-1240
domain: Z
Appears in sequences
- Coefficients of modular function G_3(tau).at n=35A005761
- Triangle, read by rows, where T(0,0) = 1, T(n,k) = 2^n*T(n-1,k) - T(n-1,k-1).at n=18A108085
- Matrix inverse of triangle A022166.at n=17A135950
- Triangle read by rows generated from (x-1)*(x-2)*(x-4)*...at n=18A158474
- Hankel transform of A052702.at n=48A160705
- Coefficients of Hankel moment polynomials for c=1/2:f(a,b) = Gamma[a + b]/Gamma[a] p(x,n)=Sum[Binomial(n, k)*(f(c, n)/(f(c, n - k)*f(c, k)))*x^k, {k, 0, n}].at n=27A171605
- Coefficients of Hankel moment polynomials for c=1/2:f(a,b) = Gamma[a + b]/Gamma[a] p(x,n)=Sum[Binomial(n, k)*(f(c, n)/(f(c, n - k)*f(c, k)))*x^k, {k, 0, n}].at n=29A171605
- Expansion of Product_{n>=0} (1 + q*(-q^2)^n) / (1 - q*(-q^2)^n).at n=65A193863
- Poly-Cauchy numbers c_n^(-4).at n=6A222748
- Difference between sums of quadratic residues and non-residues modulo n that are coprime to n.at n=95A255643
- a(n) = n! * Sum_{k=0..n} (-k * (n-k))^k/k!.at n=5A351796
- G.f. satisfies A(x) = 1 + x*A(x) - x^2*A(x)^3.at n=10A367028
- Expansion of 1 / Sum_{k in Z} x^k / (1 - x^(5*k+1)).at n=38A375062
- Square array A(n,k), n >= 0, k >= 0, read by antidiagonals downwards, where A(n,k) is the n-th term of the inverse Stirling transform of j-> (j+1)^k.at n=61A383049