85660
domain: N
Appears in sequences
- T(n,k) = 24*A046802(n,k) - 9*A008518(n,k) - 8*A007318(n,k), triangle read by rows (0 <= k <= n).at n=38A168292
- T(n,k) = 24*A046802(n,k) - 9*A008518(n,k) - 8*A007318(n,k), triangle read by rows (0 <= k <= n).at n=42A168292
- Triangle t(n,m,k) = binomial(n, m) - k*(binomial(n, m)*binomial(n+1, m)/(m+1)) + k*Eulerian(n+1, m) with k = 6.at n=38A178347
- Triangle t(n,m,k) = binomial(n, m) - k*(binomial(n, m)*binomial(n+1, m)/(m+1)) + k*Eulerian(n+1, m) with k = 6.at n=42A178347
- Expansion of Product_{k>=1} 1/(1 + k^2*x^k).at n=16A292165
- Number of integer partitions of the n-th squarefree number using squarefree numbers.at n=34A303365