-540
domain: Z
Appears in sequences
- Expansion of Product_{k >= 1} (1 - x^k)^6.at n=66A000729
- Expansion of e.g.f. sin(x)/cos(log(1+x)).at n=6A009552
- Coefficient of x^(30-n) in the minimal polynomial for 2^(1/6)+3^(1/5).at n=15A035616
- 10th differences of primes.at n=23A036271
- Matrix inverse of triangle A055140.at n=23A055141
- Image of Euler totient function (A000010) under "little Hankel" transform that sends [c_0, c_1, ...] to [d_0, d_1, ...] where d_n = c_n^2 - c_{n+1}*c_{n-1}.at n=36A056228
- McKay-Thompson series of class 28C for Monster.at n=39A058608
- Coefficients of polynomials ( (1 -x +sqrt(x))^(n+1) - (1 -x -sqrt(x))^(n+1) )/(2*sqrt(x)).at n=51A061177
- 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=18A089087
- Riordan array (((1+x)^2 - x^3)/(1+x)^3, 1/(1+x)).at n=70A099569
- Triangle read by rows giving coefficients in Bernoulli polynomials as defined in A001898, after multiplication by the common denominators A001898(n).at n=39A100655
- Triangle, read by rows, equal to the right-hand side of the triangle A084610, with row n listing the coefficients of (1+x-x^2)^n: T(n,k) = [x^(n+k)] (1+x-x^2)^n, for n>=k>=0.at n=58A104505
- Riordan array ((1-x)/(1+x), x/(1+x)^2).at n=47A110162
- Riordan array (1,x(1-3x)).at n=51A110517
- a(n) is the determinant of the 3 X 3 matrix with entries the 9 consecutive primes starting with the n-th prime.at n=12A117330
- Triangle of Hankel transforms of certain binomial sums.at n=37A120257
- Scaled coefficient table for Chebyshev polynomials 2*T(2*n, sqrt(x)/2) (increasing even scaled powers, without zero entries).at n=47A127677
- Triangle T(n,k) = A053120(n,k)+binomial(n,k) read by rows, 0<=k<=n.at n=52A137423
- Coefficients of a normalized Schwarzian derivative generating the Neretin polynomials: S(f) = (x^2/6) { D^2 log(f(x)) - (1/2) [D log(f(x))]^2 }.at n=38A145900
- Triangle read by rows, characteristic polynomials of Cartan ring matrices.at n=52A152060