Last modified: 31 Jul 2023 11:19
Analysis provides the rigourous, foundational underpinnings of calculus. The focus of this course is multivariable analysis, building on the single-variable theory from MA2009 Analysis I and MA2509 Analysis II. Concepts and results around multivariable differentiation are comprehensively established, laying the ground for multivariable integration in MX3535 Analysis IV.
As in Analysis I and II, abstract reasoning and proof-authoring are key skills emphasised in this course.
|First Sub Session
|15 credits (7.5 ECTS credits)
To provide students with the basic knowledge of the modern mathematical analysis.
Main Learning Outcomes
-Understand definitions and basic concepts of real analysis (real number, limit, continuity, differential, etc.)
-Be fluent computing limits, and differentials, and manipulating elementary functions.
-Euclidean spaces: metric structure, topology
- Functions between Euclidean spaces: limits, continuity
- Differentiability of functions between Euclidean spaces
- The chain rule, the Inverse Function Theorem, and the Implicit Function Theorem
- Applications of differentiation
Information on contact teaching time is available from the course guide.
There are no assessments for this course.
Best of (resit exam mark) or (resit exam mark with carried forward CA marks).
|Understand definitions and basic concepts of real analysis (real number, limit, continuity, differential, etc.)
|Be fluent computing limits, and differentials, and manipulating elementary functions.