LINEAR ALGEBRA

  1. Course Description
    본 교과목에서는 미분방정식과 함께 공학도로서 공학기술 개발과 연구에 필요한 기본적인 수학적 지식인 선형대수학 및 백터의 기본적인 개념 및 해법을 학습하여 상급학년에서 공부하게 될 전공과목을 이해하고, 이를 산업현장에 적용하는데 필요한 다양한 수학적 지식들을 습득하는데 주안점을 둔다.
  2. Course Objectives
    This course will cover the basic mathematical knowledge such as solutions of Linear Algebra and its basic concepts as a prerequisite to other advanced courses. The specific contents covered in this course are as follows. 1) Solution of linear simultaneous equations 2) Understand matrix, determinant, vector space concept 3) Understanding the basic theorem for eigenvalues and eigenvectors 4) Mathematical application ability of matrix, determinant, eigenvalue and eigenvector
  3. Teachnig Method
    I. Attendance: • Regular class attendance is expected for all students at the University. You are not required but advised to attend all classes. • Please send your professor a brief e-mail to explain your absence in advance. • Your absence will not reduce your attendance rate if and only if you have a legitimate reason for missing a class (such as illness, death in family, a traffic accident, etc.). In case of an illness or emergency, you must supply a formal documentation that supports your claim. • Classes start on the hour. Please be respectful of your classmates by being on time. • All electronic equipment should be turned off and kept out of sight before lecture starts. II. Make-up Exams: Make‐ups for Midterm Exam will be available if and only if you have a legitimate reason for missing the exam (such as illness, death in family, a traffic accident, etc.). In case of an illness or emergency, you must supply a formal documentation that supports your claim. III. Late Submission Policy: Late submissions will not be graded. There will be no make-up for quizzes and homework/ assignments. Missed assignments and quizzes will result in a grade of zero (0). IV. Participation: In their book, The Adult Student's Guide to Survival & Success, Al Siebert and Mary Karr suggest that the most effective learning technique of all is to study by asking and answering questions. Develop the habit of reading textbooks, taking lecture notes, and studying by asking and answering questions. When you do this, you save many hours of studying and have time to spend with your family or friends. There are several ways to go about asking and answering questions. When studying on your own, write questions that occur to you while you're reading and then go back and find the answers. If you're part of a study group, make a list of questions to ask the group. In the classroom, participate fully by asking questions and answering the ones posed by your instructor.
  4. Textbook
  5. Assessment
  6. Requiments
    없음
  7. Practical application of the course
    Basic row operations on matrices State equations of differential equations
  8. Reference