This course deals with Fourier analysis for future frequency analysis, Laplace transform for solving differential equations
in electronic circuits, Vector analysis for further understandings of electromagnetics and physics.
Based on Mathematics for Electrical Analyses 1, you are expected to acquire ability for solving fundamental mathematics for
electronic engineering.
- Be able to understand Fourier analysis, and solve problems requiring use of Fourier analysis
- Be able to understand Laplace transform, and solve problems requiring use of Laplace transform
- Be able to understand Vector analysis, and solve problems requiring use of Vector analysis
| Class schedule | HW assignments (Including preparation and review of the class.) | Amount of Time Required | |
|---|---|---|---|
| 1. | Fourier analysis (1): Fourier series expansion (1) | Solve the examples by yourself (4-1-1, 4-1-2) | 200minutes |
| 2. | Fourier analysis (2): Fourier series expansion (2) | Solve the examples by yourself (4-1-3, 4-1-4) | 200minutes |
| 3. | Fourier analysis (3): Fourier transform (1) | Solve the examples by yourself (4-2-1, 4-2-3) | 200minutes |
| 4. | Fourier analysis (4): Fourier transform (2) | Solve the examples by yourself (4-2-3, 4-2-5) | 200minutes |
| 5. | Laplace transform (1): Differential equations and their Laplace transforms (1) | Solve the examples by yourself (5-1-1, 5-1-3) | 200minutes |
| 6. | Laplace transform (2): Differential equations and their Laplace transforms (2) | Solve the examples by yourself (5-1-4, 5-1-5) | 200minutes |
| 7. | Midterm examination (1-6), and comments | Prepare the midterm examination | 200minutes |
| 8. | Laplace transform (3): Basic properties and applications of Laplace transforms (1) | Solve the examples by yourself (5-2-1, 5-2-3) | 200minutes |
| 9. | Laplace transform (4): Basic properties and applications of Laplace transforms (2) | Solve the examples by yourself (5-2-3, 5-2-6) | 200minutes |
| 10. | Vector analysis (1): Differential operations (1) | Solve the examples by yourself (6-1-1, 6-1-3) | 200minutes |
| 11. | Vector analysis (2): Differential (2), Line integrals | Solve the examples by yourself (6-1-4,6-2-1) | 200minutes |
| 12. | Vector analysis (3): Surface integrals, volume integrals | Solve the examples by yourself (6-2-2, 6-2-3) | 200minutes |
| 13. | Vector analysis (4): Gauss theorem, Stokes theorem | Solve the examples by yourself (6-3-1, 6-3-2) | 200minutes |
| 14. | Final examination (8-14), and comments | Prepare the final examination | 200minutes |
| Total. | - | - | 2800minutes |
| D | Total. | |
|---|---|---|
| 1. | 33% | 33% |
| 2. | 33% | 33% |
| 3. | 34% | 34% |
| Total. | 100% | - |
Evaluation method:
A 6th absence may constitute a failing grade in this course.
Midterm examination 50%, and final examination 50%. You must score at least 60 points or higher out of 100 to pass.
Criteria:
If you able to answer the examples end exercises in the textbook taken in the class without reference to the textbook, you will get 80 points out of 100 to pass.
A 6th absence may constitute a failing grade in this course.
Midterm examination 50%, and final examination 50%. You must score at least 60 points or higher out of 100 to pass.
Criteria:
If you able to answer the examples end exercises in the textbook taken in the class without reference to the textbook, you will get 80 points out of 100 to pass.
- 12:30-13:10 (Lunch break) on Tuesday @ Room #4301 in OMIYA campus.
You can ask or contact me by e-mail in advance.
email: ishkwh@sic.shibaura-it.ac.jp
- Non-social and professional independence development course
Last modified : Wed Oct 17 06:39:52 JST 2018