1999 AIME Problems/Problem 3
Problem
Find the sum of all positive integers for which is a perfect square.
Solution
We have , where is a positive integer. Rearranging gives us Applying the quadratic formula yields Now, we simplyfy: In order for to be an integer, the discriminant must be a perfect square. In other words, where is a positive integer. Rearranging gives us Aha! Difference of squares. Remember that both of these factors are integers, so we have a very limited amount of choices. Either or These two systems yield and . Plugging back in gives us , , , . Therefore, our answer is
Solution
If for some positive integer , then rearranging we get . Now from the quadratic formula,
Because is an integer, this means for some nonnegative integer . Rearranging gives . Thus or , giving or . This gives or , and the sum is .
Alternate Solution
Suppose there is some such that . Completing the square, we have that , that is, . Multiplying both sides by 4 and rearranging, we see that . Thus, . We then proceed as we did in the previous solution.
See also
1999 AIME (Problems • Answer Key • Resources) | ||
Preceded by Problem 2 |
Followed by Problem 4 | |
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