Cremona's table of elliptic curves

29325 = 3 · 5² · 17 · 23

Class	r	Atkin-Lehner	Eigenvalues
29325a (6 curves)	0	3+ 5+ 17+ 23-	1 3+ 5+  0 -4  2 17+  4
Curve Equation t 29325a1 [1,1,0,-3375,234000] 2 29325a2 [1,1,0,-81500,8905875] 4 29325a3 [1,1,0,-109625,2184000] 4 29325a4 [1,1,0,-1303375,572190250] 2 29325a5 [1,1,0,432250,17898375] 2 29325a6 [1,1,0,-1101500,-443167875] 2
29325b (1 curve)	0	3+ 5+ 17+ 23-	1 3+ 5+  2 -3 -1 17+  5
Curve Equation t 29325b1 [1,1,0,425,-4250] 1
29325c (4 curves)	0	3+ 5+ 17+ 23-	1 3+ 5+ -4  0  2 17+ -4
Curve Equation t 29325c1 [1,1,0,-76375,-8156000] 2 29325c2 [1,1,0,-76500,-8128125] 4 29325c3 [1,1,0,-29625,-17925000] 2 29325c4 [1,1,0,-125375,3455250] 2
29325d (1 curve)	0	3+ 5+ 17+ 23-	-1 3+ 5+  2 -3 -1 17+ -5
Curve Equation t 29325d1 [1,1,1,378487,-228834844] 1
29325e (2 curves)	0	3+ 5+ 17+ 23-	-1 3+ 5+  2 -6  2 17+  4
Curve Equation t 29325e1 [1,1,1,-3063,-80844] 2 29325e2 [1,1,1,-51938,-4577344] 2
29325f (1 curve)	0	3+ 5+ 17+ 23-	2 3+ 5+ -1  0  5 17+ -8
Curve Equation t 29325f1 [0,-1,1,-458,3443] 1
29325g (1 curve)	0	3+ 5+ 17+ 23-	-2 3+ 5+ -3  2 -1 17+  4
Curve Equation t 29325g1 [0,-1,1,-49008,-4159582] 1
29325h (1 curve)	0	3+ 5+ 17+ 23-	-2 3+ 5+  5  6 -1 17+ -4
Curve Equation t 29325h1 [0,-1,1,-2158,-28032] 1
29325i (1 curve)	0	3+ 5+ 17- 23+	0 3+ 5+ -1  2  1 17- -6
Curve Equation t 29325i1 [0,-1,1,-42233,1596743] 1
29325j (1 curve)	0	3+ 5+ 17- 23+	0 3+ 5+  3  6  5 17-  2
Curve Equation t 29325j1 [0,-1,1,-236283,-43902907] 1
29325k (2 curves)	1	3+ 5+ 17- 23-	1 3+ 5+  2  2  2 17- -4
Curve Equation t Generators 29325k1 [1,1,0,-941025,-352548000] 2 [194420:9988465:64] 29325k2 [1,1,0,-15065900,-22514476875] 2 [1980146940:15054112155:438976]
29325l (2 curves)	0	3+ 5- 17+ 23+	-1 3+ 5- -2  0 -4 17+  4
Curve Equation t 29325l1 [1,1,1,5822,-3269194] 2 29325l2 [1,1,1,-298353,-61062444] 2
29325m (1 curve)	1	3+ 5- 17- 23+	1 3+ 5- -3  3  5 17-  1
Curve Equation t Generators 29325m1 [1,1,0,-2200,32125] 1 [4:151:1]
29325n (2 curves)	1	3+ 5- 17- 23+	-1 3+ 5-  2  0  4 17- -4
Curve Equation t Generators 29325n1 [1,1,1,52,356] 2 [4:23:1] 29325n2 [1,1,1,-523,3806] 2 [30:-143:1]
29325o (1 curve)	0	3- 5+ 17+ 23+	2 3- 5+ -1  2 -5 17+  0
Curve Equation t 29325o1 [0,1,1,-6908,206969] 1
29325p (1 curve)	1	3- 5+ 17+ 23-	0 3- 5+ -5  2  1 17+ -2
Curve Equation t Generators 29325p1 [0,1,1,-13183,558544] 1 [38:-338:1]
29325q (4 curves)	1	3- 5+ 17+ 23-	-1 3- 5+  0  0  2 17+  4
Curve Equation t Generators 29325q1 [1,0,0,-3063,64992] 2 [1011:1010:27] 29325q2 [1,0,0,-3188,59367] 4 [-3:264:1] 29325q3 [1,0,0,5437,326742] 2 [66:954:1] 29325q4 [1,0,0,-13813,-567508] 2 [-67:275:1]
29325r (1 curve)	1	3- 5+ 17+ 23-	-1 3- 5+  3  3 -5 17+  1
Curve Equation t Generators 29325r1 [1,0,0,-88,257] 1 [11:-31:1]
29325s (1 curve)	0	3- 5+ 17- 23-	1 3- 5+  2  5 -1 17- -1
Curve Equation t 29325s1 [1,0,1,-501,4273] 1
29325t (2 curves)	0	3- 5- 17+ 23-	1 3- 5- -2  0 -4 17+ -4
Curve Equation t 29325t1 [1,0,1,1299,41923] 2 29325t2 [1,0,1,-13076,501923] 2
29325u (2 curves)	1	3- 5- 17- 23-	1 3- 5-  2  0  4 17-  4
Curve Equation t Generators 29325u1 [1,0,1,145549,-408940327] 2 [49537257:-1789500973:35937] 29325u2 [1,0,1,-7458826,-7617887827] 2 [-2167297:-18239846:1331]

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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