Factor completely: 50x³ − 18x. (Section 5.5, Example 2)

Factoring polynomials involves rewriting a polynomial expression as a product of its factors. This process is essential for simplifying expressions and solving equations. Common techniques include factoring out the greatest common factor (GCF), using special products, and applying methods like grouping or the quadratic formula when applicable.

The greatest common factor (GCF) of a set of terms is the largest expression that divides each term without leaving a remainder. Identifying the GCF is a crucial first step in factoring polynomials, as it allows for simplification of the expression by factoring out this common factor, making the remaining polynomial easier to work with.

The difference of squares is a specific factoring pattern that applies to expressions of the form a² - b², which can be factored into (a + b)(a - b). Recognizing this pattern is important when dealing with polynomials, as it can simplify the factoring process and lead to quicker solutions in problems involving quadratic expressions.