Fourier series, Fourier transform and Inverse Fourier transform are important techniques to solve partial differential equations
such as equation of heat conduction.
Laplace transform and Inverse Laplace transform are the effective techniques to solve various differential equations.
In this course, fundamentals and applications of these techniques are lectured.
Laplace transform and Inverse Laplace transform are the effective techniques to solve various differential equations.
In this course, fundamentals and applications of these techniques are lectured.
The aim of this course is to acquire the basics of Fourier transform and Laplace transform, and to learn how to apply these
techniques to solve various problems in the mechanical engineering.
- Students can solve Fourier series of Even functions and Odd functions.
- Students can solve Fourier series of trigonometric and exponential functions.
- Students can solve partial differential equations using Fourier transform and Inverse Fourier transform.
- Students acquires definitions and characteristics of Laplace transform and Inverse Laplace transform.
- Students can solve differential equations in problems of mechanical engineering by applying Laplace transform.
| Class schedule | HW assignments (Including preparation and review of the class.) | Amount of Time Required | |
|---|---|---|---|
| 1. | What is the Fourier series ? What is the Fourier transform? Application to the square wave Fundamentals of Fourier series and Fourier transform |
Preparation and review using reference materials | 190minutes |
| 2. | Euler's coefficients Even function, Odd functions Orthogonalitys of trigonometric functions How to solve Euler's coefficients |
Preparation and review using reference materials | 190minutes |
| 3. | Fourier series of even functions and odd functions An example: Saw-tooth wave Half-range expansion |
Preparation and review using reference materials | 190minutes |
| 4. | Description of fourier series in the exponential functions Definition of exponential functions, Euler's formulae Description of fourier series in the trigonometric and exponential functions |
Preparation and review using reference materials | 190minutes |
| 5. | Fourier series to Fourier transform Change of the independent variables Replacement to the continuous functions |
Preparation and review using reference materials | 190minutes |
| 6. | Fourier transform and Inverse Fourier transform (1) Single square wave Exponential function |
Preparation and review using reference materials | 190minutes |
| 7. | Mid-term examination and review Fourier series of Even functions and Odd functions Description of fourier series in the trigonometric and exponential functions Fourier series to Fourier transform |
Preparation and review using reference materials | 190minutes |
| 8. | Fourier transform and Inverse Fourier transform (1) Step function Delta function Trigonometric function |
Preparation and review using reference materials | 190minutes |
| 9. | Characteristics of Fourier transform Linearity, transitivity, and similarity Fourier transform of differentials and integrations |
Preparation and review using reference materials | 190minutes |
| 10. | Parseval's equality and Gaussian function Parseval's equality Fourier transform, Inverse Fourier transform of Gaussian function |
Preparation and review using reference materials | 190minutes |
| 11. | Application of Fourier transform on partial differential equations Equation of heat conduction Application of Fourier transform on the equation of heat conduction |
Preparation and review using reference materials | 190minutes |
| 12. | Laplace transform (1) Definitions of Laplace transform and Inverse Laplace transform Characteristics of Laplace transform |
Preparation and review using reference materials | 190minutes |
| 13. | Laplace transform (2) Laplace transform of a typical function Application of Laplace transform |
Preparation and review using reference materials | 190minutes |
| 14. | Laplace transform (3) How to solve differential equations using Laplace transform ? Applications on the problems in mechanical engineering Term-end examination and the summary |
Preparation and review using reference materials | 190minutes |
| Total. | - | - | 2660minutes |
| Intermediate test | Term-end exam | Total. | |
|---|---|---|---|
| 1. | 10% | 10% | |
| 2. | 10% | 5% | 15% |
| 3. | 10% | 5% | 15% |
| 4. | 30% | 30% | |
| 5. | 30% | 30% | |
| Total. | 30% | 70% | - |
Final grade will be calculated according to mid-term examination (30%) and term-end examination (70%).
Mid-term examination includes issues 1 to 6 and partly issue 7.
Term-end examination includes issues 7 to 15.
Mid-term examination includes issues 1 to 6 and partly issue 7.
Term-end examination includes issues 7 to 15.
Reference materials will be provided before each lecture (in the file folder of network system).
It is desireable 'Elementary Mathematics (Analysis)', 'Differential and Integral Calculus and Exercise' and 'Basic Analysis'
are completed before this lecture.
- Tuesday 10: 00-12: 00. It is desirable to notify the visit in advance.
Accept questions during the class and any time by e-mail.
- Non-social and professional independence development course
Last modified : Wed Oct 17 06:24:16 JST 2018