-56700
domain: Z
Appears in sequences
- T(n, k) is the coefficient of z^k in the numerator of the polynomial part of z^n*exp(-n*s), where s = hypergeom([1, 1, 3/2], [2, 5/2], 1/z^2)/(6z^2); related to Chebyshev's quadrature. Triangle read by rows, T(n,k) for 0 <= k <= n.at n=42A101270
- Coefficients of a partition transform for Lagrange inversion of -log(1 - u(.)*t), complementary to A134685 for an e.g.f.at n=38A133932
- Triangular array read by rows: e.g.f. sqrt(1-z^2)*exp(x*z)/(1+z).at n=47A138022
- Coefficient table of numerator polynomials of o.g.f.s for partial sums of powers of positive integers.at n=39A196837
- Irregular triangle read by rows: row n gives numerators of coefficients of polynomials arising from Chebyshev quadrature.at n=21A324123