How do you factor completely 2x^3 -32x?

1 Answer
mason m
Nov 15, 2015

2x(x+4)(x-4)

Explanation:

Look for a common factor between the two terms. If you focus on just the constants, 2 and 32, it is clear that their greatest common factor is 2.
So, we can "take a 2" out of both terms in 2x^3-32x.
We can rewrite it as 2(x^3-16x).
We can also factor out an x from both terms: 2x(x^2-16)
We are not done. The term x^2-16 is a "difference of squares".
Differences of squares, like a^2-b^2, can be factored into (a+b)(a-b).
Therefore, we can factor x^2-16 into (x+4)(x-4).

So, we can factor the entire term into 2x(x+4)(x-4).

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