%I #16 Dec 17 2021 01:45:58
%S 1,1,1,1,2,1,1,3,3,1,1,4,6,4,1,1,5,10,10,5,1,1,6,3,8,3,6,1,1,7,9,11,
%T 11,9,7,1,1,8,4,8,10,8,4,8,1,1,9,0,0,6,6,0,0,9,1,1,10,9,0,6,0,6,0,9,
%U 10,1,1,11,7,9,6,6,6,6,9,7,11,1,1,0,6,4,3,0,0,0,3,4,6,0,1,1,1,6,10,7,3,0,0,3
%N Triangle, read by rows, formed by reading Pascal's triangle (A007318) mod 12.
%H Ilya Gutkovskiy, <a href="/A275198/a275198.pdf">Illustrations (triangle formed by reading Pascal's triangle mod m)</a>
%H <a href="/index/Pas#Pascal">Index entries for triangles and arrays related to Pascal's triangle</a>
%F T(i, j) = binomial(i, j) mod 12.
%t Mod[ Flatten[ Table[ Binomial[n, k], {n, 0, 13}, {k, 0, n}]], 12]
%Y Cf. A007318, A047999, A083093, A034931, A095140, A095141, A095142, A034930, A095143, A008975, A095144, A034932.
%Y Sequences based on the triangles formed by reading Pascal's triangle mod m: A047999 (m = 2), A083093 (m = 3), A034931 (m = 4), A095140 (m = 5), A095141 (m = 6), A095142 (m = 7), A034930 (m = 8), A095143 (m = 9), A008975 (m = 10), A095144 (m = 11), (this sequence) (m = 12), A275198 (m = 14), A034932 (m = 16).
%K easy,nonn,tabl
%O 0,5
%A _Robert G. Wilson v_, May 29 2004