Third Cycle Programmes
    (Doctorate Degree)
Second Cycle Programmes
    (Master's Degree)
First Cycle Programmes
    (Bachelor's Degree)
Short Cycle Programmes
    (Associate's Degree)
 
First Cycle Programmes (Bachelor's Degree)

Faculty of Science - Mathematics - First Cycle Programme



General Description
History
The department of Mathematics was founded as a major, independent unit within the Faculty of Science in 1961. In 1973, it was proposed that it be a department consisting of two subsections: Applied Mathematics and Theoretic Mathematics. The department was reformed in 1982. Since then it has had seven subunits (Theory of Algebra and Number, Geometry, Theory of Calculus and Functions, Topology, Foundations of Mathematics and Mathematical Logic, Applied Mathematics, and Computer Science) and steadily improved in the areas of academics and education.
Qualification Awarded
The Bachelor's Degree in Mathematics( first cycle in Mathematics) is awarded to the graduates who have successfully completed all courses in the curriculum
Level of Qualification
First Cycle
Specific Admission Requirements
High School Diploma, Based on nation wide examination administered by Student Selection and Placement Center.
Specific Arrangements For Recognition Of Prior Learning (Formal, Non-Formal and Informal)
To coordinate exemption exam for lessons, computer English and etc at the begining of all the academic semester. The students, who think that they have enough knowledge about the lessons , have right to join exams. The students, who passed the exams, excused from the lessons.
Qualification Requirements and Regulations
Undergraduate: Undergraduate diploma is given to the students who successed all lessons which are in the program (Totally 240 ECTS) and get at least 2.0 on 4.0 at the average mark. Graduate: Graduate diploma is given to the students who takes at least 21 credits (60 ECTS) and gets 70 average marks on 100 mark and present tthe thesis that prepared related to his/ her subjects tothe selected jury. Postgraduate : Postgraduate diploma is given to the students who takes at least 21 credits (60 ECTS) and gets 75 average marks on 100 mark and present tthe thesis that prepared related to his/ her subjects tothe selected jury.
Profile of The Programme
The education is four years excepting one year of English Prepration. The students who couldn’t qualified for English must attend English Prepration education at foreign language department. Some part of department lessons are English. Our departments education program is coordinated as to follow nowadays mathematical developments. First semester all the department students take common lessons; General :Mathematics, Analysis, Topology, Differential Equations, Abstract Algebra, Computer Science and etc. At the fifth semester, students chose options as Theoritical Mathematics, Computer Science and Applied Mathematics. At the third and fourth years all the options have optional and compulsary lessons.
Occupational Profiles of Graduates With Examples
If the graduates have formation and get KPSS Marks, they can be appointed as a Mathematics theacher by M.E.B, or they can be work as a mathematics theacher at private establishment preparing students for various exams and special school. On computer sector they can work in diferent positions. The students who are in graduate education can be researcher and researcher assistants in universities.
Access to Further Studies
The student who succeed undergraduate, get enough mark from ALES and enough level of english can attend on graduate and post graduate programs.
Examination Regulations, Assessment and Grading
The applied survey and valuation form for all lessons is defined in detailed form at “Lesson Education Plan”.
Graduation Requirements
The conditions and Laws in the Sufficiency Conditions and Laws adequate.
Mode of Study (Full-Time, Part-Time, E-Learning )
Full-Time
Address, Programme Director or Equivalent
Asst. Prof. Dr. Bahadır TANTAY
Facilities
In our department there are 8 professor, 6 associate professor, 12 assistant professor, 4 university lecturer, 13 research assistant and 997 students.

