1.1 - Functions and change

1.2 - Exponential functions

1.3 - New functions from old

1.4 - Logarithmic functions

1.5 - Trigonometric Functions

1.6 - Powers, polynomials, rational functions

1.7 - Introduction to continuity

1.8 - Limits

2.1 - How do we measure speed?

2.3 - The derivative function

2.4 - Interpretation of the derivative

2.5 - The second derivative

2.6 - Differentiability

3.1 - Powers and polynomials

3.2 - The exponential function

3.3 - The product and quotient rules

3.4 - The chain rule

3.5 - The trigonometric functions

3.6 - The chain rule and inverse functions

3.7 - Implicit functions

3.9 - Linear approximation of the derivative

3.10 - Theorems about differentiable functions

4.1 - Using first and second derivatives

4.2 - Optimization

4.3 - Families and functions

4.4 - Optimization, geometry, and modeling

4.6 - Rates and related rates

4.7 - L'Hopital's Rule, growth, and dominance

4.8 - Parametric equations

5.1 - How do we measure distance travelled?

Limits of Reimann sums

5.3 - The fundamental theorem and interpretations

5.4 - Theorems about definite integrals

6.1 - Antiderivatives and graphically and numerically

6.2 - Constructing antiderivatives analytically

7.1 - Integration by substitution

6.3 - Differential equations

6.4 - Second fundamental theorem of calculus

6.5 - The equations of motion