LMFDB - Embedded newform 65.2.l.a.4.4

Show commands: Magma / PariGP / SageMath

Newspace parameters

comment: Compute space of new eigenforms

[N,k,chi] = [65,2,Mod(4,65)]

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

lf = mfeigenbasis(mf)

from sage.modular.dirichlet import DirichletCharacter

H = DirichletGroup(65, base_ring=CyclotomicField(6))

chi = DirichletCharacter(H, H._module([3, 1]))

N = Newforms(chi, 2, names="a")

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

chi := DirichletCharacter("65.4");

S:= CuspForms(chi, 2);

N := Newforms(S);

Level:	$ N $	$=$	$ 65 = 5 \cdot 13 $
Weight:	$ k $	$=$	$ 2 $
Character orbit:	$[\chi]$	$=$	65.l (of order $6$, degree $2$, minimal)

Newform invariants

comment: select newform

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

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

Self dual:	no
Analytic conductor:	$0.519027613138$
Analytic rank:	$0$
Dimension:	$8$
Relative dimension:	$4$ over $\Q(\zeta_{6})$
Coefficient field:	8.0.49787136.1
comment: defining polynomial gp: f.mod \\ as an extension of the character field
Defining polynomial:	$ x^{8} + 3x^{6} + 5x^{4} + 12x^{2} + 16 $ x^8 + 3x^6 + 5x^4 + 12*x^2 + 16
Coefficient ring:	$\Z[a_1, a_2, a_3]$
Coefficient ring index:	$ 1 $
Twist minimal:	yes
Sato-Tate group:	$\mathrm{SU}(2)[C_{6}]$

Embedding invariants

Embedding label			4.4
Root			$1.09445 - 0.895644i$ of defining polynomial
Character	$\chi$	$=$	65.4
Dual form			65.2.l.a.49.4

$q$-expansion

comment: q-expansion

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

gp: mfcoefs(f, 20)

$f(q)$	$=$	$q+(1.09445 - 1.89564i) q^{2} +(-0.866025 - 0.500000i) q^{3} +(-1.39564 - 2.41733i) q^{4} +(-0.456850 + 2.18890i) q^{5} +(-1.89564 + 1.09445i) q^{6} +(0.866025 + 1.50000i) q^{7} -1.73205 q^{8} +(-1.00000 - 1.73205i) q^{9} +O(q^{10})$	\(q+(1.09445 - 1.89564i) q^{2} +(-0.866025 - 0.500000i) q^{3} +(-1.39564 - 2.41733i) q^{4} +(-0.456850 + 2.18890i) q^{5} +(-1.89564 + 1.09445i) q^{6} +(0.866025 + 1.50000i) q^{7} -1.73205 q^{8} +(-1.00000 - 1.73205i) q^{9} +(3.64938 + 3.26167i) q^{10} +(2.29129 + 1.32288i) q^{11} +2.79129i q^{12} +(-3.46410 - 1.00000i) q^{13} +3.79129 q^{14} +(1.49009 - 1.66722i) q^{15} +(0.895644 - 1.55130i) q^{16} +(-3.96863 + 2.29129i) q^{17} -4.37780 q^{18} +(-1.50000 + 0.866025i) q^{19} +(5.92889 - 1.95057i) q^{20} -1.73205i q^{21} +(5.01540 - 2.89564i) q^{22} +(3.96863 + 2.29129i) q^{23} +(1.50000 + 0.866025i) q^{24} +(-4.58258 - 2.00000i) q^{25} +(-5.68693 + 5.47225i) q^{26} +5.00000i q^{27} +(2.41733 - 4.18693i) q^{28} +(-2.29129 + 3.96863i) q^{29} +(-1.52962 - 4.64938i) q^{30} -9.66930i q^{31} +(-3.69253 - 6.39564i) q^{32} +(-1.32288 - 2.29129i) q^{33} +10.0308i q^{34} +(-3.67900 + 1.21037i) q^{35} +(-2.79129 + 4.83465i) q^{36} +(3.96863 - 6.87386i) q^{37} +3.79129i q^{38} +(2.50000 + 2.59808i) q^{39} +(0.791288 - 3.79129i) q^{40} +(-2.29129 - 1.32288i) q^{41} +(-3.28335 - 1.89564i) q^{42} +(1.22753 - 0.708712i) q^{43} -7.38505i q^{44} +(4.24814 - 1.39761i) q^{45} +(8.68693 - 5.01540i) q^{46} +8.75560 q^{47} +(-1.55130 + 0.895644i) q^{48} +(2.00000 - 3.46410i) q^{49} +(-8.80669 + 6.49803i) q^{50} +4.58258 q^{51} +(2.41733 + 9.76951i) q^{52} -1.58258i q^{53} +(9.47822 + 5.47225i) q^{54} +(-3.94242 + 4.41105i) q^{55} +(-1.50000 - 2.59808i) q^{56} +1.73205 q^{57} +(5.01540 + 8.68693i) q^{58} +(-2.91742 + 1.68438i) q^{59} +(-6.10985 - 1.27520i) q^{60} +(5.29129 + 9.16478i) q^{61} +(-18.3296 - 10.5826i) q^{62} +(1.73205 - 3.00000i) q^{63} -12.5826 q^{64} +(3.77148 - 7.12573i) q^{65} -5.79129 q^{66} +(-7.43273 + 12.8739i) q^{67} +(11.0776 + 6.39564i) q^{68} +(-2.29129 - 3.96863i) q^{69} +(-1.73205 + 8.29875i) q^{70} +(-3.08258 + 1.77973i) q^{71} +(1.73205 + 3.00000i) q^{72} +(-8.68693 - 15.0462i) q^{74} +(2.96863 + 4.02334i) q^{75} +(4.18693 + 2.41733i) q^{76} +4.58258i q^{77} +(7.66115 - 1.89564i) q^{78} +6.00000 q^{79} +(2.98647 + 2.66919i) q^{80} +(-0.500000 + 0.866025i) q^{81} +(-5.01540 + 2.89564i) q^{82} +11.3060 q^{83} +(-4.18693 + 2.41733i) q^{84} +(-3.20233 - 9.73371i) q^{85} -3.10260i q^{86} +(3.96863 - 2.29129i) q^{87} +(-3.96863 - 2.29129i) q^{88} +(3.70871 + 2.14123i) q^{89} +(2.00000 - 9.58258i) q^{90} +(-1.50000 - 6.06218i) q^{91} -12.7913i q^{92} +(-4.83465 + 8.37386i) q^{93} +(9.58258 - 16.5975i) q^{94} +(-1.21037 - 3.67900i) q^{95} +7.38505i q^{96} +(-2.23658 - 3.87386i) q^{97} +(-4.37780 - 7.58258i) q^{98} -5.29150i q^{99} +O(q^{100})\)
$\operatorname{Tr}(f)(q)$	$=$	$ 8 q - 2 q^{4} - 6 q^{6} - 8 q^{9}+O(q^{10}) $ 8 * q - 2 * q^4 - 6 * q^6 - 8 * q^9	$ 8 q - 2 q^{4} - 6 q^{6} - 8 q^{9} - 4 q^{10} + 12 q^{14} - 6 q^{15} - 2 q^{16} - 12 q^{19} + 24 q^{20} + 12 q^{24} - 18 q^{26} - 10 q^{30} + 6 q^{35} - 4 q^{36} + 20 q^{39} - 12 q^{40} + 12 q^{45} + 42 q^{46} + 16 q^{49} - 12 q^{50} + 30 q^{54} - 14 q^{55} - 12 q^{56} - 60 q^{59} + 24 q^{61} - 64 q^{64} - 24 q^{65} - 28 q^{66} + 12 q^{71} - 42 q^{74} - 8 q^{75} + 6 q^{76} + 48 q^{79} + 18 q^{80} - 4 q^{81} - 6 q^{84} + 42 q^{85} + 48 q^{89} + 16 q^{90} - 12 q^{91} + 40 q^{94} - 6 q^{95}+O(q^{100}) $ 8 * q - 2 * q^4 - 6 * q^6 - 8 * q^9 - 4 * q^10 + 12 * q^14 - 6 * q^15 - 2 * q^16 - 12 * q^19 + 24 * q^20 + 12 * q^24 - 18 * q^26 - 10 * q^30 + 6 * q^35 - 4 * q^36 + 20 * q^39 - 12 * q^40 + 12 * q^45 + 42 * q^46 + 16 * q^49 - 12 * q^50 + 30 * q^54 - 14 * q^55 - 12 * q^56 - 60 * q^59 + 24 * q^61 - 64 * q^64 - 24 * q^65 - 28 * q^66 + 12 * q^71 - 42 * q^74 - 8 * q^75 + 6 * q^76 + 48 * q^79 + 18 * q^80 - 4 * q^81 - 6 * q^84 + 42 * q^85 + 48 * q^89 + 16 * q^90 - 12 * q^91 + 40 * q^94 - 6 * q^95

Display 100 coefficients 10 coefficients

Character values

We give the values of $\chi$ on generators for $\left(\mathbb{Z}/65\mathbb{Z}\right)^\times$.

