-600
domain: Z
Appears in sequences
- Expansion of e.g.f. log(1 + x*cosh(x)).at n=6A009305
- Specific heat coefficients for square lattice spin 5/2 Ising model.at n=10A010114
- Triangle of coefficients of Laguerre polynomials n!*L_n(x) (rising powers of x).at n=16A021009
- Triangle of coefficients of Laguerre polynomials L_n(x) (powers of x in decreasing order).at n=19A021010
- Triangle of coefficients in expansion of x^n in terms of Laguerre polynomials L_n(x).at n=16A021012
- Expansion of eta(q^2)^12 / theta_3(q)^3 in powers of q.at n=29A029769
- Triangle formed by coefficients of numerator polynomials defined by iterating f(u,v) = 1/u - x*v applied to a list of elements {1,2,3,4,...}.at n=25A053495
- Triangle formed by coefficients of numerator polynomials defined by iterating f(u,v) = 1/u - x*v applied to a list of elements {1,2,3,4,...}.at n=31A053495
- McKay-Thompson series of class 20e for Monster.at n=67A058560
- Triangular array of coefficients multiplied by n! of polynomials in e. These give the expected number of trials needed for the sum of uniform random variables from the interval [0,1] to exceed n+1.at n=16A089087
- Triangle, read by rows, equal to the matrix inverse of A104557 and related to Laguerre polynomials.at n=51A104558
- Riordan array (1/(1+2xc(-2x)),xc(-2x)/(1+2xc(-2x))), c(x) the g.f. of A000108.at n=17A114193
- Riordan array (-sqrt(4*x^2+8*x+1)+2*x+2, (sqrt(4*x^2+8*x+1)-2*x-1)/2).at n=15A121575
- a(2*n) = A000217(n), a(2*n+1) = -2*A000217(n).at n=49A131259
- Expansion of 1 - (1/3) * b(q) * b(q^2) * c(q)^2 / c(q^2) in powers of q where b(), c() are cubic AGM functions.at n=21A132001
- Triangle read by rows: T(n,k) = (2*k - n)*A008292(n,k) with T(n,n) = n, 0 <= k <= n, where A008292 is the triangle of Eulerian numbers.at n=29A141693
- Triangle T(n, k) = n! * StirlingS1(n, k)/binomial(n, k), read by rows.at n=11A142473
- A triangle sequence of coefficients of polynomials with roots that are inverse primes: a(n)=Prime[n](a(n-1); p(x,n)=If[n == 0, 1, a[n - 1]*(x - a[n - 1])*Product[x + Prime[i], {i, 1, n - 1}]].at n=13A144455
- Denominator polynomials for continued fraction generating function for n!.at n=33A145118
- First differences of A046163.at n=29A153171