2,2

In general a(n)= (2/m)*Sum(r,1,m-1,Sin(r*j*Pi/m)Sin(r*k*Pi/m)(2Cos(r*Pi/m))^(2n)) counts (s(0), s(1), ..., s(2n)) such that 0 < s(i) < m and |s(i)-s(i-1)| = 1 for i = 1,2,....,2n, s(0) = j, s(2n) = k.

a(n)=(2/9)*Sum(r, 1, 8, Sin(r*Pi/9)Sin(5*r*Pi/9)(2Cos(r*Pi/9))^(2n)) a(n)=7a(n-1)-15a(n-2)+10a(n-3)-a(n-4) G.f.: x^2(-1+2x)/(-1+7x-15x^2+10x^3-x^4)

Sequence in context: A026639 A022633 A092490 this_sequence A030191 A093131 A000344

Adjacent sequences: A094825 A094826 A094827 this_sequence A094829 A094830 A094831

nonn

Herbert Kociemba (kociemba(AT)t-online.de), Jun 13 2004