1.1.1 Defining and Estimating Limits
1.1.2 Evaluating Limits
1.1.3 One-sided Limits
1.2.1 Asymptotes
1.2.2 Continuity
2.1.1 Secant Lines and Tangent Lines
2.1.2 Differentiability
2.1.3 Estimating Derivatives
2.2.1 Derivatives of Algebraic Functions
2.2.2 Derivatives of Transcendental Functions
2.2.3 Product and Quotient Rule
2.2.4 Chain Rule
2.3.1 Implicit Differentiation
3.1.1 L'Hospital's Rule*
3.1.2 Linear Approximation*
3.2.1 Increasing/Decreasing Intervals
3.2.2 Concavity
3.2.3 Mean Value Theorem
3.3.1 Derivative in Context*
3.3.2 Related Rates
3.3.3 Optimization
3.3.4 Straight-Line Motion*
4.1.1 Antiderivatives of Algebraic Functions
4.1.2 Antiderivatives of Transcendental Functions
4.1.3 Antidifferentiation by Substitution
4.2.1 Separable Differential Equations
4.2.2 Slope Fields*
4.3.1 Riemann Sums*
4.3.2 Fundamental Theorem of Calculus
4.3.3 Definite Integrals
5.1.1 Area Between Graphs of Functions
5.1.2 Average Value of a Function
5.1.3 Volumes
5.2.1 Modeling
5.2.2 Straight-Line Motion*