DEGREE PROGRAMMES

: Mathematics (English)

General Description

History

Department of Mathematics was founded in 1991. The undergraduate program started in 1991, and the Master and PhD programs started in 1993. Our department carries out the Mathematics courses both in the undergraduate and in the graduate programs of the Faculty of Science, Engineering Faculty and the other faculties of our university. As a developing department, our aim is especially to strengthen the department in research and to grow in various sub-branches of mathematics. The language of instruction is English.

Qualification Awarded

Mathematics, Bachelor's Degree (B.Sc.)

Level of Qualification

First Cycle (Bachelor's Degree)

Specific Admission Requirements

High school diploma, placement through a nation-wide Student Selection Examination.

Specific Arrangements for Recognition of Prior Learning (Formal, Non-Formal and Informal)

Transfer Students:
The transfer student candidates from Turkish or foreign universities are subject to the YOK Legislation "The transfer, double degree, minor degree and inter-institutional credit transfer" and to the evaluation conditions determined by Dokuz Eylul University Senate.
The transfer quotas are determined and announced by Turkish Higher Education Council (YOK). The evaluation of the candidates are done by the school evaluation commmisin and approved by the management

The Graduate Transfers:
The short cycle graduates are given the right to be admitted to the first cycle programs if they comply with the conditions set by the "The transfer of Short Cycle Program Graduates to First Cycle Programs" Legilation of Turkish Higher Education Council (YOK)
The universities inform YOK regarding the quotas and YOK announces the quotas and conditions in "Graduate Transfer Guide" and the placements are managed by YOK due to the results of nationwide graduate transfer exam.

According to the Regulations of Dokuz Eylül University for Graduate Schools, students are not connected to the right for internal transfer, previously taken courses at another graduate programme by another university with a successful grade may be
recognized by the related programmes after the letter of the students includes course contents and the transcript, and by the recommendation of the head of the departments and by the decision of the Board of Directors. The courses taken by the outgoing
Exchange students have the recognition at the school either as compulsory or elective.

Qualification Requirements and Regulations

4 years (excluding one year of English Preparatory School), 2 semesters per year, 16 weeks per semester, 240 ECTS in total.

Profile of the Programme

The aim of this program is to provide a solid background both in pure and applied mathematics together with a wide range of elective courses, to enhance the ability to think analytically and to construct logical solutions.

Key Learning Outcomes

1   To be able to use theoretical and applied knowledge acquired in the fields of mathematics.
2   To be able to transfer the knowledge obtained in the area of mathematics to secondary education
3   To gain ability to solve problems, to reason, to make connections and to generalize.
4   In the areas where mathematics is used, to be able to reach the knowledge, to gain the ability to make necessary references search.
5   To gain the ability to keep oneself up-to-date with the latest developments in Science and Technology
6   To conduct a study in mathematics and in related areas individually or as a group, and to be effective in the deriving conclusion process.
7   To be able to criticize and renew his/her own models.
8   To be able to explain theoretical and technical knowledge of oneself both in a detailed manner to experts and in a clear manner to non-experts
9   To be able to use English actively at the General Level B1 of the European Language Portfolio, to be able to communicate easily with colleagues from our country or abroad, to be able to follow the periodicals
10   To be familiar with the software that is commonly used in the area of mathematics and to use at least one program actively.
11   To be able to act in accordance with the social, scientific and ethic values in every stage of the projects included in
12   To be able to relate abstract concepts in mathematics to concrete situations by scientific methods, to examine and interpret the conclusions
13   To be able to use and apply the knowledge and skills gained in mathematics in various disciplines

Occupational Profiles of Graduates with Examples

This degree enables the holder to exercise the profession in the public or private sector.

Access to Further Studies

May apply to second cycle programmes.