Key Learning Outcomes
1Ability to assimilate mathematic related concepts and associate these concepts with each other.
2Ability to learn scientific, mathematical perception and the ability to use that information to related areas.
3Ability to gain qualifications based on basic mathematical skills, problem solving, reasoning, association and generalization.
4Following the developments in science and technology and gain self-renewing ability.
5Be able to access to information, make research on resources for this purpose and be able to use databases and other information resources.
6To perform the ethical responsibilities in working life.
7Ability to learn information about history of science and scientific knowledge production.
8Be able to organize events, for the development of critical and creative thinking and problem solving skills, by using appropriate methods and techniques.
9Ability to make individual and team work on issues related to working and social life.
10Ability to transfer ideas and suggestions, related to topics about his/her field of interest, written and verball.
11Ability to use mathematical knowledge in technology.
12Ability to develop a foreign language in a sufficient level to follow the information in his/her field of interest and to communicate with the colleagues.
13To apply mathematical principles to real world problems.
14Ability to use the approaches and knowledge of other disciplines in Mathematics.
15Be able to set up and develope a solution method for a problem in mathematics independently, be able to solve and evaluate the results and to apply them if necessary.
16

Key Programme Learning Outcomes - NQF for HE in Turkey
TYYÇKey Learning Outcomes
12345678910111213141516
KNOWLEDGE1
SKILLS1
2
COMPETENCES (Competence to Work Independently and Take Responsibility)1
2
3
COMPETENCES (Learning Competence)1
2
3
COMPETENCES (Communication and Social Competence)1
2
3
4
5
COMPETENCES (Field Specific Competence)1
2

Course Structure Diagram with Credits
T : Theoretical P: Practice L : Laboratory
1. Semester
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 MAT107 ABSTRACT MATHEMATICS I Compulsory 3 1 0 4
2 MAT101 ANALYTIC GEOMETRY I Compulsory 3 1 0 4
3 MAT103 FOUNDATION OF MATHEMATICS Compulsory 3 1 0 4
4 MAT105 MATHEMATICS I Compulsory 3 1 0 5
5 FİZ157 PHYSICS Compulsory 2 1 0 4
6 ATA101 PRINCIPLES OF ATATURK AND RECENT TURKISH HISTORY I Compulsory 2 0 0 2
7 FEN101 SCIENTIFIC ENGLISH I Compulsory 2 0 0 3
8 ÜYG101 TRANSITION INTO UNIVERSITY LIFE Compulsory 1 0 0 2
9 TUR101 TURKISH LANGUAGE I Compulsory 2 0 0 2
Total 21 5 0 30
 
2. Semester
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 MAT106 ABSTRACT MATHEMATICS II Compulsory 3 1 0 4
2 MAT102 ANALYTIC GEOMETRY II Compulsory 3 1 0 8
3 FEN106 COMPUTER CORSE Compulsory 3 0 0 3
4 MAT104 MATHEMATICS II Compulsory 3 1 0 8
5 ATA102 PRINCIPLES OF ATATURK AND RECENT TURKISH HISTORY II Compulsory 2 0 0 2
6 FEN102 SCIENTIFIC ENGLISH II Compulsory 2 0 0 3
7 TUR102 TURKISH LANGUAGE II Compulsory 2 0 0 2
Total 18 3 0 30
 
3. Semester
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 MAT201 ANALYSIS I Compulsory 3 1 0 9
2 MAT203 COMPUTER SCIENCES I Compulsory 3 0 1 4
3 MAT205 INTRODUCTION TO GENERAL TOPOLOGY Compulsory 3 1 0 4
4 İST251 INTRODUCTION TO STATISTICS Compulsory 2 1 0 9
5 MAT207 LINEAR ALGEBRA I Compulsory 3 1 0 4
Total 14 4 1 30
 
4. Semester
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 MAT202 ANALYSIS II Compulsory 3 1 0 4
2 THU202 COMMUNITY SERVICE ACTIVITIES Compulsory 1 0 0 1
3 MAT204 COMPUTER SCIENCES II Compulsory 3 0 1 7
4 MAT206 INTRODUCTION TO DIFFERANTIAL EQUATIONS Compulsory 2 1 0 7
5 İST252 INTRODUCTION TO PROBABILITY Compulsory 2 1 0 7
6 MAT208 LINEAR ALGEBRA II Compulsory 3 1 0 4
Total 14 4 1 30
 
