Cremona's table of elliptic curves

128122 = 2 · 29 · 47²

Class	r	Atkin-Lehner	Eigenvalues
128122a (1 curve)	0	2+ 29+ 47-	2+  2  1 -2  0 -7 -2  5
Curve Equation t 128122a1 [1,1,0,-7777,-44217] 1
128122b (1 curve)	1	2+ 29- 47-	2+  0  1  4  0  1  4  7
Curve Equation t Generators 128122b1 [1,-1,0,-3689444,2510690896] 1 [111563130:6435400279:27000]
128122c (1 curve)	1	2+ 29- 47-	2+ -2 -2 -1  1  2  2 -4
Curve Equation t Generators 128122c1 [1,0,1,1058,-1475184] 1 [1077:34805:1]
128122d (2 curves)	1	2+ 29- 47-	2+ -2  3  2  0 -5  6 -5
Curve Equation t Generators 128122d1 [1,0,1,-639552,-190711378] 1 [-65433720:58233691:166375] 128122d2 [1,0,1,-7388047,7667859138] 1 [1454:-423:1]
128122e (1 curve)	1	2+ 29- 47-	2+ -3  3 -2  1 -3 -4  8
Curve Equation t Generators 128122e1 [1,-1,0,-2623,-73967] 1 [96:695:1]
128122f (1 curve)	1	2- 29+ 47-	2-  0  3 -4  0 -5  0  7
Curve Equation t Generators 128122f1 [1,-1,1,-663470251,6577960272379] 1 [14851:-3078:1]
128122g (1 curve)	1	2- 29+ 47-	2-  2  1 -2  6  1 -1  4
Curve Equation t Generators 128122g1 [1,1,1,-46435,3848593] 1 [121:80:1]
128122h (1 curve)	1	2- 29+ 47-	2- -2 -1 -4  2 -5 -7 -2
Curve Equation t Generators 128122h1 [1,0,0,209809,-39963143] 1 [184:2117:1]
128122i (1 curve)	1	2- 29+ 47-	2- -3  0  2  0  4  3  4
Curve Equation t Generators 128122i1 [1,-1,1,-15,375] 1 [15:50:1]
128122j (2 curves)	0	2- 29- 47-	2- -1 -1 -2  3  1  8  0
Curve Equation t 128122j1 [1,1,1,10999,-732873] 1 128122j2 [1,1,1,-1005141,390083407] 1
128122k (1 curve)	0	2- 29- 47-	2-  2 -1 -2 -6 -1 -1 -4
Curve Equation t 128122k1 [1,1,1,-102574961,-401623988705] 1
128122l (1 curve)	2	2- 29- 47-	2- -2  1 -4 -2  5 -7  2
Curve Equation t Generators 128122l1 [1,0,0,95,393] 1 [-26:71:8]&[4:-31:1]
128122m (1 curve)	0	2- 29- 47-	2- -3  0  2  0 -4  3 -4
Curve Equation t 128122m1 [1,-1,1,-32445,-38571867] 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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