Cremona's table of elliptic curves

7995 = 3 · 5 · 13 · 41

Class	r	Atkin-Lehner	Eigenvalues
7995a (2 curves)	0	3+ 5+ 13+ 41-	-1 3+ 5+  4  0 13+ -6  2
Curve Equation t 7995a1 [1,1,1,-61,-286] 2 7995a2 [1,1,1,-1086,-14226] 2
7995b (4 curves)	0	3+ 5+ 13- 41+	1 3+ 5+  0 -4 13-  2  4
Curve Equation t 7995b1 [1,1,0,-43,-248] 2 7995b2 [1,1,0,-888,-10557] 4 7995b3 [1,1,0,-14213,-658152] 2 7995b4 [1,1,0,-1083,-5838] 2
7995c (2 curves)	2	3+ 5- 13+ 41+	-1 3+ 5- -2 -4 13+ -6 -8
Curve Equation t Generators 7995c1 [1,1,1,-1385,19262] 2 [-28:206:1]&[12:61:1] 7995c2 [1,1,1,-1340,20630] 2 [-27:208:1]&[-12:193:1]
7995d (1 curve)	1	3+ 5- 13- 41+	-2 3+ 5-  2  0 13- -2  0
Curve Equation t Generators 7995d1 [0,-1,1,370,3056] 1 [-5:32:1]
7995e (1 curve)	0	3- 5+ 13+ 41+	2 3- 5+ -4 -1 13+  5  0
Curve Equation t 7995e1 [0,1,1,-3336,-75409] 1
7995f (1 curve)	1	3- 5+ 13+ 41-	0 3- 5+  0  2 13+ -6 -4
Curve Equation t Generators 7995f1 [0,1,1,-1,-5] 1 [7:19:1]
7995g (1 curve)	1	3- 5+ 13+ 41-	0 3- 5+  0 -6 13+  2  4
Curve Equation t Generators 7995g1 [0,1,1,-2366131,1400108965] 1 [887:40:1]
7995h (1 curve)	1	3- 5+ 13+ 41-	2 3- 5+  2 -4 13+  2  0
Curve Equation t Generators 7995h1 [0,1,1,-536,4631] 1 [122:119:8]
7995i (2 curves)	0	3- 5+ 13- 41-	-1 3- 5+ -4  4 13- -2  6
Curve Equation t 7995i1 [1,0,0,2818454,-1054921285] 2 7995i2 [1,0,0,-13197171,-9085155660] 2
7995j (4 curves)	0	3- 5- 13+ 41-	-1 3- 5-  0  0 13+ -2  4
Curve Equation t 7995j1 [1,0,0,25,0] 2 7995j2 [1,0,0,-100,-25] 4 7995j3 [1,0,0,-1125,-14580] 2 7995j4 [1,0,0,-1075,13430] 2

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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