4. READ CAREFULLY: You are given the graph of y = f'(x). (a) minima, or neither. Find all critical numbers of f(r) and classify them as locations of local maxima, (b) On which interval(s) is f(x) DECREASING? (c) of f(r). O Make a table (or number line) of signs for f"(x) and find all inflection points

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**Graph Analysis Activity** **Instructions:** 4. **READ CAREFULLY**: You are given the graph of \( y = f'(x) \). --- **(a)** Find all critical numbers of \( f(x) \) and classify them as locations of local maxima, minima, or neither. *Graph Description:* The graph presented appears to be a curve that shows the derivative \( f'(x) \). It oscillates, moving upwards and downwards, possibly crossing the x-axis multiple times which indicates points where the derivative is zero. --- **(b)** On which interval(s) is \( f(x) \) DECREASING? *Graph Description:* Analyze the graph where \( f'(x) < 0 \); these intervals indicate where the function \( f(x) \) is decreasing. --- **(c)** Make a table (or number line) of signs for \( f''(x) \) and find all inflection points of \( f(x) \). --- **(d)** Graph a possible \( y = f(x) \). Clearly mark the location of all critical points with "CP" and their x-coordinates. Clearly mark the location of all inflection points with "IP" and their x-coordinates. *Graph Description:* - Create a sketch based upon the critical points and the nature of \( f'(x) \). - Indicate critical points (where \( f'(x) = 0 \)) and inflection points (where the concavity changes). *Graph Template:* A blank set of axes is provided for plotting \( y = f(x) \), extending from -4 to +4 on both axes.