82524

Appears in sequences

• Number of partitions of n into parts of 20 kinds.at n=5A023018
• Sum of terms of n-th group in A075383.at n=38A075386
• Number of n X 5 0..1 arrays avoiding 0 0 0 and 1 0 1 horizontally and 0 0 1 and 1 0 1 vertically.at n=11A207166
• Number of partitions p = [x(1), ..., x(k)], where x(1) >= x(2) >= ... >= x(k), of n such that max(x(i) - x(i-1)) >= number of distinct parts of p.at n=48A241821