University :Damietta University |
Faculty :Faculty of Science |
Department :الفيزياء |
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| 1- Course data :- |
| | Code: | 312ف | | Course title: | Mathematical Physics | | Year/Level: | ثالثة فيزياء | | Program Title: | | | Specialization: | | | Teaching Hours: | Theoretical: | 2 | Tutorial: | 1 | Practical: | |
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| 2- Course aims :- |
| - Have a good basic knowledge of structures and functional aspects of complex variables.
- Apply knowledge of scientific concepts to the physical problems through complex variables
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| 3- Course Learning Outcomes :- |
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| 4- Course contents :- |
| | No | Topics | Week |
|---|
| 1 | Complex Numbers (Polar form – De moivre’s theorm – N th root of unity – Point sets) | | | 2 | Functions of Complex Variables (Variables and functions – Transformation – Derivatives – Analytic functions-– Branch point and Branch line) | | | 3 | Complex Integrations (Cauchy’s fundamental equations – Cauchy derivatives) | | | 4 | Complex Integrations ( Integral functions - Cauchy inequality – Liouville theorem) | | | 5 | Complex Integrations (Taylor series - Laurent’s series - Zoro’s and singularities) | | | 6 | Complex Integrations (Cauchy Residue theorm) | | | 7 | Complex Integrations (Definite integrals) | | | 8 | Integral Transforms (Fourier Transform Part I) | | | 9 | Integral Transforms (Fourier Transform Part II) | | | 10 | Integral Transforms (Laplace Transform) | | | 11 | Solutions of Ordinary differential equations (ODEs) using integral transforms (PartI) | | | 12 | Solutions of ODEs using integral transforms (PartII) | |
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| 5- Teaching and learning methods :- |
| | S | Method |
|---|
| Lectures (Blackboard-Data Show-Lecture Notes) |
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| 6- Teaching and learning methods of disables :- |
| - None
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| 7- Student assessment :- |
| A. Timing |
| | No | Method | Week |
|---|
| 1 | Revision. | 13 | | 2 | Written Exam. | 14 | | 3 | Oral Exam. | 15 |
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| B. Degree |
| | No | Method | Degree |
|---|
| 1 | Mid_term examination | 0 | | 2 | Final_term examination | 90 | | 3 | Oral examination | 10 | | 4 | Practical examination | 0 | | 5 | Semester work | 0 | | 6 | Other types of asessment | 0 | | Total | 100% |
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| 8- List of books and references |
| | S | Item | Type |
|---|
| 1 | Complex Variables ( Schaum’s Outline Series; The McGraw-Hill), Authors: Murray R. Spiege, Seymour Lipschutz, John J. Schiller, and Dennis Spellman. ISBN: 978-0-07-161570-9 | | | 2 | Mathematical Methods for Physicists, Arfken and Weber, Academic Press ISBN 0-12-059816-7 | |
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| 9- Matrix of knowledge and skills of the course |
| | S | Content | Study week |
|---|
| Complex Numbers (Polar form – De moivre’s theorm – N th root of unity – Point sets) | | | Functions of Complex Variables (Variables and functions – Transformation – Derivatives – Analytic functions-– Branch point and Branch line) | | | Complex Integrations (Cauchy’s fundamental equations – Cauchy derivatives) | | | Complex Integrations ( Integral functions - Cauchy inequality – Liouville theorem) | | | Complex Integrations (Taylor series - Laurent’s series - Zoro’s and singularities) | | | Complex Integrations (Cauchy Residue theorm) | | | Complex Integrations (Definite integrals) | | | Integral Transforms (Fourier Transform Part I) | | | Integral Transforms (Fourier Transform Part II) | | | Integral Transforms (Laplace Transform) | | | Solutions of Ordinary differential equations (ODEs) using integral transforms (PartI) | | | Solutions of ODEs using integral transforms (PartII) | |
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| Course Coordinator(s): - |
| - رفعت صبرى عبدالوهاب عبدالوهاب
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| Head of department: - |
| صلاح كامل محمد اللبنى |
