Syllabus for Special Topics in Applied Mathematics I
 
◇ Information of class

Curriculum NO.  EGR503
Course NO. 
00
Title  Applied Mathematics I (응용수학 1)
Lecturer  Hakuen LEE
Credit  1.5-1.5

 
◇ Grading

수시과제

10 점

중간과제

40 점

기말과제

40 점

참여도

10 점

합계

100 점

평가점수
공개여부

비공개

◇ Academic Integrity

  Maintaining high level of academic integrity standard is very important. During the coursework, a particular attention should be given to plagiarism. Discussion between students about assignments and projects is encouraged. However, copying another student's work, or letting your own work be copied, is unacceptable. More detailed definition of plagiarism can be found at the Korea University Policy for Academic Conduct. Instances of plagiarism will be dealt with in accordance to the Korea University Policy for Academic Conduct. Such instances will be reported to the Head of School and a record will be kept of the case and penalty given, for future reference.

Updates in this semester

  In this semester, the entire course structure is completely reorganized to accommodate most up-to-date theories and research trends.

◇ Introduction of class

The purpose of this course is to give a broad coverage of the field of numerical analysis, emphasizing its practical applications rather than theory. At the same time, methods are compared, errors are analyzed, and relationship to the fundamental mathematical basis for the procedures are presented so that a true understanding of the subject is attained.

◇ Objective

The purpose of this course is to give a broad coverage of the field of numerical analysis, emphasizing its practical applications rather than theory. At the same time, methods are compared, errors are analyzed, and relationship to the fundamental mathematical basis for the procedures are presented so that a true understanding of the subject is attained.

 
◇ Prerequisite Subjects

Engineering Mathematics I, II 


◇ Class Materials

Lecture Note & Handout.

 
◇ References

Steven Chapra (2004), "Applied Numerical Methods", McGraw-Hill, ISBN-0072976772

 
◇ Assignments

Problems at each chapter.

 
◇ Weekly Plans

 

기간

 

회차

 

학습내용

 

교재

 

활동 및
설계내용

1

 

03.04 - 03.10

 

1

 

Representation of Functions by Series

 

 

 

 

2

 

03.11 - 03.17

 

1

 

Interporating Polynominals

 

 

 

 

3

 

03.18 - 03.24

 

1

 

Newton Divided Difference Polynominals

 

 

 

 

4

 

03.25 - 03.31

 

1

 

Newton Forward Difference Polynominals

 

 

 

 

5

 

04.01 - 04.07

 

1

 

Least Squres Appromiaion

 

 

 

 

6

 

04.08 - 04.14

 

1

 

Matrix Formulation

 

 

 

 

7

 

04.15 - 04.21

 

1

 

Exponential Function

 

 

 

 

8

 

04.22 - 04.28

 

1

 

Mid Term Exam

 

 

 

 

9

 

04.29 - 05.05

 

1

 

Incremental Search Method

 

 

 

 

10

 

05.06 - 05.12

 

1

 

Iterative Method

 

 

 

 

11

 

05.13 - 05.19

 

1

 

Newton Method

 

 

 

 

12

 

05.20 - 05.26

 

1

 

Solution of Polynominal Equation

 

 

 

 

13

 

05.27 - 06.02

 

1

 

Solution of Polynominal Equation

 

 

 

 

14

 

06.03 - 06.09

 

1

 

Eigenvalues and Eigenvectors

 

 

 

 

15

 

06.10 - 06.16

 

1

 

Nemerical Solution of Differential Equation

 

 

 

 

16

 

06.17 - 06.23

 

1

 

Final Term Exam