-3410
domain: Z
Appears in sequences
- Triangle of coefficients of Euler polynomials E_2n(x) (exponents in increasing order).at n=39A004172
- Triangle of coefficients of Euler polynomials E_2n(x) (exponents in decreasing order).at n=45A004173
- Triangle of coefficients of Euler polynomials rescaled to integers by multiplication with 2^(binary carry sequence (A007814)).at n=68A058940
- Triangle of coefficients of Euler polynomials rescaled to integers by multiplication with 2^(binary carry sequence (A007814)).at n=81A058940
- Triangle giving numerators of coefficients of Euler polynomials, highest powers first.at n=87A059341
- Coefficients of even-indexed Euler polynomials (falling powers without zeros).at n=26A060082
- Coefficients of even-indexed Euler polynomials (rising powers without zeros).at n=22A060083
- Numerator of coefficients of Euler polynomials (rising powers).at n=81A060096
- Let c(n) = x^(2^n-1)*(1-x^(2^n)), g(n) = 1 + x^(2^n-1) + x^(2^n), h(n) = Product_{i=1..n} g(i); then use g.f. Sum_{n>=1} c(n)/h(n).at n=60A151676
- a(n) = 5*(-1)^n*A078008(n).at n=11A156550
- Expansion of the unique normalized cusp form of Gamma_0(5) of weight 6 in powers of q.at n=28A226347
- a(n) = Sum_{k=1..n-1} binomial(n, k)*G_n*G_{n-k} where G_n is the n-th Genocchi number (of the first kind).at n=9A290701
- a(n) = -(A(n) - A(n-1)) where A(n) = A057597(n+1), for n >= 0.at n=36A319200