Course title
線形代数学Ⅰ   [Linear Algebra Ⅰ]
Course category technology speciality courses,ets.  Requirement   Credit 2 
Department   Year 14  Semester Spring 
Course type Spring  Course code 021402
Instructor(s)
原 伸生   [HARA Nobuo]
Facility affiliation Faculty of Engineering Office   Email address

Course description
Linear algebra provides indispensable tools to analyze various mathematical phenomena appearing in engineering. Computations in linear algebra are based on matrices and their elementary transformations, which enable us to treat more abstract notions such as linear maps and linear independence at hand. In this course we will learn about various computations with matrices (elementary transformation, determinants etc.), via which the concept of "linearity" behind them will be understood.
Expected Learning
The goal of this course is:
1) capable to perform basic operations on matrices
2) capable to calculate the reduced row echelon form of a matrix with elementary transformation
3) capable to calculate the determinant of a square matrix
4) capable to apply the above techniques to solving a system of linear equations, computations of inverse matrices and linear (in)dependence of column vectors
5) to understand the correspondence between the Euclidean vector space and the space of column vectors, as well as the basic notions for those vectors
Course schedule
1. Matrices and their operations
2. Square matrices: inverse matrices, regular matrices etc.
3. Block division of matrices
4. Elementary transformation and row echelon form
5. Applications: system of linear equations and inverse matrices
6. Determinants 1: permutations
7. Exercises, or midterm examination
8. Determinants 2: a definition and basic properties
9. Determinants 3: cofactor expansion
10. Determinants 4: adjoints and Cramer's formula
11. The vector space of column vectors with real entries
12. Linear combination and linear independence of column vectors
13. 3-dimensional space vectors
14. Exercises summarizing the semester
15. Term examination
Prerequisites
None
Required Text(s) and Materials
Miyake, T.: "Nyuumon-Senkei-Daisuu", Baifu-kan (in japanese)
References
To be indicated in the lecture
Assessment/Grading
Midterm exam (50%), Term exam (50%)
Message from instructor(s)
Course keywords
matrix, vector, rank, system of linear equations, determinant, inverse matrix
Office hours
Remarks 1
Remarks 2
Related URL
Lecture Language
Japanese
Language Subject
Last update
5/30/2018 10:38:05 AM