45251
domain: N
Appears in sequences
- Let p = n-th irregular prime, A000928(n). Then a(n) = smallest value of m such that numerator(Bernoulli(2*m)/(2*m)) / numerator(Bernoulli(2*m)/(2*m*(2*m-1))) equals p.at n=15A092291
- Take a squarefree semiprime and take the difference of its prime factors. If it is a squarefree semiprime repeat the process. Sequence lists the squarefree semiprimes that generate other squarefree semiprimes only in the first k steps of this process. Case k = 5.at n=20A296812
- Triangle read by rows, derived from A007318, row sums = the Bell Sequence.at n=62A309495
- Number of joining pairs of integer partitions of n.at n=30A318915