1 Answer

Alex Zak · Answer 1 · 2023-06-19T03:30:25+0000

Answer:

$4(x-5)(3{x}^(2)+1)$

Explanation:

1) Find the Greatest Common Factor (GCF).

1 - What is the largest number that divides evenly into
12x^3,-60x^2,4x, and
?

It is

2 - What is the highest degree of
that divides evenly into
12x^3,-60x^2,4x, and
?

It is 1, since
is not in every term.

3 - Multiplying the results above,

The GCF is 4.

2) Factor out the GCF. (Write the GCF first. Then, in parentheses, divide each term by the GCF.)

$4(\frac{12{x}^(3)}{4}+\frac{-60{x}^(2)}{4}+(4x)/(4)-(20)/(4))$

3) Simplify each term in parentheses.

$4(3{x}^(3)-15{x}^(2)+x-5)$

4) Factor out common terms in the first two terms, then in the last two terms.

$4(3{x}^(2)(x-5)+(x-5))$

5) Factor out the common term
x-5 .

$4(x-5)(3{x}^(2)+1)$

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