Module Handbook

 

Module Name:

Advanced Real Analysis

Module Level:

Bachelor

Abbreviation, if applicable:

MAA 305

Sub-heading, if applicable:

-

Courses included in the

module, if applicable:

-

Semester/term:

7th/ Fourth Year

Module coordinator(s):

Dr. Eridani

Lecturer(s):

Dr. Eridani

Language:

BahasaIndonesia

Classification within the

curriculum

Compulsory Course / Elective Studies

Teaching format / class

hours per week during semester:

3hours lectures (50 min / hour)

Workload:

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

13 week per semester, and total 117 hours per semester 3.75 ECTS

Credit Points:

3

Requirements:

Real Analysis II

Learning goals/competencies:

General Competence (Knowledge)

Capable toapplied the real analysis in an ordinary defferential equations and capable to explain Lebesgue integration.

 

Specific Competence:

1. Capable to explain Bolzano-Weierstrass

2. Capable to explain Continous function spaces

3. Capable to explain Lebesgue measures

4. Capable to explain Lebesgue spaces

Content:

This coursecontains: subsequence, limit sequence, Bolzano-Weierstrass, Continous function spaces, Lebesgue measure, Lebesgue spaces.

Soft Skill Attribute

Communication 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 + 15% assignment+ 20% quiz+ 25% 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

Lectureandassessments

Literature:

1. Goldberg R., 1976, Methods of Real Analysis, John Wiley and Sons.

Notes: