Cremona's table of elliptic curves

31800 = 2³ · 3 · 5² · 53

Field	Data	Notes
Atkin-Lehner	2+ 3+ 5+ 53-	Signs for the Atkin-Lehner involutions
Class	31800f	Isogeny class
Conductor	31800	Conductor
∏ cp	16	Product of Tamagawa factors cp
deg	16128	Modular degree for the optimal curve
Δ	-3180000000 = -1 · 28 · 3 · 57 · 53	Discriminant
Eigenvalues	2+ 3+ 5+ -2  0 -4 -7  0	Hecke eigenvalues for primes up to 20
Equation	[0,-1,0,367,-363]	[a1,a2,a3,a4,a6]
Generators	[1:2:1] [7:50:1]	Generators of the group modulo torsion
j	1362944/795	j-invariant
L	6.9381391338738	L(r)(E,1)/r!
Ω	0.83700699212909	Real period
R	0.51807655126529	Regulator
r	2	Rank of the group of rational points
S	0.99999999999985	(Analytic) order of Ш
t	1	Number of elements in the torsion subgroup
Twists	63600s1 95400y1 6360i1	Quadratic twists by: -4 -3 5

Hecke Eigenvalues for elliptic curve 31800f1

a2	a3	a5	a7	a11	a13	a17	a19	a23	a29	a31	a37	a41	a43	a47	a53	a59	a61	a67	a71	a73	a79	a83	a89	a97
+	+	+	-2	0	-4	-7	0	-6	6	-2	-4	-9	-6	9	-	-14	0	11	-3	1	-14	-16	-6	-14

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Quadratic twists for elliptic curve 31800f1

-4	-3	5
63600s1	95400y1	6360i1

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Data from Elliptic Curve Data by J. E. Cremona.
Design inspired by The Modular Forms Explorer by William Stein.

Part of Computational Number Theory
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