5. Semester
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 MAT.TEO.MESL.I Elective - - - 10
2 FEN.ÜNİV.SEÇ.I Elective - - - 3
3 405023021997 DIFFERANTIAL GEOMETRY-I Compulsory 3 1 0 5
4 405023021997 DIFFERANTIAL GEOMETRY-I Compulsory 3 1 0 5
5 MAT1301 DIFFERENTIAL GEOMETRY I Compulsory 2 1 0 4
6 MAT.TEO.05 ELECTIVE I Elective - - - 10
7 MAT.TEO.05 ELECTIVE I Elective - - - 10
8 MAT1303 GENERAL TOPOLOGY I Compulsory 2 1 0 5
9 405023041997 GENERAL TOPOLOGY-I Compulsory 3 1 0 5
10 405023041997 GENERAL TOPOLOGY-I Compulsory 3 1 0 5
11 MAT1305 INTRODUCTION TO NUMBER THEORY Compulsory 2 1 0 5
12 MAT1305 INTRODUCTION TO NUMBER THEORY Compulsory 2 1 0 5
13 MAT1305 INTRODUCTION TO NUMBER THEORY Compulsory 2 1 0 5
14 PFGRUP-05 PEDAGOGICAL FORMATION GROUP 05 Elective - - - 6
15 405023032006 THEORY OF COMPLEX FUNCTIONS Compulsory 2 2 0 5
16 405023032006 THEORY OF COMPLEX FUNCTIONS Compulsory 2 2 0 5
17 MAT1307 THEORY OF COMPLEX FUNCTIONS I Compulsory 2 1 0 4
Total 28 14 0 97
 
6. Semester
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 MAT.TEO.MESL.II Elective - - - 10
2 FEN.ÜNİV.SEÇ.II Elective - - - 3
3 405023052001 ABSTRACT ALGEBRA Compulsory 3 1 0 5
4 405023052001 ABSTRACT ALGEBRA Compulsory 3 1 0 5
5 MAT1308 ABSTRACT ALGEBRA Compulsory 2 1 0 4
6 MAT1302 DIFFERANTIAL GEOMETRY II Compulsory 2 1 0 3
7 405023062006 DIFFERENTIAL GEOMETRY-II Compulsory 2 2 0 5
8 405023062006 DIFFERENTIAL GEOMETRY-II Compulsory 2 2 0 5
9 MAT.TEO.06 ELECTIVE II Elective - - - 10
10 MAT.TEO.06 ELECTIVE II Elective - - - 10
11 405023082006 GENERAL TOPOLOGY II Compulsory 2 2 0 5
12 405023082006 GENERAL TOPOLOGY II Compulsory 2 2 0 5
13 MAT1306 GENERAL TOPOLOGY II Compulsory 2 1 0 6
14 PFGRUP-06 PEDAGOGICAL FORMATION GROUP 06 Elective - - - 6
15 405023072006 THEORY OF COMPLEX FUNCTIONS II Compulsory 2 2 0 5
16 405023072006 THEORY OF COMPLEX FUNCTIONS II Compulsory 2 2 0 5
17 MAT1304 THEORY OF COMPLEX FUNCTIONS II Compulsory 2 1 0 4
Total 26 18 0 96
 
7. Semester
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 MAT.TEO.MESL.III Elective - - - 14
2 FEN.FAK.SEÇ.I Elective - - - 3
3 405024012006 ADVANCED ALGEBRA I Compulsory 2 1 0 6
4 405024012006 ADVANCED ALGEBRA I Compulsory 2 1 0 6
5 MAT1403 ADVANCED ALGEBRA I Compulsory 2 1 0 3
6 MAT1401 ALGEBRA TOPOLOGY Compulsory 2 1 0 3
7 405024142006 ALGEBRAIC TOPOLOGY Compulsory 2 1 0 6
8 405024142006 ALGEBRAIC TOPOLOGY Compulsory 2 1 0 6
9 MAT.TEO.07 ELECTIVE I Elective - - - 6
10 MAT.TEO.07 ELECTIVE I Elective - - - 6
11 405024032006 MATHEMATICAL LOGIC Compulsory 2 1 0 6
12 405024032006 MATHEMATICAL LOGIC Compulsory 2 1 0 6
13 MAT1405 MATHEMATICAL LOGIC Compulsory 3 0 0 3
14 PFGRUP-07 PEDAGOGICAL FORMATION GROUP 07 Elective - - - 7
15 405024332012 REAL ANALYSIS Compulsory 3 1 0 6
16 405024332012 REAL ANALYSIS Compulsory 3 1 0 6
17 MAT1407 REAL ANALYSIS Compulsory 2 1 0 4
Total 27 11 0 97
 
