LMFDB - Embedded newform 242.4.c.q.81.1

Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms

[N,k,chi] = [242,4,Mod(3,242)]

mf = mfinit([N,k,chi],0)

lf = mfeigenbasis(mf)

from sage.modular.dirichlet import DirichletCharacter

H = DirichletGroup(242, base_ring=CyclotomicField(10))

chi = DirichletCharacter(H, H._module([8]))

N = Newforms(chi, 4, names="a")

//Please install CHIMP (https://github.com/edgarcosta/CHIMP) if you want to run this code

chi := DirichletCharacter("242.3");

S:= CuspForms(chi, 4);

N := Newforms(S);

Level:	$ N $	$=$	$ 242 = 2 \cdot 11^{2} $
Weight:	$ k $	$=$	$ 4 $
Character orbit:	$[\chi]$	$=$	242.c (of order $5$, degree $4$, not minimal)

Newform invariants

comment: select newform

sage: f = N[0] # Warning: the index may be different

gp: f = lf[1] \\ Warning: the index may be different

Self dual:	no
Analytic conductor:	$14.2784622214$
Analytic rank:	$0$
Dimension:	$8$
Relative dimension:	$2$ over $\Q(\zeta_{5})$
Coefficient field:	$\mathbb{Q}[x]/(x^{8} - \cdots)$
comment: defining polynomial gp: f.mod \\ as an extension of the character field
Defining polynomial:	$ x^{8} - x^{7} + 71x^{6} - 141x^{5} + 2911x^{4} + 2710x^{3} + 75340x^{2} + 169400x + 5856400 $ x^8 - x^7 + 71x^6 - 141x^5 + 2911x^4 + 2710x^3 + 75340x^2 + 169400x + 5856400
Coefficient ring:	$\Z[a_1, a_2, a_3]$
Coefficient ring index:	$ 1 $
Twist minimal:	no (minimal twist has level 22)
Sato-Tate group:	$\mathrm{SU}(2)[C_{5}]$

Embedding invariants

Embedding label			81.1
Root			$-4.79501 - 3.48378i$ of defining polynomial
Character	$\chi$	$=$	242.81
Dual form			242.4.c.q.3.1

$q$-expansion

comment: q-expansion

sage: f.q_expansion() # note that sage often uses an isomorphic number field

gp: mfcoefs(f, 20)

$f(q)$	$=$	$q+(-1.61803 - 1.17557i) q^{2} +(-1.33153 + 4.09803i) q^{3} +(1.23607 + 3.80423i) q^{4} +(6.52241 - 4.73881i) q^{5} +(6.97198 - 5.06544i) q^{6} +(8.05890 + 24.8027i) q^{7} +(2.47214 - 7.60845i) q^{8} +(6.82261 + 4.95692i) q^{9} +O(q^{10})$	\(q+(-1.61803 - 1.17557i) q^{2} +(-1.33153 + 4.09803i) q^{3} +(1.23607 + 3.80423i) q^{4} +(6.52241 - 4.73881i) q^{5} +(6.97198 - 5.06544i) q^{6} +(8.05890 + 24.8027i) q^{7} +(2.47214 - 7.60845i) q^{8} +(6.82261 + 4.95692i) q^{9} -16.1243 q^{10} -17.2357 q^{12} +(-2.64049 - 1.91843i) q^{13} +(16.1178 - 49.6055i) q^{14} +(10.7350 + 33.0389i) q^{15} +(-12.9443 + 9.40456i) q^{16} +(-16.8855 + 12.2681i) q^{17} +(-5.21201 - 16.0409i) q^{18} +(38.9268 - 119.804i) q^{19} +(26.0897 + 18.9552i) q^{20} -112.373 q^{21} +97.8394 q^{23} +(27.8879 + 20.2618i) q^{24} +(-18.5416 + 57.0651i) q^{25} +(2.01715 + 6.20815i) q^{26} +(-123.520 + 89.7424i) q^{27} +(-84.3939 + 61.3158i) q^{28} +(81.5293 + 250.921i) q^{29} +(21.4700 - 66.0778i) q^{30} +(-161.288 - 117.183i) q^{31} +32.0000 q^{32} +41.7433 q^{34} +(170.099 + 123.584i) q^{35} +(-10.4240 + 32.0819i) q^{36} +(112.990 + 347.748i) q^{37} +(-203.823 + 148.086i) q^{38} +(11.3776 - 8.26634i) q^{39} +(-19.9307 - 61.3405i) q^{40} +(-84.5880 + 260.335i) q^{41} +(181.823 + 132.102i) q^{42} -388.059 q^{43} +67.9898 q^{45} +(-158.307 - 115.017i) q^{46} +(-16.0238 + 49.3162i) q^{47} +(-21.3045 - 65.5684i) q^{48} +(-272.737 + 198.155i) q^{49} +(97.0849 - 70.5363i) q^{50} +(-27.7912 - 85.5326i) q^{51} +(4.03430 - 12.4163i) q^{52} +(333.739 + 242.476i) q^{53} +305.358 q^{54} +208.633 q^{56} +(439.129 + 319.046i) q^{57} +(163.059 - 501.843i) q^{58} +(8.12202 + 24.9970i) q^{59} +(-112.418 + 81.6766i) q^{60} +(132.799 - 96.4844i) q^{61} +(123.213 + 379.212i) q^{62} +(-67.9624 + 209.167i) q^{63} +(-51.7771 - 37.6183i) q^{64} -26.3134 q^{65} +276.961 q^{67} +(-67.5421 - 49.0722i) q^{68} +(-130.276 + 400.948i) q^{69} +(-129.944 - 399.927i) q^{70} +(418.205 - 303.844i) q^{71} +(54.5809 - 39.6554i) q^{72} +(74.6476 + 229.742i) q^{73} +(225.980 - 695.495i) q^{74} +(-209.166 - 151.968i) q^{75} +503.879 q^{76} -28.1271 q^{78} +(-220.959 - 160.536i) q^{79} +(-39.8615 + 122.681i) q^{80} +(-132.934 - 409.129i) q^{81} +(442.908 - 321.792i) q^{82} +(58.7298 - 42.6697i) q^{83} +(-138.901 - 427.492i) q^{84} +(-51.9984 + 160.035i) q^{85} +(627.893 + 456.191i) q^{86} -1136.84 q^{87} -1194.73 q^{89} +(-110.010 - 79.9268i) q^{90} +(26.3028 - 80.9517i) q^{91} +(120.936 + 372.203i) q^{92} +(694.979 - 504.932i) q^{93} +(83.9018 - 60.9582i) q^{94} +(-313.833 - 965.880i) q^{95} +(-42.6089 + 131.137i) q^{96} +(-1184.10 - 860.299i) q^{97} +674.244 q^{98} +O(q^{100})\)
$\operatorname{Tr}(f)(q)$	$=$	$ 8 q - 4 q^{2} + 3 q^{3} - 8 q^{4} + 5 q^{5} - 14 q^{6} + q^{7} - 16 q^{8} - 21 q^{9}+O(q^{10}) $ 8 * q - 4 * q^2 + 3 * q^3 - 8 * q^4 + 5 * q^5 - 14 * q^6 + q^7 - 16 * q^8 - 21 * q^9	\( 8 q - 4 q^{2} + 3 q^{3} - 8 q^{4} + 5 q^{5} - 14 q^{6} + q^{7} - 16 q^{8} - 21 q^{9} + 100 q^{10} + 32 q^{12} - 7 q^{13} + 2 q^{14} + 211 q^{15} - 32 q^{16} - 161 q^{17} - 162 q^{18} + 272 q^{19} + 20 q^{20} + 50 q^{21} + 628 q^{23} - 56 q^{24} - 17 q^{25} + 96 q^{26} - 528 q^{27} - 16 q^{28} - 33 q^{29} + 422 q^{30} + 323 q^{31} + 256 q^{32} + 208 q^{34} + 697 q^{35} - 324 q^{36} + 49 q^{37} - 576 q^{38} - 391 q^{39} - 240 q^{40} - 361 q^{41} + 1430 q^{42} - 1442 q^{43} + 2652 q^{45} + 416 q^{46} - 1069 q^{47} + 48 q^{48} - 709 q^{49} + 76 q^{50} + 1332 q^{51} + 192 q^{52} - 281 q^{53} + 1144 q^{54} + 48 q^{56} + 438 q^{57} - 66 q^{58} - 128 q^{59} - 1116 q^{60} + 617 q^{61} - 1044 q^{62} - 694 q^{63} - 128 q^{64} + 138 q^{65} + 578 q^{67} - 644 q^{68} - 310 q^{69} + 34 q^{70} + 115 q^{71} - 168 q^{72} + 1487 q^{73} + 98 q^{74} - 1852 q^{75} + 128 q^{76} - 4152 q^{78} - 71 q^{79} - 480 q^{80} + 1630 q^{81} + 658 q^{82} - 1942 q^{83} - 2960 q^{84} + 329 q^{85} + 2426 q^{86} - 2122 q^{87} - 2202 q^{89} - 1286 q^{90} + 4523 q^{91} - 2088 q^{92} + 6019 q^{93} + 1332 q^{94} + 793 q^{95} + 96 q^{96} - 5128 q^{97} + 3292 q^{98}+O(q^{100}) \) 8 * q - 4 * q^2 + 3 * q^3 - 8 * q^4 + 5 * q^5 - 14 * q^6 + q^7 - 16 * q^8 - 21 * q^9 + 100 * q^10 + 32 * q^12 - 7 * q^13 + 2 * q^14 + 211 * q^15 - 32 * q^16 - 161 * q^17 - 162 * q^18 + 272 * q^19 + 20 * q^20 + 50 * q^21 + 628 * q^23 - 56 * q^24 - 17 * q^25 + 96 * q^26 - 528 * q^27 - 16 * q^28 - 33 * q^29 + 422 * q^30 + 323 * q^31 + 256 * q^32 + 208 * q^34 + 697 * q^35 - 324 * q^36 + 49 * q^37 - 576 * q^38 - 391 * q^39 - 240 * q^40 - 361 * q^41 + 1430 * q^42 - 1442 * q^43 + 2652 * q^45 + 416 * q^46 - 1069 * q^47 + 48 * q^48 - 709 * q^49 + 76 * q^50 + 1332 * q^51 + 192 * q^52 - 281 * q^53 + 1144 * q^54 + 48 * q^56 + 438 * q^57 - 66 * q^58 - 128 * q^59 - 1116 * q^60 + 617 * q^61 - 1044 * q^62 - 694 * q^63 - 128 * q^64 + 138 * q^65 + 578 * q^67 - 644 * q^68 - 310 * q^69 + 34 * q^70 + 115 * q^71 - 168 * q^72 + 1487 * q^73 + 98 * q^74 - 1852 * q^75 + 128 * q^76 - 4152 * q^78 - 71 * q^79 - 480 * q^80 + 1630 * q^81 + 658 * q^82 - 1942 * q^83 - 2960 * q^84 + 329 * q^85 + 2426 * q^86 - 2122 * q^87 - 2202 * q^89 - 1286 * q^90 + 4523 * q^91 - 2088 * q^92 + 6019 * q^93 + 1332 * q^94 + 793 * q^95 + 96 * q^96 - 5128 * q^97 + 3292 * q^98

Display 100 coefficients 10 coefficients

Character values

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

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

Coefficient data

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

Display $a_p$ with $p$ up to: 50 250 1000 (See $a_n$ instead) (See $a_n$ instead) (See $a_n$ instead) Display $a_n$ with $n$ up to: 50 250 1000 (See only $a_p$) (See only $a_p$) (See only $a_p$)

$n$	$a_n$			$a_n / n^{(k-1)/2}$			$ \alpha_n $			$ \theta_n $
$p$	$a_p$			$a_p / p^{(k-1)/2}$			$ \alpha_p$			$ \theta_p $

