-691
domain: Z
Appears in sequences
- Numerators of Bernoulli numbers B_2n.at n=6A000367
- Numerator of Bernoulli(2*n)/(2*n).at n=5A001067
- Numerator of (2n+1) B_{2n}, where B_n are the Bernoulli numbers.at n=6A002427
- Numerator of Bernoulli number B_n.at n=12A027641
- Numerators of coefficients in Stirling's expansion for log(Gamma(z)).at n=5A046968
- Numerator of (n+1)*Bernoulli(n).at n=12A050925
- Numerators of table a(n,k) read by antidiagonals: a(0,k) = 1/(k+1), a(n+1,k) = (k+1)*(a(n,k) - a(n,k+1)), n >= 0, k >= 0.at n=90A051714
- Numerators of Bernoulli twin numbers C(n).at n=12A051716
- Numerators of numbers appearing in the Euler-Maclaurin summation formula.at n=11A060054
- Triangle of Faulhaber numbers (numerators) read by rows.at n=22A065551
- Square array T(i,j) = Bernoulli(2i)*Bernoulli(2j) read by antidiagonals: numerators.at n=34A071020
- Square array T(i,j) = Bernoulli(2i)*Bernoulli(2j) read by antidiagonals: numerators.at n=29A071020
- Square array T(i,j) = Bernoulli(2i)*Bernoulli(2j) read by antidiagonals: numerators.at n=27A071020
- Square array T(i,j) = Bernoulli(2i)*Bernoulli(2j) read by antidiagonals: numerators.at n=48A071020
- Square array T(i,j) = Bernoulli(2i)*Bernoulli(2j) read by antidiagonals: numerators.at n=21A071020
- Square array T(i,j) = Bernoulli(2i)*Bernoulli(2j) read by antidiagonals: numerators.at n=51A071020
- Numerator of (2n+1)(2n+2) B_{2n}, where B_n are the Bernoulli numbers. Also numerators of the asymptotic expansion of the polygamma function psi'''(z).at n=7A076549
- Triangle of coefficients in polynomials for partial sums of powers, scaled to produce integers: Sum_{i=1..m} i^(n-1) = Sum_{k=1..n} T(n,k)*m^k/A064538(n-1).at n=78A079618
- Numerators of series coefficients of 1/(1 + cosh(sqrt(x))).at n=5A089171
- Prime numerators of Bernoulli numbers, i.e., numerators of Bernoulli numbers with indices A092132.at n=1A092133