Search: id:A045999
Results 1-1 of 1 results found.

%I A045999
%S A045999 1,2,2,4,6,6,6,8,10,10,10,10,10,12,14,14,14,16,18,18,18,20,22,22,22,22,
%T A045999 22,22,22,24,26,26,26,28,30,30,30,32,34,34,34,36,38,38,38,40,42,42,42,
%U A045999 44,46,46,46,46,46,46,46,46,46,46,46,48,50,50,50,52,54,54,54,56,58,58
%N A045999 Length of n-th term of binary Gleichniszahlen-Reihe (BGR) sequence A045998.
%C A045999 Now we count the leading zeros, of course.
%D A045999 N. Worrick, S. Lewis and B. Shrader, A possible formula for the length 
               of BGR sequences, Graph Theory Notes of New York, XXXVI (1999), p. 
               25.
%F A045999 Reference gives a conjectured formula.
%e A045999 1,11,01,1011,111001,110011,010001,...
%Y A045999 Cf. A045998, A048522.
%Y A045999 Sequence in context: A118960 A107797 A038759 this_sequence A075569 A062722 
               A160731
%Y A045999 Adjacent sequences: A045996 A045997 A045998 this_sequence A046000 A046001 
               A046002
%K A045999 nonn,base,easy
%O A045999 0,2
%A A045999 N. J. A. Sloane (njas(AT)research.att.com).
%E A045999 More terms from Patrick De Geest (pdg(AT)worldofnumbers.com), Jun 15 
               1999.

Search completed in 0.001 seconds