Factor out the greatest common factor from each polynomial. See Example 1. xy-5xy^2

The Greatest Common Factor (GCF) is the largest factor that divides two or more numbers or terms without leaving a remainder. In the context of polynomials, the GCF is the highest degree of common variables and the largest numerical coefficient shared among the terms. Identifying the GCF is essential for simplifying expressions and factoring polynomials effectively.

Factoring polynomials involves rewriting a polynomial as a product of its factors, which can include numbers, variables, or other polynomials. This process is crucial for simplifying expressions, solving equations, and analyzing polynomial behavior. Factoring out the GCF is often the first step in this process, making it easier to work with the remaining polynomial.

Polynomial terms are the individual components of a polynomial expression, typically consisting of a coefficient and one or more variables raised to a power. Each term is separated by addition or subtraction signs. Understanding how to identify and manipulate these terms is fundamental for operations such as factoring, as it allows for the recognition of common factors across the terms.