Math 1210 | Calculus I

These lecture videos are organized in an order that corresponds with the current book we are using for our Math1210, Calculus 1, courses (Calculus, with Differential Equations, by Varberg, Purcell and Rigdon, 9th edition published by Pearson). We have numbered the videos for quick reference so it's reasonably obvious that each subsequent video presumes knowledge of the previous videos' material. Along with the video lecture for each topic, we have included the "pre-notes" and "post-notes" which are the notes of the lecture before we did the problems and after we worked everything out during the lecture, respectively. You may want to download the notes to use as a reference while watching the lecture video, or for later reference.

If you find an error in the lecture or a problem with the video, or if you would like to give feedback to us about these lectures, please email rebecca@math.utah.edu to do so.


NOTE: These videos were not recorded in stereo sound. If you are listening to these videos on headphones, you may want to consider setting your sound channels to come through both sides. This document will give you an idea of how to accomplish that.

• 1 Slope of a Line (Review) lecture video
• 1 Pre Notes
• 1 Post Notes


• 2 Introduction to Limits lecture video
• 2 Pre Notes
• 2 Post Notes


• 2.5 (optional) Rigorous Definition of Limits lecture video
• 2.5 Pre Notes
• 2.5 Post Notes


• 3 Limit Properties lecture video
• 3 Pre Notes
• 3 Post Notes


• 4A Limits at Infinity (part 1) lecture video
• 4B Limits at Infinity (part 2) lecture video
• 4AB Pre Notes
• 4AB Post Notes


• 4C Squeeze Theorem lecture video
• 4C Pre Notes
• 4C Post Notes


• 5 Trigonometric Limits lecture video
• 5 Pre Notes
• 5 Post Notes


• 6 Continuity lecture video
• 6 Pre Notes
• 6 Post Notes


• 7 Slope of a Curve lecture video
• 7 Pre Notes
• 7 Post Notes


• 8 Two Problems, One Theme lecture video
• 8 Pre Notes
• 8 Post Notes


• 9 The Derivative lecture video
• 9 Pre Notes
• 9 Post Notes


• 10 Derivative Rules lecture video
• 10 Pre Notes
• 10 Post Notes


• 11 Derivatives of Trigonometric Functions lecture video
• 11 Pre Notes
• 11 Post Notes


• 12 The Chain Rule lecture video
• 12 Pre Notes
• 12 Post Notes


• 13 Higher Order Derivatives lecture video
• 13 Pre Notes
• 13 Post Notes


• 14A Implicit Differentiation (part 1) lecture video
• 14B Implicit Differentiation (part 2) lecture video
• 14 Pre Notes
• 14 Post Notes


• 15A Related Rates (part 1) lecture video
• 15B Related Rates (part 2) lecture video
• 15 Pre Notes
• 15 Post Notes


• 15.5 Differentials & Approximations lecture video
• 15.5 Pre Notes
• 15.5 Post Notes


• 16A Maximum and Minimum Values (part 1) lecture video
• 16B Maximum and Minimum Values (part 2) lecture video
• 16 Pre Notes
• 16 Post Notes


• 17A Monotonicity lecture video
• 17B Concavity (part 1) lecture video
• 17C Concavity (part 2) lecture video
• 17 Pre Notes
• 17 Post Notes


• 18A Local Extrema (part 1) lecture video
• 18B Local Extrema (part 2) lecture video
• 18 Pre Notes
• 18 Post Notes


• 19A Sketching The Graph of a Function (part 1) lecture video
• 19B Sketching The Graph of a Function (part 2) lecture video
• 19 Pre Notes
• 19 Post Notes


• 20 The Mean Value Theorem for Derivatives lecture video
• 20 Pre Notes
• 20 Post Notes


• 20.5 Optimization Word Problems (part 1) lecture video
• 20.5 Optimization Word Problems (part 2) lecture video
• 20.5 Pre Notes
• 20.5 Post Notes


• 21A Solving Equations Numerically--Bisection Method lecture video
• 21B Solving Equations Numerically--Newton's Method lecture video
• 21 Pre Notes
• 21 Post Notes


• 22 Antiderivatives lecture video
• 22 Pre Notes
• 22 Post Notes


• 23 Differential Equations lecture video
• 23 Pre Notes
• 23 Post Notes


• 24A Introduction to Area (part 1) lecture video
• 24B Introduction to Area (part 2) lecture video
• 24 Pre Notes
• 24 Post Notes


• 25A The Definite Integral (part 1) lecture video
• 25B The Definite Integral (part 2) lecture video
• 25 Pre Notes
• 25 Post Notes


• 26 The First Fundamental Theorem of Calculus lecture video
• 26 Pre Notes
• 26 Post Notes


• 27 The Second Fundamental Theorem of Calculus lecture video
• 27 Pre Notes
• 27 Post Notes


• 28A The Mean Value Theorem for Integrals (part 1) lecture video
• 28B The Mean Value Theorem for Integrals (part 2) lecture video
• 28 Pre Notes
• 28 Post Notes


• 28C Extra Integration Practice lecture video
• 28C Pre Notes
• 28C Post Notes


• 29A Area of a Plane Region (part 1) lecture video
• 29B Area of a Plane Region (part 2) lecture video
• 29 Pre Notes
• 29 Post Notes


• 30A Volume of Solids--Disk Method lecture video
• 30B Volume of Solids--Washer Method lecture video
• 30C Volume of Solids--Shell Method lecture video
• 30D Volume of Solids--more practice lecture video
• 30 Pre Notes
• 30 Post Notes


• 31A Length of a Plane Curve (part 1) lecture video
• 31B Length of a Plane Curve (part 2) lecture video
• 31C Surface Area lecture video
• 31 Pre Notes
• 31 Post Notes


• 32 Work lecture video
• 32 Pre Notes
• 32 Post Notes


• 33A Moments & Center of Mass (part 1) lecture video
• 33B Moments & Center of Mass (part 2) lecture video
• 33 Pre Notes
• 33 Post Notes


• 34A Numerical Integration (part 1) lecture video
• 34B Numerical Integration (part 2) lecture video
• 34 Pre Notes
• 34 Post Notes

These videos were completed as a collaborative effort of Marilyn Keir and Kelly MacArthur, funded and supported by the Mathematics Department at the University of Utah.

Calculus Games

Play these games to help your calculus skills, and have fun at the same time!

• Derivative Game
  
• Implicit Differentiation Game
  
• Volume of Solids of Revolution Game