Daily Assignments
Week 1: Vectors
June 30: Vectors and the Dot Product
- Please read the syllabus
- Read Section 1.1-2 of the online notes, and start 1.3
July 1: Dot Product and Cross Product
- Finish section 1.3, and read sections 1.4 and 1.5 of the online notes
July 2: Vector Functions
- Mastery Quiz 1: Due
- Read section 2.1 of the online notes
- See also section 3.1 of Gilbert and Strang
July 3: Calculus of Vector Functions
- Read the solutions to quiz 1.
- Read sections 2.1-2 of the online notes
- Some videos:
Week 2: Multivariable Functions
July 7: Multivariable Functions and their Limits
- Mastery Quiz 2: Due July 7
- M1, S1, S2
- Without answer blanks
- Answer blanks
- Read Sections 3.1-2 of the online notes
July 8: Partial Derivatives, Linear Approximation, and the Gradient
- Read sections 3.3-5 of the online notes
- See also sections 4.3 and 4.4 of Gilbert and Strang
July 9: The Chain Rule and Second Partials
- Mastery Quiz 3: due July 9
- M1, M2, S2, S3
- Without answer blanks
- Answer blanks
- Read sections 3.6-7 of the online notes
- See also section 4.6 of Gilbert and Strang, and look back at 4.3
July 10: Test 1
- Read the solutions to quiz 3.
- You may bring a one-sided, handwritten cheat sheet on letter-size or A4-size paper.
- You may not use a calculator.
- Practice Midterm 1
Week 3: Optimization and Integration
July 14: Maxima and Minima
- Mastery Quiz 4: due July 14
- M1, M2, S3
- Without answer blanks
- Answer blanks
- Read sections 4.1-2 of the online notes
- See also section 4.7 of Gilbert and Strang
July 15: Global Extrema and Constrained Optimization
- Read the solutions to Mastery Quiz 4
- Read sections 4.2-3 of the online notes
- See also section 4.8 of Gilbert and Strang
July 16: Riemann Sums and Multivariable Integrals
- Mastery Quiz 5: Due July 16
- Read section 5.1 of the online notes
- See also section 5.1 of Gilbert and Strang
July 17: Double and Triple Integrals
- Read the solutions to quiz 5
- Read section 5.2 of the online notes
Week 4: Integration
July 21: Polar, Cylindrical, and Spherical Integrals
- Mastery Quiz 6: due July 21
- M2, M3, M4
- Without answer blanks
- Answer blanks
- Read the rest of sections 5.3-4 of the online notes
July 22: Integrals and Change of Variables
- Read the Solutions to Quiz 6
- Read the section 5.5 of the online notes
- See also section 5.7 of Gilbert and Strang
July 23: Integral Applications
- Mastery Quiz 7: due July 23
- Read section 5.6 of the online notes
- See also section 5.6 of Gilbert and Strang
July 24: Test 2
- Read the Solutions to quiz 7
- Take the practice midterm
Week 5: Vector Calculus
July 28: Vector Fields and Line Integrals
- Mastery Quiz 8: due July 28
- M3, M4, S4
- Without answer blanks
- Answer blanks
- Read sections 6.1-2 of the online notes
July 29: Conservative Vector Fields
- Read sections 6.3-4 of the online notes
July 30: The Curl and Green’s Theorem
- Read the Solutions to Mastery Quiz 8
- Mastery Quiz 9: due July 30
- M4, M5, S4
- Without answer blanks
- Answer blanks
- Read sections 6.5-6 of the online notes
July 31: Surface Parametrization and Surface Integrals
- Read the Solutions to quiz 9
- Read sections 7.1-2 of the online notes
- See also (sub)sections 6.6.1-6.6.3 of Gilbert and Strang
Week 6: Flux Integrals
August 4: Flux Integrals
- Mastery Quiz 10: due August 4
- Read section 7.3 of the online notes
- See also (sub)sections 6.6.4-6.6.6 of Gilbert and Strang
August 5: Stokes’s Theorem
- Read the Solutions to Mastery Quiz 10
- Read section 7.4 of the online notes
- See also (sub)sections 6.7 of Gilbert and Strang
August 6: Divergence and the Divergence Theorem
- Without answer blanks
- Answer blanks
- Read section 8.1-3 of the online notes
- Bonus Section 8.4 of the online notes discusses an advanced perspective on vector calculus. We will not be substantially covering it in this course, and we certainly won’t be testing on it, but you might find it interesting or enlightening.