Course Structure Diagram with Credits

8Third year students must take and succeed two free elective courses in a year from the common elective courses (English or Turkish) of the faculty or university. Fourth year students must take and succeed two free elective courses in a year from the common elective courses (English or Turkish) of the faculty or university. The language of instruction is English. Head of the department, if necessary, decides to open each course of each semester (Fall-Spring) for 1st, 2nd, 3rd and 4th years. Third year students must take two elective courses in the 6th semester. Fourth year students must take three elective courses besides the must course Grduation Project in the 7th semester and must take four elective courses in the 8th semester.
T: Theoretical P: Practice L: Laboratory
B: Spring Semester G: Fall Semester H: Full Year
1 .Semester:
Semester No Course Unit Code Course Unit Title Course Unit Type T P L ECTS
G 1 ATA 1001 PRINCIPLES OF ATATURK AND HISTORY OF THE TURKISH REVOLUTION I REQUIRED 2 0 0 2
G 2 KPD 1001 CAREER PLANNING REQUIRED 1 0 0 2
G 3 MAT 1015 TECHNICAL ENGLISH I REQUIRED 3 0 0 3
G 4 MAT 1031 CALCULUS I REQUIRED 4 2 0 9
G 5 MAT 1033 FUNDAMENTALS OF MATHEMATICS I REQUIRED 4 0 0 7
G 6 MAT 1035 ANALYTIC GEOMETRY REQUIRED 4 0 0 7
G 0 - ELECTIVE COURSE ELECTIVE - - - 0
TOTAL:   30
 
2. Semester:
Semester No Course Unit Code Course Unit Title Course Unit Type T P L ECTS
B 1 ATA 1002 PRINCIPLES OF ATATURK AND HISTORY OF THE TURKISH REVOLUTION II REQUIRED 2 0 0 2
B 2 MAT 1012 TECHNICAL ENGLISH II REQUIRED 3 0 0 4
B 3 MAT 1032 CALCULUS II REQUIRED 4 2 0 9
B 4 MAT 1034 BASIC ALGEBRAIC STRUCTURES REQUIRED 4 0 0 7
B 5 PHY 1101 PRINCIPLES OF PHYSICS REQUIRED 4 0 0 6
B 0 - ELECTIVE COURSE ELECTIVE - - - 2
TOTAL:   30
 
2 .Semester: Elective Course
Semester No Course Unit Code Course Unit Title Course Unit Type T P L ECTS
B 1 BDE 1003 PHYSICAL EDUCATION ELECTIVE 2 0 0 2
B 2 GSH 1003 FOLK DANCING ELECTIVE 2 0 0 2
B 3 GSM 1003 MUSIC ELECTIVE 2 0 0 2
B 4 GSR 1003 PAINTING ELECTIVE 2 0 0 2
 
3 .Semester:
Semester No Course Unit Code Course Unit Title Course Unit Type T P L ECTS
G 1 CSC 2201 ALGORITHMS AND PROGRAMMING REQUIRED 2 2 0 5
G 2 MAT 2037 LINEAR ALGEBRA I REQUIRED 4 0 0 7
G 3 MAT 2039 DIFERENTIAL EQUATIONS I REQUIRED 4 0 0 7
G 4 MAT 2043 ANALYSIS I REQUIRED 4 2 0 9
G 5 TDL 1001 TURKISH LANGUAGE I REQUIRED 2 0 0 2
G 0 - ELECTIVE COURSE ELECTIVE - - - 0
TOTAL:   30
 
4. Semester:
Semester No Course Unit Code Course Unit Title Course Unit Type T P L ECTS
B 1 MAT 2038 LINEAR ALGEBRA II REQUIRED 4 0 0 7
B 2 MAT 2040 DIFERENTIAL EQUATIONS II REQUIRED 4 0 0 7
B 3 MAT 2042 COMPUTER ALGEBRA SYSTEMS REQUIRED 2 2 0 5
B 4 MAT 2044 ANALYSIS II REQUIRED 4 2 0 9
B 5 TDL 1002 TURKISH LANGUAGE II REQUIRED 2 0 0 2
B 0 - ELECTIVE COURSE ELECTIVE - - - 0
TOTAL:   30
 
