How many positive integers completely divide p^3 but do not completely divide p?

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Multiple Choice

How many positive integers completely divide p^3 but do not completely divide p?

To resolve the question, it's important to analyze the properties of the integer ( p ) when raised to different powers. Let’s denote ( p ) as a prime number to simplify our analysis.

When dealing with prime factors, the number of positive divisors (or "divisors") of a number can generally be determined using its prime factorization. For any integer ( n = p^k ) (where ( p ) is prime and ( k ) is a positive integer), the total number of positive divisors ( d(n) ) is given by the formula ( k + 1 ).

In the case of ( p^3 ), the prime factorization shows us that it can be expressed as ( p^3 ). This means it has ( 3 + 1 = 4 ) positive divisors: ( 1, p, p^2, ) and ( p^3 ).

Now, we need to identify how many of these divisors completely divide ( p^3 ) but do not completely divide ( p ). The divisors of ( p ) are simply ( 1 ) and ( p ) (which are ( 2

How many positive integers completely divide p^3 but do not completely divide p?

Prepare for the e-GMAT Exam with our comprehensive quiz. Study with flashcards and multiple choice questions. Dive deep into explanations and hints for each question. Get ready to ace your test!

How many positive integers completely divide p^3 but do not completely divide p?

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