$2$	−1.61803	−	1.17557i	−0.572061	−	0.415627i
$2$	−1.61803	−	1.17557i	−0.572061	−	0.415627i
$3$	−1.33153	+	4.09803i	−0.256253	+	0.788665i	0.737327	+	0.675536i	$0.236088\pi$
$3$	−1.33153	+	4.09803i	−0.256253	+	0.788665i	−0.993580	+	0.113130i	$0.963912\pi$
$4$	1.23607	+	3.80423i	0.154508	+	0.475528i
$5$	6.52241	−	4.73881i	0.583382	−	0.423852i	−0.256559	−	0.966528i	$-0.582589\pi$
$5$	6.52241	−	4.73881i	0.583382	−	0.423852i	0.839942	+	0.542676i	$0.182589\pi$
$6$	6.97198	−	5.06544i	0.474383	−	0.344659i
$7$	8.05890	+	24.8027i	0.435140	+	1.33922i	0.892943	+	0.450169i	$0.148636\pi$
$7$	8.05890	+	24.8027i	0.435140	+	1.33922i	−0.457804	+	0.889053i	$0.651364\pi$
$8$	2.47214	−	7.60845i	0.109254	−	0.336249i
$9$	6.82261	+	4.95692i	0.252689	+	0.183590i
$10$	−16.1243			−0.509895
$11$		0			0
$11$		0			0
$12$	−17.2357			−0.414626
$13$	−2.64049	−	1.91843i	−0.0563338	−	0.0409289i	0.559262	−	0.828991i	$-0.311085\pi$
$13$	−2.64049	−	1.91843i	−0.0563338	−	0.0409289i	−0.615596	+	0.788062i	$0.711085\pi$
$14$	16.1178	−	49.6055i	0.307690	−	0.946973i
$15$	10.7350	+	33.0389i	0.184784	+	0.568707i
$16$	−12.9443	+	9.40456i	−0.202254	+	0.146946i
$17$	−16.8855	+	12.2681i	−0.240902	+	0.175026i	−0.701685	−	0.712487i	$-0.747569\pi$
$17$	−16.8855	+	12.2681i	−0.240902	+	0.175026i	0.460783	+	0.887513i	$0.347569\pi$
$18$	−5.21201	−	16.0409i	−0.0682491	−	0.210049i
$19$	38.9268	−	119.804i	0.470022	−	1.44658i	−0.382534	−	0.923942i	$-0.624948\pi$
$19$	38.9268	−	119.804i	0.470022	−	1.44658i	0.852555	−	0.522637i	$-0.175052\pi$
$20$	26.0897	+	18.9552i	0.291691	+	0.211926i
$21$	−112.373			−1.16770
$22$		0			0
$23$	97.8394			0.886997			0.443498	−	0.896275i	$-0.353737\pi$
$23$	97.8394			0.886997			0.443498	+	0.896275i	$0.353737\pi$
$24$	27.8879	+	20.2618i	0.237192	+	0.172330i
$25$	−18.5416	+	57.0651i	−0.148333	+	0.456521i
$26$	2.01715	+	6.20815i	0.0152152	+	0.0468277i
$27$	−123.520	+	89.7424i	−0.880422	+	0.639664i
$28$	−84.3939	+	61.3158i	−0.569605	+	0.413842i
$29$	81.5293	+	250.921i	0.522055	+	1.60672i	0.770066	+	0.637964i	$0.220223\pi$
$29$	81.5293	+	250.921i	0.522055	+	1.60672i	−0.248011	+	0.968757i	$0.579777\pi$
$30$	21.4700	−	66.0778i	0.130662	−	0.402137i
$31$	−161.288	−	117.183i	−0.934460	−	0.678925i	0.0126205	−	0.999920i	$-0.495983\pi$
$31$	−161.288	−	117.183i	−0.934460	−	0.678925i	−0.947081	+	0.320995i	$0.895983\pi$
$32$	32.0000			0.176777
$33$		0			0
$34$	41.7433			0.210557
$35$	170.099	+	123.584i	0.821485	+	0.596844i
$36$	−10.4240	+	32.0819i	−0.0482594	+	0.148527i
$37$	112.990	+	347.748i	0.502039	+	1.54512i	0.805692	+	0.592335i	$0.201794\pi$
$37$	112.990	+	347.748i	0.502039	+	1.54512i	−0.303653	+	0.952783i	$0.598206\pi$
$38$	−203.823	+	148.086i	−0.870118	+	0.632178i
$39$	11.3776	−	8.26634i	0.0467149	−	0.0339404i
$40$	−19.9307	−	61.3405i	−0.0787831	−	0.242469i
$41$	−84.5880	+	260.335i	−0.322205	+	0.991646i	0.650481	+	0.759523i	$0.274567\pi$
$41$	−84.5880	+	260.335i	−0.322205	+	0.991646i	−0.972686	+	0.232124i	$0.925433\pi$
$42$	181.823	+	132.102i	0.667999	+	0.485329i
$43$	−388.059			−1.37624			−0.688121	−	0.725596i	$-0.741564\pi$
$43$	−388.059			−1.37624			−0.688121	+	0.725596i	$0.741564\pi$
$44$		0			0
$45$	67.9898			0.225229
$46$	−158.307	−	115.017i	−0.507417	−	0.368660i
$47$	−16.0238	+	49.3162i	−0.0497301	+	0.153053i	−0.972838	−	0.231488i	$-0.925641\pi$
$47$	−16.0238	+	49.3162i	−0.0497301	+	0.153053i	0.923108	+	0.384542i	$0.125641\pi$
$48$	−21.3045	−	65.5684i	−0.0640632	−	0.197166i
$49$	−272.737	+	198.155i	−0.795153	+	0.577712i
$50$	97.0849	−	70.5363i	0.274598	−	0.199507i
$51$	−27.7912	−	85.5326i	−0.0763049	−	0.234842i
$52$	4.03430	−	12.4163i	0.0107588	−	0.0331122i
$53$	333.739	+	242.476i	0.864955	+	0.628427i	0.929228	−	0.369506i	$-0.120473\pi$
$53$	333.739	+	242.476i	0.864955	+	0.628427i	−0.0642735	+	0.997932i	$0.520473\pi$
$54$	305.358			0.769517
$55$		0			0
$56$	208.633			0.497853
$57$	439.129	+	319.046i	1.02042	+	0.741380i
$58$	163.059	−	501.843i	0.369149	−	1.13612i
$59$	8.12202	+	24.9970i	0.0179220	+	0.0551582i	0.959618	−	0.281308i	$-0.0907682\pi$
$59$	8.12202	+	24.9970i	0.0179220	+	0.0551582i	−0.941696	+	0.336466i	$0.890768\pi$
$60$	−112.418	+	81.6766i	−0.241886	+	0.175740i
$61$	132.799	−	96.4844i	0.278741	−	0.202517i	−0.439627	−	0.898180i	$-0.644889\pi$
$61$	132.799	−	96.4844i	0.278741	−	0.202517i	0.718368	+	0.695663i	$0.244889\pi$
$62$	123.213	+	379.212i	0.252389	+	0.776774i
$63$	−67.9624	+	209.167i	−0.135912	+	0.418294i
$64$	−51.7771	−	37.6183i	−0.101127	−	0.0734732i
$65$	−26.3134			−0.0502119
$66$		0			0
$67$	276.961			0.505017			0.252508	−	0.967595i	$-0.418744\pi$
$67$	276.961			0.505017			0.252508	+	0.967595i	$0.418744\pi$
$68$	−67.5421	−	49.0722i	−0.120451	−	0.0875130i
$69$	−130.276	+	400.948i	−0.227296	+	0.699544i
$70$	−129.944	−	399.927i	−0.221876	−	0.682863i
$71$	418.205	−	303.844i	0.699039	−	0.507882i	−0.180580	−	0.983560i	$-0.557797\pi$
$71$	418.205	−	303.844i	0.699039	−	0.507882i	0.879619	+	0.475679i	$0.157797\pi$
$72$	54.5809	−	39.6554i	0.0893392	−	0.0649087i
$73$	74.6476	+	229.742i	0.119683	+	0.368346i	0.992895	−	0.118995i	$-0.0379671\pi$
$73$	74.6476	+	229.742i	0.119683	+	0.368346i	−0.873212	+	0.487340i	$0.837967\pi$
$74$	225.980	−	695.495i	0.354995	−	1.09256i
$75$	−209.166	−	151.968i	−0.322031	−	0.233969i
$76$	503.879			0.760511
$77$		0			0
$78$	−28.1271			−0.0408303
$79$	−220.959	−	160.536i	−0.314681	−	0.228629i	0.419222	−	0.907884i	$-0.362303\pi$
$79$	−220.959	−	160.536i	−0.314681	−	0.228629i	−0.733902	+	0.679255i	$0.762303\pi$
$80$	−39.8615	+	122.681i	−0.0557081	+	0.171452i
$81$	−132.934	−	409.129i	−0.182351	−	0.561220i
$82$	442.908	−	321.792i	0.596476	−	0.433365i
$83$	58.7298	−	42.6697i	0.0776678	−	0.0564290i	−0.548274	−	0.836299i	$-0.684715\pi$
$83$	58.7298	−	42.6697i	0.0776678	−	0.0564290i	0.625942	+	0.779870i	$0.284715\pi$
$84$	−138.901	−	427.492i	−0.180420	−	0.555276i
$85$	−51.9984	+	160.035i	−0.0663532	+	0.204214i
$86$	627.893	+	456.191i	0.787295	+	0.572004i
$87$	−1136.84			−1.40094
$88$		0			0
$89$	−1194.73			−1.42294			−0.711470	−	0.702717i	$-0.751970\pi$
$89$	−1194.73			−1.42294			−0.711470	+	0.702717i	$0.751970\pi$
$90$	−110.010	−	79.9268i	−0.128845	−	0.0936114i
$91$	26.3028	−	80.9517i	0.0302998	−	0.0932532i
$92$	120.936	+	372.203i	0.137049	+	0.421792i
$93$	694.979	−	504.932i	0.774903	−	0.563000i
$94$	83.9018	−	60.9582i	0.0920618	−	0.0668868i
$95$	−313.833	−	965.880i	−0.338933	−	1.04313i
$96$	−42.6089	+	131.137i	−0.0452995	+	0.139418i
$97$	−1184.10	−	860.299i	−1.23946	−	0.900517i	−0.241893	−	0.970303i	$-0.577768\pi$
$97$	−1184.10	−	860.299i	−1.23946	−	0.900517i	−0.997562	+	0.0697858i	$0.977768\pi$
$98$	674.244			0.694989
$99$		0			0
$100$	−240.007			−0.240007
$101$	−728.191	−	529.062i	−0.717403	−	0.521224i	0.168151	−	0.985761i	$-0.446221\pi$
$101$	−728.191	−	529.062i	−0.717403	−	0.521224i	−0.885553	+	0.464538i	$0.846221\pi$
$102$	−55.5825	+	171.065i	−0.0539557	+	0.166059i
$103$	−128.899	−	396.710i	−0.123309	−	0.379505i	0.870281	−	0.492556i	$-0.163937\pi$
$103$	−128.899	−	396.710i	−0.123309	−	0.379505i	−0.993589	+	0.113052i	$0.963937\pi$
$104$	−21.1239	+	15.3474i	−0.0199170	+	0.0144705i
$105$	−732.943	+	532.514i	−0.681218	+	0.494934i
$106$	−254.954	−	784.668i	−0.233616	−	0.718997i
$107$	−333.858	+	1027.51i	−0.301638	+	0.928346i	0.679273	+	0.733886i	$0.262295\pi$
$107$	−333.858	+	1027.51i	−0.301638	+	0.928346i	−0.980911	+	0.194460i	$0.937705\pi$
$108$	−494.079	−	358.970i	−0.440211	−	0.319832i
$109$	1472.08			1.29358			0.646789	−	0.762669i	$-0.276112\pi$
$109$	1472.08			1.29358			0.646789	+	0.762669i	$0.276112\pi$
$110$		0			0
$111$	−1575.53			−1.34723
$112$	−337.576	−	245.263i	−0.284803	−	0.206921i
$113$	−39.0846	+	120.290i	−0.0325378	+	0.100141i	−0.966006	−	0.258518i	$-0.916766\pi$
$113$	−39.0846	+	120.290i	−0.0325378	+	0.100141i	0.933469	+	0.358659i	$0.116766\pi$
$114$	−335.465	−	1032.45i	−0.275607	−	0.848230i
$115$	638.149	−	463.643i	0.517458	−	0.375956i
$116$	−853.786	+	620.312i	−0.683379	+	0.496504i
$117$	−8.50554	−	26.1774i	−0.00672083	−	0.0206846i
$118$	16.2440	−	49.9940i	0.0126727	−	0.0390027i
$119$	−440.360	−	319.940i	−0.339225	−	0.246461i
$120$	277.913			0.211416
$121$		0			0
$122$	−328.298			−0.243629
$123$	−954.228	−	693.287i	−0.699511	−	0.508224i
$124$	246.427	−	758.424i	0.178466	−	0.549262i
$125$	460.902	+	1418.51i	0.329795	+	1.01500i
$126$	355.856	−	258.544i	0.251605	−	0.182801i
$127$	860.426	−	625.136i	0.601185	−	0.436786i	−0.245115	−	0.969494i	$-0.578826\pi$
$127$	860.426	−	625.136i	0.601185	−	0.436786i	0.846299	+	0.532708i	$0.178826\pi$
$128$	39.5542	+	121.735i	0.0273135	+	0.0840623i
$129$	516.712	−	1590.28i	0.352666	−	1.08539i
$130$	42.5760	+	30.9333i	0.0287243	+	0.0208694i
$131$	1525.04			1.01713			0.508563	−	0.861025i	$-0.330177\pi$
$131$	1525.04			1.01713			0.508563	+	0.861025i	$0.330177\pi$
$132$		0			0
$133$	3285.18			2.14182
$134$	−448.132	−	325.587i	−0.288901	−	0.209899i
$135$	−380.375	+	1170.67i	−0.242500	+	0.746338i
$136$	51.5976	+	158.801i	0.0325328	+	0.100126i
$137$	1681.81	−	1221.91i	1.04881	−	0.762004i	0.0768227	−	0.997045i	$-0.475522\pi$
$137$	1681.81	−	1221.91i	1.04881	−	0.762004i	0.971985	+	0.235041i	$0.0755225\pi$
$138$	682.134	−	495.600i	0.420776	−	0.305712i
$139$	−465.826	−	1433.67i	−0.284251	−	0.874834i	−0.986622	−	0.163023i	$-0.947875\pi$
$139$	−465.826	−	1433.67i	−0.284251	−	0.874834i	0.702371	−	0.711811i	$-0.252125\pi$
$140$	−259.888	+	799.854i	−0.156890	+	0.482857i
$141$	−180.763	−	131.332i	−0.107964	−	0.0784408i
$142$	−1033.86			−0.610983
$143$		0			0
$144$	−134.931			−0.0780853
$145$	1720.84	+	1250.26i	0.985570	+	0.716059i
$146$	149.295	−	459.484i	0.0846285	−	0.260460i
$147$	−448.888	−	1381.53i	−0.251862	−	0.775150i
$148$	−1183.25	+	859.679i	−0.657178	+	0.477468i
$149$	−347.754	+	252.658i	−0.191202	+	0.138916i	−0.679268	−	0.733890i	$-0.737703\pi$
$149$	−347.754	+	252.658i	−0.191202	+	0.138916i	0.488066	+	0.872807i	$0.337703\pi$
$150$	159.788	+	491.778i	0.0869777	+	0.267690i
$151$	−275.545	+	848.040i	−0.148500	+	0.457036i	−0.997444	−	0.0714459i	$-0.977239\pi$
