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 Arts And Sciences - Mathematics - Mathematics



General Description
History
Igdir rectorate of the University, the Faculty of Arts and Sciences and the main branches of science in the opening section in the proposal dated 16.06.2011 in higher education executive meeting examined and amended by Law No. 2880 of 2547 7/d-2 law. In accordance with article Department of Mathematics at the Faculty of Arts and Sciences is eligible to be opened.
Qualification Awarded
Students who successively complete the program will be awarded with a bachelor’s degree in the field of MATHEMATICS.
Level of Qualification (Short Cycle , First Cycle , Second Cycle, Third Cycle)
First Cycle
Specific Admission Requirements
1. Having a high school (or equivalent) diploma 2. Getting sufficient points from the higher education institutions examination (YKS).
Specific Arrangements For Recognition Of Prior Learning (Formal, Non-Formal and Informal)
The recognition of prior learning process is still at an early stage in the institutions of higher education in Turkey. Therefore, the recognition of prior learning is not literally initiated in all programs of Igdir University.
Qualification Requirements and Regulations
In order to obtain a bachelor degree in Mathematics (or to assume the title of mathematician ), students must satisfy the following conditions; All courses must be passed with at least a letter grade of DC. and Cumulative grade point average must be at least 2.00 on the scale of 4.00.
Profile of The Programme
Our department has 9 academic staff consisting of 2 professor, 5 academic members, 1 lecturer and 1 research assistant. The department provides education and training, and research in the fields Calculus, Algebra, Geometry, Topology and Applied Mathematics as they are all considered the key areas of mathematics. Besides, the department synchronously undertakes the task of carrying out other departments’ undergraduate courses in mathematics. Our vision is to train and support staff who have a voice in Mathematics both in national and international level, who perform works and studies contributing to science and technology with their research in pure and applied mathematics, who continue self-improving, and who have appropriate social leadership skills.
Occupational Profiles of Graduates With Examples
Students who graduate from the Department of Mathematics and complete Pedagogical Formation Education find the opportunity to work as a teacher in public or private secondary education institutions and also they can work as a computer operator, a researcher and a planner in various public and private enterprises. Successful graduates may have a chance of working as a Research Assistant in Universities and have the opportunity to study graduate education in abroad.
Access to Further Studies
Candidates who successfully complete undergraduate program, and satisfy the conditions of getting a valid mark from the academic personnel and postgraduate education entrance exam and having enough knowledge of English language can apply for graduate programs (master and doctoral degree).
Examination Regulations, Assessment and Grading
Students are subjected to take at least a midterm exam and a final exam for all courses. The contribution of the midterm exam and the final exam to Final grade is 40% and 60%, respectively. All exams are graded out of 100 points. Students are required to score at least 50 from final exam. Grades are expressed with 4 point grading system. Students who get any of the letter grades of AA, BA, BB, CB, and CC are deemed to be successful for that course. A student having the letter grade of DC will be considered as successful for related course if his/her average grade of the relevant term (corresponding GPA) is 2.00 or more.
Graduation Requirements
To obtain 240 ECTS credits that are available in the program and to complete all the courses successfully, a weighted grade point average of at least 2.0 over 4.00 is necessary to have.
Mode of Study (Full-Time, Part-Time, E-Learning )
Full-Time
Address, Programme Director or Equivalent
Igdir University, The Faculty of Science and Literature, The Department of Mathematics, Şehit Bülent Yurtseven Campus Postal Code: 76000 City: IGDIR, Head of Department: Prof. Dr. Elman HAZAR
Facilities
As of the 2018-2019 academic year, our department has 5 academic staff consisting of 2 professor, 5 academic members, 1 lecturer and 1 research assistant. Students who meet the requirements can join a double major or minor program with Civil Engineering, Mechanical Engineering or Electrical and Electronic Engineering.