8. Semester
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 MAT.TEO.MESL.IV Elective - - - 12
2 FEN.FAK.SEÇ.II Elective - - - 3
3 FEN.ÜNİV.SEÇ.III Elective - - - 3
4 405024052000 ADVANCED ALGEBRA II Compulsory 3 0 0 6
5 405024052000 ADVANCED ALGEBRA II Compulsory 3 0 0 6
6 MAT1408 ADVANCED ALGEBRA II Compulsory 2 1 0 3
7 MAT.TEO.08 ELECTIVE II Elective - - - 6
8 MAT.TEO.08 ELECTIVE II Elective - - - 6
9 405024172006 FOURIER AND LAPLACE TRANSFORMS Compulsory 2 1 0 6
10 405024172006 FOURIER AND LAPLACE TRANSFORMS Compulsory 2 1 0 6
11 MAT1402 FOURIER AND LAPLACE TRANSFORMS Compulsory 2 1 0 3
12 MAT1404 GEOMETRIC TOPOLOGY Compulsory 2 1 0 3
13 405024402006 GEOMETRICAL TOPOLOGY Compulsory 3 0 0 6
14 405024402006 GEOMETRICAL TOPOLOGY Compulsory 3 0 0 6
15 405024162000 GEOMETRY OF MOTION Compulsory 2 1 0 6
16 405024462012 GEOMETRY OF MOTION Compulsory 2 1 0 6
17 MAT1406 GEOMETRY OF MOTION Compulsory 2 1 0 3
18 PFGRUP-08 PEDAGOGICAL FORMATION GROUP 08 Elective - - - 7
Total 28 8 0 97
 
