%I #6 Jan 21 2014 12:30:21
%S 115325637083043831900183479190311008528007516613207384396965600343647846400000,
%T 3575094749574358788905687854899641264368233015009428916305933610653083238400000,
%U 16347325453573190128511213579615837273221059920118876332835279076344751718400000
%N Intersection of A141586 and A100933.
%C For the prime factorizations of the first four terms (only three are shown above) see the Maple code.
%C Since all terms > 1 in A141586 are even, this is also the intersection of A141586 and A141757.
%p B0:=2^23*3^14*5^5*7^3*11^3*13^3*17^2*19^2*23^2*29;
%p a1:=B0*31^28; a2:=B0*31^29; a3:=B0*37^28; a4:=B0*350*31^28;
%p [seq(a1,a2,a3,a4)];
%K nonn,bref
%O 1,1
%A _David Applegate_ and _N. J. A. Sloane_, Sep 15 2008
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