$n$	$27$	$41$
$\chi(n)$	$-1$	$e\left(\frac{1}{6}\right)$

Coefficient data

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

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

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

$2$	1.09445	−	1.89564i	0.773893	−	1.34042i	−0.161521	−	0.986869i	$-0.551640\pi$
$2$	1.09445	−	1.89564i	0.773893	−	1.34042i	0.935414	−	0.353553i	$-0.115027\pi$
$3$	−0.866025	−	0.500000i	−0.500000	−	0.288675i	0.228714	−	0.973494i	$-0.426548\pi$
$3$	−0.866025	−	0.500000i	−0.500000	−	0.288675i	−0.728714	+	0.684819i	$0.759881\pi$
$4$	−1.39564	−	2.41733i	−0.697822	−	1.20866i
$5$	−0.456850	+	2.18890i	−0.204310	+	0.978906i
$5$	−0.456850	+	2.18890i	−0.204310	+	0.978906i
$6$	−1.89564	+	1.09445i	−0.773893	+	0.446808i
$7$	0.866025	+	1.50000i	0.327327	+	0.566947i	0.981981	−	0.188982i	$-0.0605189\pi$
$7$	0.866025	+	1.50000i	0.327327	+	0.566947i	−0.654654	+	0.755929i	$0.727186\pi$
$8$	−1.73205			−0.612372
$9$	−1.00000	−	1.73205i	−0.333333	−	0.577350i
$10$	3.64938	+	3.26167i	1.15403	+	1.03143i
$11$	2.29129	+	1.32288i	0.690849	+	0.398862i	0.803930	−	0.594724i	$-0.202739\pi$
$11$	2.29129	+	1.32288i	0.690849	+	0.398862i	−0.113081	+	0.993586i	$0.536072\pi$
$12$			2.79129i			0.805775i
$13$	−3.46410	−	1.00000i	−0.960769	−	0.277350i
$13$	−3.46410	−	1.00000i	−0.960769	−	0.277350i
$14$	3.79129			1.01326
$15$	1.49009	−	1.66722i	0.384741	−	0.430474i
$16$	0.895644	−	1.55130i	0.223911	−	0.387825i
$17$	−3.96863	+	2.29129i	−0.962533	+	0.555719i	−0.896952	−	0.442128i	$-0.854224\pi$
$17$	−3.96863	+	2.29129i	−0.962533	+	0.555719i	−0.0655816	+	0.997847i	$0.520890\pi$
$18$	−4.37780			−1.03186
$19$	−1.50000	+	0.866025i	−0.344124	+	0.198680i	−0.662094	−	0.749421i	$-0.730332\pi$
$19$	−1.50000	+	0.866025i	−0.344124	+	0.198680i	0.317970	+	0.948101i	$0.396999\pi$
$20$	5.92889	−	1.95057i	1.32574	−	0.436161i
$21$		−	1.73205i		−	0.377964i
$22$	5.01540	−	2.89564i	1.06929	−	0.617353i
$23$	3.96863	+	2.29129i	0.827516	+	0.477767i	0.853001	−	0.521909i	$-0.174780\pi$
$23$	3.96863	+	2.29129i	0.827516	+	0.477767i	−0.0254855	+	0.999675i	$0.508113\pi$
$24$	1.50000	+	0.866025i	0.306186	+	0.176777i
$25$	−4.58258	−	2.00000i	−0.916515	−	0.400000i
$26$	−5.68693	+	5.47225i	−1.11530	+	1.07320i
$27$			5.00000i			0.962250i
$28$	2.41733	−	4.18693i	0.456832	−	0.791256i
$29$	−2.29129	+	3.96863i	−0.425481	+	0.736956i	−0.996465	−	0.0840058i	$-0.973229\pi$
$29$	−2.29129	+	3.96863i	−0.425481	+	0.736956i	0.570984	+	0.820961i	$0.306562\pi$
$30$	−1.52962	−	4.64938i	−0.279269	−	0.848856i
$31$		−	9.66930i		−	1.73666i	−0.495988	−	0.868329i	$-0.665194\pi$
$31$		−	9.66930i		−	1.73666i	0.495988	−	0.868329i	$-0.334806\pi$
$32$	−3.69253	−	6.39564i	−0.652753	−	1.13060i
$33$	−1.32288	−	2.29129i	−0.230283	−	0.398862i
$34$			10.0308i			1.72027i
$35$	−3.67900	+	1.21037i	−0.621864	+	0.204590i
$36$	−2.79129	+	4.83465i	−0.465215	+	0.805775i
$37$	3.96863	−	6.87386i	0.652438	−	1.13006i	−0.330091	−	0.943949i	$-0.607080\pi$
$37$	3.96863	−	6.87386i	0.652438	−	1.13006i	0.982529	−	0.186107i	$-0.0595872\pi$
$38$			3.79129i			0.615028i
$39$	2.50000	+	2.59808i	0.400320	+	0.416025i
$40$	0.791288	−	3.79129i	0.125114	−	0.599455i
$41$	−2.29129	−	1.32288i	−0.357839	−	0.206598i	0.310293	−	0.950641i	$-0.399573\pi$
$41$	−2.29129	−	1.32288i	−0.357839	−	0.206598i	−0.668132	+	0.744042i	$0.732906\pi$
$42$	−3.28335	−	1.89564i	−0.506632	−	0.292504i
$43$	1.22753	−	0.708712i	0.187196	−	0.108078i	−0.403473	−	0.914991i	$-0.632197\pi$
$43$	1.22753	−	0.708712i	0.187196	−	0.108078i	0.590669	+	0.806914i	$0.298864\pi$
$44$		−	7.38505i		−	1.11334i
$45$	4.24814	−	1.39761i	0.633275	−	0.208344i
$46$	8.68693	−	5.01540i	1.28082	−	0.739481i
$47$	8.75560			1.27714			0.638568	−	0.769565i	$-0.279527\pi$
$47$	8.75560			1.27714			0.638568	+	0.769565i	$0.279527\pi$
$48$	−1.55130	+	0.895644i	−0.223911	+	0.129275i
$49$	2.00000	−	3.46410i	0.285714	−	0.494872i
$50$	−8.80669	+	6.49803i	−1.24545	+	0.918960i
$51$	4.58258			0.641689
$52$	2.41733	+	9.76951i	0.335223	+	1.35479i
$53$		−	1.58258i		−	0.217383i	−0.994076	−	0.108692i	$-0.965334\pi$
$53$		−	1.58258i		−	0.217383i	0.994076	−	0.108692i	$-0.0346661\pi$
$54$	9.47822	+	5.47225i	1.28982	+	0.744679i
$55$	−3.94242	+	4.41105i	−0.531596	+	0.594785i
$56$	−1.50000	−	2.59808i	−0.200446	−	0.347183i
$57$	1.73205			0.229416
$58$	5.01540	+	8.68693i	0.658555	+	1.14065i
$59$	−2.91742	+	1.68438i	−0.379816	+	0.219287i	−0.677738	−	0.735303i	$-0.737040\pi$
$59$	−2.91742	+	1.68438i	−0.379816	+	0.219287i	0.297922	+	0.954590i	$0.403706\pi$
$60$	−6.10985	−	1.27520i	−0.788779	−	0.164628i
$61$	5.29129	+	9.16478i	0.677480	+	1.17343i	0.975737	+	0.218944i	$0.0702613\pi$
$61$	5.29129	+	9.16478i	0.677480	+	1.17343i	−0.298257	+	0.954485i	$0.596405\pi$
$62$	−18.3296	−	10.5826i	−2.32786	−	1.34399i
$63$	1.73205	−	3.00000i	0.218218	−	0.377964i
$64$	−12.5826			−1.57282
$65$	3.77148	−	7.12573i	0.467794	−	0.883837i
$66$	−5.79129			−0.712858
$67$	−7.43273	+	12.8739i	−0.908052	+	1.57279i	−0.0912856	+	0.995825i	$0.529098\pi$
$67$	−7.43273	+	12.8739i	−0.908052	+	1.57279i	−0.816767	+	0.576968i	$0.804236\pi$
$68$	11.0776	+	6.39564i	1.34335	+	0.775586i
$69$	−2.29129	−	3.96863i	−0.275839	−	0.477767i
$70$	−1.73205	+	8.29875i	−0.207020	+	0.991891i
$71$	−3.08258	+	1.77973i	−0.365834	+	0.211215i	−0.671637	−	0.740880i	$-0.734409\pi$
$71$	−3.08258	+	1.77973i	−0.365834	+	0.211215i	0.305803	+	0.952095i	$0.401075\pi$
$72$	1.73205	+	3.00000i	0.204124	+	0.353553i
$73$		0			0			−	1.00000i	$-0.5\pi$
$73$		0			0				1.00000i	$0.5\pi$
$74$	−8.68693	−	15.0462i	−1.00984	−	1.74909i
$75$	2.96863	+	4.02334i	0.342788	+	0.464575i
$76$	4.18693	+	2.41733i	0.480274	+	0.277286i
$77$			4.58258i			0.522233i
$78$	7.66115	−	1.89564i	0.867455	−	0.214639i
$79$	6.00000			0.675053			0.337526	−	0.941316i	$-0.390410\pi$
$79$	6.00000			0.675053			0.337526	+	0.941316i	$0.390410\pi$
$80$	2.98647	+	2.66919i	0.333897	+	0.298424i
$81$	−0.500000	+	0.866025i	−0.0555556	+	0.0962250i
$82$	−5.01540	+	2.89564i	−0.553859	+	0.319770i
$83$	11.3060			1.24100			0.620498	−	0.784208i	$-0.286931\pi$
$83$	11.3060			1.24100			0.620498	+	0.784208i	$0.286931\pi$
$84$	−4.18693	+	2.41733i	−0.456832	+	0.263752i
$85$	−3.20233	−	9.73371i	−0.347342	−	1.05577i
$86$		−	3.10260i		−	0.334562i
$87$	3.96863	−	2.29129i	0.425481	−	0.245652i
$88$	−3.96863	−	2.29129i	−0.423057	−	0.244252i
$89$	3.70871	+	2.14123i	0.393123	+	0.226969i	0.683512	−	0.729939i	$-0.260452\pi$
$89$	3.70871	+	2.14123i	0.393123	+	0.226969i	−0.290390	+	0.956909i	$0.593785\pi$
$90$	2.00000	−	9.58258i	0.210819	−	1.01009i
$91$	−1.50000	−	6.06218i	−0.157243	−	0.635489i
$92$		−	12.7913i		−	1.33358i
$93$	−4.83465	+	8.37386i	−0.501330	+	0.868329i
$94$	9.58258	−	16.5975i	0.988367	−	1.71190i
$95$	−1.21037	−	3.67900i	−0.124181	−	0.377457i
$96$			7.38505i			0.753734i
$97$	−2.23658	−	3.87386i	−0.227090	−	0.393331i	0.729854	−	0.683603i	$-0.239588\pi$
$97$	−2.23658	−	3.87386i	−0.227090	−	0.393331i	−0.956944	+	0.290271i	$0.906254\pi$
$98$	−4.37780	−	7.58258i	−0.442225	−	0.765956i
$99$		−	5.29150i		−	0.531816i
$100$	1.56099	+	13.8689i	0.156099	+	1.38689i
$101$	−4.50000	+	7.79423i	−0.447767	+	0.775555i	−0.998240	−	0.0592978i	$-0.981114\pi$
$101$	−4.50000	+	7.79423i	−0.447767	+	0.775555i	0.550474	+	0.834853i	$0.314447\pi$
$102$	5.01540	−	8.68693i	0.496599	−	0.860134i
$103$		−	15.1652i		−	1.49427i	−0.664674	−	0.747133i	$-0.731430\pi$
$103$		−	15.1652i		−	1.49427i	0.664674	−	0.747133i	$-0.268570\pi$
$104$	6.00000	+	1.73205i	0.588348	+	0.169842i
$105$	3.79129	+	0.791288i	0.369992	+	0.0772218i
$106$	−3.00000	−	1.73205i	−0.291386	−	0.168232i
$107$	−1.22753	−	0.708712i	−0.118669	−	0.0685138i	0.439490	−	0.898247i	$-0.355159\pi$
$107$	−1.22753	−	0.708712i	−0.118669	−	0.0685138i	−0.558160	+	0.829733i	$0.688492\pi$
$108$	12.0866	−	6.97822i	1.16304	−	0.671479i
$109$			2.74110i			0.262550i	0.991346	+	0.131275i	$0.0419071\pi$
$109$			2.74110i			0.262550i	−0.991346	+	0.131275i	$0.958093\pi$
$110$	4.04699	+	12.3011i	0.385865	+	1.17286i
$111$	−6.87386	+	3.96863i	−0.652438	+	0.376685i
$112$	3.10260			0.293168
$113$	−14.3609	+	8.29129i	−1.35096	+	0.779979i	−0.988384	−	0.151975i	$-0.951437\pi$
$113$	−14.3609	+	8.29129i	−1.35096	+	0.779979i	−0.362578	+	0.931953i	$0.618103\pi$
$114$	1.89564	−	3.28335i	0.177543	−	0.307514i
$115$	−6.82847	+	7.64016i	−0.636758	+	0.712448i
$116$	12.7913			1.18764
$117$	1.73205	+	7.00000i	0.160128	+	0.647150i
$118$			7.37386i			0.678819i
$119$	−6.87386	−	3.96863i	−0.630126	−	0.363803i
$120$	−2.58092	+	2.88771i	−0.235605	+	0.263610i
$121$	−2.00000	−	3.46410i	−0.181818	−	0.314918i
$122$	23.1642			2.09719
$123$	1.32288	+	2.29129i	0.119280	+	0.206598i
$124$	−23.3739	+	13.4949i	−2.09903	+	1.21188i
$125$	6.47135	−	9.11710i	0.578815	−	0.815459i
$126$	−3.79129	−	6.56670i	−0.337755	−	0.585008i
$127$	−8.44178	−	4.87386i	−0.749087	−	0.432485i	0.0762771	−	0.997087i	$-0.475697\pi$
$127$	−8.44178	−	4.87386i	−0.749087	−	0.432485i	−0.825364	+	0.564601i	$0.809030\pi$
$128$	−6.38595	+	11.0608i	−0.564444	+	0.977645i
$129$	−1.41742			−0.124797
$130$	−9.38014	−	14.9481i	−0.822693	−	1.31104i
$131$	1.58258			0.138270			0.0691351	−	0.997607i	$-0.477976\pi$
$131$	1.58258			0.138270			0.0691351	+	0.997607i	$0.477976\pi$
$132$	−3.69253	+	6.39564i	−0.321393	+	0.556669i
$133$	−2.59808	−	1.50000i	−0.225282	−	0.130066i
$134$	16.2695	+	28.1796i	1.40547	+	2.43435i
$135$	−10.9445	−	2.28425i	−0.941953	−	0.196597i
$136$	6.87386	−	3.96863i	0.589429	−	0.340307i
$137$	0.0476751	+	0.0825757i	0.00407316	+	0.00705492i	0.868055	−	0.496468i	$-0.165370\pi$
$137$	0.0476751	+	0.0825757i	0.00407316	+	0.00705492i	−0.863982	+	0.503523i	$0.832037\pi$
$138$	−10.0308			−0.853879
$139$	2.87386	+	4.97768i	0.243758	+	0.422201i	0.961782	−	0.273817i	$-0.0882864\pi$
$139$	2.87386	+	4.97768i	0.243758	+	0.422201i	−0.718024	+	0.696019i	$0.754953\pi$
$140$	8.06042	+	7.20409i	0.681230	+	0.608857i
$141$	−7.58258	−	4.37780i	−0.638568	−	0.368677i
$142$			7.79129i			0.653830i
$143$	−6.61438	−	6.87386i	−0.553122	−	0.574821i
$144$	−3.58258			−0.298548
$145$	−7.64016	−	6.82847i	−0.634480	−	0.567074i
$146$		0			0
$147$	−3.46410	+	2.00000i	−0.285714	+	0.164957i
$148$	−22.1552			−1.82114
$149$	8.45644	−	4.88233i	0.692778	−	0.399976i	−0.111874	−	0.993722i	$-0.535685\pi$
$149$	8.45644	−	4.88233i	0.692778	−	0.399976i	0.804652	+	0.593747i	$0.202352\pi$
$150$	10.8758	−	1.22411i	0.888008	−	0.0999485i
$151$			6.20520i			0.504972i	0.967601	+	0.252486i	$0.0812482\pi$
$151$			6.20520i			0.504972i	−0.967601	+	0.252486i	$0.918752\pi$
$152$	2.59808	−	1.50000i	0.210732	−	0.121666i
$153$	7.93725	+	4.58258i	0.641689	+	0.370479i
$154$	8.68693	+	5.01540i	0.700013	+	0.404153i
$155$	21.1652	+	4.41742i	1.70003	+	0.354816i
$156$	2.79129	−	9.66930i	0.223482	−	0.774164i
$157$			9.16515i			0.731459i	0.930721	+	0.365729i	$0.119180\pi$
$157$			9.16515i			0.731459i	−0.930721	+	0.365729i	$0.880820\pi$
$158$	6.56670	−	11.3739i	0.522419	−	0.904856i
$159$	−0.791288	+	1.37055i	−0.0627532	+	0.108692i
$160$	15.6864	−	5.16072i	1.24012	−	0.407991i
$161$			7.93725i			0.625543i
$162$	1.09445	+	1.89564i	0.0859882	+	0.148936i
$163$	5.33918	+	9.24773i	0.418197	+	0.724338i	0.995758	−	0.0920093i	$-0.0293290\pi$
$163$	5.33918	+	9.24773i	0.418197	+	0.724338i	−0.577561	+	0.816347i	$0.695996\pi$
$164$			7.38505i			0.576676i
$165$	5.61976	−	1.84887i	0.437498	−	0.143934i
$166$	12.3739	−	21.4322i	0.960398	−	1.66346i
$167$	2.14123	−	3.70871i	0.165693	−	0.286989i	−0.771208	−	0.636583i	$-0.780347\pi$
$167$	2.14123	−	3.70871i	0.165693	−	0.286989i	0.936901	+	0.349594i	$0.113681\pi$
$168$			3.00000i			0.231455i
$169$	11.0000	+	6.92820i	0.846154	+	0.532939i
$170$	−21.9564	−	4.58258i	−1.68398	−	0.351468i
$171$	3.00000	+	1.73205i	0.229416	+	0.132453i
$172$	−3.42638	−	1.97822i	−0.261259	−	0.150838i
$173$	−6.42368	+	3.70871i	−0.488383	+	0.281968i	−0.723903	−	0.689901i	$-0.757654\pi$
$173$	−6.42368	+	3.70871i	−0.488383	+	0.281968i	0.235520	+	0.971869i	$0.424321\pi$
$174$		−	10.0308i		−	0.760433i
$175$	−0.968627	−	8.60591i	−0.0732213	−	0.650546i
$176$	4.10436	−	2.36965i	0.309377	−	0.178619i
$177$	3.36875			0.253211
$178$	8.11800	−	4.68693i	0.608470	−	0.351300i
$179$	−0.0825757	+	0.143025i	−0.00617200	+	0.0106902i	−0.869095	−	0.494645i	$-0.835298\pi$
$179$	−0.0825757	+	0.143025i	−0.00617200	+	0.0106902i	0.862923	+	0.505336i	$0.168631\pi$
$180$	−9.30738	−	8.31857i	−0.693731	−	0.620029i
$181$	−18.7477			−1.39351			−0.696754	−	0.717310i	$-0.745373\pi$
$181$	−18.7477			−1.39351			−0.696754	+	0.717310i	$0.745373\pi$
$182$	−13.1334	−	3.79129i	−0.973513	−	0.281029i
$183$		−	10.5826i		−	0.782287i
$184$	−6.87386	−	3.96863i	−0.506748	−	0.292571i
$185$	13.2331	+	11.8273i	0.972920	+	0.869557i
$186$	10.5826	+	18.3296i	0.775952	+	1.34399i
$187$	−12.1244			−0.886621
$188$	−12.2197	−	21.1652i	−0.891214	−	1.54363i
$189$	−7.50000	+	4.33013i	−0.545545	+	0.314970i
$190$	−8.29875	−	1.73205i	−0.602055	−	0.125656i
$191$	3.70871	+	6.42368i	0.268353	+	0.464801i	0.968437	−	0.249260i	$-0.0801873\pi$
$191$	3.70871	+	6.42368i	0.268353	+	0.464801i	−0.700084	+	0.714061i	$0.746854\pi$
$192$	10.8968	+	6.29129i	0.786411	+	0.454035i
$193$	0.504525	−	0.873864i	0.0363165	−	0.0629021i	−0.847296	−	0.531121i	$-0.821771\pi$
$193$	0.504525	−	0.873864i	0.0363165	−	0.0629021i	0.883612	+	0.468219i	$0.155104\pi$
$194$	−9.79129			−0.702973
$195$	−6.82906	+	4.28532i	−0.489039	+	0.306878i
$196$	−11.1652			−0.797511
$197$	9.98313	−	17.2913i	0.711269	−	1.23195i	−0.253113	−	0.967437i	$-0.581454\pi$
$197$	9.98313	−	17.2913i	0.711269	−	1.23195i	0.964381	−	0.264516i	$-0.0852123\pi$
$198$	−10.0308	−	5.79129i	−0.712858	−	0.411569i
$199$	0.708712	+	1.22753i	0.0502393	+	0.0870170i	0.890051	−	0.455860i	$-0.150668\pi$
$199$	0.708712	+	1.22753i	0.0502393	+	0.0870170i	−0.839812	+	0.542877i	$0.817335\pi$
$200$	7.93725	+	3.46410i	0.561249	+	0.244949i
$201$	12.8739	−	7.43273i	0.908052	−	0.524264i
$202$	9.85005	+	17.0608i	0.693047	+	1.20039i
$203$	−7.93725			−0.557086
$204$	−6.39564	−	11.0776i	−0.447785	−	0.775586i
$205$	3.94242	−	4.41105i	0.275351	−	0.308081i
$206$	−28.7477	−	16.5975i	−2.00295	−	1.15640i
$207$		−	9.16515i		−	0.637022i
$208$	−4.65390	+	4.47822i	−0.322690	+	0.310509i
$209$	−4.58258			−0.316983
$210$	5.64938	−	6.32091i	0.389844	−	0.436184i
$211$	−9.08258	+	15.7315i	−0.625270	+	1.08300i	0.363218	+	0.931704i	$0.381678\pi$
$211$	−9.08258	+	15.7315i	−0.625270	+	1.08300i	−0.988489	+	0.151296i	$0.951655\pi$
$212$	−3.82560	+	2.20871i	−0.262743	+	0.151695i
$213$	3.55945			0.243890
$214$	−2.68693	+	1.55130i	−0.183675	+	0.106045i
$215$	0.990505	+	3.01071i	0.0675519	+	0.205329i
$216$		−	8.66025i		−	0.589256i
$217$	14.5040	−	8.37386i	0.984593	−	0.568455i
$218$	5.19615	+	3.00000i	0.351928	+	0.203186i
$219$		0			0
$220$	16.1652	+	3.37386i	1.08985	+	0.227466i
$221$	16.0390	−	3.96863i	1.07890	−	0.266959i
$222$			17.3739i			1.16606i
$223$	4.33013	−	7.50000i	0.289967	−	0.502237i	−0.683835	−	0.729637i	$-0.739689\pi$
$223$	4.33013	−	7.50000i	0.289967	−	0.502237i	0.973801	+	0.227400i	$0.0730224\pi$
$224$	6.39564	−	11.0776i	0.427327	−	0.740152i
$225$	1.11847	+	9.93725i	0.0745649	+	0.662484i
$226$			36.2976i			2.41448i
$227$	−3.05493	−	5.29129i	−0.202763	−	0.351195i	0.746655	−	0.665212i	$-0.231659\pi$
$227$	−3.05493	−	5.29129i	−0.202763	−	0.351195i	−0.949418	+	0.314016i	$0.898325\pi$
$228$	−2.41733	−	4.18693i	−0.160091	−	0.277286i
$229$		−	5.48220i		−	0.362274i	−0.983458	−	0.181137i	$-0.942022\pi$
$229$		−	5.48220i		−	0.362274i	0.983458	−	0.181137i	$-0.0579778\pi$
$230$	7.00959	+	21.3061i	0.462199	+	1.40488i
$231$	2.29129	−	3.96863i	0.150756	−	0.261116i
$232$	3.96863	−	6.87386i	0.260553	−	0.451291i
$233$			21.1652i			1.38658i	0.720661	+	0.693288i	$0.243838\pi$
$233$			21.1652i			1.38658i	−0.720661	+	0.693288i	$0.756162\pi$
$234$	15.1652	+	4.37780i	0.991377	+	0.286186i
$235$	−4.00000	+	19.1652i	−0.260931	+	1.25020i
$236$	8.14337	+	4.70158i	0.530088	+	0.306047i
$237$	−5.19615	−	3.00000i	−0.337526	−	0.194871i
$238$	−15.0462	+	8.68693i	−0.975301	+	0.563090i
$239$		−	20.9753i		−	1.35678i	−0.734702	−	0.678390i	$-0.762678\pi$
$239$		−	20.9753i		−	1.35678i	0.734702	−	0.678390i	$-0.237322\pi$
$240$	−1.25176	−	3.80482i	−0.0808010	−	0.245600i
$241$	−1.50000	+	0.866025i	−0.0966235	+	0.0557856i	−0.547533	−	0.836784i	$-0.684433\pi$
$241$	−1.50000	+	0.866025i	−0.0966235	+	0.0557856i	0.450910	+	0.892570i	$0.351100\pi$
$242$	−8.75560			−0.562832
$243$	13.8564	−	8.00000i	0.888889	−	0.513200i
$244$	14.7695	−	25.5815i	0.945521	−	1.63769i
$245$	6.66888	+	5.96038i	0.426059	+	0.380795i
$246$	5.79129			0.369239
$247$	6.06218	−	1.50000i	0.385727	−	0.0954427i
$248$			16.7477i			1.06348i
$249$	−9.79129	−	5.65300i	−0.620498	−	0.358244i
$250$	−10.2002	−	22.2456i	−0.645118	−	1.40694i
$251$	−9.08258	−	15.7315i	−0.573287	−	0.992962i	−0.996225	−	0.0868039i	$-0.972335\pi$
$251$	−9.08258	−	15.7315i	−0.573287	−	0.992962i	0.422938	−	0.906158i	$-0.360999\pi$
$252$	−9.66930			−0.609109
$253$	6.06218	+	10.5000i	0.381126	+	0.660129i
$254$	−18.4782	+	10.6684i	−1.15943	+	0.669395i
$255$	−2.09355	+	10.0308i	−0.131103	+	0.628153i
$256$	1.39564	+	2.41733i	0.0872277	+	0.151083i
$257$	0.143025	+	0.0825757i	0.00892167	+	0.00515093i	0.504454	−	0.863438i	$-0.331694\pi$
$257$	0.143025	+	0.0825757i	0.00892167	+	0.00515093i	−0.495533	+	0.868589i	$0.665027\pi$
$258$	−1.55130	+	2.68693i	−0.0965798	+	0.167281i
$259$	13.7477			0.854242
$260$	−22.4888	+	0.828086i	−1.39470	+	0.0513557i
$261$	9.16515			0.567309
$262$	1.73205	−	3.00000i	0.107006	−	0.185341i
$263$	−7.79423	−	4.50000i	−0.480613	−	0.277482i	0.240059	−	0.970758i	$-0.422833\pi$
$263$	−7.79423	−	4.50000i	−0.480613	−	0.277482i	−0.720672	+	0.693276i	$0.756167\pi$
$264$	2.29129	+	3.96863i	0.141019	+	0.244252i
$265$	3.46410	+	0.723000i	0.212798	+	0.0444135i
$266$	−5.68693	+	3.28335i	−0.348688	+	0.201315i
$267$	−2.14123	−	3.70871i	−0.131041	−	0.226969i
$268$	41.4938			2.53464
$269$	−7.50000	−	12.9904i	−0.457283	−	0.792038i	0.541533	−	0.840679i	$-0.317844\pi$
$269$	−7.50000	−	12.9904i	−0.457283	−	0.792038i	−0.998816	+	0.0486418i	$0.984511\pi$
$270$	−16.3083	+	18.2469i	−0.992494	+	1.11047i
$271$	7.50000	+	4.33013i	0.455593	+	0.263036i	0.710189	−	0.704011i	$-0.248609\pi$
$271$	7.50000	+	4.33013i	0.455593	+	0.263036i	−0.254597	+	0.967047i	$0.581943\pi$
$272$			8.20871i			0.497726i
$273$	−1.73205	+	6.00000i	−0.104828	+	0.363137i
$274$	0.208712			0.0126088
$275$	−7.85425	−	10.6448i	−0.473629	−	0.641903i
$276$	−6.39564	+	11.0776i	−0.384973	+	0.666792i
$277$	14.3609	−	8.29129i	0.862865	−	0.498175i	−0.00210581	−	0.999998i	$-0.500670\pi$
$277$	14.3609	−	8.29129i	0.862865	−	0.498175i	0.864971	+	0.501823i	$0.167337\pi$
$278$	12.5812			0.754571
$279$	−16.7477	+	9.66930i	−1.00266	+	0.578886i
$280$	6.37221	−	2.09642i	0.380812	−	0.125285i
$281$		−	17.5112i		−	1.04463i	−0.852752	−	0.522316i	$-0.825068\pi$
$281$		−	17.5112i		−	1.04463i	0.852752	−	0.522316i	$-0.174932\pi$
$282$	−16.5975	+	9.58258i	−0.988367	+	0.570634i
$283$	0.218475	+	0.126136i	0.0129870	+	0.00749803i	0.506479	−	0.862252i	$-0.330947\pi$
$283$	0.218475	+	0.126136i	0.0129870	+	0.00749803i	−0.493492	+	0.869750i	$0.664280\pi$
$284$	8.60436	+	4.96773i	0.510575	+	0.294780i
$285$	−0.791288	+	3.79129i	−0.0468718	+	0.224577i
$286$	−20.2695	+	5.01540i	−1.19856	+	0.296567i
$287$		−	4.58258i		−	0.270501i
$288$	−7.38505	+	12.7913i	−0.435168	+	0.753734i
$289$	2.00000	−	3.46410i	0.117647	−	0.203771i
$290$	−21.3061	+	7.00959i	−1.25114	+	0.411617i
$291$			4.47315i			0.262221i
$292$		0			0
$293$	11.7152	+	20.2913i	0.684408	+	1.18543i	0.973622	+	0.228165i	$0.0732727\pi$
$293$	11.7152	+	20.2913i	0.684408	+	1.18543i	−0.289214	+	0.957264i	$0.593394\pi$
$294$			8.75560i			0.510637i
$295$	−2.35411	−	7.15546i	−0.137061	−	0.416607i
$296$	−6.87386	+	11.9059i	−0.399535	+	0.692015i
$297$	−6.61438	+	11.4564i	−0.383805	+	0.664770i
$298$		−	21.3739i		−	1.23815i
$299$	−11.4564	−	11.9059i	−0.662543	−	0.688535i
$300$	5.58258	−	12.7913i	0.322310	−	0.738505i
$301$	2.12614	+	1.22753i	0.122548	+	0.0707534i
$302$	11.7629	+	6.79129i	0.676876	+	0.390795i
$303$	7.79423	−	4.50000i	0.447767	−	0.258518i
$304$			3.10260i			0.177946i
$305$	−22.4781	+	7.39517i	−1.28709	+	0.423446i
$306$	17.3739	−	10.0308i	0.993198	−	0.573423i
$307$	−24.2487			−1.38395			−0.691974	−	0.721923i	$-0.743259\pi$
$307$	−24.2487			−1.38395			−0.691974	+	0.721923i	$0.743259\pi$
$308$	11.0776	−	6.39564i	0.631204	−	0.364426i
$309$	−7.58258	+	13.1334i	−0.431358	+	0.747133i
$310$	31.5381	−	35.2869i	1.79124	−	2.00416i
$311$	−1.58258			−0.0897396			−0.0448698	−	0.998993i	$-0.514287\pi$
$311$	−1.58258			−0.0897396			−0.0448698	+	0.998993i	$0.514287\pi$
$312$	−4.33013	−	4.50000i	−0.245145	−	0.254762i
