Test Dates
- Friday, September 21 in lecture — Midterm 1 — Study Guide 1 — Study Guide 1 Solutions — Practice Midterm 1 — Practice Midterm 1 Solutions
- Thursday, October 18, 6pm-6:55pm in Journalism Building (JR) 300 — Midterm 2 — Study Guide 2 — Study Guide 2 Solutions — Practice Midterm 2 — Practice Midterm 2 Solutions
- Thursday, November 15, 6pm-6:55pm in Journalism Building (JR) 300 — Midterm 3 — Study Guide 3 — Study Guide 3 Solutions — Practice Midterm 3 — Practice Midterm 3 Solutions
- Monday, December 10, 8pm-9:45pm in Hitchcock Hall (HI) 031 — Final Exam — Final Exam Study Guide — Final Exam Study Guide Solutions
Online Homework
Available on Carmen
Written Homework
- Written Homework 1 — Due Tuesday 9/4/2018
- Written Homework 2 — Due Tuesday 9/18/2018
- Written Homework 3 — Due Tuesday 10/2/2018
- Written Homework 4 — Due Tuesday 10/16/2018
- Written Homework 5 — Due Tuesday 10/30/2018
- Written Homework 6 — Due Tuesday 11/13/2018
- Written Homework 7 — Due Tuesday 12/4/2018
Lecture Notes
(Not guaranteed to be comprehensive)- Lecture 2 — 8/24/2018 — Classes of functions, Limit laws, Applying limit laws, What to do when plugging in fails, The Squeeze Theorem
- Lecture 3 — 8/27/2018 — What to do when plugging in fails, The Squeeze Theorem, Infinite limits, Vertical asymptotes
- Lecture 4 — 8/29/2018 — Limits at infinity, Horizontal asymptotpes
- Lecture 5 — 8/31/2018 — Continuity, Continuity Laws, Intermediate Value Theorem
- Lecture 6 — 9/5/2018 — Definition of the Limit
- Lecture 7 — 9/7/2018 — Definition of the derivative, Differentiability
- Lecture 8 — 9/10/2018 — Derivative Rules, Atomic Derivatives, Higher Derivatives
- Lecture 9 — 9/12/2018 — Product & Quotient Rules, Trig Limits, Trig Derivatives
- Lecture 10 — 9/14/2018 — Chain Rule, Implicit differentiation
- Lecture 11 — 9/17/2018 — Position, velocity and acceleration, Population growth, Marginal cost, Price elasticity
- Lecture 13 — 9/24/2018 — Derivatives of inverse functions, Derivative of ln x, Derivatives of inverse trig functions, Logarithmic differentiation
- Lecture 14 — 9/26/2018 — Derivatives summary, Related Rates
- Lecture 15 — 9/28/2018 — Absolute Extrema, Extreme Value Theorem, Local Extrema, Critical Points, Intervals of Increase/Decrease
- Lecture 16 — 10/1/2018 — First derivative test for increase/decrease, First derivative test for local extrema, Concavity and Inflection points, Second derivative test for concavity, Second derivative test for local extrema, Symmetry of functions (even, odd, periodic)
- Lecture 17 — 10/3/2018 — Complete graphing
- Lecture 18 — 10/5/2018 — Minimization/Maximization
- Lecture 19 — 10/8/2018 — Linear Approximation, Mean Value Theorem
- Lecture 20 — 10/10/2018 — L'Hôpital's Rule
- Lecture 21 — 10/15/2018 — Antidifferentiation/Integration
- Lecture 23 — 10/19/2018 — Estimating area under curves
- Lecture 24 — 10/22/2018 — Definition of the definite integral, Integrals as limits of Riemann Sums, Properties of the definite integral, Definite integrals from area formulas or symmetry
- Lecture 25 — 10/24/2018 — The area function, Fundamental Theorem of Calculus I and II
- Lecture 26 — 10/26/2018 — Average value of a function, Mean Value Theorem for integrals, Substitution
- Lecture 27 — 10/29/2018 — Integrals and motion, Area between curves
- Lecture 28 — 10/31/2018 — Volumes by slicing
- Lecture 29 — 11/2/2018 — Volumes by cylindrical shells
- Lecture 30 — 11/5/2018 — Arc Length
- Lecture 31 — 11/7/2018 — Surfaces of revolution
- Lecture 32 — 11/9/2018 — Applications in physics, mass, work
- Lecture 34 — 11/16/2018 — Definition of the natural logarithm and exponential function, Exponential growth
- Lecture 35 — 11/19/2018 — Integration by parts
- Lecture 36 — 11/26/2018 — Trigonometric integrals
- Lecture 37 — 11/28/2018 — Trigonometric substitutions
- Lecture 38 — 11/30/2018 — Partial fractions
- Lecture 39 — 12/3/2018 — Improper integrals