217556
domain: N
Appears in sequences
- Greatest number m such that the fractional part of (Pi-2)^A153719(m) >= 1-(1/m).at n=17A153723
- Greatest number m such that the fractional part of (Pi-2)^A153720(n) >= 1-(1/m).at n=12A153724
- Sum of the perimeters of all regions of the n-th section of a modular table of partitions.at n=38A278602
- Start with a(0) = a(1) = 1. If a(n) = n is the rightmost term defined so far, let a(m) = m := n + a(n-1). If the terms between a(n) and a(m) are undefined, let a(n+1) = a(n) + a(m) and if m > n+1, a(m-1) = a(n+1) + a(m).at n=35A333375