$313$		−	30.7477i		−	1.73796i	−0.494843	−	0.868982i	$-0.664775\pi$
$313$		−	30.7477i		−	1.73796i	0.494843	−	0.868982i	$-0.335225\pi$
$314$	17.3739	+	10.0308i	0.980464	+	0.566071i
$315$	5.77542	+	5.16184i	0.325408	+	0.290837i
$316$	−8.37386	−	14.5040i	−0.471067	−	0.815911i
$317$	−20.9753			−1.17809			−0.589045	−	0.808100i	$-0.700496\pi$
$317$	−20.9753			−1.17809			−0.589045	+	0.808100i	$0.700496\pi$
$318$	1.73205	+	3.00000i	0.0971286	+	0.168232i
$319$	−10.5000	+	6.06218i	−0.587887	+	0.339417i
$320$	5.74835	−	27.5420i	0.321343	−	1.53965i
$321$	0.708712	+	1.22753i	0.0395565	+	0.0685138i
$322$	15.0462	+	8.68693i	0.838492	+	0.484104i
$323$	3.96863	−	6.87386i	0.220820	−	0.382472i
$324$	2.79129			0.155072
$325$	13.8745	+	11.5108i	0.769619	+	0.638503i
$326$	23.3739			1.29456
$327$	1.37055	−	2.37386i	0.0757916	−	0.131275i
$328$	3.96863	+	2.29129i	0.219131	+	0.126515i
$329$	7.58258	+	13.1334i	0.418041	+	0.724068i
$330$	2.64575	−	12.6766i	0.145644	−	0.697821i
$331$	9.87386	−	5.70068i	0.542717	−	0.313338i	−0.203463	−	0.979083i	$-0.565220\pi$
$331$	9.87386	−	5.70068i	0.542717	−	0.313338i	0.746179	+	0.665745i	$0.231886\pi$
$332$	−15.7792	−	27.3303i	−0.865994	−	1.49995i
$333$	−15.8745			−0.869918
$334$	−4.68693	−	8.11800i	−0.256457	−	0.444197i
$335$	−24.7840	−	22.1509i	−1.35409	−	1.21023i
$336$	−2.68693	−	1.55130i	−0.146584	−	0.0846304i
$337$		−	3.25227i		−	0.177163i	−0.996069	−	0.0885813i	$-0.971767\pi$
$337$		−	3.25227i		−	0.177163i	0.996069	−	0.0885813i	$-0.0282333\pi$
$338$	25.1724	−	13.2695i	1.36920	−	0.721766i
$339$	16.5826			0.900642
$340$	−19.0602	+	21.3259i	−1.03369	+	1.15656i
$341$	12.7913	−	22.1552i	0.692687	−	1.19977i
$342$	6.56670	−	3.79129i	0.355087	−	0.205009i
$343$	19.0526			1.02874
$344$	−2.12614	+	1.22753i	−0.114634	+	0.0661837i
$345$	9.73371	−	3.20233i	0.524045	−	0.172408i
$346$			16.2360i			0.872853i
$347$	−13.2764	+	7.66515i	−0.712716	+	0.411487i	−0.812066	−	0.583566i	$-0.801657\pi$
$347$	−13.2764	+	7.66515i	−0.712716	+	0.411487i	0.0993497	+	0.995053i	$0.468324\pi$
$348$	−11.0776	−	6.39564i	−0.593821	−	0.342843i
$349$	15.8739	+	9.16478i	0.849708	+	0.490579i	0.860552	−	0.509362i	$-0.170118\pi$
$349$	15.8739	+	9.16478i	0.849708	+	0.490579i	−0.0108440	+	0.999941i	$0.503452\pi$
$350$	−17.3739	−	7.58258i	−0.928672	−	0.405306i
$351$	5.00000	−	17.3205i	0.266880	−	0.924500i
$352$		−	19.5390i		−	1.04143i
$353$	−8.70793	+	15.0826i	−0.463476	+	0.802765i	−0.999131	−	0.0416724i	$-0.986731\pi$
$353$	−8.70793	+	15.0826i	−0.463476	+	0.802765i	0.535655	+	0.844437i	$0.320065\pi$
$354$	3.68693	−	6.38595i	0.195958	−	0.339410i
$355$	−2.48737	−	7.56052i	−0.132016	−	0.401271i
$356$		−	11.9536i		−	0.633537i
$357$	3.96863	+	6.87386i	0.210042	+	0.363803i
$358$	0.180750	+	0.313068i	0.00955294	+	0.0165462i
$359$			33.3857i			1.76203i	0.473088	+	0.881015i	$0.343139\pi$
$359$			33.3857i			1.76203i	−0.473088	+	0.881015i	$0.656861\pi$
$360$	−7.35799	+	2.42074i	−0.387800	+	0.127584i
$361$	−8.00000	+	13.8564i	−0.421053	+	0.729285i
$362$	−20.5185	+	35.5390i	−1.07843	+	1.86789i
$363$			4.00000i			0.209946i
$364$	−12.5608	+	12.0866i	−0.658365	+	0.633512i
$365$		0			0
$366$	−20.0608	−	11.5821i	−1.04859	−	0.605406i
$367$	22.2982	+	12.8739i	1.16396	+	0.672010i	0.952249	−	0.305323i	$-0.0987644\pi$
$367$	22.2982	+	12.8739i	1.16396	+	0.672010i	0.211707	+	0.977333i	$0.432098\pi$
$368$	7.10895	−	4.10436i	0.370580	−	0.213954i
$369$			5.29150i			0.275465i
$370$	36.9033	−	12.1410i	1.91851	−	0.631179i
$371$	2.37386	−	1.37055i	0.123245	−	0.0711554i
$372$	26.9898			1.39936
$373$	−11.2583	+	6.50000i	−0.582934	+	0.336557i	−0.762299	−	0.647225i	$-0.775929\pi$
$373$	−11.2583	+	6.50000i	−0.582934	+	0.336557i	0.179364	+	0.983783i	$0.442596\pi$
$374$	−13.2695	+	22.9835i	−0.686150	+	1.18845i
$375$	−10.1629	+	4.65997i	−0.524810	+	0.240640i
$376$	−15.1652			−0.782083
$377$	11.9059	−	11.4564i	0.613184	−	0.590037i
$378$			18.9564i			0.975014i
$379$	18.2477	+	10.5353i	0.937323	+	0.541164i	0.889120	−	0.457674i	$-0.151317\pi$
$379$	18.2477	+	10.5353i	0.937323	+	0.541164i	0.0482027	+	0.998838i	$0.484651\pi$
$380$	−7.20409	+	8.06042i	−0.369562	+	0.413491i
$381$	4.87386	+	8.44178i	0.249696	+	0.432485i
$382$	16.2360			0.830706
$383$	1.41823	+	2.45644i	0.0724680	+	0.125518i	0.899982	−	0.435926i	$-0.143579\pi$
$383$	1.41823	+	2.45644i	0.0724680	+	0.125518i	−0.827514	+	0.561444i	$0.810246\pi$
$384$	11.0608	−	6.38595i	0.564444	−	0.325882i
$385$	−10.0308	−	2.09355i	−0.511217	−	0.106697i
$386$	−1.10436	−	1.91280i	−0.0562102	−	0.0973590i
$387$	−2.45505	−	1.41742i	−0.124797	−	0.0720517i
$388$	−6.24293	+	10.8131i	−0.316937	+	0.548950i
$389$	−15.1652			−0.768904			−0.384452	−	0.923145i	$-0.625610\pi$
$389$	−15.1652			−0.768904			−0.384452	+	0.923145i	$0.625610\pi$
$390$	0.649377	+	17.6355i	0.0328825	+	0.893010i
$391$	−21.0000			−1.06202
$392$	−3.46410	+	6.00000i	−0.174964	+	0.303046i
$393$	−1.37055	−	0.791288i	−0.0691351	−	0.0399152i
$394$	−21.8521	−	37.8489i	−1.10089	−	1.90680i
$395$	−2.74110	+	13.1334i	−0.137920	+	0.660813i
$396$	−12.7913	+	7.38505i	−0.642786	+	0.371113i
$397$	−13.6379	−	23.6216i	−0.684468	−	1.18553i	−0.973604	−	0.228245i	$-0.926701\pi$
$397$	−13.6379	−	23.6216i	−0.684468	−	1.18553i	0.289135	−	0.957288i	$-0.406632\pi$
$398$	3.10260			0.155519
$399$	1.50000	+	2.59808i	0.0750939	+	0.130066i
$400$	−7.20696	+	5.31767i	−0.360348	+	0.265883i
$401$	10.8303	+	6.25288i	0.540840	+	0.312254i	0.745419	−	0.666596i	$-0.232249\pi$
$401$	10.8303	+	6.25288i	0.540840	+	0.312254i	−0.204580	+	0.978850i	$0.565583\pi$
$402$		−	32.5390i		−	1.62290i
$403$	−9.66930	+	33.4955i	−0.481662	+	1.66853i
$404$	25.1216			1.24985
$405$	−1.66722	−	1.49009i	−0.0828448	−	0.0740434i
$406$	−8.68693	+	15.0462i	−0.431125	+	0.746731i
$407$	18.1865	−	10.5000i	0.901473	−	0.520466i
$408$	−7.93725			−0.392953
$409$	7.50000	−	4.33013i	0.370851	−	0.214111i	−0.302979	−	0.952997i	$-0.597981\pi$
$409$	7.50000	−	4.33013i	0.370851	−	0.214111i	0.673830	+	0.738886i	$0.264648\pi$
$410$	−4.04699	−	12.3011i	−0.199867	−	0.607508i
$411$		−	0.0953502i		−	0.00470328i
$412$	−36.6591	+	21.1652i	−1.80607	+	1.04273i
$413$	−5.05313	−	2.91742i	−0.248648	−	0.143557i
$414$	−17.3739	−	10.0308i	−0.853879	−	0.492987i
$415$	−5.16515	+	24.7477i	−0.253547	+	1.21482i
$416$	6.39564	+	25.8477i	0.313572	+	1.26729i
$417$		−	5.74773i		−	0.281467i
$418$	−5.01540	+	8.68693i	−0.245311	+	0.424892i
$419$	−12.0826	+	20.9276i	−0.590272	+	1.02238i	0.403923	+	0.914793i	$0.367646\pi$
$419$	−12.0826	+	20.9276i	−0.590272	+	1.02238i	−0.994195	+	0.107589i	$0.965687\pi$
$420$	−3.37849	−	10.2691i	−0.164853	−	0.501083i
$421$		−	26.2668i		−	1.28017i	−0.768306	−	0.640083i	$-0.778900\pi$
$421$		−	26.2668i		−	1.28017i	0.768306	−	0.640083i	$-0.221100\pi$
$422$	19.8809	+	34.4347i	0.967785	+	1.67625i
$423$	−8.75560	−	15.1652i	−0.425712	−	0.737355i
$424$			2.74110i			0.133120i
$425$	22.7691	−	2.56275i	1.10446	−	0.124311i
$426$	3.89564	−	6.74745i	0.188745	−	0.326915i
$427$	−9.16478	+	15.8739i	−0.443515	+	0.768190i
$428$			3.95644i			0.191242i
$429$	2.29129	+	9.26013i	0.110624	+	0.447083i
$430$	6.79129	+	1.41742i	0.327505	+	0.0683543i
$431$	25.6652	+	14.8178i	1.23625	+	0.713747i	0.968325	−	0.249693i	$-0.0803298\pi$
$431$	25.6652	+	14.8178i	1.23625	+	0.713747i	0.267922	+	0.963441i	$0.413663\pi$
$432$	7.75650	+	4.47822i	0.373185	+	0.215458i
$433$	−15.3700	+	8.87386i	−0.738634	+	0.426451i	−0.821573	−	0.570104i	$-0.806903\pi$
$433$	−15.3700	+	8.87386i	−0.738634	+	0.426451i	0.0829383	+	0.996555i	$0.473570\pi$
$434$		−	36.6591i		−	1.75969i
$435$	3.20233	+	9.73371i	0.153540	+	0.466696i
$436$	6.62614	−	3.82560i	0.317334	−	0.183213i
$437$	−7.93725			−0.379690
$438$		0			0
$439$	20.2477	−	35.0701i	0.966371	−	1.67380i	0.260487	−	0.965477i	$-0.416117\pi$
$439$	20.2477	−	35.0701i	0.966371	−	1.67380i	0.705885	−	0.708327i	$-0.250550\pi$
$440$	6.82847	−	7.64016i	0.325535	−	0.364230i
$441$	−8.00000			−0.380952
$442$	10.0308	−	34.7477i	0.477117	−	1.65278i
$443$		−	25.9129i		−	1.23116i	−0.788075	−	0.615579i	$-0.788922\pi$
$443$		−	25.9129i		−	1.23116i	0.788075	−	0.615579i	$-0.211078\pi$
$444$	19.1869	+	11.0776i	0.910571	+	0.525719i
$445$	−6.38126	+	7.13978i	−0.302501	+	0.338458i
$446$	−9.47822	−	16.4168i	−0.448807	−	0.777356i
$447$	−9.76465			−0.461852
$448$	−10.8968	−	18.8739i	−0.514827	−	0.891706i
$449$	32.4564	−	18.7387i	1.53171	−	0.884336i	0.532431	−	0.846473i	$-0.321279\pi$
$449$	32.4564	−	18.7387i	1.53171	−	0.884336i	0.999283	−	0.0378622i	$-0.0120548\pi$
$450$	20.0616	+	8.75560i	0.945713	+	0.412743i
$451$	−3.50000	−	6.06218i	−0.164809	−	0.285457i
$452$	40.0855	+	23.1434i	1.88546	+	1.08857i
$453$	3.10260	−	5.37386i	0.145773	−	0.252486i
$454$	−13.3739			−0.627667
$455$	13.9548	−	0.513844i	0.654210	−	0.0240894i
$456$	−3.00000			−0.140488
$457$	−0.866025	+	1.50000i	−0.0405110	+	0.0701670i	−0.885570	−	0.464506i	$-0.846232\pi$
$457$	−0.866025	+	1.50000i	−0.0405110	+	0.0701670i	0.845059	+	0.534673i	$0.179565\pi$
$458$	−10.3923	−	6.00000i	−0.485601	−	0.280362i
$459$	−11.4564	−	19.8431i	−0.534741	−	0.926198i
$460$	27.9989	+	5.84370i	1.30545	+	0.272464i
$461$	−1.03901	+	0.599876i	−0.0483917	+	0.0279390i	−0.524001	−	0.851718i	$-0.675561\pi$
$461$	−1.03901	+	0.599876i	−0.0483917	+	0.0279390i	0.475609	+	0.879657i	$0.342228\pi$
$462$	−5.01540	−	8.68693i	−0.233338	−	0.404153i
$463$	8.22330			0.382169			0.191085	−	0.981574i	$-0.438799\pi$
$463$	8.22330			0.382169			0.191085	+	0.981574i	$0.438799\pi$
$464$	4.10436	+	7.10895i	0.190540	+	0.330025i
$465$	−16.1208	−	14.4082i	−0.747586	−	0.668163i
$466$	40.1216	+	23.1642i	1.85860	+	1.07306i
$467$		−	12.3303i		−	0.570578i	−0.958441	−	0.285289i	$-0.907910\pi$
$467$		−	12.3303i		−	0.570578i	0.958441	−	0.285289i	$-0.0920896\pi$
$468$	14.5040	−	13.9564i	0.670446	−	0.645137i
$469$	−25.7477			−1.18892
$470$	31.9525	+	28.5579i	1.47386	+	1.31728i
$471$	4.58258	−	7.93725i	0.211154	−	0.365729i
$472$	5.05313	−	2.91742i	0.232589	−	0.134285i
$473$	3.75015			0.172432
$474$	−11.3739	+	6.56670i	−0.522419	+	0.301619i
$475$	8.60591	−	0.968627i	0.394866	−	0.0444437i
$476$			22.1552i			1.01548i
$477$	−2.74110	+	1.58258i	−0.125506	+	0.0724612i
$478$	−39.7617	−	22.9564i	−1.81866	−	1.05000i
$479$	−28.0390	−	16.1883i	−1.28114	−	0.739664i	−0.304079	−	0.952647i	$-0.598349\pi$
$479$	−28.0390	−	16.1883i	−1.28114	−	0.739664i	−0.977056	+	0.212983i	$0.931682\pi$
