| Academic Year |
2025Year |
School/Graduate School |
Graduate School of Advanced Science and Engineering (Master's Course) Division of Advanced Science and Engineering Electrical, Systems, and Control Engineering Program |
| Lecture Code |
WSG30101 |
Subject Classification |
Specialized Education |
| Subject Name |
電気システム制御特別講義A |
Subject Name
(Katakana) |
デンキシステムセイギョトクベツコウギエー |
Subject Name in
English |
Special Lecture on Electrical, Systems, and Control Engineering A |
| Instructor |
See the class timetable. |
Instructor
(Katakana) |
ジュギョウジカンワリヲサンショウ |
| Campus |
Higashi-Hiroshima |
Semester/Term |
1st-Year, First Semester, Intensive |
| Days, Periods, and Classrooms |
(Int) Inte |
| Lesson Style |
Lecture |
Lesson Style
(More Details) |
Face-to-face |
| This lecture is given by face-to-face or online. The detail will be announced. |
| Credits |
2.0 |
Class Hours/Week |
|
Language of Instruction |
J
:
Japanese |
| Course Level |
5
:
Graduate Basic
|
| Course Area(Area) |
25
:
Science and Technology |
| Course Area(Discipline) |
01
:
Mathematics/Statistics |
| Eligible Students |
|
| Keywords |
numerical methods |
| Special Subject for Teacher Education |
|
Special Subject |
|
Class Status
within Educational
Program
(Applicable only to targeted subjects for undergraduate students) | |
|---|
Criterion referenced
Evaluation
(Applicable only to targeted subjects for undergraduate students) | |
|---|
Class Objectives
/Class Outline |
To understand the operating principles of numerical methods and be able to implement them. |
| Class Schedule |
lesson1 What is numerical computation? Dichotomy.
lesson2 Newton's method of one variable
lesson3 Taylor expansion and Newton's method
lesson4 Newton's method in two variables
lesson5 Gaussian Elimination: Backsubstitution
lesson6 Gaussian Elimination: Predecessor Elimination
lesson7 LU Decomposition Method
lesson8 Power method
lesson9 Jacobi method
lesson10 Lagrange interpolation
lesson11 Hermite interpolation
lesson12 Trapezoidal rule
lesson13 Simpson's rule
lesson14 What is numerically solving differential equations? Euler's method.
lesson15 Runge-Kutta method
Reports will be assigned. |
Text/Reference
Books,etc. |
Textbooks will not be specified. |
PC or AV used in
Class,etc. |
Other (see [More Details]), moodle |
| (More Details) |
Depending on whether it is online or face-to-face, the lecture will mainly be conducted using blackboards and slides. |
| Learning techniques to be incorporated |
Post-class Report |
Suggestions on
Preparation and
Review |
This course assumes that students have knowledge of calculus, linear algebra, and differential equations, so students should review these as necessary. Working on the report assignment will serve as a review of the lessons. |
| Requirements |
Understanding of the content of differential and integral calculus, linear algebra, and differential equations is required. |
| Grading Method |
Reports (100%) |
| Practical Experience |
|
| Summary of Practical Experience and Class Contents based on it |
|
| Message |
Period: The period will be announced at a later date on a bulletin board, etc.
Place: The face-to-face lectures will be held at Room A3-824, 8th floor, Building A3, Faculty of Engineering. |
| Other |
|
Please fill in the class improvement questionnaire which is carried out on all classes.
Instructors will reflect on your feedback and utilize the information for improving their teaching. |