7.1 Greatest common factor and factor by grouping  (Page 2/5)

Now we will start with a product, like $2x+14$ , and end with its factors, $2\left(x+7\right)$ . To do this we apply the Distributive Property “in reverse.”

We state the Distributive Property here just as you saw it in earlier chapters and “in reverse.”

So how do you use the Distributive Property to factor a polynomial? You just find the GCF of all the terms and write the polynomial as a product!

How to factor the greatest common factor from a polynomial

Factor: $4x+12$ .

Solution

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Factor as a noun and a verb

We use “factor” as both a noun and a verb.

Factor: $5a+5$ .

Solution

Find the GCF of 5 a and 5.
Rewrite each term as a product using the GCF.
Use the Distributive Property "in reverse" to factor the GCF.
Check by mulitplying the factors to get the orginal polynomial.
$5(a+1)$
$5\cdot a+5\cdot 1$
$5a+5✓$

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The expressions in the next example have several factors in common. Remember to write the GCF as the product of all the common factors.

Factor: $12x-60$ .

Solution

Find the GCF of 12 x and 60.
Rewrite each term as a product using the GCF.
Factor the GCF.
Check by mulitplying the factors.
$12(x-5)$
$12\cdot x-12\cdot 5$
$12x-60✓$

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Now we’ll factor the greatest common factor from a trinomial. We start by finding the GCF of all three terms.

Factor: $4y^2+24y+28$ .

Solution

We start by finding the GCF of all three terms.

Find the GCF of $4y^2$ , $24y$ and 28.
Rewrite each term as a product using the GCF.
Factor the GCF.
Check by mulitplying.
$4(y^2+6y+7)$
$4\cdot y^2+4\cdot 6y+4\cdot 7$
$4y^2+24y+28✓$

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Factor: $5x^3-25x^2$ .

Solution

Find the GCF of $5x^3$ and $25x^2.$
Rewrite each term.
Factor the GCF.
Check.
$5x^2(x-5)$
$5x^2\cdot x-5x^2\cdot 5$
$5x^3-25x^2✓$

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Factor: $21x^3-9x^2+15x$ .

Solution

In a previous example we found the GCF of $21x^3,9x^2,15x$ to be $3x$ .

Rewrite each term using the GCF, 3 x .
Factor the GCF.
Check.
$3x(7x^2-3x+5)$
$3x\cdot 7x^2-3x\cdot 3x+3x\cdot 5$
$21x^3-9x^2+15x✓$

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Factor: $8m^3-12m^{2}n+20m{n}^2$ .

Solution

Find the GCF of $8m^3$ , $12m^{2}n$ , $20m{n}^2$ .
Rewrite each term.
Factor the GCF.
Check.
$4m(2m^2-3mn+5n^2)$
$4m\cdot 2m^2-4m\cdot 3mn+4m\cdot 5n^2$
$8m^3-12m^{2}n+20m{n}^2✓$

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When the leading coefficient is negative, we factor the negative out as part of the GCF.

Factor: $\mathrm{-8}y-24$ .

Solution

When the leading coefficient is negative, the GCF will be negative.

Ignoring the signs of the terms, we first find the GCF of 8 y and 24 is 8. Since the expression −8 y − 24 has a negative leading coefficient, we use −8 as the GCF.
Rewrite each term using the GCF.
Factor the GCF.
Check.
$\mathrm{-8}(y+3)$
$\mathrm{-8}\cdot y+\left(\mathrm{-8}\right)\cdot 3$
$\mathrm{-8}y-24✓$

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