1994 AHSME Problems/Problem 25
Problem
If and are non-zero real numbers such that then the integer nearest to is
Solution
We have two cases to consider: is positive or is negative. If is positive, we have:
Solving for in the top equation gives us . Plugging this in gives us:
Since we're told is not zero, we can divide by , giving us:
The discriminant of this is , which means the equation has no real solutions. Therefore, is negative. Now we have:
Negating the top equation gives us . We seek , so the answer is