Refer to the information provided in Figure 1.4 below to answer the question(s) that follow.
![](data:image/png;base64, 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)
![](data:image/png;base64, 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)
Refer to Figure 1.4. Panel C shows a curve which has a slope that is
◦ first positive and then negative.
◦ first negative and then positive.
◦ infinite throughout.
◦ zero throughout.