-855
domain: Z
Appears in sequences
- Expansion of cosh(tan(sin(x))).at n=4A009157
- Expansion of e.g.f. exp(tan(sin(x))).at n=8A009238
- Expansion of e.g.f. arcsin(cosh(x) * log(x+1)).at n=6A012758
- E.g.f.: sinh(sin(x)+log(x+1)).at n=6A012892
- Expansion of (1-x-x^N)/((1-x)(1-x^2)(1-x^3)...(1-x^N)) for N = 4.at n=50A060023
- a(n) = Sum_{k=0..n} A105595(k)*(-1)^k*A105595(n-k) (interpolated zeros suppressed).at n=40A105596
- a(n) = prime(n)*(prime(n + 1) + 1) - (n^3 + sum of digits of n^3).at n=14A123139
- A triangular sequence of coefficients from a three level exponential expansion function: f(x,t) = log(1 + t)*(1 - t)*exp(x*(t - t^2)).at n=54A137455
- Numerator of Hermite(n, 3/14).at n=3A159508
- a(n)=n*(a(n-1)-3), a(0)=1.at n=5A165814
- Coefficients of partition Hermite-Eulerian polynomials: p(x,n)= If[n == 0, 1, HermiteH[n, x]*Sum[Eulerian[n-1, k-1]*x^(k - 1), {k, 1, n}]/2^Floor[n/2]].at n=32A171532
- a(n) = n^n - A002275(n).at n=3A177009
- Triangle of coefficients of Chebyshev's S(n,x-3) polynomials (exponents of x in increasing order).at n=32A207815
- Values of n such that L(5) and N(5) are both prime, where L(k) = (n^2+n+1)*2^(2*k) + (2*n+1)*2^k + 1, N(k) = (n^2+n+1)*2^k + n.at n=34A226925
- Expansion of Product_{i>=1, j>=1, k>=1} (1 - x^(i*j*k)).at n=49A319359
- Fourier coefficients of the modular form (1/t_{6a}^3) * (1-6*sqrt(-3)/t_{6a}) * (1-12*sqrt(-3)/t_{6a})^(4/3) * F_{6a}^20.at n=3A341574
- Square array A(n,k), n >= 0, k >= 0, read by antidiagonals downwards, where column k is the expansion of B(x)^k, where B(x) is the g.f. of A384943.at n=49A384946