%I A146967
%S A146967 1,1,1,1,4,1,1,11,11,1,1,34,34,34,1,1,109,102,102,109,1,1,350,303,292,
%T A146967 303,350,1,1,1127,901,819,819,901,1127,1,1,3688,2716,2296,2182,2296,
%U A146967 2716,3688,1,1,12425,8420,6548,5822,5822,6548,8420,12425,1,1,43402
%N A146967 A polynomial based symmetrical sequence: p(x,n)=If[n == 0, 1, (x + 1)^n
+ 2^(n - 3)*Sum[(2^(m - 1) +n*m - n + 1)*x^m*(1 + x^(n - 2*m)), {m,
1, n - 1}].
%C A146967 Row sums are:{1, 2, 6, 24, 104, 424, 1600, 5696, 19584, 66432, 226304}.
%F A146967 p(x,n)=If[n == 0, 1, (x + 1)^n + 2^(n - 3)*Sum[(2^(m - 1) +n*m - n +
1)*x^m*(1 + x^(n - 2*m)), {m, 1, n - 1}]]; t(n,m)=Coefficients(p(x,
m)).
%e A146967 {1}, {1, 1}, {1, 4, 1}, {1, 11, 11, 1}, {1, 34, 34, 34, 1}, {1, 109,
102, 102, 109, 1}, {1, 350, 303, 292, 303, 350, 1}, {1, 1127, 901,
819, 819, 901, 1127, 1}, {1, 3688, 2716, 2296, 2182, 2296, 2716,
3688, 1}, {1, 12425, 8420, 6548, 5822, 5822, 6548, 8420, 12425, 1},
{1, 43402, 27181, 19320, 15826, 14844, 15826, 19320, 27181, 43402,
1}
%t A146967 Clear[p, x, n]; p[x_, n_] = If[n == 0, 1, (x + 1)^n + 2^(n - 3)*Sum[(2^(m
- 1) + n*m - n + 1)*x^m*(1 + x^(n - 2*m)), {m, 1, n - 1}]]; Table[CoefficientList[FullSimplify[ExpandAll[\
p[x, n]]], x], {n, 0, 10}]; Flatten[%]
%Y A146967 Sequence in context: A156534 A008292 A157221 this_sequence A156049 A101919
A055106
%Y A146967 Adjacent sequences: A146964 A146965 A146966 this_sequence A146968 A146969
A146970
%K A146967 nonn
%O A146967 0,5
%A A146967 Roger L. Bagula (rlbagulatftn(AT)yahoo.com), Nov 03 2008
|