Key Learning Outcomes
1 To be able to comprehend the basic Mathematics subjects in a good way and to understand new information.
2To be able to evaluate the fundamental notions, theories and data in Mathematics with scientific methods and to analyze the encountered problems, to exchange of ideas and to improve suggestions based on proofs and inquiries.
3To be able to analyze current Mathematics problems with different aspects and to produce solutions.
4To be able to have the competency of executing the studies of undergraduate subjects of Mathematics independently or with shareholders.
5 To be able to use the abstract thinking.
6To be able to follow the improvements in the Mathematics and to collaborate with his/her colleagues.
7To have a personality that is respectful for professional and academic ethics values.
8To be able to select and use computer and information technology tools and techniques at satisfactory level required for her/his area.
9To be able to apply the Mathematical knowledge to different disciplines.
10To be able to continue lifelong learning by renewing the knowledge, the abilities and the competencies which have been developed during the program, and being conscious about lifelong learning.

TYYÇ - Programme Outcomes - Base Scope Relationship
TYYÇProgramme OutcomesBase Scope
1223333333
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 170300401103 ABSTRACT MATH. I Compulsory 4 0 0 5
2 210300401102 ABSTRACT MATHEMATICS-I Compulsory 4 0 0 0
3 170300401101 ANALYSIS I Compulsory 4 1 0 7
4 210300401100 ANALYSIS-I Compulsory 4 2 0 0
5 170300401102 ANALYTIC GEOMETRY I Compulsory 4 0 0 6
6 210300401101 ANALYTICAL GEOMETRY-I Compulsory 4 0 0 0
7 9900000106 ATATÜRK PRINCIPLES AND REVOLUTION HISTORY - I Compulsory 2 0 0 2
8 9900000106 ATATÜRK PRINCIPLES AND REVOLUTION HISTORY - I Compulsory 2 0 0 2
9 210300401104 BASIC INFORMATION TECHNOLOGIES-I Compulsory 2 0 0 2
10 9900001157 CAREER PLANNING Compulsory 1 0 0 0
11 210300401105 CAREER PLANNING Compulsory 1 0 0 0
12 9900000114 FOREIGN LANGUAGE - I Compulsory 2 0 0 2
13 9900000114 FOREIGN LANGUAGE - I Compulsory 2 0 0 0
14 170300401105 MATHEMATICS HISTORY I Compulsory 3 0 0 3
15 170300401104 PHYSICS I Compulsory 3 0 0 3
16 210300401103 PHYSICS- I Compulsory 3 0 0 0
17 9900000113 TURKISH LANGUAGE - I Compulsory 2 0 0 2
18 9900000113 TURKISH LANGUAGE - I Compulsory 2 0 0 0
Total 49 3 0 34
 
2. Semester
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 170300401203 ABSTRACT MATH. II Compulsory 4 0 0 5
2 210300402102 ABSTRACT MATHEMATICS II Compulsory 4 0 0 0
3 210300402100 ANALYSIS - II Compulsory 4 2 0 0
4 170300401201 ANALYSIS II Compulsory 4 1 0 7
5 170300401202 ANALYTIC GEOMETRY II Compulsory 4 0 0 6
6 210300402101 ANALYTICAL GEOMETRY -II Compulsory 4 0 0 0
7 9900000206 ATATÜRK PRINCIPLES AND REVOLUTION HISTORY - II Compulsory 2 0 0 2
8 9900000206 ATATÜRK PRINCIPLES AND REVOLUTION HISTORY - II Compulsory 2 0 0 0
9 210300402104 BASIC INFORMATION TECHNOLOGIES-II Compulsory 2 0 0 0
10 180300002100 DIGITAL LITERACY Compulsory 3 0 0 3
11 210300402105 DIGITAL LITERACY Compulsory 3 0 0 0
12 9900000214 FOREIGN LANGUAGE - II Compulsory 2 0 0 2
13 9900000214 FOREIGN LANGUAGE - II Compulsory 2 0 0 0
14 170300401205 MATHEMATICS HISTORY II Compulsory 3 0 0 3
15 170300401204 PHYSICS II Compulsory 3 0 0 3
16 210300402103 PHYS-II Compulsory 3 0 0 0
17 9900000213 TURKISH LANGUAGE - II Compulsory 2 0 0 2
18 9900000213 TURKISH LANGUAGE - II Compulsory 2 0 0 0
Total 53 3 0 33
 
