-1152

domain: Z

Appears in sequences

Coefficients in expansion of Eisenstein series E_2 (also called E_1 or G_2).at n=33A006352
Coefficients in expansion of Eisenstein series E_2 (also called E_1 or G_2).at n=35A006352
Expansion of e.g.f. sinh(x)*sin(tan(x))/2, even powers only.at n=4A024247
Expansion of Product (1+q^(2k-1))^(-8)*(1+q^(4k))^(-8), k=1..inf.at n=5A034998
Dirichlet inverse of the Jordan function J_2 (A007434).at n=41A046970
Binomial transform, alternating in sign, of the tribonacci numbers.at n=21A073358
Sum_{d divides n} d^2*(-1)^bigomega(d), where bigomega(n) = A001222(n).at n=41A076792
Expansion of theta_4(q)^4 - theta_2(q)^4, where theta_2 and theta_4 are the Jacobi theta series.at n=33A103640
Expansion of theta_4(q)^4 - theta_2(q)^4, where theta_2 and theta_4 are the Jacobi theta series.at n=35A103640
Coefficients of the C-Rogers-Selberg identity.at n=53A104410
McKay-Thompson series of class 16f for the Monster group.at n=47A112153
McKay-Thompson series of class 16g for the Monster group.at n=47A112154
a(n) is the determinant of the 3 X 3 matrix with entries the 9 consecutive primes starting with the n-th prime.at n=21A117330
Coefficient array for orthogonal polynomials defined by C(2n,n).at n=22A128411
A scaled version of the coefficient array for orthogonal polynomials defined by C(2n,n).at n=22A128412
Riordan array ((1-2x)/(1+2x),x/(1+2x)^2).at n=22A128414
Integral form of A053120 :Triangle of coefficients of Integral form Chebyshev's T(n, x) polynomials (powers of x in increasing order); Much improved version by use of the integro-differential recursive form over a previous attempt.at n=63A136265
Triangle read by rows: coefficients of Fermat-Lucas polynomials.at n=38A137372
Triangle: No(x, n) = (2*n/x)*No(x, n - 1) + (-n/(n - 2))*No( x, n - 2) + Ceiling[(2*(n - 1)/((n - 2)))*Sin[(n - 1)*Pi/2]]/x; weighted by 2*x^(n + 1).at n=49A137384
Triangular sequence from coefficients of a cumulative sum of Chebyshev T(x,n) polynomials (A053120): p(x,n)=p(x,n-1)+T(x,n).at n=63A137430