116760

Appears in sequences

• First differences of A069474, successive differences of (n+1)^6-n^6.at n=16A069475
• Number of 14 X 14 arrays of squares of integers, symmetric under 90-degree rotation, with all rows summing to n.at n=2A156417
• Number of n X n arrays of squares of integers, symmetric under 90-degree rotation, with all rows summing to 2.at n=12A156431
• Triangle read by rows, k!*s_2(n, k) where s_m(n, k) are the Stirling-Frobenius cycle numbers of order m; n >= 0, k >= 0.at n=33A225475
• E.g.f. A(x) satisfies: 1 = ...(((((A(x) - x)^(1/2) - x^2/2!)^(1/3) - x^3/3!)^(1/4) - x^4/4!)^(1/5) - x^5/5!)^(1/6) -...- x^n/n!)^(1/(n+1)) -...at n=8A274966
• p-INVERT of the positive integers, where p(S) = (1 - S^2)(1 - 2*S^2).at n=10A290930
• Triangle T(n,k) defined by Sum_{k=1..n} T(n,k)*u^k*x^n/n! = exp(Sum_{n>0} u*sigma(n)*x^n/n!).at n=51A338871
• Expansion of e.g.f. ( Product_{k>0} 1/(1-x^k)^k )^x.at n=7A356554