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Numbers n such that Mordell's equation y^2 = x^3 - n has exactly 2 integral solutions.
1

%I #6 May 02 2017 22:22:28

%S 2,13,15,18,19,20,23,25,35,40,44,45,49,54,56,61,67,71,72,74,79,81,83,

%T 87,89,95,106,107,112,118,121,124,126,127,128,139,143,146,148,150,151,

%U 153,155,159,167,170,172,175,184,186,188,193,199,222,223,233,235,236,239

%N Numbers n such that Mordell's equation y^2 = x^3 - n has exactly 2 integral solutions.

%H J. Gebel, <a href="/A001014/a001014.txt">Integer points on Mordell curves</a> [Cached copy, after the original web site tnt.math.se.tmu.ac.jp was shut down in 2017]

%Y Cf. A081120, A081121, A179163-A179175.

%K nonn

%O 1,1

%A _Artur Jasinski_, Jun 30 2010

%E Edited by _Ray Chandler_, Jul 11 2010