cp's OEIS Frontend

G.f.: (x^2-3*x)/((x^2-6*x+1)^2)+(3*x^3-4*x^2+3 x)/((x^2-6*x+1)^(5/2)).

a(n) ~ 7*(3*sqrt(2)+4)^(5/2) * n^(3/2) * (1+sqrt(2))^(2*n-4) / (3*2^(9/2)*sqrt(Pi)) * (1 - (3*sqrt((2+3/sqrt(2))*Pi))/(7*sqrt(n))). - Vaclav Kotesovec, Oct 27 2016

G.f.: -(2*z)*(2*z^3-9*z^2+19*z+3)/(y(z)^(7/2))-(2*z)*(6*z^4-5*z^3+9*z^2-15*z-3)/(y(z)^4) where y(z)=z^2-6*z+1.

a(n) ~ (17*sqrt(2)/24-1) * n^3 * (1+sqrt(2))^(2*n+6) * (1 - (7*sqrt((8+6*sqrt(2)) / Pi))/(8*sqrt(n))). - Vaclav Kotesovec, Oct 27 2016

G.f.: (2*(36*z^7+20*z^6+24*z^5-219*z^4+216*z^3+163*z^2+6*z))/(y(z)^(11/2)) +(2*(12*z^8-132*z^7+618*z^6-1830*z^5+1840*z^4+720*z^3-134*z^2-6*z))/(y(z)^6), where y(z)= z^2-6*z+1.

a(n) ~ 37 * (3*sqrt(2)+4)^(11/2) * n^(9/2) * (1+sqrt(2))^(2*n-8) / (9 * 2^(19/2) * sqrt(Pi)) * (1 - 12*sqrt(2*Pi*(4+3*sqrt(2)))/(37*sqrt(n))). - Vaclav Kotesovec, Oct 27 2016

G.f.: -(2*z*(96*z^7 - 456*z^6 + 2992*z^5 - 7068*z^4 + 3089*z^3 + 8214*z^2 + 979*z + 12)) / (y(z)^(13/2)) - (2*z*(288*z^8 + 776*z^7 - 336*z^6 - 2916*z^5 + 6276*z^4 - 1312*z^3 - 7560*z^2 - 964*z - 12)) / (y(z)^7), where y(z) = z^2-6*z+1.

G.f.: (2*x^2)/(x^2-6*x+1)^(5/2).

a(n) = 2*C_(n-2)^(5/2)(3) for n >= 2, where C_n^(m)(x) is the Gegenbauer polynomial. - Andrey Zabolotskiy, Oct 26 2016

a(n) ~ (1 + sqrt(2))^(2*n+1) * n^(3/2) / (3*2^(13/4)*sqrt(Pi)). - Vaclav Kotesovec, Oct 27 2016, simplified Aug 27 2025

From Peter Bala, Sep 20 2024: (Start)

a(n) = (1/6) * Sum_{k = 0..n} k*(k - 1)*binomial(n, k)*binomial(n+k, k).

a(n) = (1/12)*n*(n + 1)*(n - 1)*(n + 2)*hypergeom([n+3, -n+2], [3], -1).

a(n) = (2/3) * d^2/dx^2(Legendre_P(n, x)) at x = 3.

a(n) = (1/12)*n*(n + 1)*A001850(n) - (1/2)*A002695(n).

P-recursive: (n - 2)*a(n) = 3*(2*n - 1)*a(n-1) - (n + 1)*a(n-2) with a(1) = 0 and a(2) = 2. (End)