$151$	−275.545	+	848.040i	−0.148500	+	0.457036i	0.848944	+	0.528482i	$0.177239\pi$
$152$	−815.293	−	592.345i	−0.435059	−	0.316089i
$153$	−176.015			−0.0930064
$154$		0			0
$155$	−1607.30			−0.832912
$156$	45.5106	+	33.0654i	0.0233574	+	0.0169702i
$157$	167.188	−	514.551i	0.0849875	−	0.261565i	−0.899528	−	0.436864i	$-0.856089\pi$
$157$	167.188	−	514.551i	0.0849875	−	0.261565i	0.984515	+	0.175299i	$0.0560892\pi$
$158$	168.797	+	519.505i	0.0849924	+	0.261580i
$159$	−1438.06	+	1044.81i	−0.717266	+	0.521124i
$160$	208.717	−	151.642i	0.103128	−	0.0749272i
$161$	788.478	+	2426.69i	0.385968	+	1.18789i
$162$	−265.868	+	818.259i	−0.128942	+	0.396842i
$163$	2368.47	+	1720.80i	1.13812	+	0.826891i	0.986856	−	0.161603i	$-0.0516665\pi$
$163$	2368.47	+	1720.80i	1.13812	+	0.826891i	0.151261	+	0.988494i	$0.451666\pi$
$164$	−1094.93			−0.521339
$165$		0			0
$166$	−145.188			−0.0678842
$167$	1407.88	+	1022.88i	0.652364	+	0.473970i	0.864076	−	0.503362i	$-0.167904\pi$
$167$	1407.88	+	1022.88i	0.652364	+	0.473970i	−0.211712	+	0.977332i	$0.567904\pi$
$168$	−277.801	+	854.984i	−0.127576	+	0.392640i
$169$	−675.619	−	2079.34i	−0.307519	−	0.946445i
$170$	272.267	−	197.814i	0.122835	−	0.0892448i
$171$	859.443	−	624.422i	0.384346	−	0.279244i
$172$	−479.667	−	1476.26i	−0.212641	−	0.654442i
$173$	89.8625	−	276.568i	0.0394920	−	0.121544i	−0.929367	−	0.369157i	$-0.879646\pi$
$173$	89.8625	−	276.568i	0.0394920	−	0.121544i	0.968859	+	0.247613i	$0.0796463\pi$
$174$	1839.45	+	1336.44i	0.801426	+	0.582270i
$175$	−1564.80			−0.675928
$176$		0			0
$177$	−113.253			−0.0480939
$178$	1933.12	+	1404.49i	0.814009	+	0.591412i
$179$	803.545	−	2473.06i	0.335529	−	1.03265i	−0.630932	−	0.775839i	$-0.717327\pi$
$179$	803.545	−	2473.06i	0.335529	−	1.03265i	0.966461	−	0.256814i	$-0.0826729\pi$
$180$	84.0400	+	258.649i	0.0347999	+	0.107103i
$181$	−1501.40	+	1090.83i	−0.616563	+	0.447959i	−0.851719	−	0.523998i	$-0.824440\pi$
$181$	−1501.40	+	1090.83i	−0.616563	+	0.447959i	0.235156	+	0.971958i	$0.424440\pi$
$182$	−137.723	+	100.062i	−0.0560919	+	0.0407532i
$183$	218.569	+	672.687i	0.0882902	+	0.271729i
$184$	241.872	−	744.406i	0.0969080	−	0.298252i
$185$	2384.88	+	1732.72i	0.947782	+	0.688604i
$186$	−1718.08			−0.677290
$187$		0			0
$188$	−207.417			−0.0804649
$189$	−3221.29	−	2340.41i	−1.23976	−	0.900738i
$190$	−627.667	+	1931.76i	−0.239662	+	0.737603i
$191$	473.462	+	1457.17i	0.179364	+	0.552026i	0.999806	−	0.0197044i	$-0.00627251\pi$
$191$	473.462	+	1457.17i	0.179364	+	0.552026i	−0.820442	+	0.571730i	$0.806273\pi$
$192$	223.103	−	162.094i	0.0838599	−	0.0609278i
$193$	850.742	−	618.100i	0.317294	−	0.230528i	−0.417726	−	0.908573i	$-0.637173\pi$
$193$	850.742	−	618.100i	0.317294	−	0.230528i	0.735020	+	0.678045i	$0.237173\pi$
$194$	904.572	+	2783.99i	0.334765	+	1.03030i
$195$	35.0371	−	107.833i	0.0128670	−	0.0396004i
$196$	−1090.95	−	792.622i	−0.397577	−	0.288856i
$197$	1577.77			0.570616			0.285308	−	0.958436i	$-0.407904\pi$
$197$	1577.77			0.570616			0.285308	+	0.958436i	$0.407904\pi$
$198$		0			0
$199$	3760.53			1.33958			0.669791	−	0.742550i	$-0.266384\pi$
$199$	3760.53			1.33958			0.669791	+	0.742550i	$0.266384\pi$
$200$	388.340	+	282.145i	0.137299	+	0.0997534i
$201$	−368.781	+	1134.99i	−0.129412	+	0.398289i
$202$	556.288	+	1712.08i	0.193764	+	0.596344i
$203$	−5566.50	+	4044.30i	−1.92459	+	1.39830i
$204$	291.034	−	211.448i	0.0998844	−	0.0725703i
$205$	681.961	+	2098.86i	0.232342	+	0.715076i
$206$	−257.798	+	793.420i	−0.0871923	+	0.268350i
$207$	667.521	+	484.982i	0.224135	+	0.162843i
$208$	52.2211			0.0174081
$209$		0			0
$210$	1811.93			0.595407
$211$	1149.27	+	834.996i	0.374973	+	0.272434i	0.759270	−	0.650776i	$-0.225556\pi$
$211$	1149.27	+	834.996i	0.374973	+	0.272434i	−0.384297	+	0.923209i	$0.625556\pi$
$212$	−509.908	+	1569.34i	−0.165192	+	0.508408i
$213$	688.307	+	2118.39i	0.221418	+	0.681454i
$214$	1748.10	−	1270.07i	0.558401	−	0.405702i
$215$	−2531.08	+	1838.94i	−0.802876	+	0.583323i
$216$	377.443	+	1161.65i	0.118897	+	0.365927i
$217$	1606.65	−	4944.76i	0.502611	−	1.54688i
$218$	−2381.88	−	1730.54i	−0.740006	−	0.537645i
$219$	−1040.88			−0.321171
$220$		0			0
$221$	68.1213			0.0207346
$222$	2549.26	+	1852.14i	0.770698	+	0.559945i
$223$	1624.34	−	4999.20i	0.487774	−	1.50121i	−0.340148	−	0.940372i	$-0.610477\pi$
$223$	1624.34	−	4999.20i	0.487774	−	1.50121i	0.827922	−	0.560843i	$-0.189523\pi$
$224$	257.885	+	793.688i	0.0769226	+	0.236743i
$225$	−409.369	+	297.424i	−0.121295	+	0.0881256i
$226$	204.650	−	148.687i	0.0602350	−	0.0437633i
$227$	−861.007	−	2649.91i	−0.251749	−	0.774804i	−0.994453	−	0.105184i	$-0.966457\pi$
$227$	−861.007	−	2649.91i	−0.251749	−	0.774804i	0.742704	−	0.669620i	$-0.233543\pi$
$228$	−670.929	+	2064.91i	−0.194883	+	0.599789i
$229$	−3626.49	−	2634.80i	−1.04649	−	0.760316i	−0.0749442	−	0.997188i	$-0.523878\pi$
$229$	−3626.49	−	2634.80i	−1.04649	−	0.760316i	−0.971541	+	0.236872i	$0.923878\pi$
$230$	−1577.59			−0.452275
$231$		0			0
$232$	2110.67			0.597296
$233$	255.337	+	185.513i	0.0717925	+	0.0521603i	0.623103	−	0.782140i	$-0.285872\pi$
$233$	255.337	+	185.513i	0.0717925	+	0.0521603i	−0.551310	+	0.834300i	$0.685872\pi$
$234$	−17.0111	+	52.3547i	−0.00475234	+	0.0146262i
$235$	129.186	+	397.595i	0.0358604	+	0.110367i
$236$	−85.0549	+	61.7960i	−0.0234602	+	0.0170448i
$237$	952.093	−	691.736i	0.260950	−	0.189591i
$238$	336.405	+	1035.35i	0.0916215	+	0.281982i
$239$	−249.186	+	766.915i	−0.0674414	+	0.207563i	−0.979098	−	0.203390i	$-0.934804\pi$
$239$	−249.186	+	766.915i	−0.0674414	+	0.207563i	0.911656	+	0.410953i	$0.134804\pi$
$240$	−449.673	−	326.707i	−0.120943	−	0.0878701i
$241$	1009.91			0.269935			0.134967	−	0.990850i	$-0.456907\pi$
$241$	1009.91			0.269935			0.134967	+	0.990850i	$0.456907\pi$
$242$		0			0
$243$	−2268.70			−0.598919
$244$	531.197	+	385.937i	0.139371	+	0.101259i
$245$	−839.886	+	2584.90i	−0.219014	+	0.674055i
$246$	728.965	+	2243.52i	0.188931	+	0.581471i
$247$	−332.621	+	241.663i	−0.0856849	+	0.0622537i
$248$	−1290.31	+	937.464i	−0.330382	+	0.240036i
$249$	96.6610	+	297.492i	0.0246010	+	0.0757140i
$250$	921.805	−	2837.02i	0.233200	−	0.717717i
$251$	2578.54	+	1873.42i	0.648429	+	0.471111i	0.862736	−	0.505655i	$-0.168749\pi$
$251$	2578.54	+	1873.42i	0.648429	+	0.471111i	−0.214307	+	0.976766i	$0.568749\pi$
$252$	−879.724			−0.219910
$253$		0			0
$254$	−2127.09			−0.525455
$255$	−586.589	−	426.182i	−0.144053	−	0.104661i
$256$	79.1084	−	243.470i	0.0193136	−	0.0594410i
$257$	785.951	+	2418.91i	0.190764	+	0.587111i	1.00000		0.000372917i	$-0.000118703\pi$
$257$	785.951	+	2418.91i	0.190764	+	0.587111i	−0.809236	+	0.587484i	$0.800119\pi$
$258$	−2705.54	+	1965.69i	−0.652866	+	0.474335i
$259$	−7714.52	+	5604.93i	−1.85080	+	1.34468i
$260$	−32.5252	−	100.102i	−0.00775817	−	0.0238772i
$261$	−687.554	+	2116.07i	−0.163059	+	0.501845i
$262$	−2467.57	−	1792.80i	−0.581859	−	0.422745i
$263$	−2992.29			−0.701568			−0.350784	−	0.936456i	$-0.614085\pi$
$263$	−2992.29			−0.701568			−0.350784	+	0.936456i	$0.614085\pi$
$264$		0			0
$265$	3325.83			0.770960
$266$	−5315.54	−	3861.96i	−1.22525	−	0.890196i
$267$	1590.82	−	4896.05i	0.364632	−	1.12222i
$268$	342.342	+	1053.62i	0.0780294	+	0.240150i
$269$	664.469	−	482.765i	0.150607	−	0.109423i	−0.509930	−	0.860216i	$-0.670329\pi$
$269$	664.469	−	482.765i	0.150607	−	0.109423i	0.660537	+	0.750793i	$0.270329\pi$
$270$	1991.67	−	1447.03i	0.448923	−	0.326162i
$271$	−1989.99	−	6124.55i	−0.446063	−	1.37284i	−0.881313	−	0.472532i	$-0.843340\pi$
$271$	−1989.99	−	6124.55i	−0.446063	−	1.37284i	0.435250	−	0.900310i	$-0.356660\pi$
$272$	103.195	−	317.602i	0.0230041	−	0.0707995i
$273$	296.719	+	215.579i	0.0657812	+	0.0477928i
$274$	−4157.66			−0.916692
$275$		0			0
$276$	−1686.33			−0.367772
$277$	416.212	+	302.395i	0.0902806	+	0.0655927i	0.632010	−	0.774960i	$-0.282230\pi$
$277$	416.212	+	302.395i	0.0902806	+	0.0655927i	−0.541729	+	0.840553i	$0.682230\pi$
$278$	−931.652	+	2867.33i	−0.200996	+	0.618601i
$279$	−519.543	−	1598.99i	−0.111485	−	0.343114i
$280$	1360.79	−	988.673i	0.290439	−	0.211016i
$281$	6276.91	−	4560.44i	1.33256	−	0.968160i	0.332875	−	0.942971i	$-0.391981\pi$
$281$	6276.91	−	4560.44i	1.33256	−	0.968160i	0.999683	−	0.0251891i	$-0.00801879\pi$
$282$	138.091	+	424.999i	0.0291602	+	0.0897459i
$283$	1806.94	−	5561.18i	0.379545	−	1.16812i	−0.560816	−	0.827940i	$-0.689513\pi$
$283$	1806.94	−	5561.18i	0.379545	−	1.16812i	0.940361	−	0.340178i	$-0.110487\pi$
$284$	1672.82	+	1215.37i	0.349520	+	0.253941i
$285$	4376.08			0.909532
$286$		0			0
$287$	−7138.71			−1.46824
$288$	218.324	+	158.621i	0.0446696	+	0.0324544i
$289$	−1383.58	+	4258.24i	−0.281617	+	0.866728i
$290$	−1314.60	−	4045.93i	−0.266193	−	0.819259i
$291$	5102.19	−	3706.96i	1.02782	−	0.746755i
$292$	−781.720	+	567.953i	−0.156667	+	0.113825i
$293$	2495.16	+	7679.30i	0.497504	+	1.53116i	0.813019	+	0.582238i	$0.197823\pi$
$293$	2495.16	+	7679.30i	0.497504	+	1.53116i	−0.315515	+	0.948921i	$0.602177\pi$
$294$	−897.776	+	2763.07i	−0.178093	+	0.548114i
$295$	171.431	+	124.552i	0.0338343	+	0.0245820i
$296$	2925.15			0.574394
$297$		0			0
$298$	859.695			0.167117
$299$	−258.344	−	187.698i	−0.0499679	−	0.0363038i
$300$	319.576	−	983.555i	0.0615025	−	0.189285i
$301$	−3127.33	−	9624.93i	−0.598858	−	1.84309i
$302$	1442.77	−	1048.23i	0.274908	−	0.199732i
$303$	3137.72	−	2279.68i	0.594908	−	0.432226i
$304$	622.828	+	1916.87i	0.117505	+	0.361645i
$305$	408.951	−	1258.62i	0.0767753	−	0.236290i
$306$	284.799	+	206.918i	0.0532054	+	0.0386560i
$307$	4210.64			0.782781			0.391391	−	0.920225i	$-0.371994\pi$
$307$	4210.64			0.782781			0.391391	+	0.920225i	$0.371994\pi$
$308$		0			0
$309$	1797.36			0.330900
$310$	2600.66	+	1889.49i	0.476477	+	0.346181i
$311$	−407.549	+	1254.31i	−0.0743086	+	0.228698i	−0.981311	−	0.192426i	$-0.938364\pi$
$311$	−407.549	+	1254.31i	−0.0743086	+	0.228698i	0.907003	+	0.421124i	$0.138364\pi$
$312$	−34.7670	−	107.002i	−0.00630863	−	0.0194160i
$313$	3402.85	−	2472.31i	0.614505	−	0.446464i	−0.236493	−	0.971633i	$-0.575998\pi$
$313$	3402.85	−	2472.31i	0.614505	−	0.446464i	0.850998	+	0.525169i	$0.175998\pi$
