Factoring: Difference of Two Squares

Factoring

Difference of Two Squares

There are binomials that can be more easily factored if the pattern is recognized. One of these binomials is the difference of squares:

a² - b² = (a + b)(a - b)

Notice that there is no middle term in the binomial. When (a + b) and (a - b) are multiplied the new expression is a² + ab - ab - b², since the two middle terms cancel the remaining expression is a² - b². This pattern only works when the two terms are subtracted.

Example 1 Factor x² -16

Step 1. Determine if the first and last terms are perfect squares.

The first term is 1x², which is (1x)² - yes.

The last term is 16, which is (4)²- yes.

Step 2. Since the two terms are also being subtracted, substitute values for a and b into the Difference of Squares formula.

x² - 16 = (1x)² - (4)² = (x + 4)(x - 4)

Example 2 Factor 9x² - 4y²

Step 1. Determine if the first and last terms are perfect squares.

The first term is 9x², which is (3x)² - yes.

The last term is 4y², which is (2y)² - yes.

Step 2. Since the two terms are also being subtracted, substitute values for a and b into the formula.

9x² - 4y² = (3x + 2y)(3x - 2y)

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