Determine all possible positive integer solutions of this equation:

n! = a! + b! + c!

Consider if the problem is rewritten as:

n! - c! = a! + b!

The sum of two factorials must equal the difference of two others.  Fr the first six factorials, the five differences between consecutive factorials is {1, 4, 18, 96, 600}.  The factorials of the first six are {1, 2, 6, 24, 120, 720}.  It is plain to see that the higher one goes, no possibility exists that the sum of any two factorials can equal the ever-increasing gaps.  For example, to fill the gap of 600 (6! - 5!) would require 5! + 5! + 5! + 5! + 5!, a sum of 5 factorials as opposed to the 2 defined.

From that, it is easier to narrow down to the area where the integer approaches zero.  Comparing the two sets above, (4 = 2 + 2) or:

3! - 2! = 2! + 2!

Therefore, the only solution is:

2! + 2! + 2! = 3!

Posted by hoodat on 2007-04-26 08:57:19