38706
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=19A092291
- Numbers n such that (n + prime(n)), (n+1 + prime(n+1)), (n+2 + prime(n+2)) and (n+3 + prime(n+3)) are divisible by 5.at n=24A107582
- Number of base 32 circular n-digit numbers with adjacent digits differing by 6 or less.at n=4A125420
- a(n) = prime(prime(prime(A028815(n) - 1) - 1) - 1) - 1.at n=27A141133
- Total sum of the odd-indexed parts of all partitions of n.at n=25A207381
- Consecutive internal states of the linear congruential pseudo-random number generator (8121*s + 28411) mod 134456 when started at 1.at n=27A385461