Exams
- Winter 2010 Exam 1
- Winter 2010 Exam 1 Answers
- Fall 2011 Exam 1
- Fall 2011 Exam 1 Answers
- Fall 2013 Exam 1
- Fall 2013 Exam 1 Answers
- Winter 2014 Exam 1
- Fall 2019 Exam 1
- Fall 2022 Exam 1
- Fall 2022 Exam 1 Solutions
- Winter 2010 Exam 2
- Winter 2010 Exam 2 Answers
- Fall 2011 Exam 2
- Fall 2011 Exam 2 Answers
- Fall 2013 Exam 2
- Fall 2013 Exam 2 Answers
- Winter 2014 Exam 2
- Fall 2019 Exam 2
- Fall 2022 Exam 2
- Fall 2022 Exam 2 Solutions
- Winter 2010 Exam 3
- Winter 2010 Exam 3 Solutions
- Fall 2011 Exam 3
- Fall 2011 Exam 3 Solutions
- Fall 2013 Exam 3
- Winter 2014 Exam 3
- Fall 2019 Exam 3
- Fall 2022 Exam 3
- Fall 2022 Exam 3 Solutions
- Fall 2019 Exam 4
- Winter 2010 Final
- Winter 2010 Final Answers
- Fall 2011 Final
- Fall 2011 Final Answers
- Fall 2013 Final
- Fall 2013 Final Answers
- Winter 2014 Final
- Winter 2014 Final Answers
- Winter 2019 Final
- Fall 2022 Final
- Fall 2022 Final Solutions
Quizzes
Assignments
- Coming Soon!
Notes
- Introduction and Motivation
- 1.5: Limits: Definitions and Examples
- 1.6: Limit Laws: Examples
- 1.7 & 3.4: Vertical and Horizontal Asymptotes (Limits to and at Infinity)
- 3.4 & 1.6: More on Horizontal Asymptotes; The Squeeze Theorem
- 1.8: Continuity: Definition and Examples
- 1.8: The Intermediate Value Theorem
- 2.1 & 2.2: Instantaneous Velocity; Derivatives: Definition and Examples
- 2.2,2.3, & 2.5 : Leibniz Notation; Differentiation Laws
- 2.3 & 2.4: Examples Using Differention Laws; Trig Limits and Derivatives
- 2.4 & 2.5: More on Trig Limits and Derivatives
- 2.6 & 2.7: Tangent Lines; Implicit Differentiation; Acceleration and Jerk
- 2.8: Related Rates
- 2.8: More Related Rates
- 2.8: Yet More Related Rates
- 3.1, 3.2 & 3.3: Increasing/Decreasing Using Derivatives; Mean Value Theorem; Absolute Max/Min
- 3.1 & 3.3: Local Max/Min; Fermat's Theorem; Maxima and Minima for Continuous Functions; Critical Numbers
- 3.3: First and Second Derivative Tests; Intervals of Increase and Decrease; Intervals of Concavity
- 3.5: Graphing Functions Using Calculus
- 6.8: L'Hopital's Rule
- 6.8 & 3.2: More on L'Hopital's Rule; Rolle's and the Mean Value Theorem
- 3.2 & 3.7: More on Mean Value Theorem; Optimization Problems
- 3.7 & 3.8: More Optimization Problems; Newton's Method
- 3.7 & 3.8: More on Newton's Method; Yet More Optimization Problems
- 3.9: Antiderivatives
- 4.1 & 4.2: Definite Integration and Area; Properties of the Definite Integral; Fundamental Theorem of Calculus
- 4.2 & 4.3: Left and Right Riemann Sums; Using the Fundamental Theorem of Calculus; Proof of the Fundamental Theorem
- 4.4 & 4.5: Indefinite Integrals; Net Change Theorem; Substitution
- 4.5 & 5.1: More Substitution; Area Between Curves
- 5.2 & 5.3: Volumes of Revolution
