prime factors 668

asked by guest
on Nov 14, 2024 at 6:12 am



You asked:

Find the prime factorization of the integer: \(\displaystyle 668\)

MathBot Answer:

The prime factorization of \(668\) is \(2^2 \cdot 167\).


 The prime factorization of an integer is the decomposition of that integer into the product of powers of prime numbers. Begin by listing the first ten primes: $2,3,5,7,11,13,17,19,23,29$.


 Divide the integer by the smallest divisible prime. Then divide the result by its smallest divisible prime. Continue until the result is prime, and multiply the primes together to get the prime factorization.

$$\begin{aligned}2&\underline{\big | 668}\\2&\underline{\big | 334}\\& \: \: 167\end{aligned}$$

$668 = 2 \cdot 2 \cdot 167 = 2^2 \cdot 167$