5109183315
domain: N
Appears in sequences
- Consider all compositions (ordered partitions) of n into n parts, allowing zeros. E.g., for n = 3 we get 300, 030, 003, 210, 120, 201, 102, 021, 012, 111. Then a(n) is the total number of 1's.at n=16A097070
- Row sums of the extended Catalan triangle A189231.at n=31A189911
- 0 followed by the numerators of the reduced (A001803(n) + A001790(n)) / (2*A046161(n)).at n=17A206771
- a(n) = (2+[n/2])*n!/((1+[n/2])*[n/2]!^2).at n=31A275329