Linear Algebra 2

Course title

V1420700

Linear Algebra 2

	TAMORI Hiroyoshi
	SHIMIZU Kenichi

Course description

This is a continuation of "Linear Algebra 1". In the first half of the course, we learn eigenvalues, eigenvectors, diagonalization of square matrices, and their application. In the latter half, we learn basics of the theory of vector spaces.

Purpose of class

We become able to calculate eigenvalues, eigenvectors, and diagonalization of square matrices. We learn fundamental concepts of the theory of vector space, and associate them with explicit calculation of matrices.

Goals and objectives

To be able to diagonalize square matrices
To be able to diagonalize real symmetric matrices by orthogonal matrices
To be able to explain the definitions of vector space, subspace, linear map, image and kernel, basis, and dimension
To understand the notion of matrix representation, and to be able to explain its concrete examples

Relationship between 'Goals and Objectives' and 'Course Outcomes'

	Class assignment	Mid-term exam	Final exam	Total.
1.	8%	25%	2%	35%
2.	4%	10%	6%	20%
3.	8%	0%	22%	30%
4.	4%	0%	11%	15%
Total.	24%	35%	41%	-

Language

Japanese

Class schedule

	Class schedule	HW assignments (Including preparation and review of the class.)	Amount of Time Required
1.	Guidance, What is Diagonalization?	Review of Linear Algebra 1	100minutes
1.	Guidance, What is Diagonalization?	Class assignment	100minutes
2.	Eigenvalue, Eigenvector, Characteristic polynomial	Review the previous class	100minutes
2.	Eigenvalue, Eigenvector, Characteristic polynomial	Class assignment	100minutes
3.	Diagonalization of square matrices (1)	Review the previous class	100minutes
3.	Diagonalization of square matrices (1)	Class assignment	100minutes
4.	Diagonalization of square matrices (2)	Review the previous class	100minutes
4.	Diagonalization of square matrices (2)	Class assignment	100minutes
5.	Triangularization of square matrices, Cayley-Hamilton theorem	Review the previous class	100minutes
5.		Class assignment	100minutes
6.	Inner product, Gram–Schmidt orthonormalization	Review the previous class	100minutes
6.	Inner product, Gram–Schmidt orthonormalization	Class assignment	100minutes
7.	Diagonalization of real symmetric matrices by orthogonal matrices, Diagonalization of Hermitian matrices by unitary matrices	Review the previous class	100minutes
7.		Class assignment	100minutes
8.	Mid-term exam and comments on it	Review the previous classes	200minutes
9.	Vector space, Subspace	Review the previous class	100minutes
9.	Vector space, Subspace	Class assignment	100minutes
10.	Linear independence, Basis, Dimension	Review the previous class	100minutes
10.	Linear independence, Basis, Dimension	Class assignment	100minutes
11.	Linear map, Image and Kernel, Isomorphism of vector spaces	Review the previous class	100minutes
11.	Linear map, Image and Kernel, Isomorphism of vector spaces	Class assignment	100minutes
12.	Dimension theorem, Classification of finite dimensional vector spaces by dimension	Review the previous class	100minutes
12.		Class assignment	100minutes
13.	Matrix representation, Change of bases	Review the previous class	100minutes
13.	Matrix representation, Change of bases	Class assignment	100minutes
14.	Final exam and comments on it	Review the previous classes	200minutes
Total.	-	-	2800minutes

Evaluation method and criteria

Students are evaluated by Class assignments (about 25%), Mid-term exam (about 35%), and Final exam (about 40％). One criterion for earning credits is to be able to check diagonalizability of a given square matrix of order 3, to be able to diagonalize it if it is diagonalizable, and to be able to explain the definitions and examples of basic notions in the theory of vector spaces.

Feedback on exams, assignments, etc.

ways of feedback	specific contents about "Other"
Feedback in the class

Textbooks and reference materials

【Reference book】
Tatsuo SUZUKI and Katsunori ANO "講義：線形代数（第2版）"（Gakujutsu Tosho Shuppan-sha co.,Ltd., ISBN 978-4-7806-0477-1）
Toshitsune MIYAKE, "入門線形代数" (Baihu-kan co.,Ltd., ISBN 978-4563002169)
Koji HASEGAWA "線型代数［改訂版］" (Nippon Hyoron sha co.,Ltd., ISBN 978-4-535-78771-1)

Students do not need to purchase the above books. These can be used for self-study and exercises.

Prerequisites

Students need to review topics in "Linear Algebra 1".

Office hours and How to contact professors for questions

You can ask questions before/during/after each lecture.
Office Hours: Wednesday 12:30-13:20
You can ask questions at the educational support section.
You can visit the office of the lecturer and ask questions.

Regionally-oriented

Non-regionally-oriented course

Development of social and professional independence

Course that cultivates an ability for utilizing knowledge
Course that cultivates a basic problem-solving skills

Active-learning course

More than one class is interactive

Course by professor with work experience

Work experience	Work experience and relevance to the course content if applicable
N/A	N/A

Education related SDGs:the Sustainable Development Goals

4.QUALITY EDUCATION
9.INDUSTRY, INNOVATION AND INFRASTRUCTURE

Last modified : Sat Mar 02 04:32:23 JST 2024