$314$	−875.407	+	636.020i	−0.157331	+	0.114308i
$315$	547.923	+	1686.33i	0.0980063	+	0.301632i
$316$	337.595	−	1039.01i	0.0600987	−	0.184965i
$317$	1992.69	+	1447.77i	0.353062	+	0.256515i	0.750152	−	0.661265i	$-0.229980\pi$
$317$	1992.69	+	1447.77i	0.353062	+	0.256515i	−0.397090	+	0.917779i	$0.629980\pi$
$318$	3555.07			0.626913
$319$		0			0
$320$	−515.977			−0.0901376
$321$	−3766.21	−	2736.32i	−0.654859	−	0.475783i
$322$	1576.96	−	4853.37i	0.272920	−	0.839962i
$323$	812.466	+	2500.51i	0.139959	+	0.430750i
$324$	1392.10	−	1011.42i	0.238701	−	0.173427i
$325$	158.434	−	115.109i	0.0270410	−	0.0196464i
$326$	−1809.35	−	5568.61i	−0.307395	−	0.946064i
$327$	−1960.12	+	6032.63i	−0.331483	+	1.02020i
$328$	1771.63	+	1287.17i	0.298238	+	0.216683i
$329$	−1352.31			−0.226612
$330$		0			0
$331$	−3332.42			−0.553373			−0.276687	−	0.960960i	$-0.589236\pi$
$331$	−3332.42			−0.553373			−0.276687	+	0.960960i	$0.589236\pi$
$332$	234.919	+	170.679i	0.0388339	+	0.0282145i
$333$	−952.869	+	2932.63i	−0.156808	+	0.482604i
$334$	−1075.52	−	3310.12i	−0.176198	−	0.542280i
$335$	1806.45	−	1312.46i	0.294618	−	0.214052i
$336$	1454.59	−	1056.82i	0.236173	−	0.171590i
$337$	−2572.10	−	7916.10i	−0.415760	−	1.27958i	−0.911569	−	0.411146i	$-0.865129\pi$
$337$	−2572.10	−	7916.10i	−0.415760	−	1.27958i	0.495810	−	0.868431i	$-0.334871\pi$
$338$	−1351.24	+	4158.68i	−0.217449	+	0.669238i
$339$	−440.910	−	320.340i	−0.0706399	−	0.0513229i
$340$	−673.082			−0.107362
$341$		0			0
$342$	−2124.66			−0.335931
$343$	124.015	+	90.1024i	0.0195224	+	0.0141839i
$344$	−959.334	+	2952.53i	−0.150360	+	0.462761i
$345$	1050.30	+	3232.51i	0.163903	+	0.504441i
$346$	−470.526	+	341.857i	−0.0731088	+	0.0531167i
$347$	2930.66	−	2129.25i	0.453390	−	0.329407i	−0.337543	−	0.941310i	$-0.609596\pi$
$347$	2930.66	−	2129.25i	0.453390	−	0.329407i	0.790933	+	0.611903i	$0.209596\pi$
$348$	−1405.21	−	4324.80i	−0.216458	−	0.666188i
$349$	−644.814	+	1984.53i	−0.0988999	+	0.304383i	−0.988250	−	0.152843i	$-0.951157\pi$
$349$	−644.814	+	1984.53i	−0.0988999	+	0.304383i	0.889350	+	0.457226i	$0.151157\pi$
$350$	2531.89	+	1839.53i	0.386672	+	0.280934i
$351$	498.316			0.0757782
$352$		0			0
$353$	7582.15			1.14322			0.571611	−	0.820525i	$-0.306319\pi$
$353$	7582.15			1.14322			0.571611	+	0.820525i	$0.306319\pi$
$354$	183.247	+	133.137i	0.0275127	+	0.0199891i
$355$	1287.85	−	3963.59i	0.192540	−	0.592579i
$356$	−1476.77	−	4545.04i	−0.219856	−	0.676648i
$357$	1897.48	−	1378.60i	0.281303	−	0.204378i
$358$	−4207.41	+	3056.87i	−0.621142	+	0.451286i
$359$	−1400.77	−	4311.13i	−0.205933	−	0.633796i	−0.999674	−	0.0255401i	$-0.991869\pi$
$359$	−1400.77	−	4311.13i	−0.205933	−	0.633796i	0.793741	−	0.608256i	$-0.208131\pi$
$360$	168.080	−	517.297i	0.0246072	−	0.0757332i
$361$	−7288.73	−	5295.57i	−1.06265	−	0.772061i
$362$	3711.66			0.538896
$363$		0			0
$364$	340.471			0.0490261
$365$	1575.59	+	1144.73i	0.225945	+	0.164159i
$366$	437.138	−	1345.37i	0.0624306	−	0.192142i
$367$	−894.003	−	2751.46i	−0.127157	−	0.391349i	0.867131	−	0.498080i	$-0.165961\pi$
$367$	−894.003	−	2751.46i	−0.127157	−	0.391349i	−0.994288	+	0.106732i	$0.965961\pi$
$368$	−1266.46	+	920.137i	−0.179399	+	0.130341i
$369$	−1867.57	+	1356.87i	−0.263474	+	0.191425i
$370$	−1821.88	−	5607.18i	−0.255987	−	0.787848i
$371$	−3324.49	+	10231.7i	−0.465227	+	1.43182i
$372$	2779.92	+	2019.73i	0.387451	+	0.281500i
$373$	3389.46			0.470508			0.235254	−	0.971934i	$-0.424408\pi$
$373$	3389.46			0.470508			0.235254	+	0.971934i	$0.424408\pi$
$374$		0			0
$375$	−6426.80			−0.885010
$376$	335.607	+	243.833i	0.0460309	+	0.0334434i
$377$	266.097	−	818.962i	0.0363520	−	0.111880i
$378$	2460.85	+	7573.71i	0.334847	+	1.03055i
$379$	−6523.45	+	4739.57i	−0.884135	+	0.642362i	−0.934342	−	0.356377i	$-0.884012\pi$
$379$	−6523.45	+	4739.57i	−0.884135	+	0.642362i	0.0502069	+	0.998739i	$0.484012\pi$
$380$	3286.51	−	2387.79i	0.443669	−	0.322344i
$381$	1416.14	+	4358.43i	0.190423	+	0.586061i
$382$	946.924	−	2914.33i	0.126829	−	0.390341i
$383$	−4250.99	−	3088.52i	−0.567142	−	0.412053i	0.266924	−	0.963718i	$-0.413993\pi$
$383$	−4250.99	−	3088.52i	−0.567142	−	0.412053i	−0.834066	+	0.551665i	$0.813993\pi$
$384$	−551.542			−0.0732962
$385$		0			0
$386$	−2103.15			−0.277325
$387$	−2647.58	−	1923.58i	−0.347762	−	0.252664i
$388$	1809.14	−	5567.97i	0.236715	−	0.728534i
$389$	−3502.56	−	10779.8i	−0.456521	−	1.40503i	−0.869340	−	0.494214i	$-0.835456\pi$
$389$	−3502.56	−	10779.8i	−0.456521	−	1.40503i	0.412819	−	0.910813i	$-0.364544\pi$
$390$	−183.456	+	133.289i	−0.0238197	+	0.0173060i
$391$	−1652.07	+	1200.30i	−0.213680	+	0.155247i
$392$	833.412	+	2564.98i	0.107382	+	0.330487i
$393$	−2030.64	+	6249.67i	−0.260642	+	0.802173i
$394$	−2552.88	−	1854.78i	−0.326427	−	0.237163i
$395$	−2201.93			−0.280484
$396$		0			0
$397$	9896.10			1.25106			0.625530	−	0.780200i	$-0.284883\pi$
$397$	9896.10			1.25106			0.625530	+	0.780200i	$0.284883\pi$
$398$	−6084.66	−	4420.77i	−0.766323	−	0.556766i
$399$	−4374.32	+	13462.8i	−0.548846	+	1.68918i
$400$	−296.665	−	913.041i	−0.0370831	−	0.114130i
$401$	12016.9	−	8730.81i	1.49650	−	1.08727i	0.524752	−	0.851255i	$-0.324158\pi$
$401$	12016.9	−	8730.81i	1.49650	−	1.08727i	0.971749	−	0.236016i	$-0.0758418\pi$
$402$	1930.96	−	1402.93i	0.239571	−	0.174059i
$403$	201.073	+	618.840i	0.0248540	+	0.0764928i
$404$	1112.58	−	3424.16i	0.137012	−	0.421679i
$405$	−2805.84	−	2038.56i	−0.344255	−	0.250116i
$406$	13761.1			1.68215
$407$		0			0
$408$	−719.474			−0.0873022
$409$	6748.88	+	4903.35i	0.815919	+	0.592800i	0.915541	−	0.402226i	$-0.131763\pi$
$409$	6748.88	+	4903.35i	0.815919	+	0.592800i	−0.0996219	+	0.995025i	$0.531763\pi$
$410$	1363.92	−	4197.72i	0.164291	−	0.505635i
$411$	2768.02	+	8519.10i	0.332206	+	1.02242i
$412$	1349.85	−	980.721i	0.161413	−	0.117273i
$413$	−554.540	+	402.897i	−0.0660705	+	0.0480030i
$414$	−509.940	−	1569.43i	−0.0605367	−	0.186313i
$415$	180.856	−	556.619i	0.0213925	−	0.0658394i
$416$	−84.4955	−	61.3896i	−0.00995850	−	0.00723527i
$417$	6495.46			0.762791
$418$		0			0
$419$	−13082.4			−1.52534			−0.762670	−	0.646788i	$-0.776112\pi$
$419$	−13082.4			−1.52534			−0.762670	+	0.646788i	$0.776112\pi$
$420$	−2931.77	−	2130.06i	−0.340609	−	0.247467i
$421$	−1716.75	+	5283.61i	−0.198739	+	0.611656i	0.801173	+	0.598432i	$0.204209\pi$
$421$	−1716.75	+	5283.61i	−0.198739	+	0.611656i	−0.999913	+	0.0132238i	$0.995791\pi$
$422$	−877.967	−	2702.10i	−0.101277	−	0.311698i
$423$	−353.781	+	257.037i	−0.0406653	+	0.0295450i
$424$	2669.91	−	1939.81i	0.305808	−	0.222182i
$425$	−386.993	−	1191.04i	−0.0441693	−	0.135939i
$426$	1376.61	−	4236.78i	0.156566	−	0.481861i
$427$	3463.29	+	2516.23i	0.392507	+	0.285173i
$428$	−4321.55			−0.488060
$429$		0			0
$430$	6257.18			0.701739
$431$	−291.099	−	211.496i	−0.0325330	−	0.0236366i	0.571400	−	0.820672i	$-0.306401\pi$
$431$	−291.099	−	211.496i	−0.0325330	−	0.0236366i	−0.603933	+	0.797035i	$0.706401\pi$
$432$	754.886	−	2323.30i	0.0840728	−	0.258750i
$433$	4625.45	+	14235.7i	0.513360	+	1.57996i	0.786246	+	0.617913i	$0.212022\pi$
$433$	4625.45	+	14235.7i	0.513360	+	1.57996i	−0.272886	+	0.962046i	$0.587978\pi$
$434$	−8412.53	+	6112.06i	−0.930448	+	0.676010i
$435$	−7414.95	+	5387.27i	−0.817286	+	0.593793i
$436$	1819.59	+	5600.13i	0.199869	+	0.615132i
$437$	3808.57	−	11721.6i	0.416908	−	1.28311i
$438$	1684.18	+	1223.63i	0.183729	+	0.133487i
$439$	−15893.9			−1.72796			−0.863979	−	0.503527i	$-0.832035\pi$
$439$	−15893.9			−1.72796			−0.863979	+	0.503527i	$0.832035\pi$
$440$		0			0
$441$	−2843.02			−0.306989
$442$	−110.223	−	80.0814i	−0.0118614	−	0.00861784i
$443$	−812.238	+	2499.81i	−0.0871119	+	0.268103i	−0.985118	−	0.171881i	$-0.945016\pi$
$443$	−812.238	+	2499.81i	−0.0871119	+	0.268103i	0.898006	+	0.439983i	$0.145016\pi$
$444$	−1947.46	−	5993.66i	−0.208158	−	0.640646i
$445$	−7792.56	+	5661.62i	−0.830118	+	0.603116i
$446$	−8505.14	+	6179.35i	−0.902982	+	0.656055i
$447$	−572.355	−	1761.53i	−0.0605625	−	0.186392i
$448$	515.770	−	1587.38i	0.0543925	−	0.167403i
$449$	1049.68	+	762.635i	0.110328	+	0.0801580i	0.641581	−	0.767055i	$-0.278279\pi$
$449$	1049.68	+	762.635i	0.110328	+	0.0801580i	−0.531253	+	0.847213i	$0.678279\pi$
$450$	1012.02			0.106015
$451$		0			0
$452$	−505.922			−0.0526473
$453$	−3108.39	−	2258.38i	−0.322395	−	0.234234i
$454$	−1722.01	+	5299.81i	−0.178013	+	0.547869i
$455$	−212.057	−	652.645i	−0.0218492	−	0.0672449i
$456$	3513.03	−	2552.37i	0.360774	−	0.262117i
$457$	1821.87	−	1323.67i	0.186485	−	0.135489i	−0.490626	−	0.871370i	$-0.663232\pi$
$457$	1821.87	−	1323.67i	0.186485	−	0.135489i	0.677111	+	0.735881i	$0.263232\pi$
$458$	2770.39	+	8526.39i	0.282646	+	0.869895i
$459$	984.733	−	3030.70i	0.100138	−	0.308193i
$460$	2552.60	+	1854.57i	0.258729	+	0.187978i
$461$	−16772.0			−1.69447			−0.847233	−	0.531222i	$-0.821733\pi$
$461$	−16772.0			−1.69447			−0.847233	+	0.531222i	$0.821733\pi$
$462$		0			0
$463$	7726.06			0.775509			0.387754	−	0.921763i	$-0.373251\pi$
$463$	7726.06			0.775509			0.387754	+	0.921763i	$0.373251\pi$
$464$	−3415.14	−	2481.25i	−0.341690	−	0.248252i
$465$	2140.16	−	6586.75i	0.213436	−	0.656889i
$466$	−195.060	−	600.332i	−0.0193905	−	0.0596778i
$467$	6112.55	−	4441.03i	0.605685	−	0.440056i	−0.242207	−	0.970225i	$-0.577871\pi$
$467$	6112.55	−	4441.03i	0.605685	−	0.440056i	0.847892	+	0.530169i	$0.177871\pi$
$468$	89.0711	−	64.7140i	0.00879768	−	0.00639189i
$469$	2232.00	+	6869.38i	0.219753	+	0.676330i
$470$	258.373	−	795.189i	0.0253571	−	0.0780412i
$471$	1886.03	+	1370.28i	0.184509	+	0.134053i
$472$	210.267			0.0205049
$473$		0			0
$474$	−2353.70			−0.228078
$475$	6114.88	+	4442.72i	0.590673	+	0.429149i
$476$	672.811	−	2070.70i	0.0647862	−	0.199391i
$477$	1075.04	+	3308.64i	0.103192	+	0.317593i
$478$	1304.75	−	947.959i	0.124849	−	0.0907085i
$479$	10794.4	−	7842.59i	1.02966	−	0.748094i	0.0614218	−	0.998112i	$-0.480437\pi$
$479$	10794.4	−	7842.59i	1.02966	−	0.748094i	0.968241	+	0.250018i	$0.0804365\pi$
$480$	343.520	+	1057.24i	0.0326655	+	0.100534i
$481$	368.779	−	1134.99i	0.0349582	−	0.107590i
$482$	−1634.07	−	1187.22i	−0.154419	−	0.112192i
