Factor each polynomial. See Examples 5 and 6. 125-(4a-b)^3

Factoring polynomials involves rewriting a polynomial as a product of its factors, which can be simpler polynomials. This process is essential for solving equations, simplifying expressions, and understanding the roots of the polynomial. Common techniques include identifying common factors, using special product formulas, and applying methods like grouping or synthetic division.

The expression 125 - (4a - b)^3 represents a difference of cubes, which can be factored using the formula a^3 - b^3 = (a - b)(a^2 + ab + b^2). In this case, 125 is 5^3 and (4a - b)^3 is the cube of (4a - b). Recognizing this pattern allows for efficient factoring and simplification of the polynomial.

The binomial expansion refers to the expansion of expressions raised to a power, such as (x + y)^n, using the Binomial Theorem. In the context of the given polynomial, understanding how to expand and manipulate binomials is crucial for correctly applying the difference of cubes formula and simplifying the expression. This concept helps in recognizing the structure of polynomials and their factors.