Cremona's table of elliptic curves

1210 = 2 · 5 · 11²

Class	r	Atkin-Lehner	Eigenvalues
1210a (2 curves)	1	2+ 5+ 11+	2+  2 5+  0 11+ -6 -6  0
Curve Equation t Generators 1210a1 [1,1,0,-24928,2245632] 2 [4224:37984:27] 1210a2 [1,1,0,-450848,116307008] 2 [664:10168:1]
1210b (1 curve)	1	2+ 5+ 11+	2+ -3 5+ -5 11+  4 -1  5
Curve Equation t Generators 1210b1 [1,-1,0,5,-5] 1 [3:4:1]
1210c (2 curves)	0	2+ 5+ 11-	2+  1 5+  1 11- -2  3  1
Curve Equation t 1210c1 [1,0,1,-124,-1454] 1 1210c2 [1,0,1,1086,34362] 1
1210d (1 curve)	0	2+ 5- 11+	2+ -1 5-  3 11+  0  3  3
Curve Equation t 1210d1 [1,1,0,-23597,-1525091] 1
1210e (2 curves)	1	2+ 5- 11-	2+  1 5- -1 11- -4  0 -4
Curve Equation t Generators 1210e1 [1,0,1,-608,5806] 3 [-23:99:1] 1210e2 [1,0,1,2417,27586] 1 [-51:4108:27]
1210f (1 curve)	1	2+ 5- 11-	2+ -1 5-  3 11-  0 -8 -8
Curve Equation t Generators 1210f1 [1,1,0,-2,4] 1 [0:2:1]
1210g (2 curves)	1	2+ 5- 11-	2+ -1 5- -3 11-  6  7 -5
Curve Equation t Generators 1210g1 [1,1,0,1208,65696] 1 [127:1449:1] 1210g2 [1,1,0,-718742,234235786] 1 [13395:623:27]
1210h (2 curves)	0	2- 5+ 11+	2-  2 5+  0 11+  6  6  0
Curve Equation t 1210h1 [1,1,1,-206,-1781] 2 1210h2 [1,1,1,-3726,-89077] 2
1210i (1 curve)	0	2- 5+ 11+	2- -3 5+  5 11+ -4  1 -5
Curve Equation t 1210i1 [1,-1,1,582,4887] 1
1210j (2 curves)	1	2- 5+ 11-	2-  1 5+ -5 11- -2 -3  7
Curve Equation t Generators 1210j1 [1,0,0,-10711,-431639] 1 [318:5165:1] 1210j2 [1,0,0,35874,-2229820] 1 [76:930:1]
1210k (1 curve)	1	2- 5- 11+	2- -1 5- -3 11+  0 -3 -3
Curve Equation t Generators 1210k1 [1,1,1,-195,1057] 1 [17:-64:1]
1210l (2 curves)	0	2- 5- 11-	2-  1 5-  1 11-  4  0  4
Curve Equation t 1210l1 [1,0,0,-73510,-7801628] 1 1210l2 [1,0,0,292515,-36424783] 1
1210m (1 curve)	0	2- 5- 11-	2- -1 5- -3 11-  0  8  8
Curve Equation t 1210m1 [1,1,1,-305,-6753] 1

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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