-722
domain: Z
Appears in sequences
- Binomial transform of reflected pentanacci numbers A074062: a(n) = Sum_{k=0..n}(-1)^k*binomial(n, k)*A074062(k).at n=8A074826
- Triangle read by rows: T(n, k) = (-1)^(n+k) * A060187(n+1, k+1).at n=22A138076
- Triangle read by rows: T(n, k) = (-1)^(n+k) * A060187(n+1, k+1).at n=26A138076
- Triangle formed by coefficients of the expansion of p(x,n) = (1+x-x^2)^(n+1)*Sum_{j >= 0} (2*j+1)^n*(-x + x^2)^j.at n=37A156918
- Array: row n shows the coefficients of the characteristic polynomial of the n-th principal submatrix of f(i,j) = gcd(2^(i-1), 2^(j-1)) (A144464).at n=58A204124
- Coefficient of x in the minimal polynomial of the continued fraction [1^n,sqrt(6),1,1,...], where 1^n means n ones.at n=2A266805
- Triangle of coefficients of Gaussian polynomials [2n+7,6]_q represented as finite sum of terms (1+q^2)^k*q^(g-k), where k = 0,1,...,g with g=6n+3.at n=45A267486
- Expansion of (1-q)^k/Product_{j=1..k} (1-q^j) for k=12.at n=7A275643
- a(n) = 4^n*Euler(n, 1/4)*2^(valuation_{2}(n + 1)).at n=5A339058
- n minus the Heinz number of the conjugate of the integer partition with Heinz number n.at n=45A352491
- Expansion of 1 + f/(1 + 2*f), where f is the g.f. of the swinging factorial (A056040).at n=8A355775
- Expansion of e.g.f. 1/(1 - exp(x) + exp(3*x)).at n=5A368014
- Triangle read by rows: Coefficients of the polynomials P(n, x) * EZ(n, x), where P denote the signed Pascal polynomials and EZ the Eulerian zig-zag polynomials A205497.at n=56A373572
- Triangle read by rows: Coefficients of the polynomials P(n, x) * EZ(n, x), where P denote the signed Pascal polynomials and EZ the Eulerian zig-zag polynomials A205497.at n=60A373572