runningguy wrote:If n is a positive integer and n^2 is divisible by 72, then the largest positive integer that must divide n is
A) 6
B) 12
C) 24
D) 36
E) 48
The key word here is MUST.
In order to find the largest positive integer that
must divide n, we need to find the smallest possible value of n.
The question tells us that n² is divisible by 72.
So, n² is a multiple of 72 AND n² is the square of an integer.
Let's list some squares of integers: 1, 4, 9, 16, . . . 100, 121,
144, 169...
So,
144 is the smallest perfect square that is divisible by 72
If n² = 144, then n = 12.
So, 12 is the smallest possible value of n that satisfies the given conditions.
If n = 12, then the largest positive integer that
must divide n is
12 =
B
Aside: Notice that 12 is NOT DIVISIBLE by 24, 36 or 48 (so we can eliminate C, D and E). This shows why we wanted to find the smallest possible value of n.
Cheers,
Brent
