-4200
domain: Z
Appears in sequences
- Expansion of e.g.f. (1 + x)^x.at n=7A007113
- Triangle of Lah numbers.at n=24A008297
- sin(tan(x)*arcsin(x))=2/2!*x^2+12/4!*x^4+70/6!*x^6-4200/8!*x^8...at n=3A012376
- arcsinh(tan(x)*arcsin(x))=2/2!*x^2+12/4!*x^4+70/6!*x^6-4200/8!*x^8...at n=3A012381
- a(n) = 2*a(n-1) - a(n-2) - a(n-4) with a(0) = a(1) = 0, a(2) = 1, a(3) = 2.at n=24A014292
- Triangle read by rows: matrix 5th power of the Stirling-1 triangle A008275.at n=11A039817
- Coefficient triangle of generalized Laguerre polynomials n!*L(n,2,x) (rising powers of x).at n=16A062139
- Coefficient triangle of generalized Laguerre polynomials (a=1).at n=24A066667
- Triangle read by rows: coefficients of polynomials E(n,x) related to partitions with parts occurring at most thrice.at n=20A098494
- Triangle, read by rows, equal to the matrix inverse of A104557 and related to Laguerre polynomials.at n=87A104558
- The matrix inverse of the unsigned Lah numbers A271703.at n=32A111596
- Irregular triangular array a(n,m) for third (k=3) convolution of Chebyshev's S(n,x) = U(n,x/2) polynomials, read by rows (n >=0, 0 <= m <= floor(n/2)).at n=33A128505
- Coefficients of list partition transform: reciprocal of an exponential generating function (e.g.f.).at n=40A133314
- Triangle read by rows, based on the two-variable g.f. exp(x*t)*(x*(1 - 2*exp(x)) - 2*exp(x))/(1 - exp(t)) (the first of two parts).at n=30A138133
- Denominator polynomials for continued fraction generating function for n!.at n=52A145118
- Triangle, read by rows, T(n, k) = (prime(n+1) - prime(k+1))! - (n! - k!).at n=33A158748
- 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=18A189765
- Triangle read by rows, based on expansion of (x^2/(exp(x)-1))^m = x^m+sum(n>m T(n,m)*m!/((n-m)!*n!)*x^n).at n=32A191578
- Minimum value in the inverse of Hilbert's matrix.at n=3A210358
- Triangle read by rows in which row n gives coefficients of polynomial f_n(x)/(n+1) of degree less than n that satisfies Integral_{x=0..1} g(t - x) * f_n(x) dx = g(t) for any polynomial g(x) of degree less than n.at n=24A303700