Last modified: 25 May 2018 11:16
Analysis provides the rigourous, foundational underpinnings of calculus. This course builds on MX3035 Analysis III, continuing the development of multivariable calculus, with a focus on multivariable integration. Hilbert spaces (infinite dimensional Euclidean spaces) are also introduced.
Students will see the benefit of having acquired the formal reasoning skills developed in Analysis I, II, and III, as it enables them to work with increasingly abstract concepts and deep results. Techniques of rigourous argumentation continue to be a prominent part of the course.
Study Type | Undergraduate | Level | 3 |
---|---|---|---|
Term | Second Term | Credit Points | 15 credits (7.5 ECTS credits) |
Campus | Old Aberdeen | Sustained Study | No |
Co-ordinators |
|
- Multivariable Riemann integration; volume of subsets of Euclidean space
- Fubini and Tonelli Theorems
- Stokes's and Green's Theorems
- Introduction to Hilbert spaces
Syllabus
Information on contact teaching time is available from the course guide.
1st attempt - 1 two-hour written examination (80%); in-course assessment (20%).
Resit – 1 two-hour written examination paper. Maximum of written exam (100%) or written exam (80%) with carried forward in-course assessment (20%).
Informal assessment of weekly homework through discussions in tutorials.
In-course assignments will normally be marked within one week and feedback provided to students in tutorials. Students will be invited to contact Course Coordinator for feedback on the final examination.
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