693\) −1048.15 + 656.598i −1.51248 + 0.947472i
\(694\) 813.279i 1.17187i
\(695\) 1145.57 74.1295i 1.64830 0.106661i
\(696\) 39.9041 + 250.128i 0.0573335 + 0.359379i
\(697\) −920.697 + 246.700i −1.32094 + 0.353945i
\(698\) 145.710 + 39.0429i 0.208754 + 0.0559354i
\(699\) 603.727 490.011i 0.863701 0.701018i
\(700\) −127.370 326.001i −0.181958 0.465716i
\(701\) 1078.49i 1.53850i −0.638949 0.769249i \(-0.720630\pi\)
0.638949 0.769249i \(-0.279370\pi\)
\(702\) −408.153 + 88.1926i −0.581415 + 0.125631i
\(703\) −8.11002 + 2.17307i −0.0115363 + 0.00309114i
\(704\) 78.5284 136.015i 0.111546 0.193203i
\(705\) −573.014 + 529.999i −0.812786 + 0.751772i
\(706\) 37.8738i 0.0536456i
\(707\) 695.049 172.471i 0.983097 0.243948i
\(708\) −45.8970 + 441.445i −0.0648263 + 0.623510i
\(709\) −379.565 + 219.142i −0.535353 + 0.309086i −0.743193 0.669077i \(-0.766690\pi\)
0.207841 + 0.978163i \(0.433356\pi\)
\(710\) −5.83027 + 29.1841i −0.00821165 + 0.0411043i
\(711\) −518.973 465.181i −0.729920 0.654263i
\(712\) 4.51056 + 1.20860i 0.00633506 + 0.00169747i
\(713\) −180.208 + 180.208i −0.252746 + 0.252746i
\(714\) 52.5181 + 373.672i 0.0735548 + 0.523350i
\(715\) −344.212 1016.79i −0.481415 1.42208i
\(716\) 124.673 71.9801i 0.174124 0.100531i
\(717\) 80.5702 + 58.3996i 0.112371 + 0.0814500i
\(718\) −133.315 497.538i −0.185675 0.692950i
\(719\) 139.253 80.3980i 0.193677 0.111819i −0.400026 0.916504i \(-0.630999\pi\)
0.593703 + 0.804685i \(0.297666\pi\)
\(720\) 111.237 141.514i 0.154496 0.196548i
\(721\) −897.447 + 496.154i −1.24473 + 0.688147i
\(722\) −360.624 + 360.624i −0.499480 + 0.499480i
\(723\) −347.872 778.980i −0.481151 1.07743i
\(724\) 134.777 233.441i 0.186156 0.322432i
\(725\) −740.042 + 96.1785i −1.02075 + 0.132660i
\(726\) 400.855 1047.78i 0.552142 1.44322i
\(727\) 694.902 694.902i 0.955848 0.955848i −0.0432176 0.999066i \(-0.513761\pi\)
0.999066 + 0.0432176i \(0.0137609\pi\)
\(728\) 155.919 150.233i 0.214174 0.206364i
\(729\) −592.645 424.515i −0.812956 0.582326i
\(730\) 167.796 10.8580i 0.229857 0.0148740i
\(731\) −420.224 + 727.850i −0.574862 + 0.995690i
\(732\) −108.149 78.3899i −0.147745 0.107090i
\(733\) −39.1333 + 146.048i −0.0533879 + 0.199246i −0.987469 0.157816i \(-0.949555\pi\)
0.934081 + 0.357062i \(0.116222\pi\)
\(734\) 310.218i 0.422640i
\(735\) 414.841 606.739i 0.564409 0.825495i
\(736\) −71.4128 −0.0970282
\(737\) −173.296 46.4346i −0.235138 0.0630049i
\(738\) 52.1116 + 953.408i 0.0706120 + 1.29188i
\(739\) −1272.70 734.796i −1.72220 0.994311i −0.914355 0.404913i \(-0.867302\pi\)
−0.807843 0.589398i \(-0.799365\pi\)
