Given a positive integer, n, and another positive integer, b, return a matrix, M, of width b, with the following properties: (a) Each row is sorted in ascending order (b) the rows are unique (c) the product of the integers in each row equals n (d) the columns are sorted in ascending order, such that the primary sorting is based on the first column, secondary on the second column, etc. (e) M contains integer values only
Note: The number 1 is also considered a valid factor.
Example 1:
n = 30
b = 2
M = [ 1 30 ; 2 15 ; 3 10 ; 5 6 ]
Example 2:
n = 120
b = 3
M = [ 1 1 120 ; 1 2 60 ; 1 3 40 ; 1 4 30 ; 1 5 24 ; 1 6 20 ; 1 8 15 ; 1 10 12 ; 2 2 30 ; 2 3 20 ; 2 4 15 ; 2 5 12 ; 2 6 10 ; 3 4 10 ; 3 5 8 ; 4 5 6 ]
Solution Stats
Problem Comments
Solution Comments
Show commentsProblem Recent Solvers33
Suggested Problems
-
287 Solvers
-
Project Euler: Problem 4, Palindromic numbers
1295 Solvers
-
Back to basics 6 - Column Vector
1113 Solvers
-
Golomb's self-describing sequence (based on Euler 341)
190 Solvers
-
Mersenne Primes vs. All Primes
850 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!
The hardest property is not described (but tested):
(f) There are no b integers with product n other than in the rows of M.