%I A034932
%S A034932 1,1,1,1,2,1,1,3,3,1,1,4,6,4,1,1,5,10,10,5,1,1,6,15,4,15,
%T A034932 6,1,1,7,5,3,3,5,7,1,1,8,12,8,6,8,12,8,1,1,9,4,4,14,14,
%U A034932 4,4,9,1,1,10,13,8,2,12,2,8,13,10,1,1,11,7,5,10,14,14,10
%N A034932 Pascal's triangle read modulo 16.
%D A034932 Huard et al., Europ. J. Combin., 19 (1998), 45-62.
%F A034932 T(i, j) = binomial(i, j) (mod 16)
%t A034932 Mod[ Flatten[ Table[ Binomial[n, k], {n, 0, 13}, {k, 0, n}]], 16] (from 
               Robert G. Wilson v May 26 2004)
%Y A034932 Cf. A007318, A047999, A083093, A034931, A034930, A008975.
%Y A034932 Sequence in context: A095145 A095144 A144398 this_sequence A094495 A154926 
               A117440
%Y A034932 Adjacent sequences: A034929 A034930 A034931 this_sequence A034933 A034934 
               A034935
%K A034932 nonn,tabl
%O A034932 0,5
%A A034932 N. J. A. Sloane (njas(AT)research.att.com).