$483$	−10994.5			−1.03575
$484$		0			0
$485$	−11800.0			−1.10476
$486$	3670.83	+	2667.02i	0.342618	+	0.248927i
$487$	5815.72	−	17898.9i	0.541141	−	1.66546i	−0.188853	−	0.982005i	$-0.560477\pi$
$487$	5815.72	−	17898.9i	0.541141	−	1.66546i	0.729994	−	0.683454i	$-0.239523\pi$
$488$	−405.799	−	1248.92i	−0.0376427	−	0.115852i
$489$	−10205.6	+	7414.77i	−0.943786	+	0.685701i
$490$	4397.70	−	3195.12i	0.405445	−	0.294573i
$491$	−970.055	−	2985.52i	−0.0891608	−	0.274409i	0.896527	−	0.442989i	$-0.146082\pi$
$491$	−970.055	−	2985.52i	−0.0891608	−	0.274409i	−0.985688	+	0.168580i	$0.946082\pi$
$492$	1457.93	−	4487.05i	0.133595	−	0.411162i
$493$	−4454.98	−	3236.73i	−0.406982	−	0.295690i
$494$	822.285			0.0748914
$495$		0			0
$496$	3189.82			0.288764
$497$	10906.4	+	7923.98i	0.984346	+	0.715169i
$498$	193.322	−	594.984i	0.0173955	−	0.0535379i
$499$	−1722.86	−	5302.43i	−0.154561	−	0.475690i	0.843555	−	0.537043i	$-0.180459\pi$
$499$	−1722.86	−	5302.43i	−0.154561	−	0.475690i	−0.998116	+	0.0613526i	$0.980459\pi$
$500$	−4826.63	+	3506.75i	−0.431707	+	0.313654i
$501$	−6066.43	+	4407.52i	−0.540974	+	0.393041i
$502$	−1969.83	−	6062.50i	−0.175135	−	0.539009i
$503$	−728.995	+	2243.62i	−0.0646209	+	0.198883i	−0.978154	−	0.207882i	$-0.933343\pi$
$503$	−728.995	+	2243.62i	−0.0646209	+	0.198883i	0.913533	+	0.406764i	$0.133343\pi$
$504$	1423.42	+	1034.18i	0.125802	+	0.0914007i
$505$	−7256.68			−0.639442
$506$		0			0
$507$	9420.79			0.825231
$508$	3441.70	+	2500.54i	0.300592	+	0.218393i
$509$	−2355.68	+	7250.02i	−0.205135	+	0.631339i	0.794573	+	0.607168i	$0.207695\pi$
$509$	−2355.68	+	7250.02i	−0.205135	+	0.631339i	−0.999708	+	0.0241710i	$0.992305\pi$
$510$	448.114	+	1379.15i	0.0389075	+	0.119745i
$511$	−5096.65	+	3702.93i	−0.441218	+	0.320564i
$512$	−414.217	+	300.946i	−0.0357538	+	0.0259767i
$513$	5943.30	+	18291.6i	0.511507	+	1.57426i
$514$	1571.90	−	4837.82i	0.134890	−	0.415150i
$515$	−2720.67	−	1976.68i	−0.232790	−	0.169132i
$516$	6688.46			0.570626
$517$		0			0
$518$	19071.3			1.61766
$519$	1013.73	+	736.518i	0.0857376	+	0.0622920i
$520$	−65.0503	+	200.204i	−0.00548585	+	0.0168837i
$521$	6472.30	+	19919.7i	0.544255	+	1.67504i	0.722755	+	0.691104i	$0.242875\pi$
$521$	6472.30	+	19919.7i	0.544255	+	1.67504i	−0.178500	+	0.983940i	$0.557125\pi$
$522$	3600.08	−	2615.61i	0.301861	−	0.219314i
$523$	−4837.79	+	3514.86i	−0.404477	+	0.293870i	−0.771362	−	0.636396i	$-0.780424\pi$
$523$	−4837.79	+	3514.86i	−0.404477	+	0.293870i	0.366885	+	0.930266i	$0.380424\pi$
$524$	1885.06	+	5801.61i	0.157155	+	0.483673i
$525$	2083.57	−	6412.57i	0.173209	−	0.533081i
$526$	4841.63	+	3517.65i	0.401340	+	0.291591i
$527$	4161.05			0.343943
$528$		0			0
$529$	−2594.45			−0.213237
$530$	−5381.31	−	3909.75i	−0.441036	−	0.320432i
$531$	−68.4947	+	210.805i	−0.00559777	+	0.0172282i
$532$	4060.71	+	12497.6i	0.330929	+	1.01849i
$533$	722.786	−	525.135i	0.0587380	−	0.0426757i
$534$	−8329.66	+	6051.86i	−0.675018	+	0.490430i
$535$	2691.61	+	8283.92i	0.217511	+	0.669430i
$536$	684.684	−	2107.24i	0.0551751	−	0.169812i
$537$	9064.70	+	6585.89i	0.728437	+	0.529241i
$538$	−1642.66			−0.131636
$539$		0			0
$540$	−4923.68			−0.392373
$541$	−6838.05	−	4968.13i	−0.543421	−	0.394818i	0.281933	−	0.959434i	$-0.409024\pi$
$541$	−6838.05	−	4968.13i	−0.543421	−	0.394818i	−0.825354	+	0.564616i	$0.809024\pi$
$542$	−3979.98	+	12249.1i	−0.315414	+	0.970746i
$543$	−2471.09	−	7605.23i	−0.195294	−	0.601053i
$544$	−540.337	+	392.578i	−0.0425859	+	0.0309405i
$545$	9601.53	−	6975.92i	0.754650	−	0.548285i
$546$	−226.673	−	697.629i	−0.0177669	−	0.0546809i
$547$	−375.960	+	1157.09i	−0.0293874	+	0.0904450i	−0.964674	−	0.263445i	$-0.915141\pi$
$547$	−375.960	+	1157.09i	−0.0293874	+	0.0904450i	0.935287	+	0.353890i	$0.115141\pi$
$548$	6727.24	+	4887.63i	0.524404	+	0.381002i
$549$	1384.30			0.107615
$550$		0			0
$551$	33235.1			2.56963
$552$	2728.54	+	1982.40i	0.210388	+	0.152856i
$553$	2201.05	−	6774.12i	0.169255	−	0.520913i
$554$	−317.957	−	978.572i	−0.0243840	−	0.0750461i
$555$	−10276.2	+	7466.13i	−0.785950	+	0.571026i
$556$	4878.19	−	3544.22i	0.372089	−	0.270339i
$557$	−2045.70	−	6296.01i	−0.155618	−	0.478942i	0.842605	−	0.538532i	$-0.181021\pi$
$557$	−2045.70	−	6296.01i	−0.155618	−	0.478942i	−0.998223	+	0.0595897i	$0.981021\pi$
$558$	−1039.09	+	3197.98i	−0.0788315	+	0.242619i
$559$	1024.66	+	744.462i	0.0775289	+	0.0563281i
$560$	−3364.06			−0.253853
$561$		0			0
$562$	−15517.4			−1.16470
$563$	785.836	+	570.943i	0.0588260	+	0.0427396i	0.616810	−	0.787112i	$-0.288425\pi$
$563$	785.836	+	570.943i	0.0588260	+	0.0427396i	−0.557984	+	0.829852i	$0.688425\pi$
$564$	276.181	−	849.998i	0.0206194	−	0.0634599i
$565$	315.106	+	969.797i	0.0234630	+	0.0722118i
$566$	−9461.24	+	6873.99i	−0.702625	+	0.510487i
$567$	9076.23	−	6594.27i	0.672250	−	0.488418i
$568$	−1277.92	−	3933.03i	−0.0944020	−	0.290540i
$569$	−1298.72	+	3997.04i	−0.0956856	+	0.294490i	−0.987432	−	0.158046i	$-0.949481\pi$
$569$	−1298.72	+	3997.04i	−0.0956856	+	0.294490i	0.891746	+	0.452536i	$0.149481\pi$
$570$	−7080.64	−	5144.39i	−0.520308	−	0.378026i
$571$	11418.5			0.836862			0.418431	−	0.908248i	$-0.362580\pi$
$571$	11418.5			0.836862			0.418431	+	0.908248i	$0.362580\pi$
$572$		0			0
$573$	−6601.93			−0.481326
$574$	11550.7	+	8392.05i	0.839923	+	0.610240i
$575$	−1814.10	+	5583.21i	−0.131570	+	0.404932i
$576$	−166.784	−	513.310i	−0.0120648	−	0.0371318i
$577$	1176.28	−	854.620i	0.0848688	−	0.0616608i	−0.544542	−	0.838734i	$-0.683296\pi$
$577$	1176.28	−	854.620i	0.0848688	−	0.0616608i	0.629411	+	0.777073i	$0.283296\pi$
$578$	7244.54	−	5263.47i	0.521338	−	0.378774i
$579$	1400.20	+	4309.38i	0.100502	+	0.309312i
$580$	−2629.20	+	8091.86i	−0.188227	+	0.579304i
$581$	1531.62	+	1112.79i	0.109367	+	0.0794600i
$582$	−12613.3			−0.898348
$583$		0			0
$584$	1932.52			0.136932
$585$	−179.526	−	130.433i	−0.0126880	−	0.00921839i
$586$	4990.31	−	15358.6i	0.351788	−	1.08269i
$587$	3014.31	+	9277.09i	0.211949	+	0.652311i	0.999356	+	0.0358780i	$0.0114228\pi$
$587$	3014.31	+	9277.09i	0.211949	+	0.652311i	−0.787408	+	0.616433i	$0.788577\pi$
$588$	4700.82	−	3415.34i	0.329691	−	0.239535i
$589$	−20317.5	+	14761.5i	−1.42134	+	1.03266i
$590$	−130.962	−	403.059i	−0.00913832	−	0.0281249i
$591$	−2100.85	+	6465.74i	−0.146222	+	0.450025i
$592$	−4732.99	−	3438.72i	−0.328589	−	0.238734i
$593$	22963.3			1.59020			0.795102	−	0.606476i	$-0.207417\pi$
$593$	22963.3			1.59020			0.795102	+	0.606476i	$0.207417\pi$
$594$		0			0
$595$	−4388.35			−0.302361
$596$	−1391.02	−	1010.63i	−0.0956011	−	0.0694582i
$597$	−5007.25	+	15410.7i	−0.343272	+	1.05648i
$598$	197.357	+	607.402i	0.0134959	+	0.0415360i
$599$	−8081.00	+	5871.19i	−0.551220	+	0.400485i	−0.828235	−	0.560381i	$-0.810655\pi$
$599$	−8081.00	+	5871.19i	−0.551220	+	0.400485i	0.277015	+	0.960866i	$0.410655\pi$
$600$	−1673.32	+	1215.74i	−0.113855	+	0.0827207i
$601$	146.457	+	450.749i	0.00994030	+	0.0305931i	0.955904	−	0.293680i	$-0.0948802\pi$
$601$	146.457	+	450.749i	0.00994030	+	0.0305931i	−0.945963	+	0.324274i	$0.894880\pi$
$602$	−6254.66	+	19249.9i	−0.423456	+	1.30326i
$603$	1889.60	+	1372.87i	0.127612	+	0.0927158i
$604$	−3566.73			−0.240278
$605$		0			0
$606$	−7756.86			−0.519968
$607$	−3231.25	−	2347.64i	−0.216067	−	0.156982i	0.474488	−	0.880262i	$-0.342633\pi$
$607$	−3231.25	−	2347.64i	−0.216067	−	0.156982i	−0.690554	+	0.723281i	$0.742633\pi$
$608$	1245.66	−	3833.74i	0.0830889	−	0.255721i
$609$	−9161.69	−	28196.8i	−0.609606	−	1.87618i
$610$	−2141.30	+	1555.74i	−0.142129	+	0.103263i
$611$	136.920	−	99.4783i	0.00906579	−	0.00658668i
$612$	−217.567	−	669.602i	−0.0143703	−	0.0442272i
$613$	−3260.82	+	10035.8i	−0.214850	+	0.661241i	0.784314	+	0.620364i	$0.213015\pi$
$613$	−3260.82	+	10035.8i	−0.214850	+	0.661241i	−0.999164	+	0.0408768i	$0.986985\pi$
$614$	−6812.96	−	4949.90i	−0.447799	−	0.325345i
$615$	−9509.23			−0.623494
$616$		0			0
$617$	−14598.0			−0.952500			−0.476250	−	0.879310i	$-0.658004\pi$
$617$	−14598.0			−0.952500			−0.476250	+	0.879310i	$0.658004\pi$
$618$	−2908.19	−	2112.92i	−0.189295	−	0.137531i
$619$	−4324.78	+	13310.3i	−0.280820	+	0.864275i	0.706801	+	0.707413i	$0.250138\pi$
$619$	−4324.78	+	13310.3i	−0.280820	+	0.864275i	−0.987621	+	0.156862i	$0.949862\pi$
$620$	−1986.73	−	6114.53i	−0.128692	−	0.396073i
$621$	−12085.1	+	8780.34i	−0.780932	+	0.567380i
$622$	2133.95	−	1550.41i	0.137562	−	0.0999448i
$623$	−9628.25	−	29632.7i	−0.619178	−	1.90563i
$624$	−69.5340	+	214.003i	−0.00446087	+	0.0137292i
$625$	3660.45	+	2659.47i	0.234269	+	0.170206i
$626$	−8412.30			−0.537097
$627$		0			0
$628$	2164.12			0.137513
$629$	−6174.08	−	4485.73i	−0.391378	−	0.284353i
$630$	1095.85	−	3372.67i	0.0693009	−	0.213286i
$631$	−2522.70	−	7764.08i	−0.159156	−	0.489830i	0.839403	−	0.543510i	$-0.182905\pi$
$631$	−2522.70	−	7764.08i	−0.159156	−	0.489830i	−0.998558	+	0.0536797i	$0.982905\pi$
$632$	−1767.67	+	1284.29i	−0.111256	+	0.0808325i
$633$	−4952.13	+	3597.93i	−0.310947	+	0.225916i
$634$	−1522.28	−	4685.10i	−0.0953588	−	0.293484i
$635$	2649.65	−	8154.79i	0.165588	−	0.509627i
$636$	−5752.22	−	4179.23i	−0.358633	−	0.260562i
$637$	1100.31			0.0684391
$638$		0			0
$639$	4359.38			0.269882
$640$	834.869	+	606.568i	0.0515642	+	0.0374636i
$641$	5457.36	−	16796.0i	0.336276	−	1.03495i	−0.629815	−	0.776745i	$-0.716869\pi$
$641$	5457.36	−	16796.0i	0.336276	−	1.03495i	0.966090	−	0.258204i	$-0.0831308\pi$
$642$	2877.13	+	8854.90i	0.176871	+	0.544354i
$643$	14586.7	−	10597.8i	0.894623	−	0.649981i	−0.0424565	−	0.999098i	$-0.513518\pi$
$643$	14586.7	−	10597.8i	0.894623	−	0.649981i	0.937079	+	0.349117i	$0.113518\pi$
$644$	−8257.05	+	5999.10i	−0.505238	+	0.367077i
$645$	−4165.81	−	12821.0i	−0.254308	−	0.782679i
$646$	1624.93	−	5001.03i	0.0989661	−	0.304586i
$647$	−7986.43	−	5802.48i	−0.485285	−	0.352580i	0.318083	−	0.948063i	$-0.396961\pi$
$647$	−7986.43	−	5802.48i	−0.485285	−	0.352580i	−0.803368	+	0.595483i	$0.796961\pi$
$648$	−3441.47			−0.208632
$649$		0			0
$650$	−391.670			−0.0236347
$651$	18124.5	+	13168.2i	1.09117	+	0.792784i
$652$	−3618.70	+	11137.2i	−0.217361	+	0.668969i
