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MECHATRONICS ENGINEERING (ENGLISH) PROGRAMME COURSE DESCRIPTION |
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| Name of the Course Unit | Code | Year | Semester | In-Class Hours (T+P) | Credit | ECTS Credit |
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| COMPLEX ANALYSIS | MAT303 | 3 | 5 | 3+0 | 3.0 | 5.0 |
| No |
Key Learning Outcomes of the Course Unit On successful completion of this course unit, students/learners will or will be able to: |
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| 1 | Understand the significance of differentiability for complex functions and be familiar with the Cauchy-Riemann equations; |
| 2 | Evaluate integrals along a path in the complex plane and understand the statement of Cauchy's Theorem; |
| 3 | Compute the Taylor and Laurent expansions of simple functions, determining the nature of the singularities and calculating residues; |
| 4 | Use the Cauchy Residue Theorem to evaluate integrals and sum series. |