|
課程名稱 |
工程數學下
Engineering Mathematics (2) |
|
開課學期 |
109-2 |
|
授課對象 |
機械工程學系 |
|
授課教師 |
潘國隆 |
|
課號 |
ME2002 |
|
課程識別碼 |
502E20002 |
|
班次 |
02 |
|
學分 |
3.0 |
|
全/半年 |
全年 |
|
必/選修 |
必修 |
|
上課時間 |
星期一3,4(10:20~12:10)星期三2(9:10~10:00) |
|
上課地點 |
工綜215新103 |
|
備註 |
本課程以英語授課。
限本系所學生(含輔系、雙修生)
總人數上限:55人 |
|
Ceiba 課程網頁 |
http://ceiba.ntu.edu.tw/1092ME2002_02 |
|
課程簡介影片 |
|
|
核心能力關聯 |
核心能力與課程規劃關聯圖 |
|
課程大綱
|
|
為確保您我的權利,請尊重智慧財產權及不得非法影印
|
|
課程概述 |
In this course, we will explore the mathematical methods and techniques that are typically used in engineering science. This is an interdisciplinary subject motivated by engineers’ needs of using mathematical approaches in terms of practical and theoretical considerations for analyzing and solving problems of relevance. This second semester of engineering mathematics will be dealt with vector calculus, Fourier series as well as integral and transforms, boundary-value problems, partial differential equations (PDE), and complex analysis. |
|
課程目標 |
1. Vector differential calculus
2. Vector integral calculus
3. Orthogonal functions and Fourier series
4. Sturm-Liouville theorem
5. Fourier integral
6. Fourier transform
7. Boundary-value problems and partial differential equations
8. PDE Wave equation
9. PDE Heat equation
10. PDE Laplace equation
11. Complex analysis: functions of a complex variable
12. Complex analysis: integration in the complex plane
13. Complex analysis: series and residues |
|
課程要求 |
待補 |
|
預期每週課後學習時數 |
|
|
Office Hours |
|
|
指定閱讀 |
D. G. Zill, Advanced Engineering Mathematics, 6th Ed., Jones & Bartlett Learning, Burlington, 2018. |
|
參考書目 |
2. E. Kreyszig, Advanced Engineering Mathematics, 10th Edition, John Wiley
& Sons, Inc., New York, 2011.
3. P. V. O’Neil, Advanced Engineering Mathematics, 7th Edition,
Brooks/Cole Publishing Company, London, 2011.
4. M. D. Greenberg, Advanced Engineering Mathematics, 2nd Ed., Prentice
Hall, 1998. |
|
評量方式
(僅供參考) |
|
|
週次 |
日期 |
單元主題 |
|
Week 1 |
2/22,2/24 |
1. Vector differential calculus |
|
Week 2 |
3/01,3/03 |
Topic 1 (3/01 school off) |
|
Week 3 |
3/08,3/10 |
Topic 1; 2. Vector integral calculus |
|
Week 4 |
3/15,3/17 |
Topic 2 |
|
Week 5 |
3/22,3/24 |
Topic 2; 3. Orthogonal functions and Fourier series |
|
Week 6 |
3/29,3/31 |
Topic 3 |
|
Week 7 |
4/05,4/07 |
(4/05 school off, 1st midterm exam: 4/09, 18:30 - 21:30) |
|
Week 8 |
4/12,4/14 |
Topic 3. (Sturm-Liouville theorem) 4. Fourier Integral and Transforms |
|
Week 9 |
4/19,4/21 |
Topic 4 |
|
Week 10 |
4/26,4/28 |
5. Boundary-Value Problems in Rectangular Coordinates (2nd midterm exam: 4/30, 18:30 - 21:30) |
|
Week 11 |
5/03,5/05 |
Topic 5 |
|
Week 12 |
5/10,5/12 |
Topic 5 |
|
Week 13 |
5/17,5/19 |
Topic 5 |
|
Week 14 |
5/24,5/26 |
6. Boundary-Value Problems in Other Coordinates |
|
Week 15 |
5/31,6/02 |
Topic 6 |
|
Week 16 |
6/07,6/09 |
7. Complex Analysis: functions of a complex variable |
|
Week 17 |
6/14,6/16 |
Topic 7 (6/14 school off; 3rd midterm exam: 6/16, 19:00 - 22:00) |
|
Week 18 |
6/21,6/23 |
8. Complex analysis: integration in the complex plane; Final exam (6/28, 14:00 - 17:00) |
|