In Exercises 39–52, find all zeros of the polynomial function or solve the given polynomial equation. Use the Rational Zero Theorem, Descartes's Rule of Signs, and possibly the graph of the polynomial function shown by a graphing utility as an aid in obtaining the first zero or the first root. 2x^3−x^2−9x−4=0

The Rational Zero Theorem provides a method for identifying potential rational roots of a polynomial equation. It states that any rational solution, expressed as a fraction p/q, must have p as a factor of the constant term and q as a factor of the leading coefficient. This theorem helps narrow down the possible candidates for zeros, making it easier to test which values satisfy the polynomial equation.

Descartes's Rule of Signs is a technique used to determine the number of positive and negative real roots of a polynomial function based on the number of sign changes in the polynomial's coefficients. For positive roots, count the sign changes in f(x), and for negative roots, count the sign changes in f(-x). This rule provides valuable insight into the possible number of real roots, guiding the search for actual solutions.

A graphing utility is a software tool or calculator that allows users to visualize mathematical functions and their behaviors. By plotting the polynomial function, one can observe where it intersects the x-axis, indicating the real roots or zeros of the function. This visual representation can aid in confirming the results obtained through algebraic methods and provides an intuitive understanding of the function's behavior.