### 2020　Applied Probability and Statistical Theory

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Undergraduate major in Electrical and Electronic Engineering
Instructor(s)
Kajikawa Kotaro  Sakaguchi Kei
Course component(s)
Lecture
Mode of instruction
ZOOM
Day/Period(Room No.)
Tue1-2(S011)  Fri1-2(S011)
Group
-
Course number
EEE.M231
Credits
2
2020
Offered quarter
3Q
Syllabus updated
2020/9/18
Lecture notes updated
2020/11/23
Language used
Japanese
Access Index ### Course description and aims

It is vital to acquire knowledge and skills in statistics and probability in various fields related to electrical engineering and information communication engineering. By combining lectures and exercises, the course enables students to understand and learn the fundamentals of mean, variance, characteristic function, etc. in the first part (probability) and those of unbiased estimation, maximum likelihood estimation, hypothesis testing, etc. in the second part (statistics).
The ability to derive statistically significant information will be very useful in the real world.

### Student learning outcomes

Students will be able to learn how to analyze data in various fields related to electrical engineering and information communication engineering by using probablistic methods and statistical techniques. The course provides specific examples in engineering, which will give a deeper understanding. Many practical exercises and exams will enable students to acquire knowledge effectively.

Corresponding educational goals are:
(1) Specialist skills Fundamental specialist skills
(6) Firm fundamental specialist skills on electrical and electronic engineering, including areas such as electromagnetism, circuits, linear systems, and applied mathematics

### Keywords

Probability, Mean, Variance, Maximum likelihood estimation, Hypothesis testing

### Competencies that will be developed

 ✔ Specialist skills Intercultural skills Communication skills Critical thinking skills Practical and/or problem-solving skills ✔ ・Fundamental specialist skills on EEE

### Class flow

To cultivate practical ability, students are given many exercise problems, which are related to a previous class and a class on the day.

### Course schedule/Required learning

Course schedule Required learning
Class 1 Permutations Understand the Permutations
Class 2 Conditional probability Calculate conditional probability.
Class 3 Mean and variance Calculate mean and variance
Class 4 Characteristic function Understand characteristic function
Class 5 Random variable and distribution　I Understand random variable and distribution
Class 6 Random variable and distribution　II Understand random variable and distribution
Class 7 Test level of understanding with exercise problems Test level of understanding for classes 1–6
Class 8 Statistical estimation Calculate several types of means
Class 9 Unbiased estimation Understand unbiased estimation
Class 10 Maximum likelihood estimation Learn how to perform maximum likelihood estimation
Class 11 Hypothesis testing Learn applications of hypothesis testing
Class 12 Stochastic process I Perform regression analysis calculation
Class 13 Stochastic process II Calculate correlation coefficient
Class 14 Test level of understanding with exercise problems Test level of understanding for classes 8–13

### Out-of-Class Study Time (Preparation and Review)

To enhance effective learning, students are encouraged to spend approximately 100 minutes preparing for class and another 100 minutes reviewing class content afterwards (including assignments) for each class.
They should do so by referring to textbooks and other course material.

N/A

### Reference books, course materials, etc.

Watanabe, Sumio, Noboru, Murata, Probability and statistics: a bridge to information science, Corona-sha; ISBN: 9784339060775 (in Japanese)
Ogura, Hisanao, stochastic process for physics and engineering, Corona-sha; ISBN: 9784339004229, 9784339004236 (in Japanese)
Shibata, Fumiaki, Probability and statistics, Iwanami-shoten; ISBN: 9784000079778 (in Japanese)
Baba, Noriyuki, Kuchii, Shigeru, Campus seminar: statistics, mathema-shuppan, ISBN: 9784907165314 (in Japanese)

### Assessment criteria and methods

Students' knowledge of probability and statistical, and their ability to apply them to problems will be assessed.
Midterm exam 40%, final exam 40%, exercise problems 20%.

### Related courses

• LAS.M101 ： Calculus I / Recitation
• LAS.M105 ： Calculus II
• EEE.M211 ： Fourier Transform and Laplace Transform
• EEE.S341 ： Communication Theory (Electrical and Electronic Engineering)

### Prerequisites (i.e., required knowledge, skills, courses, etc.)

Students must have successfully completed both Calculus I and Calculus II.

### Other 