What are the smallest positive integers A, B, C, and D such that A+A > A+B > A+C > B+B > B+C > A+D > C+C > B+D > C+D > D+D ?
Note: Of all solutions, choose the one with the smallest A, then smallest B if there are more than one with the smallest A, etc.
We can easily see that A>B>C>D. This satisfies a lot of the other inequalities. What's left is:
A+C>2B
2B>A+D
B+C>A+D
A+D>2C
2C>B+D
So we have 6 inequalities to satisfy. From a first look, it A, B, C, D cannot be consecutive. Maybe I'll try it later when I have more time.
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Posted by np_rt
on 2004-11-06 13:17:27 |
First Steps
