32912
domain: N
Appears in sequences
- a(n) = 36*n^2 - 55*n + 21.at n=30A157262
- Number of (n+1)X5 0..1 arrays with the number of rightwards and downwards edge increases in each 2X2 subblock differing from the number in all its horizontal and vertical neighbors.at n=14A205068
- G.f. satisfies: A(x) = Sum_{n>=0} x^n * (A(x)^n + 1/A(x)^n)^n.at n=7A217041
- Number of (n+3)X(n+3) 0..3 arrays x(i,j) with each element diagonally or antidiagonally next to at least one element with value (x(i,j)+1) mod 4, and upper left element zero.at n=1A230788
- Number of (n+3)X(2+3) 0..3 arrays x(i,j) with each element diagonally or antidiagonally next to at least one element with value (x(i,j)+1) mod 4, and upper left element zero.at n=1A230790
- T(n,k)=Number of (n+3)X(k+3) 0..3 arrays x(i,j) with each element diagonally or antidiagonally next to at least one element with value (x(i,j)+1) mod 4, and upper left element zero.at n=4A230796
- Sum of the divisors of n^3 - 1.at n=26A234860
- Numbers whose square and cube taken together contain each decimal digit at least twice.at n=25A363909
- a(n) is the number of distinct combinations that can be created by painting the sections on a shape with n divisions that rotates around its center and consists of 4 identical arms at 90-degree intervals.at n=4A367636
- Consecutive states of the linear congruential pseudo-random number generator 228*s mod (2^16+1) when started at s=1.at n=22A385079
- Conductor of elliptic curve y^2 = x^3 - n*x - n.at n=10A387891