5 .Semester:
Semester No Course Unit Code Course Unit Title Course Unit Type T P L ECTS
G 1 MAT 3049 INTRODUCTION TO TOPOLOGY REQUIRED 4 0 0 7
G 2 MAT 3051 DIFERENTIAL GEOMETRY REQUIRED 4 0 0 7
G 3 MAT 3055 ALGEBRA I REQUIRED 4 0 0 7
G 4 MAT 3059 NUMERICAL ANALYSIS I REQUIRED 4 0 0 7
G 0 - ELECTIVE COURSE ELECTIVE - - - 2
TOTAL:   30
 
6. Semester:
Semester No Course Unit Code Course Unit Title Course Unit Type T P L ECTS
B 1 FSH 0002 PROFESSIONAL VALUES AND ETHICS REQUIRED 2 0 0 2
B 2 MAT 3054 COMPLEX CALCULUS REQUIRED 4 0 0 6
B 3 MAT 3056 PARTIAL DIFERENTIAL EQUATIONS REQUIRED 4 0 0 6
B 0 - ELECTIVE COURSE ELECTIVE - - - 16
TOTAL:   30
 
6 .Semester: Elective Course
Semester No Course Unit Code Course Unit Title Course Unit Type T P L ECTS
B 1 CSC 3202 OBJECT ORIENTED PROGRAMMING ELECTIVE 4 0 0 7
B 2 MAT 3008 NUMERICAL ANALYSIS II ELECTIVE 4 0 0 7
B 3 MAT 3026 SPECIAL FUNCTIONS AND DIFERENTIAL EQNS. ELECTIVE 4 0 0 7
B 4 MAT 3042 ADVANCED DIFERENTIAL GEOMETRY ELECTIVE 4 0 0 7
B 5 MAT 3046 ALGEBRA II ELECTIVE 4 0 0 7
B 6 MAT 3053 REAL ANALYSIS I ELECTIVE 4 0 0 7
B 7 MAT 3058 PROBABILITY ELECTIVE 4 0 0 7
B 8 MAT 3060 DISCRETE AND COMBINATORIAL MATHEMATICS ELECTIVE 4 0 0 7
 
7 .Semester:
Semester No Course Unit Code Course Unit Title Course Unit Type T P L ECTS
G 1 MAT 4079 GRADUATION PROJECT REQUIRED 4 0 0 7
G 0 - ELECTIVE COURSE ELECTIVE - - - 23
TOTAL:   30
 