$653$	3078.59	+	9474.92i	0.184494	+	0.567813i	0.999939	−	0.0110205i	$-0.00350799\pi$
$653$	3078.59	+	9474.92i	0.184494	+	0.567813i	−0.815446	+	0.578834i	$0.803508\pi$
$654$	10263.3	−	7456.74i	0.613651	−	0.445844i
$655$	9946.96	−	7226.89i	0.593374	−	0.431111i
$656$	−1353.41	−	4165.36i	−0.0805513	−	0.247912i
$657$	−629.519	+	1937.46i	−0.0373819	+	0.115050i
$658$	2188.09	+	1589.74i	0.129636	+	0.0941861i
$659$	15778.5			0.932692			0.466346	−	0.884602i	$-0.345570\pi$
$659$	15778.5			0.932692			0.466346	+	0.884602i	$0.345570\pi$
$660$		0			0
$661$	9698.70			0.570704			0.285352	−	0.958423i	$-0.407889\pi$
$661$	9698.70			0.570704			0.285352	+	0.958423i	$0.407889\pi$
$662$	5391.97	+	3917.50i	0.316563	+	0.229997i
$663$	−90.7056	+	279.163i	−0.00531329	+	0.0163526i
$664$	−179.462	−	552.328i	−0.0104887	−	0.0322808i
$665$	21427.3	−	15567.9i	1.24950	−	0.907813i
$666$	4989.29	−	3624.93i	0.290287	−	0.210906i
$667$	7976.78	+	24550.0i	0.463062	+	1.42516i
$668$	−2151.05	+	6620.24i	−0.124590	+	0.383450i
$669$	18324.0	+	13313.1i	1.05896	+	0.769381i
$670$	−4465.79			−0.257506
$671$		0			0
$672$	−3595.93			−0.206423
$673$	−21866.7	−	15887.1i	−1.25245	−	0.909960i	−0.254091	−	0.967180i	$-0.581776\pi$
$673$	−21866.7	−	15887.1i	−1.25245	−	0.909960i	−0.998362	+	0.0572204i	$0.981776\pi$
$674$	−5144.20	+	15832.2i	−0.293987	+	0.904798i
$675$	−2830.91	−	8712.63i	−0.161425	−	0.496814i
$676$	7075.17	−	5140.41i	0.402547	−	0.292468i
$677$	2811.85	−	2042.93i	0.159628	−	0.115976i	−0.505104	−	0.863059i	$-0.668546\pi$
$677$	2811.85	−	2042.93i	0.159628	−	0.115976i	0.664732	+	0.747082i	$0.268546\pi$
$678$	336.825	+	1036.64i	0.0190792	+	0.0587197i
$679$	11795.2	−	36302.0i	0.666656	−	2.05176i
$680$	1089.07	+	791.255i	0.0614175	+	0.0446224i
$681$	12005.8			0.675572
$682$		0			0
$683$	−2691.57			−0.150790			−0.0753952	−	0.997154i	$-0.524022\pi$
$683$	−2691.57			−0.150790			−0.0753952	+	0.997154i	$0.524022\pi$
$684$	3437.77	+	2497.69i	0.192173	+	0.139622i
$685$	5179.08	−	15939.6i	0.288879	−	0.889079i
$686$	−94.7393	−	291.577i	−0.00527283	−	0.0162281i
$687$	15626.2	−	11353.1i	0.867800	−	0.630493i
$688$	5023.14	−	3649.53i	0.278351	−	0.202234i
$689$	−416.062	−	1280.51i	−0.0230054	−	0.0708033i
$690$	2100.61	−	6465.01i	0.115897	−	0.356694i
$691$	−5807.64	−	4219.50i	−0.319730	−	0.232297i	0.416331	−	0.909213i	$-0.363316\pi$
$691$	−5807.64	−	4219.50i	−0.319730	−	0.232297i	−0.736060	+	0.676916i	$0.763316\pi$
$692$	1163.21			0.0638995
$693$		0			0
$694$	−7244.99			−0.396277
$695$	−9832.18	−	7143.50i	−0.536627	−	0.389882i
$696$	−2810.42	+	8649.60i	−0.153059	+	0.471066i
$697$	−1765.49	−	5433.62i	−0.0959437	−	0.295284i
$698$	3376.29	−	2453.02i	0.183086	−	0.133020i
$699$	−1100.22	+	799.360i	−0.0595341	+	0.0432540i
$700$	−1934.19	−	5952.83i	−0.104437	−	0.321423i
$701$	−1269.83	+	3908.15i	−0.0684180	+	0.210569i	−0.979420	−	0.201833i	$-0.935310\pi$
$701$	−1269.83	+	3908.15i	−0.0684180	+	0.210569i	0.911002	+	0.412402i	$0.135310\pi$
$702$	−806.293	−	585.806i	−0.0433498	−	0.0314955i
$703$	46060.0			2.47110
$704$		0			0
$705$	−1801.37			−0.0962319
$706$	−12268.2	−	8913.35i	−0.653993	−	0.475154i
$707$	7253.76	−	22324.8i	0.385864	−	1.18757i
$708$	−139.988	−	430.840i	−0.00743091	−	0.0228700i
$709$	12973.8	−	9426.03i	0.687224	−	0.499298i	−0.188522	−	0.982069i	$-0.560370\pi$
$709$	12973.8	−	9426.03i	0.687224	−	0.499298i	0.875746	+	0.482771i	$0.160370\pi$
$710$	−6743.26	+	4899.26i	−0.356437	+	0.258966i
$711$	−711.752	−	2190.55i	−0.0375426	−	0.115544i
$712$	−2953.55	+	9090.08i	−0.155462	+	0.478462i
$713$	−15780.4	−	11465.1i	−0.828863	−	0.602204i
$714$	−4690.82			−0.245868
$715$		0			0
$716$	10401.3			0.542898
$717$	−2811.04	−	2042.34i	−0.146416	−	0.106377i
$718$	−2801.54	+	8622.26i	−0.145616	+	0.448161i
$719$	−11376.1	−	35011.9i	−0.590064	−	1.81603i	−0.577907	−	0.816103i	$-0.696130\pi$
$719$	−11376.1	−	35011.9i	−0.590064	−	1.81603i	−0.0121568	−	0.999926i	$-0.503870\pi$
$720$	−880.079	+	639.415i	−0.0455536	+	0.0330966i
$721$	8800.71	−	6394.09i	0.454585	−	0.330275i
$722$	5568.09	+	17136.8i	0.287012	+	0.883333i
$723$	−1344.73	+	4138.65i	−0.0691716	+	0.212888i
$724$	−6005.59	−	4363.31i	−0.308282	−	0.223980i
$725$	−15830.5			−0.810939
$726$		0			0
$727$	−21685.1			−1.10627			−0.553133	−	0.833093i	$-0.686568\pi$
$727$	−21685.1			−1.10627			−0.553133	+	0.833093i	$0.686568\pi$
$728$	−550.893	−	400.247i	−0.0280460	−	0.0203766i
$729$	6610.06	−	20343.7i	0.335826	−	1.03357i
$730$	−1203.64	−	3704.42i	−0.0610257	−	0.187818i
$731$	6552.58	−	4760.73i	0.331540	−	0.240878i
$732$	−2288.89	+	1662.97i	−0.115573	+	0.0839689i
$733$	−7456.99	−	22950.2i	−0.375757	−	1.15646i	−0.942966	−	0.332888i	$-0.891977\pi$
$733$	−7456.99	−	22950.2i	−0.375757	−	1.15646i	0.567209	−	0.823574i	$-0.308023\pi$
$734$	−1788.01	+	5502.92i	−0.0899135	+	0.276725i
$735$	−9474.67	−	6883.75i	−0.475481	−	0.345457i
$736$	3130.86			0.156800
$737$		0			0
$738$	4616.89			0.230285
$739$	−29175.8	−	21197.4i	−1.45230	−	1.05516i	−0.985287	−	0.170905i	$-0.945331\pi$
$739$	−29175.8	−	21197.4i	−1.45230	−	1.05516i	−0.467011	−	0.884252i	$-0.654669\pi$
$740$	−3643.77	+	11214.4i	−0.181010	+	0.557092i
$741$	−547.448	−	1684.87i	−0.0271404	−	0.0835294i
$742$	17407.3	−	12647.1i	0.861241	−	0.625728i
$743$	11375.4	−	8264.73i	0.561674	−	0.408080i	−0.270397	−	0.962749i	$-0.587155\pi$
$743$	11375.4	−	8264.73i	0.561674	−	0.408080i	0.832071	+	0.554669i	$0.187155\pi$
$744$	−2123.67	−	6535.98i	−0.104647	−	0.322071i
$745$	−1070.90	+	3295.88i	−0.0526639	+	0.162083i
$746$	−5484.26	−	3984.55i	−0.269159	−	0.195556i
$747$	612.201			0.0299856
$748$		0			0
$749$	−28175.6			−1.37452
$750$	10398.8	+	7555.16i	0.506280	+	0.367834i
$751$	−8943.86	+	27526.4i	−0.434575	+	1.33749i	0.458946	+	0.888464i	$0.348227\pi$
$751$	−8943.86	+	27526.4i	−0.434575	+	1.33749i	−0.893521	+	0.449021i	$0.851773\pi$
$752$	−256.381	−	789.059i	−0.0124325	−	0.0382633i
$753$	−11110.7	+	8072.40i	−0.537711	+	0.390670i
$754$	−1393.30	+	1012.29i	−0.0672958	+	0.0488933i
$755$	2221.48	+	6837.02i	0.107084	+	0.329569i
$756$	4921.70	−	15147.4i	0.236773	−	0.728712i
$757$	17493.1	+	12709.5i	0.839893	+	0.610218i	0.922341	−	0.386377i	$-0.126274\pi$
$757$	17493.1	+	12709.5i	0.839893	+	0.610218i	−0.0824476	+	0.996595i	$0.526274\pi$
$758$	16126.9			0.772763
$759$		0			0
$760$	−8124.69			−0.387781
$761$	17469.7	+	12692.5i	0.832163	+	0.604602i	0.920170	−	0.391518i	$-0.128050\pi$
$761$	17469.7	+	12692.5i	0.832163	+	0.604602i	−0.0880073	+	0.996120i	$0.528050\pi$
$762$	2832.28	−	8716.87i	0.134649	−	0.414408i
$763$	11863.4	+	36511.7i	0.562887	+	1.73239i
$764$	−4958.16	+	3602.31i	−0.234790	+	0.170585i
$765$	−1148.04	+	834.103i	−0.0542583	+	0.0394210i
$766$	3247.47	+	9994.67i	0.153180	+	0.471439i
$767$	26.5088	−	81.5857i	0.00124795	−	0.00384079i
$768$	892.413	+	648.376i	0.0419299	+	0.0304639i
$769$	−30161.8			−1.41439			−0.707194	−	0.707020i	$-0.750039\pi$
$769$	−30161.8			−1.41439			−0.707194	+	0.707020i	$0.750039\pi$
$770$		0			0
$771$	−10959.3			−0.511918
$772$	3402.97	+	2472.40i	0.158647	+	0.115264i
$773$	9582.84	−	29493.0i	0.445887	−	1.37230i	−0.435620	−	0.900131i	$-0.643471\pi$
$773$	9582.84	−	29493.0i	0.445887	−	1.37230i	0.881508	−	0.472170i	$-0.156529\pi$
$774$	2022.57	+	6224.83i	0.0939273	+	0.289078i
$775$	9677.60	−	7031.18i	0.448554	−	0.325894i
$776$	−9472.80	+	6882.39i	−0.438214	+	0.318381i
$777$	−12697.0	−	39077.4i	−0.586233	−	1.80424i
$778$	−7005.11	+	21559.5i	−0.322809	+	0.993504i
$779$	27896.5	+	20268.0i	1.28305	+	0.932191i
$780$	453.529			0.0208192
$781$		0			0
$782$	4084.14			0.186763
$783$	−32588.8	−	23677.1i	−1.48739	−	1.08065i
$784$	1666.82	−	5129.95i	0.0759304	−	0.233690i
$785$	−1347.89	−	4148.39i	−0.0612845	−	0.188614i
$786$	10632.6	−	7725.01i	0.482508	−	0.350562i
$787$	−15790.9	+	11472.8i	−0.715230	+	0.519645i	−0.884857	−	0.465864i	$-0.845744\pi$
$787$	−15790.9	+	11472.8i	−0.715230	+	0.519645i	0.169627	+	0.985508i	$0.445744\pi$
$788$	1950.23	+	6002.19i	0.0881650	+	0.271344i
$789$	3984.32	−	12262.5i	0.179779	−	0.553303i
$790$	3562.80	+	2588.53i	0.160454	+	0.116577i
$791$	−3298.51			−0.148270
$792$		0			0
$793$	−535.753			−0.0239913
$794$	−16012.2	−	11633.6i	−0.715683	−	0.519974i
$795$	−4428.44	+	13629.3i	−0.197561	+	0.608029i
$796$	4648.27	+	14305.9i	0.206977	+	0.637009i
$797$	−17707.6	+	12865.3i	−0.786997	+	0.571787i	−0.907071	−	0.420978i	$-0.861687\pi$
$797$	−17707.6	+	12865.3i	−0.786997	+	0.571787i	0.120074	+	0.992765i	$0.461687\pi$
$798$	22904.2	−	16640.9i	1.01604	−	0.738197i
$799$	−334.444	−	1029.31i	−0.0148082	−	0.0455750i
$800$	−593.330	+	1826.08i	−0.0262217	+	0.0807022i
$801$	−8151.21	−	5922.20i	−0.359562	−	0.261237i
$802$	−29707.5			−1.30799
$803$		0			0
$804$	−4773.60			−0.209393
$805$	16642.4	+	12091.4i	0.728655	+	0.529399i
$806$	402.147	−	1237.68i	0.0175745	−	0.0540886i
$807$	1093.62	+	3365.83i	0.0477043	+	0.146819i
$808$	−5825.53	+	4232.49i	−0.253640	+	0.184280i
$809$	−30067.6	+	21845.4i	−1.30670	+	0.949372i	−0.999997	−	0.00243364i	$-0.999225\pi$
$809$	−30067.6	+	21845.4i	−1.30670	+	0.949372i	−0.306702	+	0.951806i	$0.599225\pi$
$810$	2143.47	+	6596.92i	0.0929801	+	0.286163i
$811$	−8825.17	+	27161.1i	−0.382113	+	1.17602i	0.556440	+	0.830888i	$0.312167\pi$
$811$	−8825.17	+	27161.1i	−0.382113	+	1.17602i	−0.938553	+	0.345135i	$0.887833\pi$
$812$	−22266.0	−	16177.2i	−0.962295	−	0.699148i
$813$	27748.3			1.19702
$814$		0			0
$815$	23602.7			1.01444
$816$	1164.13	+	845.793i	0.0499422	+	0.0362851i
$817$	−15105.9	+	46491.1i	−0.646864	+	1.99084i
$818$	−5155.69	−	15867.6i	−0.220372	−	0.678236i
$819$	580.725	−	421.921i	0.0247768	−	0.0180014i
$820$	−7141.58	+	5188.66i	−0.304140	+	0.220971i
$821$	−1944.69	−	5985.14i	−0.0826677	−	0.254425i	0.901176	−	0.433453i	$-0.142705\pi$
$821$	−1944.69	−	5985.14i	−0.0826677	−	0.254425i	−0.983844	+	0.179028i	$0.942705\pi$
$822$	5536.05	−	17038.2i	0.234905	−	0.722963i
$823$	−12085.9	−	8780.90i	−0.511892	−	0.371911i	0.301649	−	0.953419i	$-0.402463\pi$
$823$	−12085.9	−	8780.90i	−0.511892	−	0.371911i	−0.813541	+	0.581508i	$0.802463\pi$
$824$	−3337.00			−0.141080
$825$		0			0
$826$	1370.90			0.0577477