August 7: Final Exam
- Read the Solutions to Quiz 11
- Final Exam on August 7
August 8: Wrap-up
- Optional Mastery Quiz 12: due August 8
Course Goals
In this course we will extend our theory of calculus to cover functions of multiple variables. We will understand these functions algebraically and geometrically, and learn how to use the tools of differential and integral calculus to further understand them.
Topics will include: vectors, 3D graphing, planes, partial derivatives, directional derivatives, gradients, the chain rule, optimization and Lagrange multipliers, integration, vector fields, line and surface integrals, and Green’s, Stokes’s, and the Divergence theorem.
The course syllabus is available here.
Course notes
- Course Notes
- Section 1: Vectors in Space
- Section 2: Vector Functions
- Section 3: Partial Derivatives
- Section 4: Optimization
- Section 5: Multiple Integrals
- Section 6: Line Integrals
- Section 7: Surface Integrals
- Section 8: Divergence
Mastery Quizzes
Allocation of topics is tentative and may change as the course progresses.
- Mastery Quiz 1: Due July 2
- Mastery Quiz 2: Due July 7
- M1, S1, S2
- Without answer blanks
- Answer blanks
- Solutions
- Mastery Quiz 3: due July 9
- M1, M2, S2, S3
- Without answer blanks
- Answer blanks
- Solutions
- Mastery Quiz 4: due July 14
- M1, M2, S3
- Without answer blanks
- Answer blanks
- Solutions
- Mastery Quiz 5: Due July 16
- Mastery Quiz 6: due July 21
- M2, M3, M4
- Without answer blanks
- Answer blanks
- Solutions
- Mastery Quiz 7: due July 23
- Mastery Quiz 8: due July 28
- M3, M4, S4
- Without answer blanks
- Answer blanks
- Solutions
- Mastery Quiz 9: due July 30
- M4, M5, S4
- Without answer blanks
- Answer blanks
- Solutions
- Mastery Quiz 10: due August 4
- Mastery Quiz 11: due August 6
- M5, M6, S5
- Without answer blanks
- Answer blanks
- Solutions
- Optional Mastery Quiz 12: due August 8
Major Topics
- Vectors
- Partial Derivatives
- Optimization
- Multiple Integrals
- Line Integrals
- Surface Integrals
Secondary Topics
- Lines and Planes
- Vector Functions
- Multivariable Functions
- Integral Applications
- Vector Fields
The Divergence Theorem
Tests
- Midterm on July 10
- Midterm on July 24
- Final Exam on August 7
Calculators of any sort will not be allowed on tests. I will allow you to bring a cheat sheet in your own handwriting. For midterms I will allow a one-sided cheat sheet, and for the final I will allow a two-sided cheat sheet.
Textbook
The official textbook for Math 2233 is OpenStax Calculus Volume 3 by Gilbert Strang and Edwin Herman. It is available for free online here. You can also buy copies from Amazon; a paperback is a little under $30.
I will be loosely following the textbook, but will often be giving my own take or focusing on topics the textbook doesn’t emphasize. All my course notes will be posted to the course web page.
We will be using a (free!) online homework system called WeBWorK this term. You can access it by going to Blackboard, then to “Course Links”, and clicking the WeBWorK link. This will automatically create an account for you and log you in. You may continue to log in through Blackboard, or if you wish you may create a password within WeBWorK to log in directly.