7 .Semester: Elective Course
Semester No Course Unit Code Course Unit Title Course Unit Type T P L ECTS
G 1 CSC 4201 VISUAL PROGRAMMING TECHNIQUES ELECTIVE 4 0 0 7
G 2 MAT 4011 NUMERICAL SOLU.OF ORDINA.DIFE.EQU. ELECTIVE 4 0 0 7
G 3 MAT 4013 APPLIED MATHEMATICS I ELECTIVE 4 0 0 7
G 4 MAT 4019 ASYMPTOTIC ANALYSIS ELECTIVE 4 0 0 7
G 5 MAT 4029 THEORY OF MANIFOLDS ELECTIVE 4 0 0 7
G 6 MAT 4031 GENERAL TOPOLOGY ELECTIVE 4 0 0 7
G 7 MAT 4033 NONLINEAR DIFERENTIAL EQUATIONS AND DYNMC. SYST. ELECTIVE 4 0 0 7
G 8 MAT 4035 MATH. METHODS IN COMP. AIDED GEOM. DESIGN ELECTIVE 4 0 0 7
G 9 MAT 4043 ELEMENTARY ALGEBRAIC GEOMETRY ELECTIVE 4 0 0 7
G 10 MAT 4045 GALOIS THEORY ELECTIVE 4 0 0 7
G 11 MAT 4047 APPLIED OPTIMIZATION ELECTIVE 4 0 0 7
G 12 MAT 4049 ELEMENTARY ALGEBRAIC TOPOLOGY ELECTIVE 4 0 0 7
G 13 MAT 4051 GRAPH THEORY ELECTIVE 4 0 0 7
G 14 MAT 4053 ALGEBRAIC NUMBER THEORY ELECTIVE 4 0 0 7
G 15 MAT 4057 LIFE INSURANCE MATHEMATICS ELECTIVE 4 0 0 7
G 16 MAT 4059 INTRODUCTION TO FUNCTIONAL ANALYSIS ELECTIVE 4 0 0 7
G 17 MAT 4065 COMPUTATIONAL COMMUTATIVE ALGEBRA I ELECTIVE 4 0 0 7
G 18 MAT 4067 COMMUTATIVE RING THEORY ELECTIVE 4 0 0 7
G 19 MAT 4069 ADVANCED MATHEMATICAL PROBLEM SOLVING TECHNIQUES FOR OLYMPIADS ELECTIVE 4 0 0 7
G 20 MAT 4071 COMPUTATIONAL MATHEMATICS I ELECTIVE 4 0 0 7
G 21 MAT 4073 GUIDED UNDERGRADUATE RESEARCH I ELECTIVE 4 0 0 7
G 22 MAT 4075 HISTORY OF MATHEMATICS ELECTIVE 4 0 0 7
G 23 MAT 4077 MATHEMATICS FOR MACHINE LEARNING I ELECTIVE 4 0 0 7
G 24 PHY 4165 INTERMADIATE CLASSICAL MECHANICS ELECTIVE 4 0 0 7
G 25 PHY 4166 INTRODUCTION TO QUANTUM MECHANICS ELECTIVE 4 0 0 7
G 26 STA 4201 STATISTICAL METHODS ELECTIVE 4 0 0 7
 
8. Semester:
Semester No Course Unit Code Course Unit Title Course Unit Type T P L ECTS
B 0 - ELECTIVE COURSE ELECTIVE - - - 30
TOTAL:   30
 
8 .Semester: Elective Course
Semester No Course Unit Code Course Unit Title Course Unit Type T P L ECTS
B 1 CSC 4202 COMPUTER PROGRAMMING FOR DATA MANAGEMENT ELECTIVE 4 0 0 7
B 2 MAT 4008 PERTURBATION TECHNIQUES ELECTIVE 4 0 0 7
B 3 MAT 4010 MODULES AND RINGS ELECTIVE 4 0 0 7
B 4 MAT 4012 ELEMENTARY TOPOLOGY AND GEOMETRY ELECTIVE 4 0 0 7
B 5 MAT 4014 APPLIED MATHEMATICS II ELECTIVE 4 0 0 7
B 6 MAT 4016 RIEMANNIAN GEOMETRY ELECTIVE 4 0 0 7
B 7 MAT 4024 NUMERICAL SOLUTION OF PARTIAL DIFEREN.EQUATIONS ELECTIVE 4 0 0 7
B 8 MAT 4030 DIFERENCE EQUATIONS ELECTIVE 4 0 0 7
B 9 MAT 4034 NONLINEAR PARTIAL DIFERANTIAL EQUATIONS ELECTIVE 4 0 0 7
B 10 MAT 4038 PRINCIPLES OF ECONOMICS ELECTIVE 4 0 0 7
B 11 MAT 4044 MATH. MODELING AND ITS PHILOSOPHY ELECTIVE 4 0 0 7
B 12 MAT 4046 MEASURE THEORY AND LEBESQUE INTEGRAL ELECTIVE 4 0 0 7
B 13 MAT 4054 FINANCIAL MATHEMATICS ELECTIVE 4 0 0 7
B 14 MAT 4058 TOPOLOGICAL VECTOR SPACES ELECTIVE 4 0 0 7
B 15 MAT 4060 INTRODUCTION TO MATHEMATICAL BIOLOGY ELECTIVE 4 0 0 7
B 16 MAT 4062 INRODUCTION TO REPRESENTATION THEORY ELECTIVE 4 0 0 7
B 17 MAT 4064 NUMBER THEORY ELECTIVE 4 0 0 7
B 18 MAT 4066 COMPUTATIONAL COMMUTATIVE ALGEBRA II ELECTIVE 4 0 0 7
B 19 MAT 4068 GEOMETRY ELECTIVE 4 0 0 7
B 20 MAT 4070 PROJECT ELECTIVE 2 4 0 7
B 21 MAT 4072 COMPUTATIONAL MATHEMATICS II ELECTIVE 4 0 0 7
B 22 MAT 4074 GUIDED UNDERGRADUATE RESEARCH II ELECTIVE 4 0 0 7
B 23 MAT 4076 MATHEMATICAL FUNDAMENTALS OF ROBOTICS ELECTIVE 4 0 0 7
B 24 MAT 4078 MATHEMATICS FOR MACHINE LEARNING II ELECTIVE 4 0 0 7
B 25 MAT 4080 MATHEMATICS AND TECHNOLOGY ELECTIVE 4 0 0 7
B 26 MAT 4082 CODING THEORY ELECTIVE 4 0 0 7
 
