MATH2050C - Mathematical Analysis I - 2022/23
Announcement
- The statistics for midterm is as follow: mean=52.2, median=54.5, standard deviation=15.9. A suggested solution has been uploaded to Blackboard.
- Problem Set 8 is posted and due on Mar 24.
- Problem Set 7 is posted and due after the reading week on Mar 17.
- The midterm will take place in class on March 2, 2023, from 4:30PM-6:15PM. It covers all the topics in Lecture Notes 1-11 up to textbook Section 3.3 inclusively.
- Problem Set 6 is posted and due on Mar 3.
- Problem Set 5 is posted and due on Feb 24.
- Quiz 2 will take place in class on Feb 16, covering topics up to lecture on Feb 9.
- Problem Set 4 is posted and due on Feb 17.
- Problem Set 3 is posted and due on Feb 10.
- Quiz 1 will take place in class on Feb 2.
- Problem Set 2 is posted and due on Feb 3.
- Problem Set 1 is posted and due on Jan 20.
- There is no tutorial in the first week of class. The first lecture will be on Jan 10, 2023. You are highly encouraged to go through Problem Set 0 for revision of some background topics which are needed for this course but not going to be covered in lectures.
General Information
Lecturer
-
LI Man-chun Martin
- Office: LSB 236
- Tel: 3943-1851
- Email:
- Office Hours: By appointment
Teaching Assistant
-
LO Chiu Hong
- Office: LSB 228
- Tel: 3943-7955
- Email:
- Office Hours: Mon 2:30-3:30PM, Wed 2:30-3:30PM (or by appointment)
-
IU Liu Yin
- Office: AB1 407A
- Tel: 3943-3721
- Email:
- Office Hours: Thur 2:00-4:00PM (or by appointment)
Time and Venue
- Lecture: Tue 4:30-6:15PM and Thur 4:30-5:15PM at LHC G04
- Tutorial: Thur 5:30-6:15PM at LHC G04
Course Description
This course is intended to provide conceptual understanding in the theory of functions of one variable. Topics include: real numbers, real valued functions, set notations; limits of sequences, convergence, Bolzano-Weierstrass; limits of functions, continuous functions, uniform continuity.
Textbooks
- "Introduction to Real Analysis" (4th edition) by R.G. Bartle and D.R. Sherbert, John-Wiley and Sons, NY, 2011
References
- "Principles of Mathematical Analysis" by W. Rudin, McGraw-Hill, 1976
Pre-class Notes
Lecture Notes
- Lecture 1 on Jan 10
- Lecture 2 on Jan 12
- Lecture 3 on Jan 17
- Lecture 4 on Jan 19
- Lecture 5 on Jan 31
- Lecture 6 on Feb 2
- Lecture 7 on Feb 7
- Lecture 8 on Feb 9
- Lecture 9 on Feb 14
- Lecture 10 on Feb 16
- Lecture 11 on Feb 21
- Lecture 12 on Feb 23
- Lecture 13 on Feb 28
- Lecture 14 on Mar 14
- Lecture 15 on Mar 16
Assignments
- Problem Set 0 (no need to hand in)
- Problem Set 1 (due on Jan 20)
- Problem Set 2 (due on Feb 3)
- Problem Set 3 (due on Feb 10)
- Problem Set 4 (due on Feb 17)
- Problem Set 5 (due on Feb 24)
- Problem Set 6 (due on Mar 3)
- Problem Set 7 (due on Mar 17)
- Problem Set 8 (due on Mar 24)
Assessment Scheme
Assignments, quizzes and classworks | 15% | |
Midterm (Mar 2, 2023 in-class) | 35% | |
Final Exam (centralized, please refer to RES webpage) | 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: March 12, 2023 11:04:03