$480$	−16.1652	−	3.37386i	−0.737835	−	0.153995i
$481$	−20.6216	+	19.8431i	−0.940264	+	0.904769i
$482$			3.79129i			0.172688i
$483$	3.96863	−	6.87386i	0.180579	−	0.312772i
$484$	−5.58258	+	9.66930i	−0.253753	+	0.439514i
$485$	9.50128	−	3.12587i	0.431431	−	0.141938i
$486$		−	35.0224i		−	1.58865i
$487$	10.5353	+	18.2477i	0.477401	+	0.826883i	0.999665	−	0.0259009i	$-0.00824545\pi$
$487$	10.5353	+	18.2477i	0.477401	+	0.826883i	−0.522263	+	0.852784i	$0.674912\pi$
$488$	−9.16478	−	15.8739i	−0.414870	−	0.718576i
$489$		−	10.6784i		−	0.482892i
$490$	18.5975	−	6.11847i	0.840150	−	0.276404i
$491$	−14.2913	+	24.7532i	−0.644957	+	1.11710i	0.339355	+	0.940658i	$0.389791\pi$
$491$	−14.2913	+	24.7532i	−0.644957	+	1.11710i	−0.984311	+	0.176439i	$0.943542\pi$
$492$	3.69253	−	6.39564i	0.166472	−	0.288338i
$493$		−	21.0000i		−	0.945792i
$494$	3.79129	−	13.1334i	0.170578	−	0.590900i
$495$	11.5826	+	2.41742i	0.520598	+	0.108655i
$496$	−15.0000	−	8.66025i	−0.673520	−	0.388857i
$497$	−5.33918	−	3.08258i	−0.239495	−	0.138272i
$498$	−21.4322	+	12.3739i	−0.960398	+	0.554486i
$499$			16.5975i			0.743006i	0.928432	+	0.371503i	$0.121158\pi$
$499$			16.5975i			0.743006i	−0.928432	+	0.371503i	$0.878842\pi$
$500$	−31.0707	−	2.91914i	−1.38952	−	0.130548i
$501$	−3.70871	+	2.14123i	−0.165693	+	0.0956629i
$502$	−39.7617			−1.77465
$503$	−15.7315	+	9.08258i	−0.701432	+	0.404972i	−0.807881	−	0.589346i	$-0.799385\pi$
$503$	−15.7315	+	9.08258i	−0.701432	+	0.404972i	0.106448	+	0.994318i	$0.466052\pi$
$504$	−3.00000	+	5.19615i	−0.133631	+	0.231455i
$505$	−15.0050	−	13.4109i	−0.667712	−	0.596775i
$506$	26.5390			1.17980
$507$	−6.06218	−	11.5000i	−0.269231	−	0.510733i
$508$			27.2087i			1.20719i
$509$	−25.6652	−	14.8178i	−1.13759	−	0.656787i	−0.191756	−	0.981443i	$-0.561418\pi$
$509$	−25.6652	−	14.8178i	−1.13759	−	0.656787i	−0.945832	+	0.324656i	$0.894751\pi$
$510$	16.7235	+	14.9468i	0.740531	+	0.661857i
$511$		0			0
$512$	−19.4340			−0.858868
$513$	−4.33013	−	7.50000i	−0.191180	−	0.331133i
$514$	0.313068	−	0.180750i	0.0138088	−	0.00797254i
$515$	33.1950	+	6.92820i	1.46275	+	0.305293i
$516$	1.97822	+	3.42638i	0.0870863	+	0.150838i
$517$	20.0616	+	11.5826i	0.882309	+	0.509401i
$518$	15.0462	−	26.0608i	0.661092	−	1.14505i
$519$	7.41742			0.325589
$520$	−6.53239	+	12.3421i	−0.286464	+	0.541238i
$521$	−27.4955			−1.20460			−0.602299	−	0.798271i	$-0.705748\pi$
$521$	−27.4955			−1.20460			−0.602299	+	0.798271i	$0.705748\pi$
$522$	10.0308	−	17.3739i	0.439036	−	0.760433i
$523$	15.7315	+	9.08258i	0.687890	+	0.397153i	0.802821	−	0.596220i	$-0.203331\pi$
$523$	15.7315	+	9.08258i	0.687890	+	0.397153i	−0.114931	+	0.993373i	$0.536665\pi$
$524$	−2.20871	−	3.82560i	−0.0964880	−	0.167122i
$525$	−3.46410	+	7.93725i	−0.151186	+	0.346410i
$526$	−17.0608	+	9.85005i	−0.743886	+	0.429483i
$527$	22.1552	+	38.3739i	0.965094	+	1.67159i
$528$	−4.73930			−0.206252
$529$	−1.00000	−	1.73205i	−0.0434783	−	0.0753066i
$530$	5.16184	−	5.77542i	0.224216	−	0.250868i
$531$	5.83485	+	3.36875i	0.253211	+	0.146191i
$532$			8.37386i			0.363053i
$533$	6.61438	+	6.87386i	0.286501	+	0.297740i
$534$	−9.37386			−0.405647
$535$	2.11210	−	2.36316i	0.0913139	−	0.102168i
$536$	12.8739	−	22.2982i	0.556066	−	0.963135i
$537$	0.143025	−	0.0825757i	0.00617200	−	0.00356340i
$538$	−32.8335			−1.41555
$539$	9.16515	−	5.29150i	0.394771	−	0.227921i
$540$	9.75285	+	29.6444i	0.419696	+	1.27569i
$541$		−	10.3923i		−	0.446800i	−0.974727	−	0.223400i	$-0.928284\pi$
$541$		−	10.3923i		−	0.446800i	0.974727	−	0.223400i	$-0.0717156\pi$
$542$	16.4168	−	9.47822i	0.705160	−	0.407124i
$543$	16.2360	+	9.37386i	0.696754	+	0.402271i
$544$	29.3085	+	16.9213i	1.25659	+	0.725494i
$545$	−6.00000	−	1.25227i	−0.257012	−	0.0536415i
$546$	9.47822	+	9.85005i	0.405630	+	0.421543i
$547$		−	1.25227i		−	0.0535433i	−0.999642	−	0.0267717i	$-0.991477\pi$
$547$		−	1.25227i		−	0.0535433i	0.999642	−	0.0267717i	$-0.00852270\pi$
$548$	0.133075	−	0.230493i	0.00568468	−	0.00984615i
$549$	10.5826	−	18.3296i	0.451653	−	0.782287i
$550$	−28.7747	+	3.23870i	−1.22696	+	0.138099i
$551$		−	7.93725i		−	0.338138i
$552$	3.96863	+	6.87386i	0.168916	+	0.292571i
$553$	5.19615	+	9.00000i	0.220963	+	0.382719i
$554$		−	36.2976i		−	1.54214i
$555$	−5.54661	−	16.8593i	−0.235440	−	0.715636i
$556$	8.02178	−	13.8941i	0.340199	−	0.589242i
$557$	−6.51903	+	11.2913i	−0.276220	+	0.478427i	−0.970442	−	0.241334i	$-0.922415\pi$
$557$	−6.51903	+	11.2913i	−0.276220	+	0.478427i	0.694222	+	0.719761i	$0.255749\pi$
$558$			42.3303i			1.79198i
$559$	−4.96099	+	1.22753i	−0.209827	+	0.0519188i
$560$	−1.41742	+	6.79129i	−0.0598971	+	0.286984i
$561$	10.5000	+	6.06218i	0.443310	+	0.255945i
$562$	−33.1950	−	19.1652i	−1.40025	−	0.808433i
$563$	−7.79423	+	4.50000i	−0.328488	+	0.189652i	−0.655169	−	0.755482i	$-0.727403\pi$
$563$	−7.79423	+	4.50000i	−0.328488	+	0.189652i	0.326682	+	0.945134i	$0.394069\pi$
$564$			24.4394i			1.02908i
$565$	−11.5880	−	35.2225i	−0.487511	−	1.48182i
$566$	0.478220	−	0.276100i	0.0201011	−	0.0116054i
$567$	−1.73205			−0.0727393
$568$	5.33918	−	3.08258i	0.224027	−	0.129342i
$569$	−9.87386	+	17.1020i	−0.413934	+	0.716955i	−0.995316	−	0.0966762i	$-0.969179\pi$
$569$	−9.87386	+	17.1020i	−0.413934	+	0.716955i	0.581382	+	0.813631i	$0.302512\pi$
$570$	6.32091	+	5.64938i	0.264754	+	0.236626i
$571$	29.0780			1.21688			0.608439	−	0.793601i	$-0.291796\pi$
$571$	29.0780			1.21688			0.608439	+	0.793601i	$0.291796\pi$
$572$	−7.38505	+	25.5826i	−0.308785	+	1.06966i
$573$		−	7.41742i		−	0.309867i
$574$	−8.68693	−	5.01540i	−0.362586	−	0.209339i
$575$	−13.6040	−	18.4373i	−0.567324	−	0.768887i
$576$	12.5826	+	21.7937i	0.524274	+	0.908069i
$577$	6.92820			0.288425			0.144212	−	0.989547i	$-0.453935\pi$
$577$	6.92820			0.288425			0.144212	+	0.989547i	$0.453935\pi$
$578$	−4.37780	−	7.58258i	−0.182093	−	0.315394i
$579$	−0.873864	+	0.504525i	−0.0363165	+	0.0209674i
$580$	−5.84370	+	27.9989i	−0.242647	+	1.16259i
$581$	9.79129	+	16.9590i	0.406211	+	0.703578i
$582$	8.47950	+	4.89564i	0.351487	+	0.202931i
$583$	2.09355	−	3.62614i	0.0867060	−	0.150179i
$584$		0			0
$585$	−16.1136	+	0.593336i	−0.666215	+	0.0245314i
$586$	51.2867			2.11864
$587$	9.35548	−	16.2042i	0.386142	−	0.668818i	−0.605785	−	0.795628i	$-0.707141\pi$
$587$	9.35548	−	16.2042i	0.386142	−	0.668818i	0.991927	+	0.126811i	$0.0404741\pi$
$588$	9.66930	+	5.58258i	0.398755	+	0.230222i
$589$	8.37386	+	14.5040i	0.345039	+	0.597625i
$590$	−16.1407	−	3.36875i	−0.664500	−	0.138689i
$591$	−17.2913	+	9.98313i	−0.711269	+	0.410651i
$592$	−7.10895	−	12.3131i	−0.292176	−	0.506064i
$593$	−21.1660			−0.869184			−0.434592	−	0.900627i	$-0.643107\pi$
$593$	−21.1660			−0.869184			−0.434592	+	0.900627i	$0.643107\pi$
$594$	14.4782	+	25.0770i	0.594049	+	1.02892i
$595$	11.8273	−	13.2331i	0.484870	−	0.542506i
$596$	−23.6044	−	13.6280i	−0.966872	−	0.558224i
$597$		−	1.41742i		−	0.0580113i
$598$	−35.1078	+	8.68693i	−1.43567	+	0.355235i
$599$	39.4955			1.61374			0.806870	−	0.590729i	$-0.201160\pi$
$599$	39.4955			1.61374			0.806870	+	0.590729i	$0.201160\pi$
$600$	−5.14181	−	6.96863i	−0.209914	−	0.284493i
$601$	14.4564	−	25.0393i	0.589690	−	1.02137i	−0.404582	−	0.914502i	$-0.632583\pi$
$601$	14.4564	−	25.0393i	0.589690	−	1.02137i	0.994273	−	0.106872i	$-0.0340836\pi$
$602$	4.65390	−	2.68693i	0.189679	−	0.109511i
$603$	29.7309			1.21074
$604$	15.0000	−	8.66025i	0.610341	−	0.352381i
$605$	8.49628	−	2.79523i	0.345423	−	0.113642i
$606$		−	19.7001i		−	0.800262i
$607$	17.1020	−	9.87386i	0.694150	−	0.400768i	−0.111015	−	0.993819i	$-0.535410\pi$
$607$	17.1020	−	9.87386i	0.694150	−	0.400768i	0.805165	+	0.593051i	$0.202077\pi$
$608$	11.0776	+	6.39564i	0.449255	+	0.259378i
$609$	6.87386	+	3.96863i	0.278543	+	0.160817i
$610$	−10.5826	+	50.7042i	−0.428476	+	2.05295i
$611$	−30.3303	−	8.75560i	−1.22703	−	0.354214i
$612$		−	25.5826i		−	1.03411i
$613$	10.8968	−	18.8739i	0.440119	−	0.762308i	−0.557579	−	0.830124i	$-0.688270\pi$
$613$	10.8968	−	18.8739i	0.440119	−	0.762308i	0.997698	+	0.0678157i	$0.0216030\pi$
$614$	−26.5390	+	45.9669i	−1.07103	+	1.85507i
$615$	−5.61976	+	1.84887i	−0.226611	+	0.0745536i
$616$		−	7.93725i		−	0.319801i
$617$	1.68438	+	2.91742i	0.0678104	+	0.117451i	0.897937	−	0.440124i	$-0.145065\pi$
$617$	1.68438	+	2.91742i	0.0678104	+	0.117451i	−0.830127	+	0.557575i	$0.811732\pi$
$618$	16.5975	+	28.7477i	0.667650	+	1.15640i
$619$			2.01810i			0.0811143i	0.999177	+	0.0405572i	$0.0129133\pi$
$619$			2.01810i			0.0811143i	−0.999177	+	0.0405572i	$0.987087\pi$
$620$	−18.8607	−	57.3282i	−0.757462	−	2.30236i
$621$	−11.4564	+	19.8431i	−0.459731	+	0.796278i
$622$	−1.73205	+	3.00000i	−0.0694489	+	0.120289i
$623$			7.41742i			0.297173i
$624$	6.26951	−	1.55130i	0.250981	−	0.0621017i
$625$	17.0000	+	18.3303i	0.680000	+	0.733212i
$626$	−58.2867	−	33.6519i	−2.32961	−	1.34500i
$627$	3.96863	+	2.29129i	0.158492	+	0.0915052i
$628$	22.1552	−	12.7913i	0.884087	−	0.510428i
$629$			36.3731i			1.45029i
$630$	16.1059	−	5.29875i	0.641675	−	0.211107i
$631$	−18.8739	+	10.8968i	−0.751357	+	0.433796i	−0.826184	−	0.563401i	$-0.809493\pi$
$631$	−18.8739	+	10.8968i	−0.751357	+	0.433796i	0.0748272	+	0.997197i	$0.476159\pi$
$632$	−10.3923			−0.413384
$633$	15.7315	−	9.08258i	0.625270	−	0.361000i
$634$	−22.9564	+	39.7617i	−0.911717	+	1.57914i
$635$	14.5250	−	16.2516i	0.576408	−	0.644925i
$636$	4.41742			0.175162
$637$	−10.3923	+	10.0000i	−0.411758	+	0.396214i
$638$			26.5390i			1.05069i
$639$	6.16515	+	3.55945i	0.243890	+	0.140810i
$640$	−21.2936	−	19.0313i	−0.841702	−	0.752280i
$641$	0.0825757	+	0.143025i	0.00326154	+	0.00564916i	0.867652	−	0.497173i	$-0.165628\pi$
$641$	0.0825757	+	0.143025i	0.00326154	+	0.00564916i	−0.864390	+	0.502822i	$0.832295\pi$
$642$	3.10260			0.122450
$643$	2.95958	+	5.12614i	0.116714	+	0.202155i	0.918464	−	0.395505i	$-0.129430\pi$
$643$	2.95958	+	5.12614i	0.116714	+	0.202155i	−0.801749	+	0.597660i	$0.796097\pi$
$644$	19.1869	−	11.0776i	0.756071	−	0.436518i
$645$	0.647551	−	3.10260i	0.0254973	−	0.122165i
$646$	−8.68693	−	15.0462i	−0.341783	−	0.591985i
$647$	23.3827	+	13.5000i	0.919268	+	0.530740i	0.883402	−	0.468617i	$-0.155247\pi$
$647$	23.3827	+	13.5000i	0.919268	+	0.530740i	0.0358667	+	0.999357i	$0.488581\pi$
$648$	0.866025	−	1.50000i	0.0340207	−	0.0589256i
$649$	−8.91288			−0.349861
