%I A092540
%S A092540 3,13,883,237051898781,17911135064090123664377811162569837,
%T A092540 1230843829352095122161574066100819070684162503
%N A092540 Primes such that their binary representation coincides with first n terms 
               of A051023 for some n.
%C A092540 Primes appearing in A092539.
%H A092540 Eric Weisstein's World of Mathematics, <a href="http://mathworld.wolfram.com/
               Rule30.html">Rule 30</a>.
%e A092540 13 is a member because 13_10 = 1101_2 and {1,1,0,1} are the first 4 terms 
               in A051023.
%t A092540 a[n_] := If[PrimeQ[p=A092539[[n]]], p]
%Y A092540 Cf. A051023, A092539.
%Y A092540 Sequence in context: A089711 A001039 A065831 this_sequence A118628 A112513 
               A006715
%Y A092540 Adjacent sequences: A092537 A092538 A092539 this_sequence A092541 A092542 
               A092543
%K A092540 nonn
%O A092540 1,1
%A A092540 Zak Seidov (zakseidov(AT)yahoo.com), Feb 27 2004
%E A092540 a(6) from Eric Weisstein (eric(AT)weisstein.com), Feb 27, 2004.
%E A092540 The next term is too large to include.