Search: id:A161196
Results 1-1 of 1 results found.

%I A161196
%S A161196 1,12,12,66,144,66,232,792,792,232,639,2784,4356,2784,639,1596,
%T A161196 7668,15312,15312,7668,1596,3774,19152,42174,53824,42174,19152,
%U A161196 3774,8328,45288,105336,146248,146248,105336,45288,8328,17283
%V A161196 1,-12,-12,66,144,66,-232,-792,-792,-232,639,2784,4356,2784,639,-1596,
%W A161196 -7668,-15312,-15312,-7668,-1596,3774,19152,42174,53824,42174,19152,
%X A161196 3774,-8328,-45288,-105336,-146248,-146248,-105336,-45288,-8328,17283
%N A161196 Triangle by rows generated from A007249, the convolution square root 
               of A007191
%C A161196 Row sums = A007191: (1, -24, 276, -2048, 11202,...)
%F A161196 Triangle by rows, self-convolution of A007249. Begin with M = an infinite 
               lower triangular Toeplitz matrix with A007249 as every column. Let 
               Q = a matrix with A007249: (1, -12, 66, -232,..) as the right border 
               and the rest zeros. Triangle A161196 = M * Q.
%e A161196 First few rows of the triangle =
%e A161196 1;
%e A161196 -12, -12;
%e A161196 66, 144, 66;
%e A161196 -232, -792, -792, -232;
%e A161196 639, 2784, 4356, 2784, 639;
%e A161196 -1596, -7668, -15312, -15312, -7668, -1596;
%e A161196 3774, 19152, 42174, 53824, 42174, 19152, 3774;
%e A161196 -8328, -45288, -105336, -148248, -148248, -105336, -45288, -8328;
%e A161196 17283, 99936, 249084, 370272, 408321, 370272, 249084, 99936, 17283;
%e A161196 -34520, -207396, -549648, -875568, -1019844, -1019844, -875568, -549648, 
               -207396, -34520;
%e A161196 ...
%Y A161196 Cf. A007191, A007249
%Y A161196 Sequence in context: A119877 A147833 A003877 this_sequence A111306 A151777 
               A143478
%Y A161196 Adjacent sequences: A161193 A161194 A161195 this_sequence A161197 A161198 
               A161199
%K A161196 tabl,sign
%O A161196 0,2
%A A161196 Gary W. Adamson & Alexander Povolotsky (qntmpkt(AT)yahoo.com), Jun 06 
               2009

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