The Yellowstone Permutation is a sequence of positive integers, defined by the following rules:
- No term is repeated.
- Given n terms, the next term, a(n+1), is always the smallest possible integer.
- Every term, a(n), must be relatively prime to the previous term, a(n-1).
- Every term, a(n), must have a common divisor greater than 1 with the term before the previous, a(n-2).
The first three terms of the sequence, after which we start applying the rules, are [1 2 3].
Given a positive integer, n, return the n-th term of the sequence, a(n).
Example:
n = 4;
a = 4
Solution Stats
Problem Comments
Solution Comments
Show comments
Loading...
Problem Recent Solvers8
Suggested Problems
-
9169 Solvers
-
Determine whether a vector is monotonically increasing
23345 Solvers
-
174 Solvers
-
248 Solvers
-
Square Digits Number Chain Terminal Value (Inspired by Project Euler Problem 92)
265 Solvers
More from this Author45
Problem Tags
Community Treasure Hunt
Find the treasures in MATLAB Central and discover how the community can help you!
Start Hunting!
