Study topics and places to find practice problems:

(I would look at odd problems, so I could check my answers, but that is just me)

1. l'Hospital's Rule - Section 6-8, page 288 - any of problems 3-30

2. Derivative by the limit definition - Section 3-4, page 96 - problems 19-22

3. Critical points analysis - Section 8-2, page 364 - any of problems 19-32

4. General Derivatives (chain rule, product rule, quotient rule), you kind of have to know these to be able to do anything else, but make sure you know how to do combinations and compositions of : polynomials, trig functions, exponentials, and logarithms. The first 5 sections of chapter 4 (stick to the short, quick problems), and section 6-9 (page 294) are good places to find practice problems.

5. Distance-velocity-acceleration - Section 3-5, page 102, problems 5-10

6. Max/min problems, section 8-3, page 372, problems 1-5,7,10,11,15

7. Interpretations of the derivative - that is, what do increasing/decreasing mean? What does concave up/down mean in the context of a problem? What does concavity tell you about what the derivative of a function is doing? What does the derivative tell you about what the function is doing?