balboa wrote:
If is n is multiple of 5, and n=p^2*q where p and q are prime, which of the following must be a multiple of 25?
A. p^2
B. q^2
C. pq
D. p^2*q^2
E. p^3*q
A common phrase that is used on the GMAT is the word must. In this question, we are asked which of the following must be a multiple of 25. This means that one of our answer choices will always be a multiple of 25, no matter what. It is our job to determine which one, based on the given information.
We are given that n is a multiple of 5, n = (p^2)q, and that p and q are prime numbers.
Because n is a multiple of 5, a prime number, we know that either p or q is 5. Let’s now analyze each answer choice to determine which one MUST (in all cases) be a multiple of 25.
A) p^2
If p = 3, then p^2 = 9 is not a multiple of 25. Answer choice A is not correct.
B) q^2
If q = 3, then q^2 = 9 is not a multiple of 25. Answer choice B is not correct.
C) pq
If p = 5 and q = 3 (or vice versa), pq = 15 is not a multiple of 25. Answer choice C is not correct.
D) (p^2)(q^2)
Regardless of which values we select for p and q, since we know that either p or q is 5, (p^2)(q^2) will always be a multiple of 25. If this is too difficult to see, let’s use numbers.
If p = 5 and q = 3, (p^2)(q^2) = (25)(9) is a multiple of 25.
If p = 3 and q = 5, (p^2)(q^2) = (9)(25) is also a multiple of 25.
Answer choice D is correct.
For practice, let’s analyze answer choice E.
E) (p^3)q
If p = 3 and q = 5, then (p^3)q = 135 is not a multiple of 25. Answer choice E is not correct.
Answer: D
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