\(740\) 90.4110 102.921i 0.122177 0.139083i
\(741\) 15.6122 12.6715i 0.0210691 0.0171006i
\(742\) 457.697 + 475.020i 0.616843 + 0.640189i
\(743\) 51.7779 + 51.7779i 0.0696876 + 0.0696876i 0.741092 0.671404i \(-0.234308\pi\)
−0.671404 + 0.741092i \(0.734308\pi\)
\(744\) −61.2086 + 159.990i −0.0822697 + 0.215041i
\(745\) −235.247 352.705i −0.315767 0.473429i
\(746\) −472.265 272.662i −0.633062 0.365499i
\(747\) 467.008 + 236.634i 0.625178 + 0.316779i
\(748\) −352.765 352.765i −0.471611 0.471611i
\(749\) 205.281 + 371.313i 0.274073 + 0.495745i
\(750\) 407.275 + 339.672i 0.543034 + 0.452895i
\(751\) −180.515 312.661i −0.240366 0.416327i 0.720452 0.693505i \(-0.243934\pi\)
−0.960819 + 0.277178i \(0.910601\pi\)
\(752\) 201.052 53.8717i 0.267356 0.0716379i
\(753\) 326.917 + 236.959i 0.434153 + 0.314687i
\(754\) −230.830 399.809i −0.306140 0.530250i
\(755\) −618.698 + 1251.97i −0.819468 + 1.65824i
\(756\) 377.138 + 25.5197i 0.498859 + 0.0337563i
\(757\) −43.6499 43.6499i −0.0576617 0.0576617i 0.677688 0.735350i \(-0.262982\pi\)
−0.735350 + 0.677688i \(0.762982\pi\)
\(758\) 139.576 520.904i 0.184137 0.687208i
\(759\) −734.229 + 117.135i −0.967364 + 0.154328i
\(760\) −1.69801 + 8.49959i −0.00223423 + 0.0111837i
\(761\) 15.0192 + 26.0141i 0.0197362 + 0.0341840i 0.875725 0.482811i \(-0.160384\pi\)
−0.855989 + 0.516995i \(0.827051\pi\)
\(762\) −5.19201 + 49.9376i −0.00681366 + 0.0655349i
\(763\) −48.3849 194.989i −0.0634140 0.255555i
\(764\) 372.097 0.487038
\(765\) −342.747 457.643i −0.448036 0.598227i
\(766\) 755.495 + 436.186i 0.986287 + 0.569433i
\(767\) −209.368 781.371i −0.272970 1.01874i
\(768\) −43.8282 + 19.5725i −0.0570680 + 0.0254851i
\(769\) 701.312 0.911979 0.455990 0.889985i \(-0.349285\pi\)
0.455990 + 0.889985i \(0.349285\pi\)
\(770\) 44.7323 + 970.710i 0.0580939 + 1.26066i
\(771\) −294.910 + 239.362i −0.382503 + 0.310456i
\(772\) −68.5905 + 255.983i −0.0888478 + 0.331584i
\(773\) −56.6906 211.572i −0.0733384 0.273703i 0.919513 0.393060i \(-0.128583\pi\)
−0.992851 + 0.119357i \(0.961917\pi\)
\(774\) 626.923 + 561.941i 0.809978 + 0.726022i
\(775\) −465.956 193.912i −0.601233 0.250209i
\(776\) −370.090 −0.476920
\(777\) 285.540 + 35.0584i 0.367491 + 0.0451202i
\(778\) 725.047 725.047i 0.931937 0.931937i
\(779\) −22.9890 39.8181i −0.0295109 0.0511144i
\(780\) −97.1968 + 313.348i −0.124611 + 0.401728i
\(781\) 41.3139 71.5577i 0.0528987 0.0916232i
\(782\) −58.7105 + 219.111i −0.0750774 + 0.280193i
\(783\) 246.476 767.354i 0.314784 0.980018i
\(784\) −173.263 + 91.6296i −0.220999 + 0.116875i
\(785\) 414.672 + 1224.92i 0.528244 + 1.56041i
