How can I tell if a problem asks to find the factor pair or the prime factor?
ex: PS110: For the postive integers a,b, and k, a^k || b means that a^k is a divisor of b, but a^(k+1) is not a divisor of b. If k is a positive integer and 2^k || 72, then k is equal to....
vs.
ex: PS204: If n=4p where p is a prime number greater than 2 how many different positive even divisors does n have, including n?
The first one uses prime factorization to solve, the second one uses factor pairs to solve. Why? Why does "how many different positive even divisors" mean that you need to look at factor pairs and not just the prime factors?
ex: PS110: For the postive integers a,b, and k, a^k || b means that a^k is a divisor of b, but a^(k+1) is not a divisor of b. If k is a positive integer and 2^k || 72, then k is equal to....
vs.
ex: PS204: If n=4p where p is a prime number greater than 2 how many different positive even divisors does n have, including n?
The first one uses prime factorization to solve, the second one uses factor pairs to solve. Why? Why does "how many different positive even divisors" mean that you need to look at factor pairs and not just the prime factors?
