876096
domain: N
Appears in sequences
- Squares of even octagonal numbers.at n=9A014794
- Squares of even pentagonal pyramidal numbers.at n=9A014800
- Squares which are the sum of twin prime pairs.at n=22A037072
- Numbers n such that n and its 10's complement are both squares, i.e., n and 10^k - n (where k is the number of digits in n) are squares.at n=19A068810
- Row sums of triangle A111595 (normalized rescaled squared Hermite polynomials).at n=11A111882
- Perfect powers which are the sum of twin prime pairs.at n=25A119767
- Number of n X 8 binary arrays without the pattern 0 1 diagonally or antidiagonally.at n=15A188823
- Number of (n+2) X 3 binary arrays avoiding patterns 001 and 011 in rows and columns.at n=19A202093
- Number of nX5 0..3 arrays avoiding the pattern z-2 z-1 z in any row, column, nw-to-se diagonal or ne-to-sw antidiagonal.at n=1A206835
- T(n,k) = Number of n X k 0..3 arrays avoiding the pattern z-2 z-1 z in any row, column, nw-to-se diagonal or ne-to-sw antidiagonal.at n=16A206838
- T(n,k) = Number of n X k 0..3 arrays avoiding the pattern z-2 z-1 z in any row, column, nw-to-se diagonal or ne-to-sw antidiagonal.at n=19A206838
- Number of 2 X n 0..3 arrays avoiding the pattern z-2 z-1 z in any row, column, nw-to-se diagonal or ne-to-sw antidiagonal.at n=5A206840
- Number of 5Xn 0..3 arrays avoiding the pattern z-2 z-1 z in any row, column, nw-to-se diagonal or ne-to-sw antidiagonal.at n=1A206843
- Number of nX5 0..3 arrays avoiding the pattern z-2 z-1 z in any row, column or nw-to-se diagonal.at n=1A206897
- T(n,k)=Number of nXk 0..3 arrays avoiding the pattern z-2 z-1 z in any row, column or nw-to-se diagonal.at n=16A206900
- T(n,k)=Number of nXk 0..3 arrays avoiding the pattern z-2 z-1 z in any row, column or nw-to-se diagonal.at n=19A206900
- Number of nX5 0..3 arrays avoiding the pattern z-2 z-1 z in any row or column.at n=1A207287
- T(n,k)=Number of nXk 0..3 arrays avoiding the pattern z-2 z-1 z in any row or column.at n=16A207290
- T(n,k)=Number of nXk 0..3 arrays avoiding the pattern z-2 z-1 z in any row or column.at n=19A207290
- Number of nX7 0..1 arrays avoiding 0 0 0 and 0 1 1 horizontally and 0 0 1 and 0 1 1 vertically.at n=7A207367