- 5/15: Introduction to tangent lines
- 5/16: The limit of a function: Understanding limits graphically, computing limits
- 5/17: The squeeze theorem; limits at infinity; continuity
- 5/18: Vertical asymptotes; the intermediate value theorem; the definition of the derivative

- 5/22: no class (Victoria Day)
- 5/23: Interpreting the derivative; the arithmetic of derivatives (sum/product/quotient/power rules)
- 5/24: Differentiation examples, and more differentiation rules: exponential + trig functions
- 5/25: Derivatives of trig functions; the chain rule; practice problems

- 5/29: Inverse functions; the natural logarithm; derivatives of logarithms; logarithmic differentiation
- 5/30: Implicit differentiation
- 5/31: Inverse trigonometric functions, and their derivatives; Velocity and acceleration
- 6/1: Velocity and acceleration; exponential growth and decay

- 6/5: Related rates (solutions)
- 6/6: More related rates; Intro to Taylor polynomials (linearization)
- 6/7: Taylor and Maclaurin polynomials
- 6/8: Estimating the error in approximation by Taylor polynomials: the Lagrange Remainder Formula

- 6/12: Local and global extrema
- 6/13: Finding local and global extrema; Optimization (solutions)
- 6/14: More optimization; the Mean Value Theorem
- 6/15: Sketching graphs

- 6/19: Graph sketching example; Intro to L'Hôpital's rule
- 6/20: L'Hôpital's rule
- 6/21: Antiderivatives; Final exam info; Final exam review
- 6/22: Final exam review