-12096
domain: Z
Appears in sequences
- a(n) = Bernoulli(2*n) * (2*n + 1)!.at n=4A001332
- Expansion of e.g.f.: cosh(tan(log(1+x))).at n=7A009156
- Triangle giving coefficients of (n+1)!*B_n(x), where B_n(x) is a Bernoulli polynomial. Rising powers of x.at n=36A048998
- 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=44A048999
- Triangle read by rows: n-th row gives expansion of the series for HarmonicNumber(n, -r).at n=36A080779
- a(n) = Bernoulli(n) * (n+1)!.at n=8A129814
- a(n) = n!*Bernoulli(n-1), n > 2; a(0)=0, a(1)=1, a(2)=1.at n=9A129825
- Transformed Bernoulli twin numbers.at n=8A129826
- Triangle T(n,k) with the coefficient [x^k] (n+1)!* C(n,x), in row n, column k, where C(.,.) are the Bernoulli twin number polynomials of A129378.at n=36A140333
- Triangle T(n, k) = coefficients of p(n, x), where p(n, x) = (-1)^n*(x+2-n)*(x+2)^(n-1), p(0, x) = 1, and p(1, x) = -1-x, read by rows.at n=60A158285
- The RSEG2 triangle.at n=46A161739
- 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=36A191578
- Triangle T(n,m) = coefficient of x^n in expansion of (x^2*cotan(x))^m = sum(n>=m, T(n,m) x^n * m!^2/n!^2).at n=42A199542
- Triangle T(n,m) = coefficient of x^n in expansion of x^m*(x+1)^(m*x^2) = sum(n>=m, T(n,m) x^n*m!/n!).at n=28A202184
- Triangle read by rows, based on expansion of (x^2*exp(x)/(exp(x)-1))^m = x^m + sum(n>m T(n,m)*m!/((n-m)!*n!)*x^n).at n=36A202995
- Triangular array read by rows: row n shows the coefficients of this polynomial of degree n: (1/n!)*(numerator of n-th derivative of 1/(1-3x+x^2)).at n=39A328645
- Triangle read by rows: A080779 with rows reversed.at n=44A335823
- E.g.f. satisfies A(x)^A(x) = 1/(1 - x)^(x^3).at n=8A356911
- Dirichlet inverse of A341528, where A341528(n) = n * sigma(A003961(n)), and A003961 is fully multiplicative with a(prime(i)) = prime(i+1).at n=41A378228