 
FLEXIBLE ELECTIVE COURSE ACCORDING TO ECTS
Semester No Course Unit Code Course Unit Title Course Unit Type T P L ECTS
H 1 GÇD 1000 VOLUNTEERISM STUDIES FACULTY ELECTIVE COURSE 1 2 0 4
H 1 FRM 0001 INTRODUCTION TO EDUCATION 3 0 0 4
H 2 FRM 0002 PRINCIPLES AND METHODS OF LEARNING 3 0 0 4
H 3 FRM 0003 CLASSROOM MANAGEMENT 2 0 0 3
H 4 FRM 0004 SPECIAL TEACHING METHODS 3 0 0 4
H 5 FRM 0005 GUIDANCE AND SPECIAL EDUCATION 3 0 0 4
H 6 FRM 0006 MEASUREMENT AND EVALUATION IN EDUCATION 3 0 0 4
H 7 FRM 0007 EDUCATIONAL PSYCHOLOGY 3 0 0 4
H 8 FRM 0008 INSTRUCTIONAL TECHNOLOGIES 2 0 0 3
H 9 FRM 0009 PRACTICE IN TEACHING 1 8 0 10
H 10 FSH 0058 INTERNSHIP FACULTY ELECTIVE COURSE 0 0 0 5
H 11 MTH 0001 BLOCKCHAIN TECHNOLOGY AND ITS APPLICATIONS FACULTY ELECTIVE COURSE 2 0 0 2
H 12 MTH 0002 INSTRUMENTAL ANALYSIS-CHROMATOGRAPHY FACULTY ELECTIVE COURSE 2 0 0 2
H 13 MTH 0003 HYDROGEN FUEL CELL TECHNOLOGY FACULTY ELECTIVE COURSE 2 0 0 2
H 14 MTH 0004 MEDICAL POLYMERS FACULTY ELECTIVE COURSE 3 0 0 3
H 15 MTH 0005 PRODUCING OPEN SOFTWARE FACULTY ELECTIVE COURSE 2 0 0 2
H 16 MTH 0006 INTRODUCTION TO STATISTICS AND DATA SCIENCE FACULTY ELECTIVE COURSE 2 0 0 2
H 17 MTH 0007 BIG DATA TECHNOLOGIES FACULTY ELECTIVE COURSE 2 0 0 2
H 18 MTH 0008 MEDICAL METROLOGY AND ULTRASONIC APPLICATIONS FACULTY ELECTIVE COURSE 2 0 0 2
H 1 ERA 0001 SOFT COMPUTING TECHNIQUES ERASMUS 2 2 0 5
H 2 ERA 0002 SOFTWARE PROJECT MANAGEMENT ERASMUS 3 0 0 5
H 3 ERA 0003 BIOLOGICAL IMPACTS OF CLIMATE CHANGE ERASMUS 3 0 0 6
H 4 ERA 0004 HUMAN ANATOMY AND PHYSIOLOGY ERASMUS 2 0 0 6
H 5 ERA 0005 QUANTUM PHYSICS FOR EVERYONE ERASMUS 2 2 0 7
H 6 ERA 0006 DARK MATTER AND MYSTERIOUS OF THE UNIVERSE-I ERASMUS 2 2 0 7
H 7 ERA 0007 TIME SERIES MODELS ERASMUS 4 0 0 6
H 8 ERA 0008 ESTIMATION AND HYPOTHESIS TESTING ERASMUS 4 0 0 6
H 9 ERA 0009 DISCRETE MATHEMATICS AND ITS APPLICATIONS ERASMUS 3 0 0 5
H 10 ERA 0010 PROOF TECHNIQUES ERASMUS 2 0 0 2
H 11 ERA 0011 UNDERSTANDING LIFE WITH CODES AND THEIR READINGS ERASMUS 3 0 0 5
H 12 ERA 0012 MATERIAL CHEMISTRY ERASMUS 3 0 0 6