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 MAT1309 GROUP THEORY Elective 3 0 0 5
2 MAT1311 TRANSFORMS AND GEOMETRY Elective 3 0 0 5
3 MAT1313 COUNTEREXAMPLES IN ANALYSIS Elective 3 0 0 5
4 MAT1315 DIFFERANTIAL TOPOLOGY Elective 3 0 0 5
5 MAT1317 TOPOLOGICAL VECTOR SPACES Elective 3 0 0 5
6 MAT1319 INTRODUCTION TO SET THEORY I Elective 3 0 0 5
7 MAT1321 FUNDAMENTAL DISCRETE MATHEMATICS Elective 3 0 0 5
8 MAT1323 FUNDAMENTAL NUMERICAL ANALYSIS Elective 3 0 0 5
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 FEN005 BASKETBOL Elective 2 0 0 3
2 FEN007 FUTBOL Elective 2 0 0 3
3 FEN009 ATLETİZM Elective 2 0 0 3
4 FEN011 YÜZME I Elective 2 0 0 3
5 FEN021 JEWELLERY ART AND PRODUCING WITH DIFFERENT MATERIALS I Elective 3 0 0 3
6 FEN035 TEMEL HUKUK Elective 2 0 0 3
7 FEN051 INTRODUCTION TO PHILOSOPHY Elective 2 0 0 3
8 FEN053 HISTORY OF ANATOLIAN ART Elective 2 0 0 3
9 FEN055 MYTHOLOGY Elective 2 0 0 3
10 FEN057 KONUŞMA EĞİTİMİ Elective 1 0 0 3
11 FEN059 ENTREPRENEURSHIP AND QUALITY Elective 2 0 0 3
12 FEN067 İNSAN İLİŞKİLERİ VE İLETİŞİM Elective 1 0 0 3
ELECTIVE I
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 10420502E11357 ANALYTICAL DESIGN Elective 3 0 0 5
2 405023512008 INTRODUCTION TO ANALYSIS ON TIME SCALES Elective 3 0 0 5
ELECTIVE I
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 10420502E11357 ANALYTICAL DESIGN Elective 3 0 0 5
2 405023512008 INTRODUCTION TO ANALYSIS ON TIME SCALES Elective 3 0 0 5
3 405024532013 INTRODUCTION TO STATISTICS Elective 3 0 0 5
PEDAGOGICAL FORMATION GROUP 05
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 408003012010 INTRODUCTION TO EDUCATIONAL SCIENCES Elective 2 0 0 2
2 408003032010 PSYCHOLOGY OF GROWTH Elective 2 0 0 2
3 408003052010 THEORY AND APPROACHES FOR TEACHING AND LEARNING Elective 2 0 0 2
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 MAT1310 LINEAR ALGEBRA III Elective 3 0 0 5
2 MAT1312 NON-EUCLIDIAN GEOMETRIES Elective 3 0 0 5
3 MAT1314 INTRODUCTION TO ANALYSIS ON TIME SCALES Elective 3 0 0 5
4 MAT1316 DIGITAL TOPOLOGY Elective 3 0 0 5
5 MAT1318 METRIC AND TOPOLOGICAL SPACES Elective 3 0 0 5
6 MAT1320 ORDERED STRUCTURES AND LATTICES Elective 3 0 0 5
7 MAT1322 INTERNSHIP Elective 0 0 0 5
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 FEN014 TENİS Elective 2 0 0 3
2 FEN016 RİTMİK JİMNASTİK Elective 2 0 0 3
3 FEN018 DANS EĞİTİMİ Elective 2 0 0 3
4 FEN034 JEWELLERY ART AND PRODUCING WITH DIFFERENT MATERIALS II Elective 3 0 0 3
5 FEN060 MEDIA LITERACY Elective 2 0 0 3
6 FEN062 NOVEL AND STORY IN MODERN TURKISH LITERATURE Elective 2 0 0 3
7 FEN064 HUMAN DEVELOPMENT Elective 2 0 0 3
8 FEN066 SIGN LANGUAGE Elective 2 0 0 3
9 FEN074 LATEX İLE DÖKÜMAN HAZIRLAMA Elective 1 0 0 3
ELECTIVE II
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 10420522E11358 GEOMETRICAL DESIGN Elective 3 0 0 5
2 405023482012 LINEAR ALGEBRA III Elective 3 0 0 5
3 405023542008 INTRODUCTION TO SET THEORY-II Elective 3 0 0 5
4 405023562010 GEOMETRIC GRAPHIC TECHNIQUES Elective 3 0 0 5
ELECTIVE II
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 10420522E11358 GEOMETRICAL DESIGN Elective 3 0 0 5
2 405023482012 LINEAR ALGEBRA III Elective 3 0 0 5
3 405023542008 INTRODUCTION TO SET THEORY-II Elective 3 0 0 5
4 405023562010 GEOMETRIC GRAPHIC TECHNIQUES Elective 3 0 0 5
5 405024482013 COMBINATORICS ANALYSIS Elective 3 0 0 5
PEDAGOGICAL FORMATION GROUP 06
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 408003022010 PROGRAMME DEVELOPMENT AND EDUCATION Elective 2 0 0 2