$650$	37.0053	−	13.7031i	1.45147	−	0.537482i
$651$	−16.7477			−0.656395
$652$	14.9032	−	25.8131i	0.583654	−	1.01092i
$653$	−42.2843	−	24.4129i	−1.65471	−	0.955350i	−0.975096	−	0.221784i	$-0.928812\pi$
$653$	−42.2843	−	24.4129i	−1.65471	−	0.955350i	−0.679619	−	0.733566i	$-0.737855\pi$
$654$	−3.00000	−	5.19615i	−0.117309	−	0.203186i
$655$	−0.723000	+	3.46410i	−0.0282500	+	0.135354i
$656$	−4.10436	+	2.36965i	−0.160248	+	0.0925193i
$657$		0			0
$658$	33.1950			1.29408
$659$	−12.2477	−	21.2137i	−0.477104	−	0.826368i	0.522552	−	0.852607i	$-0.324980\pi$
$659$	−12.2477	−	21.2137i	−0.477104	−	0.826368i	−0.999656	+	0.0262396i	$0.991647\pi$
$660$	−12.3125	−	11.0044i	−0.479263	−	0.428347i
$661$	2.12614	+	1.22753i	0.0826971	+	0.0477452i	0.540778	−	0.841165i	$-0.318130\pi$
$661$	2.12614	+	1.22753i	0.0826971	+	0.0477452i	−0.458081	+	0.888910i	$0.651463\pi$
$662$		−	24.9564i		−	0.969960i
$663$	−15.8745	−	4.58258i	−0.616515	−	0.177972i
$664$	−19.5826			−0.759951
$665$	4.47028	−	5.00166i	0.173350	−	0.193956i
$666$	−17.3739	+	30.0924i	−0.673224	+	1.16606i
$667$	−18.1865	+	10.5000i	−0.704185	+	0.406562i
$668$	−11.9536			−0.462497
$669$	−7.50000	+	4.33013i	−0.289967	+	0.167412i
$670$	−69.1151	+	22.7385i	−2.67015	+	0.878464i
$671$			27.9989i			1.08088i
$672$	−11.0776	+	6.39564i	−0.427327	+	0.246717i
$673$	5.05313	+	2.91742i	0.194784	+	0.112458i	0.594220	−	0.804302i	$-0.297461\pi$
$673$	5.05313	+	2.91742i	0.194784	+	0.112458i	−0.399436	+	0.916761i	$0.630794\pi$
$674$	−6.16515	−	3.55945i	−0.237473	−	0.137105i
$675$	10.0000	−	22.9129i	0.384900	−	0.881917i
$676$	1.39564	−	36.2599i	0.0536786	−	1.39461i
$677$			21.1652i			0.813443i	0.913552	+	0.406721i	$0.133328\pi$
$677$			21.1652i			0.813443i	−0.913552	+	0.406721i	$0.866672\pi$
$678$	18.1488	−	31.4347i	0.697001	−	1.20724i
$679$	3.87386	−	6.70973i	0.148665	−	0.257496i
$680$	5.54661	+	16.8593i	0.212703	+	0.646524i
$681$			6.10985i			0.234130i
$682$	−27.9989	−	48.4955i	−1.07213	−	1.85699i
$683$	−5.96683	−	10.3348i	−0.228314	−	0.395452i	0.728994	−	0.684520i	$-0.239988\pi$
$683$	−5.96683	−	10.3348i	−0.228314	−	0.395452i	−0.957309	+	0.289068i	$0.906655\pi$
$684$		−	9.66930i		−	0.369715i
$685$	−0.202530	+	0.0666313i	−0.00773829	+	0.00254585i
$686$	20.8521	−	36.1169i	0.796136	−	1.37895i
$687$	−2.74110	+	4.74773i	−0.104580	+	0.181137i
$688$		−	2.53901i		−	0.0967990i
$689$	−1.58258	+	5.48220i	−0.0602913	+	0.208855i
$690$	4.58258	−	21.9564i	0.174456	−	0.835867i
$691$	30.8739	+	17.8250i	1.17450	+	0.678096i	0.954735	−	0.297457i	$-0.0961386\pi$
$691$	30.8739	+	17.8250i	1.17450	+	0.678096i	0.219762	+	0.975554i	$0.429472\pi$
$692$	17.9303	+	10.3521i	0.681609	+	0.393527i
$693$	7.93725	−	4.58258i	0.301511	−	0.174078i
$694$			33.5565i			1.27379i
$695$	−12.2086	+	4.01655i	−0.463097	+	0.152356i
$696$	−6.87386	+	3.96863i	−0.260553	+	0.150430i
$697$	12.1244			0.459243
$698$	34.7463	−	20.0608i	1.31517	−	0.759312i
$699$	10.5826	−	18.3296i	0.400270	−	0.693288i
$700$	−19.4514	+	14.3523i	−0.735195	+	0.542465i
$701$	−2.83485			−0.107071			−0.0535354	−	0.998566i	$-0.517049\pi$
$701$	−2.83485			−0.107071			−0.0535354	+	0.998566i	$0.517049\pi$
$702$	−27.3613	−	28.4347i	−1.03268	−	1.07320i
$703$			13.7477i			0.518505i
$704$	−28.8303	−	16.6452i	−1.08658	−	0.627339i
$705$	13.0467	−	14.5975i	0.491366	−	0.549774i
$706$	19.0608	+	33.0143i	0.717362	+	1.24251i
$707$	−15.5885			−0.586264
$708$	−4.70158	−	8.14337i	−0.176696	−	0.306047i
$709$	31.5000	−	18.1865i	1.18301	−	0.683010i	0.226299	−	0.974058i	$-0.427337\pi$
$709$	31.5000	−	18.1865i	1.18301	−	0.683010i	0.956708	+	0.291048i	$0.0940040\pi$
$710$	−17.0544	−	3.55945i	−0.640039	−	0.133584i
$711$	−6.00000	−	10.3923i	−0.225018	−	0.389742i
$712$	−6.42368	−	3.70871i	−0.240738	−	0.138990i
$713$	22.1552	−	38.3739i	0.829717	−	1.43711i
$714$	17.3739			0.650201
$715$	18.0680	−	11.3379i	0.675704	−	0.424013i
$716$	0.460985			0.0172278
$717$	−10.4877	+	18.1652i	−0.391669	+	0.678390i
$718$	63.2874	+	36.5390i	2.36187	+	1.36362i
$719$	15.2477	+	26.4098i	0.568644	+	0.984921i	0.996700	+	0.0811686i	$0.0258652\pi$
$719$	15.2477	+	26.4098i	0.568644	+	0.984921i	−0.428056	+	0.903752i	$0.640801\pi$
$720$	1.63670	−	7.84190i	0.0609962	−	0.292250i
$721$	22.7477	−	13.1334i	0.847170	−	0.489114i
$722$	17.5112	+	30.3303i	0.651700	+	1.12878i
$723$	1.73205			0.0644157
$724$	26.1652	+	45.3194i	0.972420	+	1.68428i
$725$	18.4373	−	13.6040i	0.684742	−	0.505238i
$726$	7.58258	+	4.37780i	0.281416	+	0.162475i
$727$			42.7477i			1.58543i	0.609595	+	0.792713i	$0.291332\pi$
$727$			42.7477i			1.58543i	−0.609595	+	0.792713i	$0.708668\pi$
$728$	2.59808	+	10.5000i	0.0962911	+	0.389156i
$729$	−13.0000			−0.481481
$730$		0			0
$731$	−3.24773	+	5.62523i	−0.120122	+	0.208057i
$732$	−25.5815	+	14.7695i	−0.945521	+	0.545897i
$733$	8.94630			0.330439			0.165220	−	0.986257i	$-0.447167\pi$
$733$	8.94630			0.330439			0.165220	+	0.986257i	$0.447167\pi$
$734$	48.8085	−	28.1796i	1.80156	−	1.04013i
$735$	−2.79523	−	8.49628i	−0.103103	−	0.313390i
$736$		−	33.8426i		−	1.24745i
$737$	−34.0610	+	19.6652i	−1.25465	+	0.724375i
$738$	10.0308	+	5.79129i	0.369239	+	0.213180i
$739$	−42.2477	−	24.3917i	−1.55411	−	0.897265i	−0.997801	−	0.0662878i	$-0.978884\pi$
$739$	−42.2477	−	24.3917i	−1.55411	−	0.897265i	−0.556307	−	0.830977i	$-0.687782\pi$
$740$	10.1216	−	48.4955i	0.372077	−	1.78273i
$741$	−6.00000	−	1.73205i	−0.220416	−	0.0636285i
$742$		−	6.00000i		−	0.220267i
$743$	−21.3845	+	37.0390i	−0.784521	+	1.35883i	0.144764	+	0.989466i	$0.453758\pi$
$743$	−21.3845	+	37.0390i	−0.784521	+	1.35883i	−0.929285	+	0.369364i	$0.879576\pi$
$744$	8.37386	−	14.5040i	0.307001	−	0.531741i
$745$	6.82361	+	20.7408i	0.249998	+	0.759884i
$746$			28.4557i			1.04184i
$747$	−11.3060	−	19.5826i	−0.413665	−	0.716489i
$748$	16.9213	+	29.3085i	0.618703	+	1.07163i
$749$		−	2.45505i		−	0.0897056i
$750$	−2.28916	+	24.3654i	−0.0835884	+	0.889697i
$751$	7.87386	−	13.6379i	0.287321	−	0.497655i	−0.685848	−	0.727745i	$-0.740569\pi$
$751$	7.87386	−	13.6379i	0.287321	−	0.497655i	0.973169	+	0.230090i	$0.0739019\pi$
$752$	7.84190	−	13.5826i	0.285965	−	0.495306i
$753$			18.1652i			0.661975i
$754$	−8.68693	−	35.1078i	−0.316359	−	1.27855i
$755$	−13.5826	−	2.83485i	−0.494321	−	0.103171i
$756$	20.9347	+	12.0866i	0.761386	+	0.439587i
$757$	−15.3700	−	8.87386i	−0.558632	−	0.322526i	0.193965	−	0.981009i	$-0.437865\pi$
$757$	−15.3700	−	8.87386i	−0.558632	−	0.322526i	−0.752596	+	0.658482i	$0.771199\pi$
$758$	39.9425	−	23.0608i	1.45078	−	0.837606i
$759$		−	12.1244i		−	0.440086i
$760$	2.09642	+	6.37221i	0.0760451	+	0.231144i
$761$	−35.2913	+	20.3754i	−1.27931	+	0.738609i	−0.976721	−	0.214513i	$-0.931184\pi$
$761$	−35.2913	+	20.3754i	−1.27931	+	0.738609i	−0.302587	+	0.953122i	$0.597850\pi$
$762$	21.3368			0.772951
$763$	−4.11165	+	2.37386i	−0.148852	+	0.0859396i
$764$	10.3521	−	17.9303i	0.374525	−	0.648697i
$765$	−13.6569	+	15.2803i	−0.493768	+	0.552461i
$766$	6.20871			0.224330
$767$	11.7906	−	2.91742i	0.425735	−	0.105342i
$768$		−	2.79129i		−	0.100722i
$769$	−13.5000	−	7.79423i	−0.486822	−	0.281067i	0.236433	−	0.971648i	$-0.424022\pi$
$769$	−13.5000	−	7.79423i	−0.486822	−	0.281067i	−0.723255	+	0.690581i	$0.757355\pi$
$770$	−14.9468	+	16.7235i	−0.538647	+	0.602675i
$771$	−0.0825757	−	0.143025i	−0.00297389	−	0.00515093i
$772$	−2.81655			−0.101370
$773$	17.3682	+	30.0826i	0.624690	+	1.08200i	0.988601	+	0.150561i	$0.0481080\pi$
$773$	17.3682	+	30.0826i	0.624690	+	1.08200i	−0.363911	+	0.931434i	$0.618559\pi$
$774$	−5.37386	+	3.10260i	−0.193160	+	0.111521i
$775$	−19.3386	+	44.3103i	−0.694663	+	1.59167i
$776$	3.87386	+	6.70973i	0.139064	+	0.240865i
$777$	−11.9059	−	6.87386i	−0.427121	−	0.246598i
$778$	−16.5975	+	28.7477i	−0.595049	+	1.03066i
$779$	4.58258			0.164188
$780$	19.8900	+	10.5273i	0.712174	+	0.376937i
$781$	−9.41742			−0.336982
$782$	−22.9835	+	39.8085i	−0.821887	+	1.42355i
$783$	−19.8431	−	11.4564i	−0.709136	−	0.409420i
$784$	−3.58258	−	6.20520i	−0.127949	−	0.221614i
$785$	−20.0616	−	4.18710i	−0.716030	−	0.149444i
$786$	−3.00000	+	1.73205i	−0.107006	+	0.0617802i
$787$	−16.0930	−	27.8739i	−0.573653	−	0.993596i	−0.996187	−	0.0872487i	$-0.972193\pi$
$787$	−16.0930	−	27.8739i	−0.573653	−	0.993596i	0.422534	−	0.906347i	$-0.361141\pi$
$788$	−55.7316			−1.98536
$789$	4.50000	+	7.79423i	0.160204	+	0.277482i
$790$	21.8963	+	19.5700i	0.779034	+	0.696270i
$791$	−24.8739	−	14.3609i	−0.884413	−	0.510616i
$792$			9.16515i			0.325669i
$793$	−9.16478	−	37.0390i	−0.325451	−	1.31529i
$794$	−59.7042			−2.11882
$795$	−2.63850	−	2.35819i	−0.0935779	−	0.0836363i
$796$	1.97822	−	3.42638i	0.0701161	−	0.121445i
$797$	17.3881	−	10.0390i	0.615918	−	0.355600i	−0.159360	−	0.987220i	$-0.550943\pi$
$797$	17.3881	−	10.0390i	0.615918	−	0.355600i	0.775278	+	0.631620i	$0.217610\pi$
$798$	6.56670			0.232459
$799$	−34.7477	+	20.0616i	−1.22929	+	0.709729i
$800$	4.13000	+	36.6936i	0.146017	+	1.29731i
$801$		−	8.56490i		−	0.302626i
$802$	23.7065	−	13.6869i	0.837104	−	0.483302i
$803$		0			0
$804$	−35.9347	−	20.7469i	−1.26732	−	0.731686i
$805$	−17.3739	−	3.62614i	−0.612348	−	0.127805i
$806$	52.9129	+	54.9887i	1.86378	+	1.93689i
$807$			15.0000i			0.528025i
$808$	7.79423	−	13.5000i	0.274200	−	0.474928i
$809$	18.4129	−	31.8920i	0.647362	−	1.12126i	−0.336388	−	0.941723i	$-0.609205\pi$
$809$	18.4129	−	31.8920i	0.647362	−	1.12126i	0.983750	−	0.179541i	$-0.0574613\pi$
$810$	−4.64938	+	1.52962i	−0.163362	+	0.0537453i
$811$		−	18.7665i		−	0.658981i	−0.944159	−	0.329491i	$-0.893123\pi$
$811$		−	18.7665i		−	0.658981i	0.944159	−	0.329491i	$-0.106877\pi$
$812$	11.0776	+	19.1869i	0.388747	+	0.673329i
$813$	−4.33013	−	7.50000i	−0.151864	−	0.263036i
$814$		−	45.9669i		−	1.61114i
$815$	−22.6816	+	7.46211i	−0.794501	+	0.261386i
$816$	4.10436	−	7.10895i	0.143681	−	0.248863i
$817$	−1.22753	+	2.12614i	−0.0429457	+	0.0743841i
$818$		−	18.9564i		−	0.662796i
$819$	−9.00000	+	8.66025i	−0.314485	+	0.302614i
$820$	−16.1652	−	3.37386i	−0.564512	−	0.117820i
$821$	20.2913	+	11.7152i	0.708171	+	0.408863i	0.810383	−	0.585900i	$-0.199259\pi$
$821$	20.2913	+	11.7152i	0.708171	+	0.408863i	−0.102213	+	0.994763i	$0.532592\pi$
$822$	−0.180750	−	0.104356i	−0.00630438	−	0.00363984i
$823$	−35.1455	+	20.2913i	−1.22510	+	0.707310i	−0.966000	−	0.258542i	$-0.916758\pi$
$823$	−35.1455	+	20.2913i	−1.22510	+	0.707310i	−0.259096	+	0.965851i	$0.583425\pi$
$824$			26.2668i			0.915048i
$825$	1.47960	+	13.1458i	0.0515131	+	0.457676i
$826$	−11.0608	+	6.38595i	−0.384854	+	0.222196i
$827$	31.5583			1.09739			0.548695	−	0.836023i	$-0.315125\pi$
$827$	31.5583			1.09739			0.548695	+	0.836023i	$0.315125\pi$
$828$	−22.1552	+	12.7913i	−0.769945	+	0.444528i
$829$	1.66515	−	2.88413i	0.0578331	−	0.100170i	−0.835659	−	0.549248i	$-0.814914\pi$
$829$	1.66515	−	2.88413i	0.0578331	−	0.100170i	0.893492	+	0.449078i	$0.148248\pi$
$830$	41.2599	+	36.8765i	1.43215	+	1.28000i
$831$	−16.5826			−0.575243
$832$	43.5873	+	12.5826i	1.51112	+	0.436222i
$833$			18.3303i			0.635107i
$834$	−10.8956	−	6.29060i	−0.377285	−	0.217826i
$835$	7.13978	+	6.38126i	0.247082	+	0.220833i
$836$	6.39564	+	11.0776i	0.221198	+	0.383126i
$837$	48.3465			1.67110
$838$	26.4476	+	45.8085i	0.913616	+	1.58243i
$839$	1.16970	−	0.675325i	0.0403824	−	0.0233148i	−0.479673	−	0.877447i	$-0.659245\pi$
$839$	1.16970	−	0.675325i	0.0403824	−	0.0233148i	0.520055	+	0.854133i	$0.325911\pi$
$840$	−6.56670	−	1.37055i	−0.226573	−	0.0472885i
$841$	4.00000	+	6.92820i	0.137931	+	0.238904i
$842$	−49.7925	−	28.7477i	−1.71596	−	0.990712i
$843$	−8.75560	+	15.1652i	−0.301559	+	0.522316i
$844$	50.7042			1.74531
$845$	−20.1905	+	20.9128i	−0.694574	+	0.719421i
$846$	−38.3303			−1.31782
$847$	3.46410	−	6.00000i	0.119028	−	0.206162i
$848$	−2.45505	−	1.41742i	−0.0843068	−	0.0486746i
$849$	−0.126136	−	0.218475i	−0.00432899	−	0.00749803i
$850$	20.0616	−	45.9669i	0.688108	−	1.57665i
$851$	31.5000	−	18.1865i	1.07981	−	0.623426i
$852$	−4.96773	−	8.60436i	−0.170192	−	0.294780i
$853$	53.2566			1.82347			0.911736	−	0.410777i	$-0.134742\pi$
$853$	53.2566			1.82347			0.911736	+	0.410777i	$0.134742\pi$
$854$	20.0608	+	34.7463i	0.686466	+	1.18899i
$855$	−5.16184	+	5.77542i	−0.176531	+	0.197515i
$856$	2.12614	+	1.22753i	0.0726698	+	0.0419560i
$857$		−	22.7477i		−	0.777048i	−0.921439	−	0.388524i	$-0.872985\pi$
$857$		−	22.7477i		−	0.777048i	0.921439	−	0.388524i	$-0.127015\pi$
$858$	20.0616	+	5.79129i	0.684892	+	0.197711i
$859$	−38.2432			−1.30484			−0.652420	−	0.757857i	$-0.726246\pi$
$859$	−38.2432			−1.30484			−0.652420	+	0.757857i	$0.726246\pi$
$860$	5.89547	−	6.59625i	0.201034	−	0.224930i
$861$	−2.29129	+	3.96863i	−0.0780869	+	0.135250i
$862$	56.1785	−	32.4347i	1.91345	−	1.10473i
$863$	−34.8317			−1.18569			−0.592843	−	0.805318i	$-0.701994\pi$
$863$	−34.8317			−1.18569			−0.592843	+	0.805318i	$0.701994\pi$
$864$	31.9782	−	18.4626i	1.08792	−	0.628112i
$865$	−5.18335	−	15.7551i	−0.176239	−	0.535690i
$866$			38.8480i			1.32011i
$867$	−3.46410	+	2.00000i	−0.117647	+	0.0679236i
$868$	−40.4847	−	23.3739i	−1.37414	−	0.793361i
$869$	13.7477	+	7.93725i	0.466360	+	0.269253i
$870$	21.9564	+	4.58258i	0.744393	+	0.155364i
$871$	38.6216	−	37.1636i	1.30864	−	1.25924i
$872$		−	4.74773i		−	0.160778i
$873$	−4.47315	+	7.74773i	−0.151393	+	0.262221i
$874$	−8.68693	+	15.0462i	−0.293840	+	0.508946i
$875$	19.2800	+	1.81139i	0.651783	+	0.0612360i
$876$		0			0
$877$	−3.96863	−	6.87386i	−0.134011	−	0.232114i	0.791208	−	0.611547i	$-0.209452\pi$
$877$	−3.96863	−	6.87386i	−0.134011	−	0.232114i	−0.925219	+	0.379433i	$0.876119\pi$
$878$	−44.3203	−	76.7650i	−1.49574	−	2.59069i
$879$		−	23.4304i		−	0.790286i
$880$	3.31186	+	10.0666i	0.111643	+	0.339345i
$881$	9.24773	−	16.0175i	0.311564	−	0.539644i	−0.667137	−	0.744935i	$-0.732481\pi$
$881$	9.24773	−	16.0175i	0.311564	−	0.539644i	0.978701	+	0.205290i	$0.0658139\pi$
$882$	−8.75560	+	15.1652i	−0.294817	+	0.510637i
$883$		−	46.2432i		−	1.55621i	−0.628136	−	0.778103i	$-0.716182\pi$
$883$		−	46.2432i		−	1.55621i	0.628136	−	0.778103i	$-0.283818\pi$
$884$	−31.9782	−	33.2327i	−1.07554	−	1.11774i
$885$	−1.53901	+	7.37386i	−0.0517334	+	0.247870i
$886$	−49.1216	−	28.3604i	−1.65027	−	0.952785i
$887$	−0.429076	−	0.247727i	−0.0144070	−	0.00831786i	0.492779	−	0.870154i	$-0.335981\pi$
$887$	−0.429076	−	0.247727i	−0.0144070	−	0.00831786i	−0.507186	+	0.861837i	$0.669314\pi$
$888$	11.9059	−	6.87386i	0.399535	−	0.230672i
$889$		−	16.8836i		−	0.566256i
$890$	6.55052	+	19.9107i	0.219574	+	0.667409i
$891$	−2.29129	+	1.32288i	−0.0767610	+	0.0443180i
$892$	−24.1733			−0.809381
$893$	−13.1334	+	7.58258i	−0.439493	+	0.253741i
$894$	−10.6869	+	18.5103i	−0.357424	+	0.619077i
$895$	−0.275344	−	0.246091i	−0.00920372	−	0.00822592i
$896$	−22.1216			−0.739030
$897$	3.96863	+	16.0390i	0.132509	+	0.535527i
$898$		−	82.0345i		−	2.73753i
$899$	38.3739	+	22.1552i	1.27984	+	0.738916i
$900$	22.4606	−	16.5726i	0.748686	−	0.552419i
$901$	3.62614	+	6.28065i	0.120804	+	0.209239i
$902$	−15.3223			−0.510177
$903$	−1.22753	−	2.12614i	−0.0408495	−	0.0707534i
$904$	24.8739	−	14.3609i	0.827292	−	0.477637i
$905$	8.56490	−	41.0369i	0.284707	−	1.36411i
$906$	−6.79129	−	11.7629i	−0.225625	−	0.390795i
$907$	−29.2264	−	16.8739i	−0.970446	−	0.560287i	−0.0710740	−	0.997471i	$-0.522643\pi$
$907$	−29.2264	−	16.8739i	−0.970446	−	0.560287i	−0.899372	+	0.437184i	$0.855976\pi$
$908$	−8.52718	+	14.7695i	−0.282984	+	0.490143i
$909$	18.0000			0.597022
$910$	14.2988	−	27.0157i	0.473999	−	0.895561i
$911$	37.9129			1.25611			0.628055	−	0.778169i	$-0.283851\pi$
$911$	37.9129			1.25611			0.628055	+	0.778169i	$0.283851\pi$
$912$	1.55130	−	2.68693i	0.0513687	−	0.0889732i
$913$	25.9053	+	14.9564i	0.857341	+	0.494986i
$914$	1.89564	+	3.28335i	0.0627023	+	0.108604i
$915$	23.1642	+	4.83465i	0.765785	+	0.159829i
$916$	−13.2523	+	7.65120i	−0.437867	+	0.252803i
$917$	1.37055	+	2.37386i	0.0452596	+	0.0783919i
$918$	−50.1540			−1.65533
$919$	17.9174	+	31.0339i	0.591041	+	1.02371i	0.994093	+	0.108536i	$0.0346163\pi$
$919$	17.9174	+	31.0339i	0.591041	+	1.02371i	−0.403051	+	0.915177i	$0.632050\pi$
$920$	11.8273	−	13.2331i	0.389933	−	0.436284i
$921$	21.0000	+	12.1244i	0.691974	+	0.399511i
$922$			2.62614i			0.0864872i
$923$	12.4581	−	3.08258i	0.410063	−	0.101464i
$924$	−12.7913			−0.420802
$925$	−31.9343	+	23.5627i	−1.04999	+	0.774738i
$926$	9.00000	−	15.5885i	0.295758	−	0.512268i
$927$	−26.2668	+	15.1652i	−0.862715	+	0.498089i
$928$	33.8426			1.11094
$929$	−13.8303	+	7.98493i	−0.453758	+	0.261977i	−0.709416	−	0.704790i	$-0.751041\pi$
$929$	−13.8303	+	7.98493i	−0.453758	+	0.261977i	0.255658	+	0.966767i	$0.417708\pi$
$930$	−44.9562	+	14.7903i	−1.47417	+	0.484995i
$931$			6.92820i			0.227063i
$932$	51.1631	−	29.5390i	1.67590	−	0.967583i
$933$	1.37055	+	0.791288i	0.0448698	+	0.0259056i
$934$	−23.3739	−	13.4949i	−0.764816	−	0.441567i
$935$	5.53901	−	26.5390i	0.181145	−	0.867919i
$936$	−3.00000	−	12.1244i	−0.0980581	−	0.396297i
$937$			23.4955i			0.767563i	0.923424	+	0.383782i	$0.125378\pi$
$937$			23.4955i			0.767563i	−0.923424	+	0.383782i	$0.874622\pi$
$938$	−28.1796	+	48.8085i	−0.920097	+	1.59365i
$939$	−15.3739	+	26.6283i	−0.501707	+	0.868982i
$940$	51.9110	−	17.0784i	1.69315	−	0.557037i
$941$			26.4575i			0.862490i	0.902235	+	0.431245i	$0.141926\pi$
$941$			26.4575i			0.862490i	−0.902235	+	0.431245i	$0.858074\pi$
$942$	−10.0308	−	17.3739i	−0.326821	−	0.566071i
$943$	−6.06218	−	10.5000i	−0.197412	−	0.341927i
$944$			6.03440i			0.196403i
$945$	−6.05184	−	18.3950i	−0.196866	−	0.598389i
$946$	4.10436	−	7.10895i	0.133444	−	0.231132i
$947$	19.2909	−	33.4129i	0.626871	−	1.08577i	−0.361305	−	0.932448i	$-0.617669\pi$
$947$	19.2909	−	33.4129i	0.626871	−	1.08577i	0.988176	−	0.153325i	$-0.0489981\pi$
$948$			16.7477i			0.543941i
$949$		0			0
$950$	7.58258	−	17.3739i	0.246011	−	0.563683i
$951$	18.1652	+	10.4877i	0.589045	+	0.340086i
$952$	11.9059	+	6.87386i	0.385872	+	0.222783i
$953$	48.5650	−	28.0390i	1.57317	−	0.908273i	0.577398	−	0.816463i	$-0.304068\pi$
$953$	48.5650	−	28.0390i	1.57317	−	0.908273i	0.995777	−	0.0918100i	$-0.0292652\pi$
$954$			6.92820i			0.224309i
$955$	−15.7551	+	5.18335i	−0.509824	+	0.167729i
$956$	−50.7042	+	29.2741i	−1.63989	+	0.946791i
$957$	12.1244			0.391925
$958$	−61.3746	+	35.4347i	−1.98292	+	1.14484i
$959$	−0.0825757	+	0.143025i	−0.00266651	+	0.00461853i
$960$	−18.7492	+	20.9779i	−0.605129	+	0.677059i
$961$	−62.4955			−2.01598
$962$	15.0462	+	60.8085i	0.485109	+	1.96055i
$963$			2.83485i			0.0913517i
$964$	4.18693	+	2.41733i	0.134852	+	0.0778568i
$965$	1.68231	+	1.50358i	0.0541554	+	0.0484020i
$966$	−8.68693	−	15.0462i	−0.279497	−	0.484104i
$967$	21.5076			0.691638			0.345819	−	0.938301i	$-0.387601\pi$
$967$	21.5076			0.691638			0.345819	+	0.938301i	$0.387601\pi$
$968$	3.46410	+	6.00000i	0.111340	+	0.192847i
$969$	−6.87386	+	3.96863i	−0.220820	+	0.127491i
$970$	4.47315	−	21.4322i	0.143624	−	0.688145i
$971$	−18.2477	−	31.6060i	−0.585597	−	1.01428i	−0.994801	−	0.101841i	$-0.967527\pi$
$971$	−18.2477	−	31.6060i	−0.585597	−	1.01428i	0.409203	−	0.912443i	$-0.365807\pi$
$972$	−38.6772	−	22.3303i	−1.24057	−	0.716245i
$973$	−4.97768	+	8.62159i	−0.159577	+	0.276396i
$974$	46.1216			1.47783
$975$	−6.26029	−	16.9059i	−0.200490	−	0.541421i
$976$	18.9564			0.606781
$977$	−19.3863	+	33.5780i	−0.620222	+	1.07426i	0.369222	+	0.929341i	$0.379624\pi$
$977$	−19.3863	+	33.5780i	−0.620222	+	1.07426i	−0.989444	+	0.144915i	$0.953709\pi$
$978$	−20.2424	−	11.6869i	−0.647279	−	0.373707i
$979$	5.66515	+	9.81233i	0.181059	+	0.313603i
$980$	5.10080	−	24.4394i	0.162939	−	0.780688i
$981$	4.74773	−	2.74110i	0.151583	−	0.0875166i
$982$	31.2822	+	54.1824i	0.998256	+	1.72903i
$983$	3.12250			0.0995924			0.0497962	−	0.998759i	$-0.484143\pi$
$983$	3.12250			0.0995924			0.0497962	+	0.998759i	$0.484143\pi$
$984$	−2.29129	−	3.96863i	−0.0730436	−	0.126515i
$985$	33.2881	+	29.7516i	1.06065	+	0.947965i
$986$	−39.8085	−	22.9835i	−1.26776	−	0.731943i
$987$		−	15.1652i		−	0.482712i
$988$	−12.0866	−	12.5608i	−0.384527	−	0.399612i
$989$	6.49545			0.206543
$990$	17.2591	−	19.3107i	0.548531	−	0.613734i
$991$	6.50000	−	11.2583i	0.206479	−	0.357633i	−0.744124	−	0.668042i	$-0.767133\pi$
$991$	6.50000	−	11.2583i	0.206479	−	0.357633i	0.950603	+	0.310409i	$0.100466\pi$
$992$	−61.8414	+	35.7042i	−1.96347	+	1.13361i
$993$	−11.4014			−0.361811
$994$	−11.6869	+	6.74745i	−0.370687	+	0.214016i
$995$	−3.01071	+	0.990505i	−0.0954458	+	0.0314011i
$996$			31.5583i			0.999963i
$997$	15.7315	−	9.08258i	0.498221	−	0.287648i	−0.229758	−	0.973248i	$-0.573793\pi$
$997$	15.7315	−	9.08258i	0.498221	−	0.287648i	0.727979	+	0.685600i	$0.240460\pi$
$998$	31.4630	+	18.1652i	0.995943	+	0.575008i
$999$	34.3693	+	19.8431i	1.08740	+	0.627809i

