Last modified: 28 Jun 2018 10:27
This course builds on the courses Introduction to Analysis (MA2005) and Further Real Analysis (MX3021), and asks what happens when concepts such as convergence of sequences and series, continuity and differentiability, are applied in the complex plane? The results are much more beautiful, and often, surprisingly, simpler, than over the real numbers. This course also covers contour integration of complex functions, which has important applications in Physics and Engineering.
Study Type | Undergraduate | Level | 3 |
---|---|---|---|
Term | Second Term | Credit Points | 15 credits (7.5 ECTS credits) |
Campus | None. | Sustained Study | No |
Co-ordinators |
Sorry, we don't have a record of any course coordinators. |
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 examination (maximum of 100% resit and 80% resit with 20% in-course assessment). Only the marks obtained on first sitting can be used for Honours classification.
Informal assessment of weekly homework through discussions in tutorials.
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