59425

Appears in sequences

• Number of parts in all compositions of n into distinct parts.at n=25A097910
• a(n) = 5^n-4^n-3^n-2^n-1.at n=7A147976
• a(n) = A005259(n) mod (n+1)^3.at n=44A289289
• Number of prime parts in the partitions of n into 10 parts.at n=48A309439
• Square array T(n,k) = k^n - Sum_{0 < i < k} e(i)*(k-i)^n where e(i) = 1 if the partial sum up to this term would remain <= k^n, or 0 else; n, k >= 1; read by falling antidiagonals.at n=61A332099
• Numbers k such that k + 4, k + 6, k + 9, k + 10, and k + 14 are all semiprimes, where 4, 6, 9, 10, 14 are the first 5 semiprimes.at n=42A365240