\(786\) −256.374 + 670.123i −0.326175 + 0.852574i
\(787\) −91.8852 342.920i −0.116754 0.435731i 0.882658 0.470015i \(-0.155752\pi\)
−0.999412 + 0.0342841i \(0.989085\pi\)
\(788\) −527.901 + 141.451i −0.669925 + 0.179506i
\(789\) 224.963 + 86.0656i 0.285124 + 0.109082i
\(790\) −518.655 + 175.579i −0.656525 + 0.222252i
\(791\) 2.68578 144.612i 0.00339542 0.182822i
\(792\) −418.515 + 273.124i −0.528428 + 0.344854i
\(793\) 235.157 + 63.0102i 0.296542 + 0.0794581i
\(794\) −101.341 58.5093i −0.127634 0.0736893i
\(795\) −954.641 296.118i −1.20081 0.372476i
\(796\) 225.645 130.276i 0.283473 0.163663i
\(797\) 339.966 + 339.966i 0.426556 + 0.426556i 0.887454 0.460897i \(-0.152472\pi\)
−0.460897 + 0.887454i \(0.652472\pi\)
\(798\) −16.7548 + 7.11211i −0.0209961 + 0.00891242i
\(799\) 661.162i 0.827487i
\(800\) −53.9026 130.746i −0.0673782 0.163432i
\(801\) −11.0645 9.91768i −0.0138134 0.0123816i
\(802\) 742.996 199.085i 0.926429 0.248236i
\(803\) −450.936 120.828i −0.561564 0.150470i
\(804\) 34.5544 + 42.5733i 0.0429781 + 0.0529519i
\(805\) 372.073 238.302i 0.462202 0.296028i
\(806\) 312.217i 0.387367i
\(807\) 226.163 + 506.441i 0.280252 + 0.627560i
\(808\) 279.500 74.8918i 0.345916 0.0926878i
\(809\) 61.1804 105.968i 0.0756248 0.130986i −0.825733 0.564061i \(-0.809238\pi\)
0.901358 + 0.433075i \(0.142572\pi\)
\(810\) −519.264 + 241.691i −0.641067 + 0.298384i
\(811\) 957.012i 1.18004i 0.807389 + 0.590020i \(0.200880\pi\)
−0.807389 + 0.590020i \(0.799120\pi\)
\(812\) 100.648 + 405.608i 0.123951 + 0.499517i
\(813\) −574.994 59.7820i −0.707249 0.0735326i
\(814\) −329.389 + 190.173i −0.404655 + 0.233628i
\(815\) −93.3655 18.6521i −0.114559 0.0228861i
\(816\) 24.0205 + 150.566i 0.0294369 + 0.184517i
\(817\) −39.1591 10.4926i −0.0479303 0.0128429i
\(818\) 372.329 372.329i 0.455170 0.455170i
\(819\) −658.628 + 202.175i −0.804186 + 0.246856i
\(820\) 672.546 + 332.357i 0.820178 + 0.405314i
\(821\) −920.486 + 531.443i −1.12118 + 0.647312i −0.941701 0.336451i \(-0.890773\pi\)
−0.179476 + 0.983762i \(0.557440\pi\)
\(822\) 623.113 859.668i 0.758044 1.04582i
\(823\) −29.6486 110.650i −0.0360250 0.134447i 0.945571 0.325415i \(-0.105504\pi\)
−0.981596 + 0.190968i \(0.938837\pi\)
\(824\) −358.838 + 207.175i −0.435483 + 0.251426i
\(825\) −768.655 1255.85i −0.931703 1.52224i
\(826\) −13.5976 + 732.147i −0.0164620 + 0.886376i
\(827\) −825.192 + 825.192i −0.997814 + 0.997814i −0.999998 0.00218371i \(-0.999305\pi\)
0.00218371 + 0.999998i \(0.499305\pi\)
\(828\) 202.698 + 102.707i 0.244804 + 0.124043i
\(829\) −344.862 + 597.318i −0.415997 + 0.720528i −0.995533 0.0944189i \(-0.969901\pi\)
