MATH2020A - Advanced Calculus II - 2024/25

Course Name: 
Course Year: 
2024/25
Term: 
1

Announcement

  • No tutorial in the 1st week
  • All homework and midterm will be graded online using the Gradescope system. The link of the Gradescope system can be found in the Blackboard system.
  • The following arrangement at the end of the midterm will be implemented: 1. Stop writing when "pen-down" is announced by the instructor. 2. Use your "smartphone" to capture images of all the (non-empty) pages of your answers when instructed by the instructor. 3. Then convert the images of your answers into a pdf file. 4. Submit the pdf file of your answers into the "Midterm" in the Gradescope system. (You will have around 15 minutes for steps 3-5.) 5. Submit your answer book to the instructor.
  • Homework 1 (due Sep 19, 2024, 11:00am, via Gradescope) [Download file]
  • Homework 2 (due Sep 26, 2024, 11:00am, via Gradescope) [Download file]
  • Homework 3 (due Oct 3, 2024, 11:00am, via Gradescope) [Download file]
  • Homework 4 (due Oct 10, 2024, 11:00am, via Gradescope) [Download file]
  • Homework 5 (due Oct 17, 2024, 11:00am, via Gradescope) [Download file]
  • Midterm coverage: From beginning up to and inclucing Line integral of function in the Lecture Notes and corresponding parts of the Textbook, and material covered by Homework 1-5.
  • Homework 6 (due Oct 31, 2024, 11:00am, via Gradescope) [Download file]
  • Homework 7 (due Nov 7, 2024, 11:00am, via Gradescope) [Download file]
  • Midterm statistics: Mean= 54.69, Median= 52.5, SD= 17.45, Max= 100, Min= 25
  • Homework 8 (due Nov 14, 2024, 11:00am, via Gradescope) [Download file]
  • Homework 9 (due Nov 21, 2024, 11:00am, via Gradescope) [Download file]
  • Homework 10 (due Nov 28, 2024, 11:00am, via Gradescope) [Download file]
  • Final exam coverage: All material in lecture notes, tutorial notes, textbook (Ch 14-15), and homework assignments, except differential forms. Emphasis on those material not included in midterm. Answer all 5 questions. Some questions are unfamiliar/difficult as required by the grade descriptor of A range.

General Information

Lecturer

  • Tom Yau Heng Wan
    • Office: LSB 202A
    • Tel: x 37969
    • Email:

Teaching Assistant

  • SHI Linhao
    • Office: AB1 614
    • Email:
    • Office Hours: Wednesday 1-2pm
  • LIU Stephen Shang Yi
    • Office: LSB 232A
    • Email:
    • Office Hours: Tuesday 4-5pm

Time and Venue

  • Lecture: Mon 10:30-11:15, Lady Shaw Bldg LT3; Wed 10:30-12:15, Lady Shaw Bldg LT4
  • Tutorial: Attend one of the following: Mon 11:30am-12:15pm LSB LT3; Wed 9:30am-10:15am NAH 114

Course Description

This is a continuation of MAT2010. The following topics will be discussed: multiple integrals, change of variables formula, vector analysis, line and surface integral, Green's Theorem, divergence theorem, and Stokes' theorem.


Textbooks

  • Thomas' Calculus,15th Edition in SI units, by Hass, Weir, Bogacki, & Heil, Pearson [2023] (Mainly Ch 14-15, basically just for assignning homework, theoretical parts are not included, Available online in Library)

Lecture Notes


Tutorial Notes


Assignments


Solutions


Assessment Scheme

Homework 10%
Mid-term (10:30-12:00, Oct 23, 2024) 40%
Final (Dec 12, 2024 (Thu), 9:30-11:30am SRRSH(stage)) 50%

Honesty in Academic Work

The Chinese University of Hong Kong places very high importance on honesty in academic work submitted by students, and adopts a policy of zero tolerance on cheating and plagiarism. Any related offence will lead to disciplinary action including termination of studies at the University. Although cases of cheating or plagiarism are rare at the University, everyone should make himself / herself familiar with the content of the following website:

http://www.cuhk.edu.hk/policy/academichonesty/

and thereby help avoid any practice that would not be acceptable.


Assessment Policy

Last updated: November 28, 2024 16:54:28