`D. Maximum, Minimum, Concavity, and Inflection Points: Definitions`

E. Maximum, Minimum, and Inflection Points: Curve Sketching

Case I. Functions That Are Everywhere Differentiable

Case II. Functions Whose Derivatives May Not Exist Everywhere

F. Global Maximum or Minimum

Case I. Differentiable Functions

Case II. Functions That Are Not Everywhere Differentiable

G. Further Aids in Sketching

H. Optimization: Problems Involving Maxima and Minima

I. Relating a Function and Its Derivatives Graphically

J. Motion Along a Line

##### BC ONLY

`K. Motion Along a Curve: Velocity and Acceleration Vectors`

L. Tangent-Line Approximations

M. Related Rates

##### BC ONLY

`N. Slope of a Polar Curve`

Practice Exercises

5 Antidifferentiation

`A. Antiderivatives`

B. Basic Formulas

##### BC ONLY

`C. Integration by Partial Fractions`

##### BC ONLY

`D. Integration by Parts`

E. Applications of Antiderivatives; Differential Equations

Practice Exercises