We can solve this problem by considering the factorization of n2−19n+99 and checking for perfect squares.
We know that a perfect square can be factored into two identical perfect squares. So we need to find two positive integers that multiply to n2−19n+99 and are themselves perfect squares.
Here's how we can proceed:
Factoring the expression: n2−19n+99=(n−1)(n−99).
Look for factors of 99: Since 99 is itself a perfect square, we only need to consider the factor 1 and itself (99) from the factored expression.
Checking for perfect squares: We see that (n−99) is already a perfect square. Now we need to check if (n−1) is a perfect square for each possibility:
If (n−1)=12=1, then n=2.
If (n−1)=92=81, then n=82. (This doesn't satisfy the condition of n being positive)
Therefore, the only positive integer value of n for which n2−19n+99 is a perfect square is n=2.