-383
domain: Z
Appears in sequences
- Coefficients of the '6th-order' mock theta function lambda(q).at n=23A053272
- Expansion of (1-x-x^N)/((1-x)(1-x^2)(1-x^3)...(1-x^N)) for N = 6.at n=30A060025
- a(n) = (n^5 - 133*n^4 + 6729*n^3 - 158379*n^2 + 1720294*n - 6823316)/4.at n=18A121887
- a(n) = a(n-2) - (n-1)*a(n-3), with a(0) = 0, a(1) = 1, a(2) = 2.at n=11A122021
- Numerator of Hermite(n, 1/16).at n=3A159521
- Numerator of Hermite(n, 3/28).at n=2A160192
- Triangle read by rows: T(n,k) = 2 - k! + 2*n! - (n-k)! - n!*binomial(n,k).at n=16A171707
- Triangle read by rows: T(n,k) = 2 - k! + 2*n! - (n-k)! - n!*binomial(n,k).at n=19A171707
- Triangle T(n, k) = 1 + (n + k - n*k)*(2*n - k - n*(n-k)), read by rows.at n=36A172176
- Triangle T(n, k) = 1 + (n + k - n*k)*(2*n - k - n*(n-k)), read by rows.at n=44A172176
- G.f.: q-Cosh(x,q)^2 - q-Sinh(x,q)^2 at q=-x.at n=42A198199
- Triangle, read by rows, such that row n equals the coefficients of x^(n^2+n-1+k) in F(x,n) for k = 1..n, where F(x,n) = (1 + x*F(x,n))*(1 + x^n/F(x,n)), for n>=1.at n=33A200171
- Triangle read by rows: T(n,k) is the coefficient A_k in the transformation Sum_{k=0..n} x^k = Sum_{k=0..n} A_k*(x-2*(-1)^k)^k.at n=11A249267
- First differences of number of active (ON, black) cells in n-th stage of growth of two-dimensional cellular automaton defined by "Rule 493", based on the 5-celled von Neumann neighborhood.at n=11A272546
- Hankel transform of A191529.at n=35A283436
- G.f.: Product_{m>0} 1/(1 + x^m + 2!*x^(2*m)).at n=18A293287
- First difference of A293666.at n=48A293667
- Values z of primitive solutions (x, y, z) to the Diophantine equation x^3 + y^3 + 2*z^3 = 128.at n=12A336230
- a(n) = reverse(10*n - a(n-1)), with n>1, a(1) = 1.at n=42A339141
- Expansion of g.f. Product_{k>=1} (1 - x^k)^phi(k), where phi() is the Euler totient function (A000010).at n=33A346770