Shown is the graph of the derivative f'(x) of the function f(x).

(a) Identify the critical numbers of f(x). 

(b) For each critical value, determine whether it is a local maximum, local minimum, or neither.

(c) Is f''(−2) positive or negative? What can you say about the concavity of the original function f(x) nearby x = −2?

Transcribed Image Text:

The image depicts a graph of a cubic function on a coordinate plane. Here is a detailed explanation: ### Graph Description: - **Axes**: The graph shows both horizontal (x-axis) and vertical (y-axis) axes. Each axis is labeled with numbers ranging from -4 to 4. - **Curve**: A smooth, continuous curve represents the cubic function. ### Curve Characteristics: 1. **Behavior**: - The curve starts in the third quadrant, moving upward from left to right. - It enters the fourth quadrant, crosses the x-axis slightly to the left of the y-axis, indicating a root or zero. 2. **Turning Points**: - The curve reaches a local maximum between the points (-2, 0) and (-1, 0). - It then decreases, passing through the origin (0, 0), indicating another root or zero. - The curve continues to a local minimum between (1, 0) and (2, 0). 3. **End Behavior**: - As the x-values increase (move right beyond 2), the curve sharply rises, indicating it goes to positive infinity. - As the x-values decrease (move left beyond -2), the curve descends, indicating it approaches negative infinity. This graph effectively demonstrates the nature of cubic functions, which often have one or more changes in direction due to their degree.