0.579535 + 0.814947i \(0.303234\pi\)
\(830\) 342.198 228.239i 0.412287 0.274987i
\(831\) −1226.58 469.261i −1.47603 0.564694i
\(832\) 61.8626 61.8626i 0.0743541 0.0743541i
\(833\) 138.696 + 606.941i 0.166502 + 0.728621i
\(834\) 613.858 + 756.315i 0.736041 + 0.906853i
\(835\) 384.456 + 337.724i 0.460427 + 0.404460i
\(836\) 12.0323 20.8405i 0.0143927 0.0249289i
\(837\) 403.836 366.085i 0.482481 0.437377i
\(838\) −105.822 + 394.932i −0.126279 + 0.471279i
\(839\) 633.111i 0.754602i −0.926091 0.377301i \(-0.876852\pi\)
0.926091 0.377301i \(-0.123148\pi\)
\(840\) 163.040 248.230i 0.194095 0.295512i
\(841\) 50.0595 0.0595238
\(842\) 929.026 + 248.932i 1.10336 + 0.295643i
\(843\) 390.021 538.087i 0.462659 0.638300i
\(844\) 233.235 + 134.658i 0.276345 + 0.159548i
\(845\) 15.9521 + 246.518i 0.0188782 + 0.291737i
\(846\) −648.145 136.248i −0.766129 0.161050i
\(847\) 512.174 1778.66i 0.604692 2.09996i
\(848\) 188.470 + 188.470i 0.222252 + 0.222252i
\(849\) 1111.34 + 425.174i 1.30900 + 0.500793i
\(850\) −445.473 + 57.8953i −0.524086 + 0.0681121i
\(851\) 149.771 + 86.4705i 0.175994 + 0.101610i
\(852\) −23.0581 + 10.2971i −0.0270635 + 0.0120858i
\(853\) 148.087 + 148.087i 0.173608 + 0.173608i 0.788562 0.614955i \(-0.210826\pi\)
−0.614955 + 0.788562i \(0.710826\pi\)
\(854\) −188.777 113.716i −0.221050 0.133156i
\(855\) 17.0439 21.6831i 0.0199344 0.0253604i
\(856\) 85.7175 + 148.467i 0.100137 + 0.173443i
\(857\) 1083.52 290.329i 1.26432 0.338774i 0.436469 0.899719i \(-0.356229\pi\)
0.827853 + 0.560945i \(0.189562\pi\)
\(858\) 534.569 737.510i 0.623041 0.859569i
\(859\) 590.351 + 1022.52i 0.687254 + 1.19036i 0.972723 + 0.231971i \(0.0745175\pi\)
−0.285468 + 0.958388i \(0.592149\pi\)
\(860\) 626.538 212.101i 0.728533 0.246629i
\(861\) 219.260 + 1560.06i 0.254658 + 1.81191i
\(862\) −499.282 499.282i −0.579214 0.579214i
\(863\) 295.511 1102.86i 0.342423 1.27794i −0.553171 0.833068i \(-0.686583\pi\)
0.895594 0.444872i \(-0.146751\pi\)
\(864\) 152.552 + 7.48008i 0.176565 + 0.00865750i
\(865\) 817.042 + 163.225i 0.944558 + 0.188700i
\(866\) 62.7615 + 108.706i 0.0724728 + 0.125527i
\(867\) −380.632 39.5743i −0.439022 0.0456451i
\(868\) −78.2065 + 271.593i −0.0900997 + 0.312896i
\(869\) 1520.27 1.74945
\(870\) −429.971 464.868i −0.494219 0.534331i
\(871\) −86.5492 49.9692i −0.0993676 0.0573699i
\(872\) −21.0101 78.4107i −0.0240941 0.0899205i
\(873\) 1050.46 + 532.271i 1.20328 + 0.609704i
\(874\) −10.9420 −0.0125195
\(875\) 717.137 + 501.338i 0.819585 + 0.572957i
\(876\) 89.9141 + 110.780i 0.102642 + 0.126462i
