-15120
domain: Z
Appears in sequences
- Expansion of (Product_{j>=1} (1-(-x)^j) - 1)^9 in powers of x.at n=23A001487
- Triangle of Lah numbers.at n=22A008297
- Triangle T(n,k) = k! * Stirling1(n,k), 1<=k<=n.at n=26A048594
- Triangle giving coefficients of (n+1)!*B_n(x), where B_n(x) is a Bernoulli polynomial. Rising powers of x.at n=26A048998
- Triangle giving coefficients of (n+1)!*B_n(x), where B_n(x) is a Bernoulli polynomial, ordered by falling powers of x.at n=22A048999
- Generalized Stirling number triangle of first kind.at n=15A049460
- Triangle T(n,k) giving coefficients in expansion of n!*binomial(x-n,n) in powers of x.at n=20A054655
- Coefficient triangle of generalized Laguerre polynomials n!*L(n,4,x) (rising powers of x).at n=16A062140
- Coefficient triangle of generalized Laguerre polynomials (a=1).at n=22A066667
- Coefficients of the polynomials in the numerator of the generating function x/(1-x-x^2) for the Fibonacci sequence and its successive derivatives starting with the highest power of x.at n=29A078991
- Nonzero coefficients of the polynomials in the numerator of the generating function x/(1-x-x^2) for the Fibonacci sequence and its successive derivatives starting with the highest power of x.at n=22A078992
- Coefficients of the polynomials in the numerator of the generating function x/(1-x-x^2) for the Fibonacci sequence and its successive derivatives starting with the constant.at n=32A079461
- Nonzero coefficients of the polynomials in the numerator of the generating function x/(1-x-x^2) for the Fibonacci sequence and its successive derivatives starting with the constant.at n=26A079462
- Triangle, read by rows, equal to the matrix inverse of A104557 and related to Laguerre polynomials.at n=85A104558
- The matrix inverse of the unsigned Lah numbers A271703.at n=30A111596
- Coefficients of a partition transform for Lagrange inversion of -log(1 - u(.)*t), complementary to A134685 for an e.g.f.at n=24A133932
- A triangular sequence of coefficients from a Laplace Transform of a Bernoulli expansion function: LaplaceTransform[t*Exp[x*t]/(Exp[t] - 1), t, 1/t] = Zeta[2,1+1/t-x]->shifted to Zeta[6,1+1/t-x].at n=9A137499
- A triangular sequence from an expansion of coefficients of the function: p(x,t)=Exp(x*g*(t))*(1-f(t)^2);f(t)=1/Sqrt[1 - 2*t^2 + t^4];g(t)=t. (Based on the Weierstrass functions of Jenkins-Serrin minimal surface.)at n=44A137523
- Triangle of coefficients associate with the expansion of the K_3 graph matric characteristic polynomial as a Sheffer sequence: M = {{0, 1, 1}, {1, 0, 1}, {1, 1, 0}} f(t)=-t^3+3t+2 p(x,t)=Exp[x,t)/(2*t^3+3*t^2-1)=exp(x*t)(t^3*f(1/t)).at n=40A137943
- A triangular sequence of coefficients based on the expansion of a Morse potential type function: p(x,t) = exp(x*t)*(exp(-2*t) - 2*exp(-t)).at n=58A138106