H 13 ERA 0013 NANOMATERIALS AND MEDICAL APPLICATIONS ERASMUS 3 0 0 6
H 14 ERA 0014 HISTORY OF MATHEMATICAL THOUGHT ERASMUS 2 0 0 2
H 15 ERA 0015 INTRODUCTION TO MOBILE PROGRAMMING ERASMUS 2 2 0 5
H 16 FSH 0001 COMMUNICATION SKILLS FACULTY ELECTIVE COURSE 2 0 0 2
H 17 FSH 0004 PHILOSOPHY OF SCIENCE FACULTY ELECTIVE COURSE 2 0 0 2
H 18 FSH 0006 HISTORY OF SCIENCE FACULTY ELECTIVE COURSE 2 0 0 2
H 19 FSH 0007 SOLUTION OF INTERPERSONAL CONFLICTS FACULTY ELECTIVE COURSE 2 0 0 2
H 20 FSH 0008 SCIENCE IN DAILY LIFE FACULTY ELECTIVE COURSE 2 0 0 2
H 21 FSH 0011 CREATIVITY, RD, Ä°NNOVATION FACULTY ELECTIVE COURSE 2 0 0 2
H 22 FSH 0012 FUTURE PLANNING AND STRATEGY FACULTY ELECTIVE COURSE 2 0 0 2
H 23 FSH 0013 YOUTH ENTREPRENEURSHIP FACULTY ELECTIVE COURSE 2 0 0 2
H 24 FSH 0015 GLOBALIZATION AND THE NEW WORLD ORDER FACULTY ELECTIVE COURSE 2 0 0 2
H 25 FSH 0020 MANAGEMENT FACULTY ELECTIVE COURSE 2 0 0 2
H 26 FSH 0021 ECONOMICS FACULTY ELECTIVE COURSE 2 0 0 2
H 27 FSH 0022 ACCOUNTING FACULTY ELECTIVE COURSE 2 0 0 2
H 28 FSH 0023 MARKETING FACULTY ELECTIVE COURSE 2 0 0 2
H 29 FSH 0024 BASIC LAW FACULTY ELECTIVE COURSE 2 0 0 2
H 30 FSH 0025 MONEY AND BANKING FACULTY ELECTIVE COURSE 2 0 0 2
H 31 FSH 0026 TOTAL QUALITY AND ACCREDITATION FACULTY ELECTIVE COURSE 2 0 0 2
H 32 FSH 0028 FLOWERING PLANTS, NATURE'S HEALING HANDS FACULTY ELECTIVE COURSE 2 0 0 2
H 33 FSH 0029 BASIC BANKING AND INFORMATION TECHNOLOGIES FACULTY ELECTIVE COURSE 2 0 0 2
H 34 FSH 0031 TRANSLATION FACULTY ELECTIVE COURSE 2 0 0 2
H 35 FSH 0032 TEXT ANALYSIS FACULTY ELECTIVE COURSE 2 0 0 2
H 36 FSH 0033 SEMANTICS FACULTY ELECTIVE COURSE 2 0 0 2
H 37 FSH 0034 TERMINOLOGY AND TERMINOGRAPHY FACULTY ELECTIVE COURSE 2 0 0 2
H 38 FSH 0035 FINANCIAL ECONOMICS FACULTY ELECTIVE COURSE 2 0 0 2
H 39 FSH 0036 ECONOMIC GLOBALIZATION FACULTY ELECTIVE COURSE 2 0 0 2
H 40 FSH 0040 CHEMISTRY AND ART FACULTY ELECTIVE COURSE 2 0 0 2
H 41 FSH 0041 QUANTUM ERA FACULTY ELECTIVE COURSE 2 0 0 2
H 42 FSH 0042 BASIC STATISTICS FACULTY ELECTIVE COURSE 2 0 0 2
H 43 FSH 0043 REFLECTIONS ON MODERNLIFE FACULTY ELECTIVE COURSE 2 0 0 2