$827$	28039.7	+	20372.1i	1.17900	+	0.856597i	0.992059	−	0.125773i	$-0.0401411\pi$
$827$	28039.7	+	20372.1i	1.17900	+	0.856597i	0.186946	+	0.982370i	$0.440141\pi$
$828$	−1019.88	+	3138.87i	−0.0428059	+	0.131743i
$829$	−9061.51	−	27888.5i	−0.379637	−	1.16840i	−0.940296	−	0.340357i	$-0.889452\pi$
$829$	−9061.51	−	27888.5i	−0.379637	−	1.16840i	0.560659	−	0.828047i	$-0.310548\pi$
$830$	−946.976	+	688.018i	−0.0396024	+	0.0287729i
$831$	−1793.42	+	1303.00i	−0.0748654	+	0.0543929i
$832$	64.5489	+	198.661i	0.00268970	+	0.00827804i
$833$	2174.34	−	6691.92i	0.0904397	−	0.278345i
$834$	−10509.9	−	7635.87i	−0.436364	−	0.317037i
$835$	14030.0			0.581471
$836$		0			0
$837$	30438.6			1.25700
$838$	21167.8	+	15379.3i	0.872588	+	0.633972i
$839$	1819.80	−	5600.75i	0.0748824	−	0.230464i	−0.906609	−	0.421973i	$-0.861338\pi$
$839$	1819.80	−	5600.75i	0.0748824	−	0.230464i	0.981491	+	0.191508i	$0.0613379\pi$
$840$	2239.67	+	6893.01i	0.0919954	+	0.283133i
$841$	−36583.4	+	26579.4i	−1.49999	+	1.08981i
$842$	8989.01	−	6530.90i	0.367912	−	0.267303i
$843$	10330.9	+	31795.3i	0.422082	+	1.29904i
$844$	−1755.93	+	5404.21i	−0.0716134	+	0.220404i
$845$	−14260.3	−	10360.7i	−0.580554	−	0.421797i
$846$	874.594			0.0355428
$847$		0			0
$848$	−6600.39			−0.267286
$849$	20383.9	+	14809.7i	0.823996	+	0.598668i
$850$	−773.987	+	2382.09i	−0.0312324	+	0.0961234i
$851$	11054.9	+	34023.4i	0.445307	+	1.37051i
$852$	−7208.04	+	5236.95i	−0.289840	+	0.210581i
$853$	30854.3	−	22416.9i	1.23849	−	0.899814i	0.240991	−	0.970527i	$-0.422528\pi$
$853$	30854.3	−	22416.9i	1.23849	−	0.899814i	0.997497	+	0.0707136i	$0.0225276\pi$
$854$	−2645.72	−	8142.69i	−0.106013	−	0.326273i
$855$	2646.62	−	8145.47i	0.105863	−	0.325812i
$856$	6992.41	+	5080.28i	0.279200	+	0.202851i
$857$	−12704.1			−0.506377			−0.253188	−	0.967417i	$-0.581479\pi$
$857$	−12704.1			−0.506377			−0.253188	+	0.967417i	$0.581479\pi$
$858$		0			0
$859$	−11123.7			−0.441833			−0.220916	−	0.975293i	$-0.570905\pi$
$859$	−11123.7			−0.441833			−0.220916	+	0.975293i	$0.570905\pi$
$860$	−10124.3	−	7355.75i	−0.401438	−	0.291662i
$861$	9505.40	−	29254.6i	0.376241	−	1.15795i
$862$	222.380	+	684.414i	0.00878687	+	0.0270432i
$863$	11067.7	−	8041.19i	0.436559	−	0.317179i	−0.347707	−	0.937603i	$-0.613040\pi$
$863$	11067.7	−	8041.19i	0.436559	−	0.317179i	0.784266	+	0.620424i	$0.213040\pi$
$864$	−3952.63	+	2871.76i	−0.155638	+	0.113078i
$865$	−724.485	−	2229.74i	−0.0284777	−	0.0876454i
$866$	9250.90	−	28471.3i	0.363000	−	1.11720i
$867$	−15608.1	−	11339.9i	−0.611393	−	0.444203i
$868$	20796.9			0.813242
$869$		0			0
$870$	18330.8			0.714334
$871$	−731.311	−	531.328i	−0.0284495	−	0.0206698i
$872$	3639.19	−	11200.3i	0.141328	−	0.434964i
$873$	−3814.23	−	11739.0i	−0.147872	−	0.455102i
$874$	−19941.9	+	14488.7i	−0.771792	+	0.560740i
$875$	−31468.6	+	22863.3i	−1.21581	+	0.883338i
$876$	−1286.60	−	3959.76i	−0.0496236	−	0.152726i
$877$	−14031.6	+	43184.7i	−0.540264	+	1.66276i	0.191726	+	0.981448i	$0.438591\pi$
$877$	−14031.6	+	43184.7i	−0.540264	+	1.66276i	−0.731991	+	0.681315i	$0.761409\pi$
$878$	25716.9	+	18684.4i	0.988498	+	0.718186i
$879$	−34792.3			−1.33506
$880$		0			0
$881$	13620.9			0.520884			0.260442	−	0.965490i	$-0.416132\pi$
$881$	13620.9			0.520884			0.260442	+	0.965490i	$0.416132\pi$
$882$	4600.11	+	3342.17i	0.175616	+	0.127593i
$883$	−2455.36	+	7556.84i	−0.0935783	+	0.288004i	−0.986881	−	0.161452i	$-0.948382\pi$
$883$	−2455.36	+	7556.84i	−0.0935783	+	0.288004i	0.893302	+	0.449456i	$0.148382\pi$
$884$	84.2026	+	259.149i	0.00320367	+	0.00985987i
$885$	−738.683	+	536.685i	−0.0280571	+	0.0203847i
$886$	4252.93	−	3089.94i	0.161264	−	0.117165i
$887$	12836.9	+	39507.9i	0.485931	+	1.49554i	0.830627	+	0.556829i	$0.187982\pi$
$887$	12836.9	+	39507.9i	0.485931	+	1.49554i	−0.344696	+	0.938714i	$0.612018\pi$
$888$	−3894.92	+	11987.3i	−0.147190	+	0.453005i
$889$	22439.2	+	16303.0i	0.846553	+	0.615057i
$890$	19264.3			0.725550
$891$		0			0
$892$	21025.9			0.789235
$893$	5284.54	+	3839.44i	0.198030	+	0.143877i
$894$	−1144.71	+	3523.05i	−0.0428242	+	0.131799i
$895$	−6478.29	−	19938.1i	−0.241950	−	0.744646i
$896$	−2700.60	+	1962.10i	−0.100693	+	0.0731577i
$897$	1113.18	−	808.774i	0.0414360	−	0.0301050i
$898$	−801.882	−	2467.94i	−0.0297986	−	0.0917106i
$899$	16254.0	−	50024.6i	0.603003	−	1.85585i
$900$	−1637.48	−	1189.70i	−0.0606473	−	0.0440628i
$901$	−8610.07			−0.318361
$902$		0			0
$903$	43607.3			1.60704
$904$	818.599	+	594.747i	0.0301175	+	0.0218816i
$905$	−4623.50	+	14229.7i	−0.169824	+	0.522663i
$906$	2374.60	+	7308.27i	0.0870760	+	0.267992i
$907$	−34974.7	+	25410.6i	−1.28039	+	0.930259i	−0.999565	−	0.0294988i	$-0.990609\pi$
$907$	−34974.7	+	25410.6i	−1.28039	+	0.930259i	−0.280827	+	0.959758i	$0.590609\pi$
$908$	9016.58	−	6550.93i	0.329544	−	0.239427i
$909$	−2345.65	−	7219.17i	−0.0855889	−	0.263415i
$910$	−424.114	+	1305.29i	−0.0154497	+	0.0475494i
$911$	27102.7	+	19691.3i	0.985679	+	0.716138i	0.958971	−	0.283506i	$-0.0914975\pi$
$911$	27102.7	+	19691.3i	0.985679	+	0.716138i	0.0267083	+	0.999643i	$0.491497\pi$
$912$	−8684.69			−0.315328
$913$		0			0
$914$	−4503.92			−0.162994
$915$	4613.33	+	3351.78i	0.166680	+	0.121100i
$916$	5540.78	−	17052.8i	0.199861	−	0.615109i
$917$	12290.2	+	37825.3i	0.442592	+	1.36216i
$918$	−5156.13	+	3746.15i	−0.185379	+	0.134685i
$919$	15290.8	−	11109.4i	0.548854	−	0.398766i	−0.278509	−	0.960434i	$-0.589840\pi$
$919$	15290.8	−	11109.4i	0.548854	−	0.398766i	0.827363	+	0.561668i	$0.189840\pi$
$920$	−1950.01	−	6001.52i	−0.0698804	−	0.215070i
$921$	−5606.59	+	17255.3i	−0.200590	+	0.617353i
$922$	27137.6	+	19716.6i	0.969339	+	0.704266i
$923$	−1687.17			−0.0601665
$924$		0			0
$925$	−21939.3			−0.779847
$926$	−12501.0	−	9082.53i	−0.443639	−	0.322322i
$927$	1087.03	−	3345.54i	0.0385144	−	0.118535i
$928$	2608.94	+	8029.48i	0.0922872	+	0.284031i
$929$	−23582.2	+	17133.5i	−0.832838	+	0.605092i	−0.920361	−	0.391070i	$-0.872105\pi$
$929$	−23582.2	+	17133.5i	−0.832838	+	0.605092i	0.0875229	+	0.996163i	$0.472105\pi$
$930$	−11206.0	+	8141.67i	−0.395119	+	0.287071i
$931$	13123.1	+	40388.7i	0.461967	+	1.42179i
$932$	−390.120	+	1200.66i	−0.0137111	+	0.0421986i
$933$	−4597.51	−	3340.29i	−0.161325	−	0.117209i
$934$	−15111.0			−0.529388
$935$		0			0
$936$	−220.196			−0.00768946
$937$	−26044.7	−	18922.6i	−0.908049	−	0.659736i	0.0324717	−	0.999473i	$-0.489662\pi$
$937$	−26044.7	−	18922.6i	−0.908049	−	0.659736i	−0.940521	+	0.339737i	$0.889662\pi$
$938$	4464.00	−	13738.8i	0.155389	−	0.478237i
$939$	5600.61	+	17236.9i	0.194642	+	0.599047i
$940$	−1352.86	+	982.908i	−0.0469418	+	0.0341052i
$941$	30253.9	−	21980.7i	1.04809	−	0.761479i	0.0762380	−	0.997090i	$-0.475709\pi$
$941$	30253.9	−	21980.7i	1.04809	−	0.761479i	0.971847	+	0.235611i	$0.0757091\pi$
$942$	−1440.80	−	4434.32i	−0.0498341	−	0.153374i
$943$	−8276.04	+	25471.0i	−0.285795	+	0.879587i
$944$	−340.219	−	247.184i	−0.0117301	−	0.00852240i
$945$	−32101.3			−1.10503
$946$		0			0
$947$	3065.34			0.105185			0.0525925	−	0.998616i	$-0.483252\pi$
$947$	3065.34			0.105185			0.0525925	+	0.998616i	$0.483252\pi$
$948$	3808.37	+	2766.94i	0.130475	+	0.0947955i
$949$	243.636	−	749.836i	0.00833380	−	0.0256488i
$950$	−4671.35	−	14376.9i	−0.159535	−	0.490999i
$951$	−8586.34	+	6238.34i	−0.292777	+	0.212715i
$952$	−3522.88	+	2559.52i	−0.119934	+	0.0871372i
$953$	−5063.37	−	15583.5i	−0.172108	−	0.529693i	0.827382	−	0.561640i	$-0.189829\pi$
$953$	−5063.37	−	15583.5i	−0.172108	−	0.529693i	−0.999490	+	0.0319466i	$0.989829\pi$
$954$	2150.08	−	6617.27i	0.0729680	−	0.224572i
$955$	9993.35	+	7260.60i	0.338615	+	0.246018i
$956$	−3225.53			−0.109122
$957$		0			0
$958$	−26685.2			−0.899958
$959$	43860.2	+	31866.3i	1.47687	+	1.07301i
$960$	687.039	−	2114.49i	0.0230980	−	0.0710884i
$961$	3076.21	+	9467.60i	0.103260	+	0.317801i
$962$	−1930.95	+	1402.92i	−0.0647156	+	0.0470186i
$963$	−7371.06	+	5355.39i	−0.246655	+	0.179206i
$964$	1248.32	+	3841.94i	0.0417072	+	0.128362i
$965$	2619.83	−	8063.01i	0.0873942	−	0.268972i
$966$	17789.5	+	12924.8i	0.592513	+	0.430486i
$967$	−16183.5			−0.538187			−0.269094	−	0.963114i	$-0.586724\pi$
$967$	−16183.5			−0.538187			−0.269094	+	0.963114i	$0.586724\pi$
$968$		0			0
$969$	−11329.0			−0.375583
$970$	19092.8	+	13871.7i	0.631992	+	0.459169i
$971$	1450.54	−	4464.30i	0.0479403	−	0.147545i	−0.924221	−	0.381858i	$-0.875284\pi$
$971$	1450.54	−	4464.30i	0.0479403	−	0.147545i	0.972161	+	0.234313i	$0.0752842\pi$
$972$	−2804.27	−	8630.65i	−0.0925380	−	0.284803i
$973$	31804.8	−	23107.5i	1.04791	−	0.761350i
$974$	−30451.5	+	22124.3i	−1.00178	+	0.727832i
$975$	260.760	+	802.537i	0.00856513	+	0.0263608i
$976$	−811.597	+	2497.84i	−0.0266174	+	0.0819200i
$977$	6199.97	+	4504.54i	0.203024	+	0.147506i	0.684652	−	0.728870i	$-0.259954\pi$
$977$	6199.97	+	4504.54i	0.203024	+	0.147506i	−0.481628	+	0.876376i	$0.659954\pi$
$978$	25229.5			0.824899
$979$		0			0
$980$	−10871.7			−0.354372
$981$	10043.4	+	7296.99i	0.326873	+	0.237487i
$982$	−1940.11	+	5971.04i	−0.0630462	+	0.194036i
$983$	11556.4	+	35566.9i	0.374966	+	1.15403i	0.943501	+	0.331368i	$0.107510\pi$
$983$	11556.4	+	35566.9i	0.374966	+	1.15403i	−0.568535	+	0.822659i	$0.692490\pi$
$984$	−7633.82	+	5546.30i	−0.247314	+	0.179684i
$985$	10290.9	−	7476.75i	0.332887	−	0.241857i
$986$	3403.30	+	10474.3i	0.109922	+	0.338306i
$987$	1800.64	−	5541.81i	0.0580700	−	0.178721i
$988$	−1330.48	−	966.654i	−0.0428425	−	0.0311269i
$989$	−37967.5			−1.22072
$990$		0			0
$991$	15536.1			0.498002			0.249001	−	0.968503i	$-0.419898\pi$
$991$	15536.1			0.498002			0.249001	+	0.968503i	$0.419898\pi$
$992$	−5161.23	−	3749.85i	−0.165191	−	0.120018i
$993$	4437.22	−	13656.4i	0.141804	−	0.436426i
$994$	−8331.77	−	25642.5i	−0.265863	−	0.818242i
$995$	24527.7	−	17820.4i	0.781488	−	0.567785i
$996$	−1012.25	+	735.441i	−0.0322031	+	0.0233969i
$997$	12721.6	+	39152.9i	0.404108	+	1.24372i	0.921638	+	0.388051i	$0.126852\pi$
$997$	12721.6	+	39152.9i	0.404108	+	1.24372i	−0.517530	+	0.855665i	$0.673148\pi$
$998$	−3445.73	+	10604.9i	−0.109291	+	0.336364i
$999$	−45164.2	−	32813.7i	−1.43036	−	1.03922i

