Search: id:A103990
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%I A103990
%S A103990 2,6,50,38,74,386,206,310,1334,614,822,3218,1370,1718,6362,2582,3106,
%T A103990 11090,4358,5094
%N A103990 Reduced numerators of the hypercube line-picking integrand Sqrt[Pi]I[n,
               0].
%C A103990 Conjecture: Let b(n) be A103991(n), then a(n)/b(n) = (2/3)*(n^3-n^2+2*n+1)/
               (2*n+1). [From Gerald McGarvey (gerald.mcgarvey(AT)comcast.net), 
               Aug 11 2009]
%H A103990 Eric Weisstein's World of Mathematics, <a href="http://mathworld.wolfram.com/
               HypercubeLinePicking.html">Hypercube Line Picking</a>
%e A103990 2/3, 6/5, 50/21, 38/9, 74/11, 386/39, 206/15, 310/17, 1334/57, 614/21, 
               ...
%Y A103990 Cf. A103991.
%Y A103990 Sequence in context: A074020 A086550 A080310 this_sequence A079835 A052332 
               A134047
%Y A103990 Adjacent sequences: A103987 A103988 A103989 this_sequence A103991 A103992 
               A103993
%K A103990 nonn,frac,more
%O A103990 1,1
%A A103990 Eric Weisstein (eric(AT)weisstein.com), Feb 23, 2005

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