7.4 Factor special products

Elementary algebra Page 1 / 7

By the end of this section, you will be able to:

Factor perfect square trinomials
Factor differences of squares
Factor sums and differences of cubes
Choose method to factor a polynomial completely

Before you get started, take this readiness quiz.

Simplify: ${(12 x)}^{2} .$
If you missed this problem, review [link] .
Multiply: ${(m + 4)}^{2} .$
If you missed this problem, review [link] .
Multiply: ${(p - 9)}^{2} .$
If you missed this problem, review [link] .
Multiply: $(k + 3) (k - 3) .$
If you missed this problem, review [link] .

The strategy for factoring we developed in the last section will guide you as you factor most binomials, trinomials, and polynomials with more than three terms. We have seen that some binomials and trinomials result from special products—squaring binomials and multiplying conjugates. If you learn to recognize these kinds of polynomials, you can use the special products patterns to factor them much more quickly.

Factor perfect square trinomials

Some trinomials are perfect squares. They result from multiplying a binomial times itself. You can square a binomial by using FOIL, but using the Binomial Squares pattern you saw in a previous chapter saves you a step. Let’s review the Binomial Squares pattern by squaring a binomial using FOIL.

This image shows the FOIL procedure for multiplying (3x + 4) squared. The polynomial is written with two factors (3x + 4)(3x + 4). Then, the terms are 9 x squared + 12 x + 12 x + 16, demonstrating first, outer, inner, last. Finally, the product is written, 9 x squared + 24 x + 16.

The first term is the square of the first term of the binomial and the last term is the square of the last. The middle term is twice the product of the two terms of the binomial.

\begin{matrix} {(3 x)}^{2} + 2 (3 x \cdot 4) + 4^{2} \\ 9 x^{2} + 24 x + 16 \end{matrix}

The trinomial 9 x ² + 24 +16 is called a perfect square trinomial. It is the square of the binomial 3 x +4.

We’ll repeat the Binomial Squares Pattern here to use as a reference in factoring.

Binomial squares pattern

If a and b are real numbers,

\begin{matrix} {(a + b)}^{2} = a^{2} + 2 a b + b^{2} & {(a - b)}^{2} = a^{2} - 2 a b + b^{2} \end{matrix}

When you square a binomial, the product is a perfect square trinomial. In this chapter, you are learning to factor—now, you will start with a perfect square trinomial and factor it into its prime factors.

You could factor this trinomial using the methods described in the last section, since it is of the form ax ² + bx + c . But if you recognize that the first and last terms are squares and the trinomial fits the perfect square trinomials pattern , you will save yourself a lot of work.

Here is the pattern—the reverse of the binomial squares pattern.

Perfect square trinomials pattern

If a and b are real numbers,

\begin{matrix} a^{2} + 2 a b + b^{2} = {(a + b)}^{2} & a^{2} - 2 a b + b^{2} = {(a - b)}^{2} \end{matrix}

To make use of this pattern, you have to recognize that a given trinomial fits it. Check first to see if the leading coefficient is a perfect square, $a^{2}$ . Next check that the last term is a perfect square, $b^{2}$ . Then check the middle term—is it twice the product, 2 ab ? If everything checks, you can easily write the factors.

How to factor perfect square trinomials

Factor: $9 x^{2} + 12 x + 4$ .

Solution

This table gives the steps for factoring 9 x squared +12 x +4. The first step is recognizing the perfect square pattern “a” squared + 2 a b + b squared. This includes, is the first term a perfect square and is the last term a perfect square. The first term can be written as (3 x) squared and the last term can be written as 2 squared. Also, in the first step, the middle term has to be twice “a” times b. This is verified by 2 times 3 x times 2 being 12 x.

The second step is writing the square of the binomial. The polynomial is written as (3 x) squared + 2 times 3 x times 2 + 2 squared. This is factored as (3 x + 2) squared.

The last step is to check with multiplication.

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Factor: $4 x^{2} + 12 x + 9$ .

${(2 x + 3)}^{2}$

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Factor: $9 y^{2} + 24 y + 16$ .

${(3 y + 4)}^{2}$

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The sign of the middle term determines which pattern we will use. When the middle term is negative, we use the pattern $a^{2} - 2 a b + b^{2}$ , which factors to ${(a - b)}^{2}$ .

The steps are summarized here.

Factor perfect square trinomials.

$\begin{matrix} Step 1. Does the trinomial fit the pattern? & a^{2} + 2 a b + b^{2} & a^{2} - 2 a b + b^{2} \\ • Is the first term a perfect square? & {(a)}^{2} & {(a)}^{2} \\ Write it as a square. \\ • Is the last term a perfect square? & {(a)}^{2} {(b)}^{2} & {(a)}^{2} {(b)}^{2} \\ Write it as a square. \\ • Check the middle term. Is it 2 a b ? & {(a)}^{2}_{↘} \underset{2 \cdot a \cdot b}{}_{↙} {(b)}^{2} & {(a)}^{2}_{↘} \underset{2 \cdot a \cdot b}{}_{↙} {(b)}^{2} \\ Step 2. Write the square of the binomial. & {(a + b)}^{2} & {(a - b)}^{2} \\ Step 3. Check by multiplying. \end{matrix}$

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Source: OpenStax, Elementary algebra. OpenStax CNX. Jan 18, 2017 Download for free at http://cnx.org/content/col12116/1.2

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