Math 325 Fall 2024

Math 325 Fall 2024

Elementary Analysis

Time and place:

Mondays, Wednesdays, and Fridays 12:30pm–1:20pm, Avery Hall 111.

Lecture notes and worksheet solutions

Review worksheet 1 solutions

Review worksheet 2 solutions

All definitions

What you need to know for the exam

Syllabus

Textbook:

Understanding Real Analysis, by Paul Zorn. Any edition is fine. This book is optional. The role of the book is as an independent resource for you. I will also post lecture notes online once the semester starts.

Course content:

In this class, we will explore the real numbers, and understand precisely what makes calculus work. In this pursuit, we will develop our proof-writing techniques and our ability to state and work with definitions. The course material breaks into four main topics: Class time will involve a combination of lecture and groupwork. You will be expected to prepare for class by reading in advance. This class will build on the proof skills developed in Math 309 and Math 310. If you want to prepare for this class in the week before school, read sections 1.2 and 1.4 of the textbook.

Office hours

Problem Sets

The complete list of acceptable resources for you to use when working on problem sets is If there is any resource that you think should be on this list, or has unclear membership status to this list, please consult me.

How to succeed in this class:

Math 325 is one of the most challenging undergraduate math classes we offer, since it is based on developing a skill set that is very different from our 100 and 200-level courses. You should be prepared to invest a large amount of time outside of class. Here are a few specific keys to success: I am confident that you (yes, you!) can succeed in this class if you are willing to work hard in and outside of class and you follow the tips above.

Axioms of ℝ

Expectations for groupwork

Brief overview of if then statements and quantifiers

Final exam: Tuesday, December 17, 3:30pm–5:30pm


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