\(877\) −225.834 + 842.825i −0.257508 + 0.961032i 0.709171 + 0.705037i \(0.249070\pi\)
−0.966678 + 0.255995i \(0.917597\pi\)
\(878\) −4.62996 17.2792i −0.00527330 0.0196802i
\(879\) 653.661 104.282i 0.743642 0.118637i
\(880\) 25.3547 + 391.823i 0.0288122 + 0.445253i
\(881\) 1627.99 1.84789 0.923944 0.382528i \(-0.124946\pi\)
0.923944 + 0.382528i \(0.124946\pi\)
\(882\) 623.573 10.8910i 0.706999 0.0123480i
\(883\) 818.020 818.020i 0.926410 0.926410i −0.0710620 0.997472i \(-0.522639\pi\)
0.997472 + 0.0710620i \(0.0226388\pi\)
\(884\) −138.950 240.668i −0.157183 0.272248i
\(885\) −516.914 981.797i −0.584084 1.10938i
\(886\) 58.6769 101.631i 0.0662267 0.114708i
\(887\) 285.319 1064.83i 0.321668 1.20048i −0.595952 0.803020i \(-0.703225\pi\)
0.917620 0.397460i \(-0.130108\pi\)
\(888\) 115.619 + 12.0209i 0.130201 + 0.0135370i
\(889\) −1.53820 + 82.8226i −0.00173026 + 0.0931638i
\(890\) −11.0578 + 3.74336i −0.0124244 + 0.00420603i
\(891\) 1580.73 173.317i 1.77411 0.194520i
\(892\) −181.546 677.538i −0.203527 0.759572i
\(893\) 30.8056 8.25433i 0.0344967 0.00924337i
\(894\) 128.543 335.992i 0.143784 0.375830i
\(895\) −159.448 + 322.653i −0.178154 + 0.360506i
\(896\) −69.3092 + 38.3176i −0.0773540 + 0.0427652i
\(897\) −411.946 42.8300i −0.459249 0.0477481i
\(898\) 757.540 + 202.982i 0.843585 + 0.226038i
\(899\) 521.883 + 301.309i 0.580514 + 0.335160i
\(900\) −35.0448 + 448.633i −0.0389387 + 0.498481i
\(901\) 733.215 423.322i 0.813779 0.469835i
\(902\) −1472.77 1472.77i −1.63279 1.63279i
\(903\) 1109.37 + 835.962i 1.22854 + 0.925761i
\(904\) 58.4423i 0.0646486i
\(905\) 43.5159 + 672.478i 0.0480838 + 0.743070i
\(906\) −1170.18 + 186.684i −1.29159 + 0.206053i
\(907\) −250.037 + 66.9971i −0.275674 + 0.0738667i −0.394007 0.919107i \(-0.628912\pi\)
0.118333 + 0.992974i \(0.462245\pi\)
\(908\) −143.536 38.4604i −0.158080 0.0423573i
\(909\) −901.044 189.410i −0.991247 0.208372i
\(910\) −115.881 + 528.749i −0.127342 + 0.581042i
\(911\) 1741.66i 1.91181i 0.293671 + 0.955906i \(0.405123\pi\)
−0.293671 + 0.955906i \(0.594877\pi\)
\(912\) −6.71545 + 2.99894i −0.00736343 + 0.00328832i
\(913\) −1103.10 + 295.576i −1.20822 + 0.323741i
\(914\) −357.843 + 619.802i −0.391513 + 0.678120i
\(915\) 333.674 + 13.0126i 0.364671 + 0.0142214i
\(916\) 136.234i 0.148727i
\(917\) −327.570 + 1137.58i −0.357219 + 1.24054i
\(918\) 148.368 461.914i 0.161621 0.503174i
\(919\) −354.938 + 204.924i −0.386222 + 0.222985i −0.680522 0.732728i \(-0.738247\pi\)
0.294300 + 0.955713i \(0.404914\pi\)
\(920\) 148.526 99.0637i 0.161441 0.107678i
\(921\) −200.974 + 32.0623i −0.218213 + 0.0348125i
