Factor: x² + 4x + 4 − 9y². (Section 5.6, Example 4)

Factoring quadratic expressions involves rewriting them as a product of two binomials. In the expression x² + 4x + 4, we can recognize it as a perfect square trinomial, which factors to (x + 2)². Understanding how to identify and factor these forms is essential for simplifying expressions and solving equations.

The difference of squares is a specific algebraic identity that states a² - b² = (a - b)(a + b). In the given expression, after factoring the quadratic part, we can recognize that we have a difference of squares when we rewrite it as (x + 2)² - (3y)². This allows us to apply the difference of squares formula to further factor the expression.

Binomial products are expressions formed by multiplying two binomials. When we apply the difference of squares to (x + 2)² - (3y)², we obtain (x + 2 - 3y)(x + 2 + 3y). Understanding how to expand and simplify binomial products is crucial for both factoring and solving polynomial equations.