Show that every positive integer is a sum of one or more
numbers of the form 2^r*3^s, where r and s are nonnegative
integers and no summand divides another.
Remarks: This problem was originally created by Paul Erdős.
Note that the representations need not be unique: for instance,
11 = 2+9 = 3+8:
(In reply to Non-answer
.... " As I noticed just before I posted but decided to share anyway...
I wonder why.