2 408003042010 ASSESSMENT AND EVALUATION Elective 0 0 0 2
3 408003062010 CLASS MANAGEMENT Elective 2 0 0 2
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 MAT1409 INTRODUCTION TO RING THEORY Elective 3 0 0 7
2 MAT1411 GROUP REPRESENTATION Elective 3 0 0 7
3 MAT1413 HISTORY OF MATHEMATICS I Elective 3 0 0 7
4 MAT1415 MEASURE THEORY Elective 3 0 0 7
5 MAT1417 COMBINATORIAL TOPOLOGY Elective 3 0 0 7
6 MAT1419 INTRODUCTION TO SET THEORY II Elective 3 0 0 7
7 MAT1421 REFERENCES MONITORING TECHNIQUES (DIPLOMA THESIS-I) Elective 0 3 0 7
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 AST003 BASIC ASTRONOMY Elective 2 0 0 3
2 FİZ328 PHYSICS IN BIOLOGY AND MEDICINE Elective 3 0 0 3
3 FİZ411 PHYSICS OF ENERGY SOURCES Elective 3 0 0 3
4 İST001 STATISTICAL GRAPHICS METHODS Elective 3 0 0 3
ELECTIVE I
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 10420522E11447 COMBINATORIAL TOPOLOGY Elective 2 0 0 3
2 405024262006 INTEGRAL EQUATIONS Elective 2 0 0 3
3 405024412006 MODERN GEOMETRY Elective 2 0 0 3
4 405024432006 REFERENCES MONITORING TECH.(DIPLOMA THES Elective 0 2 0 3
5 405024492012 GROUP REPRESENTATION Elective 2 0 0 3
6 405024512012 INTRODUCTION TO RING THEORY Elective 2 0 0 3
ELECTIVE I
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 10420522E11447 COMBINATORIAL TOPOLOGY Elective 2 0 0 3
2 405024262006 INTEGRAL EQUATIONS Elective 2 0 0 3
3 405024412006 MODERN GEOMETRY Elective 2 0 0 3
4 405024432006 REFERENCES MONITORING TECH.(DIPLOMA THES Elective 0 2 0 3
5 405024492012 GROUP REPRESENTATION Elective 2 0 0 3
6 405024512012 INTRODUCTION TO RING THEORY Elective 2 0 0 3
PEDAGOGICAL FORMATION GROUP 07
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 408004012010 EDUCATION TECHNOLOGIES AND MATERIALS Elective 2 2 0 3
2 408004032010 TECHNIQUES FOR SPECIAL TEACHING Elective 3 2 0 4
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 MAT1410 RINGS AND MODULES Elective 3 0 0 6
2 MAT1412 NUMBER THEORY Elective 3 0 0 6
3 MAT1414 HISTORY OF MATHEMATICS II Elective 3 0 0 6
4 MAT1416 FUNCTIONAL ANALYSIS Elective 3 0 0 6
5 MAT1418 FUZZY TOPOLOGY Elective 3 0 0 3
6 MAT1420 INTRODUCTION UNIVERSAL ALGEBRA Elective 3 0 0 6
7 MAT1422 COMPLETION THESSIS (DIPLOMA THESIS-II) Elective 0 3 0 6
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 AST002 MODERN ASTROPHYSICS Elective 2 0 0 3
2 İST002 ECONOMETRICS Elective 2 0 1 3
3 İST004 TOTAL QUALITY CONTROL Elective 2 0 0 3
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 FEN020 VOLEYBOL Elective 2 0 0 3
2 FEN022 RİTM EĞİTİMİ VE DANS Elective 2 0 0 3
3 FEN024 MASA TENİSİ Elective 2 0 0 3
4 FEN026 HALK OYUNLARI Elective 2 0 0 3
5 FEN042 YARATICI DÜŞÜNCE YÖNTEM VE TEKNİKLERİ Elective 3 0 0 3
ELECTIVE II
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 405024182006 NUMBER THEORY Elective 2 0 0 3
2 405024232006 FUZZY TOPOLOGY Elective 2 0 0 3
3 405024422006 COMPLETION THESSIS (DIPLOMA THESIS-II) Elective 0 2 0 3
4 405024442010 RINGS AND MODULES Elective 2 0 0 3
ELECTIVE II
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 405024182006 NUMBER THEORY Elective 2 0 0 3
2 405024232006 FUZZY TOPOLOGY Elective 2 0 0 3
3 405024422006 COMPLETION THESSIS (DIPLOMA THESIS-II) Elective 0 2 0 3
4 405024442010 RINGS AND MODULES Elective 2 0 0 3
PEDAGOGICAL FORMATION GROUP 08
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 408004022010 GUIDANCE Elective 2 0 0 2
2 408004042010 TEACHING PRACTICE Elective 2 6 0 5
 
Ege University, Bornova - İzmir / TURKEY • Phone: +90 232 311 10 10 • e-mail: intrec@mail.ege.edu.tr