-12600
domain: Z
Appears in sequences
- Triangle of Lah numbers.at n=23A008297
- Expansion of e.g.f. tan(log(x+1) - sin(x)).at n=8A013212
- E.g.f.: arctanh(log(x+1)-sin(x)) = -1/2!*x^2 + 3/3!*x^3 - 6/4!*x^4 + 23/5!*x^5 + ...at n=8A013218
- Expansion of e.g.f. tanh(log(x+1) - arcsin(x)).at n=10A013229
- tan(log(x+1)-arcsinh(x))=-1/2!*x^2+3/3!*x^3-6/4!*x^4+15/5!*x^5...at n=8A013272
- arctanh(log(x+1)-arcsinh(x))=-1/2!*x^2+3/3!*x^3-6/4!*x^4+15/5!*x^5...at n=8A013278
- Triangular table of coefficients of the Hermite polynomials, divided by 2^floor(n/2).at n=59A067613
- Triangle of coefficients of square of Hermite polynomials divided by 2^n with argument sqrt(x/2).at n=41A111595
- Coefficients of list partition transform: reciprocal of an exponential generating function (e.g.f.).at n=42A133314
- Coefficients of Laguerre recursive polynomials with an (n+2)!/2 multiplication factor and alpha=a0 =0 from Hochstadt: P(x, n) = (2*n + a0 + 1 - x)*P(x, n - 1)/(n + 1) - n*P(x, n - 2)/(n + 1);.at n=16A136533
- Triangular sequence from coefficients of the umbral calculus expansion of a Golden -Mean Bernoulli function(A001898): p(x,t)=t*phi^(x*t)/(phi^t - 1), where the golden ratio replaces "e".at n=19A137524
- Triangular array read by rows: e.g.f. sqrt(1-z^2)*exp(x*z)/(1+z).at n=37A138022
- Triangle read by rows: T(n, k) = [x^k]( (n+2)!*(3*EulerE(n, x+1) - EulerE(n, x))/4 ).at n=17A166553
- Triangle T(n,k) read by rows: matrix inverse of A106246.at n=22A167196
- A(n,k,m) is the number of permutations of an n-set with k disjoint cycles of length less than or equal to m, called the (n,k)-th m-restrained Stirling numbers of the first kind, and denoted by mS_1(n,k). The sequence shows the case of m=3.at n=39A171996
- Triangle in which row n has the n*(n+1)/2 elements of the lower triangular part of the inverse of the n-th order Hilbert matrix.at n=31A189765
- A triangle whose rows add up to the numerators of the Bernoulli numbers (with B(1) = 1/2). T(n, k) for n >= 0, 0 <= k <= n.at n=26A194587
- Numerators of bivariate Taylor expansion of the incomplete elliptic integral of the first kind.at n=13A272102
- E.g.f. A(x,k) satisfies: sn(A(x,k), k) = k * sn(x,k), where sn(,) and cn(,) are Jacobi Elliptic functions.at n=23A291527
- Coefficients of the partition polynomials that are binomial convolutions of the partition polynomials of A133314, the refined Euler characteristic polynomials of the permutahedra and coefficient polynomials of reciprocals of Taylor series or e.g.f.s. Irregular triangle read by rows with length given by A000041.at n=35A356146