4087968
domain: N
Appears in sequences
- Even partition numbers.at n=30A052001
- Number of ways to partition 2n into positive integers.at n=35A058696
- Partition numbers of the form 3*k.at n=29A087183
- T(n,k) = number of partitions of binomial(n,k), 0<=k<=n, triangular array read by rows.at n=40A090011
- Number of partitions of 3n+1.at n=23A111295
- Number of partitions of binomial(2*n, n).at n=4A128855
- Even partition numbers of even numbers.at n=16A154798
- Partition numbers of the form 4k.at n=10A225324
- Partition numbers of the form 6k.at n=9A225326
- Partition numbers of the form 8k.at n=4A225358
- Number of partitions of pentagonal numbers.at n=7A267709
- Partition numbers (A000041) of the form 2^5 * k for odd k.at n=0A278199