Math 251 - Calculus I - Fall 2022

Class Information

Instructor: Tuan Pham
Class meetings: M, T, Th, F, 9:00-9:50 AM at Badgley Hall 146 (Inlow Hall 013 on lab days)
[Syllabus]   [Canvas]   [Class Schedule]   [Homework Schedule]  

Office Hours

M, T, Th, F 12:00-1:00 PM at Loso Hall 225 or by appointment

Assignments

  • The list of homework problems is in the homework schedule link above.
  • Maple labs are to be turned in on Canvas (see class schedule above):
    [Lab 1]   [Lab 2]   [Lab 3]   [Lab 4]   [Lab 5]  

    • Lecture notes

  • Review for final exam (Dec 8,9)
  • Lecture 31 (Dec 6): Newton's method; worksheet
  • Lecture 30 (Dec 5): Second Derivative Test
  • Lecture 29 (Dec 2): graphing a function using Calculus
  • Lecture 28 (Dec 1): Mean Value Theorem
  • Lecture 27 (Nov 29): showing that a function has only one root; worksheet
  • Lecture 26 (Nov 28): Rolle's theorem (cont.)
  • Lecture 25 (Nov 18): Rolle's theorem
  • Lecture 24 (Nov 17): optimization problem; worksheet
  • Lecture 23 (Nov 15): differential, optimization problem; worksheet
  • Lecture 22 (Nov 14): linear approximation and differential
  • Lecture 21 (Nov 10): linear approximation; worksheet
  • Lecture 20 (Nov 8): implicit differentiation with the assistance of Maple
  • Lecture 19 (Nov 7): implicit differentiation; worksheet
  • Review for midterm (Nov 1)
  • Lecture 18 (Oct 28): chain rule; worksheet
  • Lecture 17 (Oct 27): product rule and power rule
  • Lecture 16 (Oct 25): differentiation rules: sum rule and scale rule
  • Lecture 15 (Oct 24): graphs of non-differentiable functions; worksheet
  • Lecture 14 (Oct 21): differentiable functions and non-differentiable functions
  • Lecture 13 (Oct 20): derivative as slope of tangent line
  • Lecture 12 (Oct 18): derivative as instantaneous rate of change
  • Lecture 11 (Oct 17): comparison of polynomials at infinity (cont.); worksheet
  • Lecture 10 (Oct 13): Intermediate Value Theorem, comparison of polynomials at infinity
  • Lecture 9 (Oct 11): applications of Squeeze theorem
  • Lecture 8 (Oct 10): Squeeze theorem; worksheet
  • Lecture 7 (Oct 7): limits and partial derivatives
  • Lecture 6 (Oct 6): how to show a limit doesn't exist; worksheet
  • Lecture 5 (Oct 4): limits (cont.); worksheet
  • Lecture 4 (Oct 3): limits; worksheet
  • Lecture 3 (Sep 30): operations on functions; worksheet
  • Lecture 2 (Sep 27): a review on functions; worksheet
  • Lecture 1 (Sep 26): introduction

    • Supplement materials

  • Animation of Newton's method
  • Example of graphing a function using Calculus; video
  • Solution to midterm exam

    • Links

    EOU portal
    EOU Learning Center
    EOU Writing Center
    EOU Testing Center
    This page was last modified on Friday, Dec 9, 2022.