Use the following graphs to identify the points (if any) on the interval [a, b] at which the function has an absolute maximum or an absolute minimum value <IMAGE>

An absolute maximum of a function on a given interval is the highest value that the function attains within that interval, while an absolute minimum is the lowest value. These extrema can occur at critical points, where the derivative is zero or undefined, or at the endpoints of the interval. Identifying these points is crucial for determining the overall behavior of the function.

Critical points are values in the domain of a function where the derivative is either zero or does not exist. These points are significant because they are potential locations for local maxima and minima. To find absolute extrema, one must evaluate the function at these critical points as well as at the endpoints of the interval.

A closed interval, denoted as [a, b], includes all numbers between a and b, including the endpoints a and b themselves. In calculus, analyzing functions over closed intervals is important because the Extreme Value Theorem guarantees that a continuous function will attain both an absolute maximum and minimum on such intervals, providing a complete picture of the function's behavior.