Search: id:A097324
Results 1-1 of 1 results found.

%I A097324
%S A097324 14,18,23,25,29,35,36,40,41,42,47,51,53,58,61,62,63,69,70,71,73,80,81,
%T A097324 84,86,88,89,90,91,95,96,99,100,102,104,106,107,109,110,113,117,118,124,
%U A097324 127,128,130,132,135,137,139,141,146,147,150,152,155,156,157,161
%N A097324 Numbers n such that A067655(n) is different from A049606(n).
%C A097324 Or, denominator of 2^n/n! differs from denominator of sum(k=1,n,C(n-1,
               k-1)*2^k/k!).
%C A097324 We conjecture that the sequence is infinite, the sequence and its complement 
               (cases where the two values are equal) equipartition N and the difference 
               between consecutive members of this sequence never exceeds c=7.
%Y A097324 Sequence in context: A052026 A118499 A111205 this_sequence A051419 A000053 
               A079349
%Y A097324 Adjacent sequences: A097321 A097322 A097323 this_sequence A097325 A097326 
               A097327
%K A097324 nonn
%O A097324 1,1
%A A097324 Ralf Stephan, Aug 11 2004

Search completed in 0.001 seconds