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Curricular information is subject to change
The student masters the basic principles and methods for the analysis of partial differential equations, including first-order equations, Cauchy's problems, characteristics, linear second-order equations, classification, boundary value problems for elliptic equations, boundary and initial value problems for hyperbolic and parabolic equations, fundamental solutions, maximum principles, Fourier series, and Fourier transform techniques. The student is then able to apply the techniques to study specific examples.
Student Effort Type | Hours |
---|---|
Lectures | 30 |
Small Group | 6 |
Specified Learning Activities | 24 |
Autonomous Student Learning | 40 |
Total | 100 |
ACM20150 Vector and Integral Calculus
Description | Timing | Component Scale | % of Final Grade | ||
---|---|---|---|---|---|
Examination: final examination | 2 hour End of Trimester Exam | No | Standard conversion grade scale 40% | No | 60 |
Continuous Assessment: Varies over semester | Varies over the Trimester | n/a | Standard conversion grade scale 40% | No | 40 |
Resit In | Terminal Exam |
---|---|
Spring | Yes - 2 Hour |
• Group/class feedback, post-assessment
Not yet recorded.