\(922\) −498.115 133.469i −0.540254 0.144761i
\(923\) 32.5460 32.5460i 0.0352611 0.0352611i
\(924\) −649.751 + 507.646i −0.703193 + 0.549401i
\(925\) −45.2666 + 339.477i −0.0489368 + 0.367002i
\(926\) 985.298 568.862i 1.06404 0.614322i
\(927\) 1316.49 71.9571i 1.42016 0.0776236i
\(928\) 43.7043 + 163.107i 0.0470952 + 0.175762i
\(929\) −868.797 + 501.600i −0.935195 + 0.539935i −0.888451 0.458972i \(-0.848218\pi\)
−0.0467445 + 0.998907i \(0.514885\pi\)
\(930\) −94.6350 417.660i −0.101758 0.449097i
\(931\) −26.5477 + 14.0397i −0.0285152 + 0.0150802i
\(932\) 366.545 366.545i 0.393288 0.393288i
\(933\) 1189.48 531.190i 1.27490 0.569336i
\(934\) 40.4966 70.1422i 0.0433583 0.0750987i
\(935\) 1223.05 + 244.335i 1.30807 + 0.261321i
\(936\) −264.563 + 86.6186i −0.282653 + 0.0925413i
\(937\) 103.217 103.217i 0.110157 0.110157i −0.649880 0.760037i \(-0.725181\pi\)
0.760037 + 0.649880i \(0.225181\pi\)
\(938\) 62.7712 + 65.1469i 0.0669202 + 0.0694530i
\(939\) −592.809 + 481.149i −0.631319 + 0.512406i
\(940\) −343.422 + 390.943i −0.365343 + 0.415897i
\(941\) −660.292 + 1143.66i −0.701692 + 1.21537i 0.266180 + 0.963923i \(0.414238\pi\)
−0.967872 + 0.251443i \(0.919095\pi\)
\(942\) −643.995 + 888.478i −0.683646 + 0.943182i
\(943\) −245.113 + 914.774i −0.259929 + 0.970068i
\(944\) 295.883i 0.313435i
\(945\) −819.782 + 470.088i −0.867494 + 0.497448i
\(946\) −1836.49 −1.94132
\(947\) 231.972 + 62.1566i 0.244954 + 0.0656353i 0.379207 0.925312i \(-0.376197\pi\)
−0.134253 + 0.990947i \(0.542863\pi\)
\(948\) −376.197 272.679i −0.396833 0.287636i
\(949\) −225.210 130.025i −0.237313 0.137013i
\(950\) −8.25906 20.0332i −0.00869375 0.0210875i
\(951\) −238.082 293.333i −0.250349 0.308447i
\(952\) 60.5859 + 244.158i 0.0636407 + 0.256469i
\(953\) −715.611 715.611i −0.750904 0.750904i 0.223744 0.974648i \(-0.428172\pi\)
−0.974648 + 0.223744i \(0.928172\pi\)
\(954\) −263.891 806.014i −0.276615 0.844879i
\(955\) −773.898 + 516.173i −0.810364 + 0.540496i
\(956\) 57.4516 + 33.1697i 0.0600958 + 0.0346964i
\(957\) 716.882 + 1605.29i 0.749093 + 1.67742i
\(958\) 149.800 + 149.800i 0.156368 + 0.156368i
\(959\) 903.913 1500.57i 0.942558 1.56472i
\(960\) 64.0041 101.506i 0.0666710 0.105735i
\(961\) −276.727 479.304i −0.287957 0.498756i
\(962\) −204.649 + 54.8355i −0.212733 + 0.0570015i
\(963\) −29.7718 544.690i −0.0309157 0.565618i
\(964\) −284.375 492.553i −0.294995 0.510947i
\(965\) −212.443 627.549i −0.220149 0.650310i
\(966\) 347.618 + 140.445i 0.359853 + 0.145388i
\(967\) 1023.53 + 1023.53i 1.05846 + 1.05846i 0.998182 + 0.0602752i \(0.0191978\pi\)
