18.1002/18.100B Real Analysis
Spring 2020
Instructor: Pei-Ken Hung
TAs: Yuqiu Fu, Veronika Silkin
Lecture: TR9.30-11 (4-163)
Information:
Office hour:
Pei-Ken Hung: Tuesday 11 am--noon, Wednesday 3--4 pm (Building
2-238A)
Yuqiu Fu: Monday 6-8 pm (Building 2-255)
Announcements
Final assignment graded
Hi all,The grading for the final assignment is finished. You can see the grade on gradescope. It's a tough one and I appreciate your hard work. I also want to thank everyone for participating this class. Hope you will have a great summer and get some rest!
Best,
Pei-Ken
Announced on 20 May 2020 11:57 p.m. by Pei-Ken Hung
Typo in last email
Hi all,Sorry for the spam. I want to clarify that in the last email, the total point on the final assignment should be 150+30 bonus. I apologize for bothering you with my mistake.
Best,
Pei-Ken
Announced on 12 May 2020 9:55 p.m. by Pei-Ken Hung
Last lecture canceled
Hi all,I am sad to announce that our last lecture is canceled because I will only have limited access to the internet for the next few days. The office hours on Tuesday and Wednesday are also canceled.
As a result, the problem 10 in the final assignment will become a bonus problem. The total points in the final assignment is now 140 plus 30 bonus.
In this semester, we started with numbers, moved to functions and proved FTC. We discussed what is root 2, what is the exponential function and how to formulate them in modern math language. It's quite a journey and I have been enjoying it a lot. I'm sorry for ending the class this way. Hope you stay strong during and after the final season.
Best,
Pei-Ken
Announced on 12 May 2020 3:36 a.m. by Pei-Ken Hung
Final assignment
Hi all,We are approaching the end of the semester. The final assignment will be released tomorrow April 28th at 12:00pm EST. It will due on Thursday May 14th at 12:00pm EST. Please submit it on gradescope as previous Psets. However, no late submission will be accepted.
Best,
Pei-Ken
Announced on 27 April 2020 2:54 p.m. by Pei-Ken Hung
Pset 7 updated
Hi all,In Pset 7, there are problems which need the Mean Value Theorem (MVT) which I haven't discussed yet. I added the statement of MVT into the Pset and you can use that without proof.
Best,
Pei-Ken
Announced on 09 April 2020 5:44 p.m. by Pei-Ken Hung