H 44 FSH 0044 SCIENTIFIC WRITING WITH LATEX FACULTY ELECTIVE COURSE 2 0 0 2
H 45 FSH 0045 INTRODUCTION TO PROGRAMMING WITH PYTHON FACULTY ELECTIVE COURSE 2 0 0 2
H 46 FSH 0046 ZOOGEOGRAPHY FACULTY ELECTIVE COURSE 2 0 0 2
H 47 FSH 0047 CREATING REPORTS AND PRESENTATIONS BY OFFICE PROGRAMS FACULTY ELECTIVE COURSE 2 0 0 2
H 48 FSH 0048 EXCEL FOR BUSINESS WORLD FACULTY ELECTIVE COURSE 2 0 0 2
H 49 FSH 0049 BIOLOGICAL IMPACTS OF CLIMATE CHANGE FACULTY ELECTIVE COURSE 2 0 0 2
H 50 FSH 0050 PIONEERS OF SCIENCE FACULTY ELECTIVE COURSE 3 0 0 5
H 51 FSH 0051 HEALTH KNOWLEDGE AND FIRST AID FACULTY ELECTIVE COURSE 2 0 0 4
H 52 FSH 0052 REPTILE AND AMPHIBIAN DIVERSITY OF TüRKIYE FACULTY ELECTIVE COURSE 2 0 0 4
H 53 FSH 0053 PROJECT PROPOSAL PREPARATION FACULTY ELECTIVE COURSE 2 0 0 2
H 54 FSH 0054 DATA PREPROCESSING FACULTY ELECTIVE COURSE 2 0 0 2
H 55 FSH 0055 MEDICAL IMAGING SYSTEMS FACULTY ELECTIVE COURSE 2 0 0 2
H 56 FSH 0056 ENVIRONMENTAL RADIOACTIVITY FACULTY ELECTIVE COURSE 2 0 0 2
H 57 FSH 0057 ARTIFICIAL INTELLIGENCE WITH APPLICATIONS FACULTY ELECTIVE COURSE 0 2 0 2
H 58 Ä°HD 1001 HUMAN RIGHTS FACULTY ELECTIVE COURSE 2 0 0 4
 

Examination Regulations, Assessment and Grading

The relevant articles of Education and Examination Regulation of Dokuz Eylül University and Education and Examination Implementation Principles of the Faculty of Science are applicable for exams and course success grades. The course evaluation criteria are defined for each course by the instructor(s) of the corresponding course and are given in the Course Description Form found in the information package.

Graduation Requirements

The students must complete 4 years of study acquiring 240 ECTS credits. This degree is awarded to students who have successfully completed all courses in the curriculum and have a minimum Cumulative Grade Point Average (CGPA) of 2.00 / 4.00 and no failing grades.

Mode of Study (Full-Time, Part-Time, E-Learning )

Full-time

Programme Director or Equivalent

Prof.Dr. BaÅŸak Karpuz
Phone: 0 (232) 301 85 76, 85 08
e-mail: basak.karpuz@deu.edu.tr