0.0602752 + 0.998182i \(0.480802\pi\)
\(968\) 193.569 722.408i 0.199968 0.746289i
\(969\) 3.68048 + 23.0700i 0.00379822 + 0.0238081i
\(970\) 769.722 513.388i 0.793528 0.529266i
\(971\) −634.234 1098.53i −0.653177 1.13134i −0.982348 0.187065i \(-0.940103\pi\)
0.329171 0.944270i \(-0.393231\pi\)
\(972\) −422.245 240.635i −0.434408 0.247567i
\(973\) 1115.13 + 1157.34i 1.14607 + 1.18945i
\(974\) −153.977 −0.158088
\(975\) −232.523 786.540i −0.238485 0.806708i
\(976\) −77.1174 44.5237i −0.0790137 0.0456186i
\(977\) −373.308 1393.20i −0.382096 1.42600i −0.842694 0.538392i \(-0.819032\pi\)
0.460599 0.887609i \(-0.347635\pi\)
\(978\) −32.9425 73.7672i −0.0336835 0.0754266i
\(979\) 32.4122 0.0331075
\(980\) 233.248 430.924i 0.238008 0.439718i
\(981\) −53.1370 + 252.778i −0.0541662 + 0.257674i
\(982\) −57.1661 + 213.347i −0.0582139 + 0.217257i
\(983\) 409.434 + 1528.03i 0.416514 + 1.55445i 0.781783 + 0.623551i \(0.214311\pi\)
−0.365268 + 0.930902i \(0.619023\pi\)
\(984\) 100.284 + 628.605i 0.101915 + 0.638826i
\(985\) 901.722 1026.50i 0.915454 1.04213i
\(986\) 536.379 0.543995
\(987\) −1084.61 133.168i −1.09890 0.134922i
\(988\) 9.47872 9.47872i 0.00959384 0.00959384i
\(989\) 417.521 + 723.167i 0.422165 + 0.731211i
\(990\) 491.562 1148.62i 0.496527 1.16022i
\(991\) −280.787 + 486.337i −0.283337 + 0.490754i −0.972204 0.234133i \(-0.924775\pi\)
0.688868 + 0.724887i \(0.258108\pi\)
\(992\) −29.5570 + 110.308i −0.0297953 + 0.111198i
\(993\) 91.6053 881.075i 0.0922511 0.887286i
\(994\) −36.4636 + 20.1589i −0.0366837 + 0.0202806i
\(995\) −288.583 + 583.965i −0.290033 + 0.586900i
\(996\) 325.984 + 124.714i 0.327293 + 0.125215i
\(997\) −128.077 477.989i −0.128462 0.479428i 0.871477 0.490436i \(-0.163162\pi\)
−0.999939 + 0.0110085i \(0.996496\pi\)
\(998\) −949.366 + 254.382i −0.951269 + 0.254892i
\(999\) −310.884 200.406i −0.311195 0.200606i
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 210.3.w.a.17.13 64
3.2 odd 2 210.3.w.b.17.10 yes 64
5.3 odd 4 210.3.w.b.143.4 yes 64
7.5 odd 6 inner 210.3.w.a.47.15 yes 64
15.8 even 4 inner 210.3.w.a.143.15 yes 64
21.5 even 6 210.3.w.b.47.4 yes 64
35.33 even 12 210.3.w.b.173.10 yes 64
105.68 odd 12 inner 210.3.w.a.173.13 yes 64
    
        By twisted newform
Twist Min Dim Char Parity Ord Type
210.3.w.a.17.13 64 1.1 even 1 trivial
210.3.w.a.47.15 yes 64 7.5 odd 6 inner
210.3.w.a.143.15 yes 64 15.8 even 4 inner
210.3.w.a.173.13 yes 64 105.68 odd 12 inner
210.3.w.b.17.10 yes 64 3.2 odd 2
210.3.w.b.47.4 yes 64 21.5 even 6
210.3.w.b.143.4 yes 64 5.3 odd 4
210.3.w.b.173.10 yes 64 35.33 even 12