Twists

By twisting character
Char	Parity	Ord	Type	Twist	Min	Dim
1.1	even	1	trivial	65.2.l.a.4.4	yes	8
3.2	odd	2		585.2.bf.a.199.1		8
4.3	odd	2		1040.2.df.b.849.3		8
5.2	odd	4		325.2.n.c.251.2		4
5.3	odd	4		325.2.n.b.251.1		4
5.4	even	2	inner	65.2.l.a.4.1	✓	8
13.2	odd	12		845.2.n.d.484.4		8
13.3	even	3		845.2.l.c.699.4		8
13.4	even	6		845.2.d.c.844.8		8
13.5	odd	4		845.2.n.c.529.1		8
13.6	odd	12		845.2.b.f.339.8		8
13.7	odd	12		845.2.b.f.339.2		8
13.8	odd	4		845.2.n.d.529.3		8
13.9	even	3		845.2.d.c.844.2		8
13.10	even	6	inner	65.2.l.a.49.1	yes	8
13.11	odd	12		845.2.n.c.484.2		8
13.12	even	2		845.2.l.c.654.1		8
15.14	odd	2		585.2.bf.a.199.4		8
20.19	odd	2		1040.2.df.b.849.2		8
39.23	odd	6		585.2.bf.a.244.4		8
52.23	odd	6		1040.2.df.b.49.2		8
65.4	even	6		845.2.d.c.844.1		8
65.7	even	12		4225.2.a.bk.1.4		4
65.9	even	6		845.2.d.c.844.7		8
65.19	odd	12		845.2.b.f.339.1		8
65.23	odd	12		325.2.n.b.101.1		4
65.24	odd	12		845.2.n.d.484.3		8
65.29	even	6		845.2.l.c.699.1		8
65.32	even	12		4225.2.a.bk.1.1		4
65.33	even	12		4225.2.a.bj.1.1		4
65.34	odd	4		845.2.n.c.529.2		8
65.44	odd	4		845.2.n.d.529.4		8
65.49	even	6	inner	65.2.l.a.49.4	yes	8
65.54	odd	12		845.2.n.c.484.1		8
65.58	even	12		4225.2.a.bj.1.4		4
65.59	odd	12		845.2.b.f.339.7		8
65.62	odd	12		325.2.n.c.101.2		4
65.64	even	2		845.2.l.c.654.4		8
195.179	odd	6		585.2.bf.a.244.1		8
260.179	odd	6		1040.2.df.b.49.3		8

By twisted newform
Twist	Min	Dim	Char	Parity	Ord	Type
65.2.l.a.4.1	✓	8	5.4	even	2	inner
65.2.l.a.4.4	yes	8	1.1	even	1	trivial
65.2.l.a.49.1	yes	8	13.10	even	6	inner
65.2.l.a.49.4	yes	8	65.49	even	6	inner
325.2.n.b.101.1		4	65.23	odd	12
325.2.n.b.251.1		4	5.3	odd	4
325.2.n.c.101.2		4	65.62	odd	12
325.2.n.c.251.2		4	5.2	odd	4
585.2.bf.a.199.1		8	3.2	odd	2
585.2.bf.a.199.4		8	15.14	odd	2
585.2.bf.a.244.1		8	195.179	odd	6
585.2.bf.a.244.4		8	39.23	odd	6
845.2.b.f.339.1		8	65.19	odd	12
845.2.b.f.339.2		8	13.7	odd	12
845.2.b.f.339.7		8	65.59	odd	12
845.2.b.f.339.8		8	13.6	odd	12
845.2.d.c.844.1		8	65.4	even	6
845.2.d.c.844.2		8	13.9	even	3
845.2.d.c.844.7		8	65.9	even	6
845.2.d.c.844.8		8	13.4	even	6
845.2.l.c.654.1		8	13.12	even	2
845.2.l.c.654.4		8	65.64	even	2
845.2.l.c.699.1		8	65.29	even	6
845.2.l.c.699.4		8	13.3	even	3
845.2.n.c.484.1		8	65.54	odd	12
845.2.n.c.484.2		8	13.11	odd	12
845.2.n.c.529.1		8	13.5	odd	4
845.2.n.c.529.2		8	65.34	odd	4
845.2.n.d.484.3		8	65.24	odd	12
845.2.n.d.484.4		8	13.2	odd	12
845.2.n.d.529.3		8	13.8	odd	4
845.2.n.d.529.4		8	65.44	odd	4
1040.2.df.b.49.2		8	52.23	odd	6
1040.2.df.b.49.3		8	260.179	odd	6
1040.2.df.b.849.2		8	20.19	odd	2
1040.2.df.b.849.3		8	4.3	odd	2
4225.2.a.bj.1.1		4	65.33	even	12
4225.2.a.bj.1.4		4	65.58	even	12
4225.2.a.bk.1.1		4	65.32	even	12
4225.2.a.bk.1.4		4	65.7	even	12

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:	\( N \)	\(=\)	\( 65 = 5 \cdot 13 \)
Weight:	\( k \)	\(=\)	\( 2 \)
Character orbit:	\([\chi]\)	\(=\)	65.l (of order \(6\), degree \(2\), minimal)

\(f(q)\)	\(=\)	\(q+(1.09445 - 1.89564i) q^{2} +(-0.866025 - 0.500000i) q^{3} +(-1.39564 - 2.41733i) q^{4} +(-0.456850 + 2.18890i) q^{5} +(-1.89564 + 1.09445i) q^{6} +(0.866025 + 1.50000i) q^{7} -1.73205 q^{8} +(-1.00000 - 1.73205i) q^{9} +O(q^{10})\)	\(q+(1.09445 - 1.89564i) q^{2} +(-0.866025 - 0.500000i) q^{3} +(-1.39564 - 2.41733i) q^{4} +(-0.456850 + 2.18890i) q^{5} +(-1.89564 + 1.09445i) q^{6} +(0.866025 + 1.50000i) q^{7} -1.73205 q^{8} +(-1.00000 - 1.73205i) q^{9} +(3.64938 + 3.26167i) q^{10} +(2.29129 + 1.32288i) q^{11} +2.79129i q^{12} +(-3.46410 - 1.00000i) q^{13} +3.79129 q^{14} +(1.49009 - 1.66722i) q^{15} +(0.895644 - 1.55130i) q^{16} +(-3.96863 + 2.29129i) q^{17} -4.37780 q^{18} +(-1.50000 + 0.866025i) q^{19} +(5.92889 - 1.95057i) q^{20} -1.73205i q^{21} +(5.01540 - 2.89564i) q^{22} +(3.96863 + 2.29129i) q^{23} +(1.50000 + 0.866025i) q^{24} +(-4.58258 - 2.00000i) q^{25} +(-5.68693 + 5.47225i) q^{26} +5.00000i q^{27} +(2.41733 - 4.18693i) q^{28} +(-2.29129 + 3.96863i) q^{29} +(-1.52962 - 4.64938i) q^{30} -9.66930i q^{31} +(-3.69253 - 6.39564i) q^{32} +(-1.32288 - 2.29129i) q^{33} +10.0308i q^{34} +(-3.67900 + 1.21037i) q^{35} +(-2.79129 + 4.83465i) q^{36} +(3.96863 - 6.87386i) q^{37} +3.79129i q^{38} +(2.50000 + 2.59808i) q^{39} +(0.791288 - 3.79129i) q^{40} +(-2.29129 - 1.32288i) q^{41} +(-3.28335 - 1.89564i) q^{42} +(1.22753 - 0.708712i) q^{43} -7.38505i q^{44} +(4.24814 - 1.39761i) q^{45} +(8.68693 - 5.01540i) q^{46} +8.75560 q^{47} +(-1.55130 + 0.895644i) q^{48} +(2.00000 - 3.46410i) q^{49} +(-8.80669 + 6.49803i) q^{50} +4.58258 q^{51} +(2.41733 + 9.76951i) q^{52} -1.58258i q^{53} +(9.47822 + 5.47225i) q^{54} +(-3.94242 + 4.41105i) q^{55} +(-1.50000 - 2.59808i) q^{56} +1.73205 q^{57} +(5.01540 + 8.68693i) q^{58} +(-2.91742 + 1.68438i) q^{59} +(-6.10985 - 1.27520i) q^{60} +(5.29129 + 9.16478i) q^{61} +(-18.3296 - 10.5826i) q^{62} +(1.73205 - 3.00000i) q^{63} -12.5826 q^{64} +(3.77148 - 7.12573i) q^{65} -5.79129 q^{66} +(-7.43273 + 12.8739i) q^{67} +(11.0776 + 6.39564i) q^{68} +(-2.29129 - 3.96863i) q^{69} +(-1.73205 + 8.29875i) q^{70} +(-3.08258 + 1.77973i) q^{71} +(1.73205 + 3.00000i) q^{72} +(-8.68693 - 15.0462i) q^{74} +(2.96863 + 4.02334i) q^{75} +(4.18693 + 2.41733i) q^{76} +4.58258i q^{77} +(7.66115 - 1.89564i) q^{78} +6.00000 q^{79} +(2.98647 + 2.66919i) q^{80} +(-0.500000 + 0.866025i) q^{81} +(-5.01540 + 2.89564i) q^{82} +11.3060 q^{83} +(-4.18693 + 2.41733i) q^{84} +(-3.20233 - 9.73371i) q^{85} -3.10260i q^{86} +(3.96863 - 2.29129i) q^{87} +(-3.96863 - 2.29129i) q^{88} +(3.70871 + 2.14123i) q^{89} +(2.00000 - 9.58258i) q^{90} +(-1.50000 - 6.06218i) q^{91} -12.7913i q^{92} +(-4.83465 + 8.37386i) q^{93} +(9.58258 - 16.5975i) q^{94} +(-1.21037 - 3.67900i) q^{95} +7.38505i q^{96} +(-2.23658 - 3.87386i) q^{97} +(-4.37780 - 7.58258i) q^{98} -5.29150i q^{99} +O(q^{100})\)
\(\operatorname{Tr}(f)(q)\)	\(=\)	\( 8 q - 2 q^{4} - 6 q^{6} - 8 q^{9}+O(q^{10}) \) 8 * q - 2 * q^4 - 6 * q^6 - 8 * q^9	\( 8 q - 2 q^{4} - 6 q^{6} - 8 q^{9} - 4 q^{10} + 12 q^{14} - 6 q^{15} - 2 q^{16} - 12 q^{19} + 24 q^{20} + 12 q^{24} - 18 q^{26} - 10 q^{30} + 6 q^{35} - 4 q^{36} + 20 q^{39} - 12 q^{40} + 12 q^{45} + 42 q^{46} + 16 q^{49} - 12 q^{50} + 30 q^{54} - 14 q^{55} - 12 q^{56} - 60 q^{59} + 24 q^{61} - 64 q^{64} - 24 q^{65} - 28 q^{66} + 12 q^{71} - 42 q^{74} - 8 q^{75} + 6 q^{76} + 48 q^{79} + 18 q^{80} - 4 q^{81} - 6 q^{84} + 42 q^{85} + 48 q^{89} + 16 q^{90} - 12 q^{91} + 40 q^{94} - 6 q^{95}+O(q^{100}) \) 8 * q - 2 * q^4 - 6 * q^6 - 8 * q^9 - 4 * q^10 + 12 * q^14 - 6 * q^15 - 2 * q^16 - 12 * q^19 + 24 * q^20 + 12 * q^24 - 18 * q^26 - 10 * q^30 + 6 * q^35 - 4 * q^36 + 20 * q^39 - 12 * q^40 + 12 * q^45 + 42 * q^46 + 16 * q^49 - 12 * q^50 + 30 * q^54 - 14 * q^55 - 12 * q^56 - 60 * q^59 + 24 * q^61 - 64 * q^64 - 24 * q^65 - 28 * q^66 + 12 * q^71 - 42 * q^74 - 8 * q^75 + 6 * q^76 + 48 * q^79 + 18 * q^80 - 4 * q^81 - 6 * q^84 + 42 * q^85 + 48 * q^89 + 16 * q^90 - 12 * q^91 + 40 * q^94 - 6 * q^95

Introduction

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