2024 AMC 10A Problems/Problem 11
Contents
Problem
How many ordered pairs of integers satisfy ?
Infinitely many
Solution
Note that is a nonnegative integer.
We square, rearrange, and apply the difference of squares formula to the given equation: It is clear that so Each ordered pair gives one ordered pair so there are such ordered pairs
Problem
How many ordered pairs of integers satisfy ?
Infinitely many
Solution 2
Squaring both sides of the given equation gives . Splitting into its factors (keep in mind it doesn't ask for [b]positive[/b] integers, so the factors can be double negative, too) gives six cases: . Note that the square root in the problem doesn't have with it. Therefore, if there are two solutions, and , then these together are to be counted as one solution. The solutions expressed as are: . and are to be counted as one, same for and . Therefore, the solution is ~Tacos_are_yummy_1