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Curricular information is subject to change
On successful completion of this module the student should be able to:
1: Evaluate the Gradient, Divergence and Curl of a scalar resp. vector field.
2: Transform problems from one coordinate system to another.
3: Calculate multiple integrals by elementary techniques.
4: Calculate line and surface integrals with the help of Green's and Stokes'
Theorem.
5: Solve and analyse Laplace's, Poisson's the heat and wave/string equations.
6: Determine the Fourier series and Transform of important functions.
7: Apply all of the above techniques to problems in engineering
and the physical sciences.
Student Effort Type | Hours |
---|---|
Lectures | 30 |
Tutorial | 12 |
Specified Learning Activities | 20 |
Autonomous Student Learning | 38 |
Total | 100 |
MATH20290 or MATH20060
Description | Timing | Component Scale | % of Final Grade | ||
---|---|---|---|---|---|
Exam (In-person): Final Examination | n/a | Standard conversion grade scale 40% | Yes | 60 |
|
Exam (In-person): Midterm tests | n/a | Standard conversion grade scale 40% | No | 30 |
|
Assignment(Including Essay): Assignment | n/a | Standard conversion grade scale 40% | No | 10 |
Resit In | Terminal Exam |
---|---|
Spring | Yes - 2 Hour |
• Group/class feedback, post-assessment
Not yet recorded.
Name | Role |
---|---|
Dr Conor Finnegan | Lecturer / Co-Lecturer |
Dr Nina Snigireva | Lecturer / Co-Lecturer |
Mr Kevin Allen | Tutor |
Mr Brian Skelly | Tutor |
Giulio Taiocchi | Tutor |