17192

Properties

Appears in sequences

• First terms from generation 1 onwards.at n=13A048456
• Number of orbits of length n under the map whose periodic points are counted by A001643.at n=20A060168
• Exponents f(n), n = 1, 2, ..., in the infinite product 1 - z - z^2 - z^3 = Product_{n>=1} (1-z^n)^f(n).at n=20A125951
• Triangle read by rows: T(n,k) is the number of dispersed Dyck paths of length n (i.e., Motzkin paths of length n with no (1,0) steps at positive heights) with k HUs, where U=(1,1) and H=(1,0).at n=65A191320
• G.f. A(x,y) satisfies: A(x,y) = x*y + A(x,x*y)^2, with A(0,y) = 1.at n=70A275670
• Numbers k such that k!6 - 27 is prime, where k!6 is the sextuple factorial number (A085158).at n=26A289698
• Digits of the Copeland-Erdős constant taken in groups of five digits.at n=8A304652
• Sum of the prime parts in the partitions of n into 7 parts.at n=34A309468
• Numbers k such that the k-th composition in standard order is an alternating permutation of {1..k} for some k.at n=22A349051
• Table read by rows: T(n,k) = number of k-gons, k >= 3, formed inside a square with edge length 1 by the straight line segments mutually connecting all vertices and points that divide the sides into segments with lengths equal to the Farey series of order n = A006842(n,m)/A006843(n,m), m = 1..A005728(n).at n=45A358889