204226
domain: N
Appears in sequences
- Even partition numbers.at n=21A052001
- Number of ways to partition 2n into positive integers.at n=25A058696
- Partition numbers of the form 3*k+1.at n=14A087184
- Number of partitions of n-th composite number containing the smallest prime factor: a(n) = A027293(A002808(n), A056608(n)).at n=35A091114
- Number of partitions of n-th composite number containing the smallest prime factor: a(n) = A027293(A002808(n), A056608(n)).at n=37A091114
- Number of partitions of T where T = (3n + 1) if n is even and T=(3n + 1)/2 if n is odd.at n=32A111329
- Even partition numbers of even numbers.at n=11A154798
- Partition numbers p(n) having the same parity as n.at n=26A209658
- p(11n+6) where p(k) = number of partitions of k = A000041(k).at n=4A213256
- Partition numbers of the form 11k.at n=22A225361
- Partition numbers (A000041) congruent to 2 (mod 4).at n=16A275029