Real Analysis (MATH*3200)
Code and section: MATH*3200*01
Term: Fall
Details
This course provides a basic foundation for real analysis. The rigorous treatment of the subject in terms of theory and examples gives students the flavour of mathematical reasoning and intuition for other advanced topics in mathematics. Topics covered include the real number line and the supremum property; metric spaces; continuity and uniform continuity; completeness and compactness; the Banach fixed-point theorem and its applications to ODEs; uniform convergence and the rigorous treatment of the Riemann integral.
Syllabus
Attachment | Size |
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Course Outline (Fall 2015) | 153.2 KB |
Course Outline (Fall 2016) | 128.1 KB |
Course Outline (Fall 2017) | 49.11 KB |
Course Outline (Fall 2018) | 126.48 KB |
Course Outline (Fall 2019) | 211.54 KB |
Course Outline (Fall 2020) | 249.27 KB |
Course Outline (Fall 2021) | 407.38 KB |
Course Outline (Fall 2022) | 275.87 KB |
Course Outline (Fall 2023) | 287.14 KB |