For the following exercises, analyze the graphs of f′, then list all inflection points and intervals f that are concave up and concave down.

Transcribed Image Text:

The image displays a graph of the derivative function \( f'(x) \). ### Graph Description: - **Axes**: The graph is plotted on a standard Cartesian coordinate system with the x-axis labeled from \(-1.5\) to \(1.5\) and the y-axis labeled from \(-2\) to \(2\). - **Curve**: The curve represents the derivative \( f'(x) \) of some function \( f(x) \). ### Key Features: - **Shape**: The curve starts below the x-axis in the third quadrant, indicating negative values of \( f'(x) \). - **Crossings**: It crosses the x-axis slightly to the left of the origin, indicating a critical point of \( f(x) \) where the slope changes from negative to positive. - **Behavior**: - **For \( x < 0 \)**: The function is decreasing as \( f'(x) < 0 \). - **At \( x = 0 \)**: \( f'(x) \) is close to zero, representing a momentary flat slope in \( f(x) \). - **For \( x > 0 \)**: The curve rises sharply, indicating increasing values and a positive slope for \( f(x) \). The graph provides information about the behavior of a function based on the characteristics of its derivative, helpful for analyzing critical points and understanding changes in intervals of increase and decrease.