Module Handbook

 

Module Name:

Complex Functions

Module Level:

Bachelor

Abbreviation, if applicable:

MAA 303

Sub-heading, if applicable:

-

Courses included in the

module, if applicable:

-

Semester/term:

6th/ Third Year

Module coordinator(s):

Dr. Eridani

Lecturer(s):

Dr. Eridani, M. Yusuf Syaifuddin, M.Si

Language:

BahasaIndonesia

Classification within the

Curriculum

Compulsory Course / Elective Studies

Teaching format / class

hours per week during semester:

3 hours lectures (50 min / hour)

Workload:

3 hours lectures, 3 hour structural activities, 3 hours individual study,

13 week per semester, and total 117 hours per semester 3.9 ECTS

Credit Points:

3

Requirements:

Real Analysis I

Learning goals/competencies:

General Competence (Knowledge)

Apply complex function in mathematics

 

Specific Competence:

1. Explain A Complex Numbers and algebraic properties

2. Explain an analytic function of complex and properties

3. Explain an elementary functions of complex and properties

4. Explain Complex Integrations

5. Explain power series and Larent series

6. Explain Residues and Applied

 

Content:

This coursecontains: Complex Numbers, Analytic Functions, Elementary Functions, Integral, Series, and residues.

Soft skill Attribute

Activity, honesty and disciplinary

Study/exam achievements:

Students are considered to be competent and pass if at least get 40of Final score.

Final score (NA) is calculated as follow: 10% score of softskill + 10% assignment+ 20% quiz+ 30% UTS+ 30% UAS

 

Final index is defined as follow:

A : 75 100

AB : 70 - 74.99

B : 65 - 69.99

BC : 60 - 64.99

C : 55 - 59.99

D : 40 - 54.99

E : 0 - 39.99

Forms of Media:

LCD projectorsandwhiteboards

Learning Methods

Lectureand discussing

Literature:

1.       Churcill, Ruel V.& Ward Brown James, 1996, Complex Variables and Applications, Seventh Edition, McGraw-Hill Publishing Company.

2.       Beck M., Marchesi G, Pixton D. and Sabalka L., (2009). A First Course in Complex Analysis, version 1.41, http://math.sfsu.edu/beck/complex.html

3.       Walkden C., 2015. Complex Analysis, http://www.maths.manchester.ac.uk/~cwalkden/complex-analysis/complex_analysis.pdf

 

Notes: