Given positive integer n, consider the set of numbers {n²+1, n²+2, ... (n+1)²}. If we pick two numbers x and y out of that set, how many different values can the product xy take?

I don't think that anybody has yet  posted a proof that the n(2n+1) products of distinct pairs drawn from the given set  are all distinct.  Somebody therefore still needs to show that if  n² < a < b < c < d < (n+1)²+1, then ad=bc is not possible.

Posted by Richard on 2005-08-20 02:00:01