Twists

By twisting character
Char	Parity	Ord	Type	Twist	Min	Dim
1.1	even	1	trivial	242.4.c.q.81.1		8
11.2	odd	10		242.4.c.r.27.2		8
11.3	even	5	inner	242.4.c.q.3.1		8
11.4	even	5		242.4.c.n.9.2		8
11.5	even	5		242.4.a.o.1.2		4
11.6	odd	10		242.4.a.n.1.2		4
11.7	odd	10		242.4.c.r.9.2		8
11.8	odd	10		22.4.c.b.3.1	✓	8
11.9	even	5		242.4.c.n.27.2		8
11.10	odd	2		22.4.c.b.15.1	yes	8
33.5	odd	10		2178.4.a.bt.1.4		4
33.8	even	10		198.4.f.d.91.1		8
33.17	even	10		2178.4.a.by.1.4		4
33.32	even	2		198.4.f.d.37.1		8
44.19	even	10		176.4.m.b.113.2		8
44.27	odd	10		1936.4.a.bm.1.3		4
44.39	even	10		1936.4.a.bn.1.3		4
44.43	even	2		176.4.m.b.81.2		8

By twisted newform
Twist	Min	Dim	Char	Parity	Ord	Type
22.4.c.b.3.1	✓	8	11.8	odd	10
22.4.c.b.15.1	yes	8	11.10	odd	2
176.4.m.b.81.2		8	44.43	even	2
176.4.m.b.113.2		8	44.19	even	10
198.4.f.d.37.1		8	33.32	even	2
198.4.f.d.91.1		8	33.8	even	10
242.4.a.n.1.2		4	11.6	odd	10
242.4.a.o.1.2		4	11.5	even	5
242.4.c.n.9.2		8	11.4	even	5
242.4.c.n.27.2		8	11.9	even	5
242.4.c.q.3.1		8	11.3	even	5	inner
242.4.c.q.81.1		8	1.1	even	1	trivial
242.4.c.r.9.2		8	11.7	odd	10
242.4.c.r.27.2		8	11.2	odd	10
1936.4.a.bm.1.3		4	44.27	odd	10
1936.4.a.bn.1.3		4	44.39	even	10
2178.4.a.bt.1.4		4	33.5	odd	10
2178.4.a.by.1.4		4	33.17	even	10

Overview	Random
Universe	Knowledge

Classical	Maass
Hilbert	Bianchi

Elliptic curves over $\Q$
Elliptic curves over $\Q(\alpha)$
Genus 2 curves over $\Q$
Higher genus families
Abelian varieties over $\F_{q}$

Level:	\( N \)	\(=\)	\( 242 = 2 \cdot 11^{2} \)
Weight:	\( k \)	\(=\)	\( 4 \)
Character orbit:	\([\chi]\)	\(=\)	242.c (of order \(5\), degree \(4\), not minimal)

\(f(q)\)	\(=\)	\(q+(-1.61803 - 1.17557i) q^{2} +(-1.33153 + 4.09803i) q^{3} +(1.23607 + 3.80423i) q^{4} +(6.52241 - 4.73881i) q^{5} +(6.97198 - 5.06544i) q^{6} +(8.05890 + 24.8027i) q^{7} +(2.47214 - 7.60845i) q^{8} +(6.82261 + 4.95692i) q^{9} +O(q^{10})\)	\(q+(-1.61803 - 1.17557i) q^{2} +(-1.33153 + 4.09803i) q^{3} +(1.23607 + 3.80423i) q^{4} +(6.52241 - 4.73881i) q^{5} +(6.97198 - 5.06544i) q^{6} +(8.05890 + 24.8027i) q^{7} +(2.47214 - 7.60845i) q^{8} +(6.82261 + 4.95692i) q^{9} -16.1243 q^{10} -17.2357 q^{12} +(-2.64049 - 1.91843i) q^{13} +(16.1178 - 49.6055i) q^{14} +(10.7350 + 33.0389i) q^{15} +(-12.9443 + 9.40456i) q^{16} +(-16.8855 + 12.2681i) q^{17} +(-5.21201 - 16.0409i) q^{18} +(38.9268 - 119.804i) q^{19} +(26.0897 + 18.9552i) q^{20} -112.373 q^{21} +97.8394 q^{23} +(27.8879 + 20.2618i) q^{24} +(-18.5416 + 57.0651i) q^{25} +(2.01715 + 6.20815i) q^{26} +(-123.520 + 89.7424i) q^{27} +(-84.3939 + 61.3158i) q^{28} +(81.5293 + 250.921i) q^{29} +(21.4700 - 66.0778i) q^{30} +(-161.288 - 117.183i) q^{31} +32.0000 q^{32} +41.7433 q^{34} +(170.099 + 123.584i) q^{35} +(-10.4240 + 32.0819i) q^{36} +(112.990 + 347.748i) q^{37} +(-203.823 + 148.086i) q^{38} +(11.3776 - 8.26634i) q^{39} +(-19.9307 - 61.3405i) q^{40} +(-84.5880 + 260.335i) q^{41} +(181.823 + 132.102i) q^{42} -388.059 q^{43} +67.9898 q^{45} +(-158.307 - 115.017i) q^{46} +(-16.0238 + 49.3162i) q^{47} +(-21.3045 - 65.5684i) q^{48} +(-272.737 + 198.155i) q^{49} +(97.0849 - 70.5363i) q^{50} +(-27.7912 - 85.5326i) q^{51} +(4.03430 - 12.4163i) q^{52} +(333.739 + 242.476i) q^{53} +305.358 q^{54} +208.633 q^{56} +(439.129 + 319.046i) q^{57} +(163.059 - 501.843i) q^{58} +(8.12202 + 24.9970i) q^{59} +(-112.418 + 81.6766i) q^{60} +(132.799 - 96.4844i) q^{61} +(123.213 + 379.212i) q^{62} +(-67.9624 + 209.167i) q^{63} +(-51.7771 - 37.6183i) q^{64} -26.3134 q^{65} +276.961 q^{67} +(-67.5421 - 49.0722i) q^{68} +(-130.276 + 400.948i) q^{69} +(-129.944 - 399.927i) q^{70} +(418.205 - 303.844i) q^{71} +(54.5809 - 39.6554i) q^{72} +(74.6476 + 229.742i) q^{73} +(225.980 - 695.495i) q^{74} +(-209.166 - 151.968i) q^{75} +503.879 q^{76} -28.1271 q^{78} +(-220.959 - 160.536i) q^{79} +(-39.8615 + 122.681i) q^{80} +(-132.934 - 409.129i) q^{81} +(442.908 - 321.792i) q^{82} +(58.7298 - 42.6697i) q^{83} +(-138.901 - 427.492i) q^{84} +(-51.9984 + 160.035i) q^{85} +(627.893 + 456.191i) q^{86} -1136.84 q^{87} -1194.73 q^{89} +(-110.010 - 79.9268i) q^{90} +(26.3028 - 80.9517i) q^{91} +(120.936 + 372.203i) q^{92} +(694.979 - 504.932i) q^{93} +(83.9018 - 60.9582i) q^{94} +(-313.833 - 965.880i) q^{95} +(-42.6089 + 131.137i) q^{96} +(-1184.10 - 860.299i) q^{97} +674.244 q^{98} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\)	\(=\)	\( 8 q - 4 q^{2} + 3 q^{3} - 8 q^{4} + 5 q^{5} - 14 q^{6} + q^{7} - 16 q^{8} - 21 q^{9}+O(q^{10}) \) 8 * q - 4 * q^2 + 3 * q^3 - 8 * q^4 + 5 * q^5 - 14 * q^6 + q^7 - 16 * q^8 - 21 * q^9	\( 8 q - 4 q^{2} + 3 q^{3} - 8 q^{4} + 5 q^{5} - 14 q^{6} + q^{7} - 16 q^{8} - 21 q^{9} + 100 q^{10} + 32 q^{12} - 7 q^{13} + 2 q^{14} + 211 q^{15} - 32 q^{16} - 161 q^{17} - 162 q^{18} + 272 q^{19} + 20 q^{20} + 50 q^{21} + 628 q^{23} - 56 q^{24} - 17 q^{25} + 96 q^{26} - 528 q^{27} - 16 q^{28} - 33 q^{29} + 422 q^{30} + 323 q^{31} + 256 q^{32} + 208 q^{34} + 697 q^{35} - 324 q^{36} + 49 q^{37} - 576 q^{38} - 391 q^{39} - 240 q^{40} - 361 q^{41} + 1430 q^{42} - 1442 q^{43} + 2652 q^{45} + 416 q^{46} - 1069 q^{47} + 48 q^{48} - 709 q^{49} + 76 q^{50} + 1332 q^{51} + 192 q^{52} - 281 q^{53} + 1144 q^{54} + 48 q^{56} + 438 q^{57} - 66 q^{58} - 128 q^{59} - 1116 q^{60} + 617 q^{61} - 1044 q^{62} - 694 q^{63} - 128 q^{64} + 138 q^{65} + 578 q^{67} - 644 q^{68} - 310 q^{69} + 34 q^{70} + 115 q^{71} - 168 q^{72} + 1487 q^{73} + 98 q^{74} - 1852 q^{75} + 128 q^{76} - 4152 q^{78} - 71 q^{79} - 480 q^{80} + 1630 q^{81} + 658 q^{82} - 1942 q^{83} - 2960 q^{84} + 329 q^{85} + 2426 q^{86} - 2122 q^{87} - 2202 q^{89} - 1286 q^{90} + 4523 q^{91} - 2088 q^{92} + 6019 q^{93} + 1332 q^{94} + 793 q^{95} + 96 q^{96} - 5128 q^{97} + 3292 q^{98}+O(q^{100}) \) 8 * q - 4 * q^2 + 3 * q^3 - 8 * q^4 + 5 * q^5 - 14 * q^6 + q^7 - 16 * q^8 - 21 * q^9 + 100 * q^10 + 32 * q^12 - 7 * q^13 + 2 * q^14 + 211 * q^15 - 32 * q^16 - 161 * q^17 - 162 * q^18 + 272 * q^19 + 20 * q^20 + 50 * q^21 + 628 * q^23 - 56 * q^24 - 17 * q^25 + 96 * q^26 - 528 * q^27 - 16 * q^28 - 33 * q^29 + 422 * q^30 + 323 * q^31 + 256 * q^32 + 208 * q^34 + 697 * q^35 - 324 * q^36 + 49 * q^37 - 576 * q^38 - 391 * q^39 - 240 * q^40 - 361 * q^41 + 1430 * q^42 - 1442 * q^43 + 2652 * q^45 + 416 * q^46 - 1069 * q^47 + 48 * q^48 - 709 * q^49 + 76 * q^50 + 1332 * q^51 + 192 * q^52 - 281 * q^53 + 1144 * q^54 + 48 * q^56 + 438 * q^57 - 66 * q^58 - 128 * q^59 - 1116 * q^60 + 617 * q^61 - 1044 * q^62 - 694 * q^63 - 128 * q^64 + 138 * q^65 + 578 * q^67 - 644 * q^68 - 310 * q^69 + 34 * q^70 + 115 * q^71 - 168 * q^72 + 1487 * q^73 + 98 * q^74 - 1852 * q^75 + 128 * q^76 - 4152 * q^78 - 71 * q^79 - 480 * q^80 + 1630 * q^81 + 658 * q^82 - 1942 * q^83 - 2960 * q^84 + 329 * q^85 + 2426 * q^86 - 2122 * q^87 - 2202 * q^89 - 1286 * q^90 + 4523 * q^91 - 2088 * q^92 + 6019 * q^93 + 1332 * q^94 + 793 * q^95 + 96 * q^96 - 5128 * q^97 + 3292 * q^98

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