46176

Appears in sequences

• Number of orbits of length n under the map whose periodic points are counted by A061693.at n=7A092239
• Define an array by d(m, 0) = 1, d(m, 1) = m; d(m, k) = (m - k + 1) d(m+1, k-1) - (k-1) (m+1) d(m+2, k-2). Sequence gives d(n,3).at n=37A126935
• Number of (n+2) X (3+2) 0..1 arrays with no 3 X 3 subblock diagonal sum 0 and no antidiagonal sum 3 and no row sum 0 or 3 and no column sum 0 or 3.at n=20A258961
• Solutions y to the negative Pell equation y^2 = 72*x^2 - 83232 with x,y >= 0.at n=10A281240
• Number of partitions p of n such that (number of numbers in p that have multiplicity 1) <= (number of numbers in p having multiplicity > 1).at n=45A330146