3. Semester
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 210300403100 Compulsory 4 2 0 0
2 210300403101 Compulsory 4 1 0 0
3 210300403102 Compulsory 4 0 0 0
4 210300403103 Compulsory 4 0 0 0
5 210300403104 Compulsory 2 1 0 0
6 2103004031000 Elective - - - 0
7 170300401301 ANALYSIS III Compulsory 4 1 0 7
8 170300401305 BASIC INFORMATION TECHNOLOGIES I Compulsory 2 0 0 3
9 170300401302 LINEAR ALGEBRA I Compulsory 4 0 0 5
10 170300401303 ORD. DIF. EQUATIONS I Compulsory 4 0 0 5
11 170300401306 PROBABILITY and STATISTICS I Compulsory 4 0 0 5
12 170300401304 TOPOLOGY I Compulsory 4 0 0 5
Total 40 5 0 30
 
4. Semester
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 210300404100 ANALYSIS - IV Compulsory 4 2 0 0
2 170300401401 ANALYSIS IV Compulsory 4 1 0 7
3 170300401405 BASIC INFORMATION TECHNOLOGIES II Compulsory 2 0 0 3
4 210300404104 COMPUTER PROGRAMMING - II Compulsory 2 1 0 0
5 210300404102 DIFFERENTIAL EQUATIONS - II Compulsory 4 0 0 0
6 2103004041000 ELECTİVE COURSE Elective - - - 0
7 210300404101 LINEAR ALGEBRA - II Compulsory 4 1 0 0
8 170300401402 LINEAR ALGEBRA II Compulsory 4 0 0 5
9 170300401403 ORD. DIF. EQUATIONS II Compulsory 4 0 0 5
10 210300404103 PROBABILITY AND STATISTICS - II Compulsory 4 0 0 0
11 170300401406 PROBABILITY and STATISTICS II Compulsory 4 0 0 5
12 170300401404 TOPOLOGY II Compulsory 4 0 0 5
Total 40 5 0 30
 
5. Semester
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 210300405102 ABSTRACT ALGEBRA - I Compulsory 4 0 0 0
2 170300401504 ABSTRACT ALGEBRA I Compulsory 4 0 0 5
3 170300401503 COMPLEX FUNCTIONS THEORY I Compulsory 4 0 0 5
4 210300405101 COMPLEX FUNCTİONS THEORY - I Compulsory 4 0 0 0
5 170300401505 COMPUTER PROGRAMMING I Compulsory 2 1 0 5
6 210300405100 DIFFERENTIAL GEOMETRY - I Compulsory 4 0 0 0
7 170300401501 DIFFERENTIAL GEOMETRY I Compulsory 4 0 0 0
8 170300401500 ELECTIVE COURSE Elective - - - 0
9 2103004051000 ELECTİVE COURSE Elective - - - 0
10 2103004051001 ELECTİVE COURSE Elective - - - 0
11 170300401502 PARTIAL DIFFERENTIAL EQUATIONS I Compulsory 4 0 0 0
12 210300405103 TOPOLOGY - I Compulsory 4 0 0 0
Total 34 1 0 15
 
6. Semester
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 210300406102 ABSTRACT ALGEBRA - II Compulsory 4 0 0 0
2 170300401604 ABSTRACT ALGEBRA II Compulsory 4 0 0 5
3 170300401603 COMPLEX FUNCTIONS THEORY II Compulsory 4 0 0 5
4 210300406101 COMPLEX FUNCTİONS THEORY - II Compulsory 4 0 0 0
5 170300401605 COMPUTER PROGRAMMING II Compulsory 2 1 0 0
6 210300406100 DIFFERENTIAL GEOMETRY - II Compulsory 4 0 0 0
7 170300401601 DIFFERENTIAL GEOMETRY II Compulsory 4 0 0 0
8 170300401600 ELECTIVE COURSE Elective - - - 0
9 2103004061000 ELECTİVE COURSE Elective - - - 0
10 2103004061001 ELECTİVE COURSE Elective - - - 0
11 170300401602 INTRODUCTION TO NUMERICAL ANALYSIS Compulsory 4 0 0 5
12 210300406103 TOPOLOGY - II Compulsory 4 0 0 0
Total 34 1 0 15
 
7. Semester
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 170300401700 ELECTIVE COURSE Elective - - - 0
2 210300407101 NUMBER THEORY - I Compulsory 4 0 0 0
3 170300401703 NUMBER THEORY I Compulsory 4 0 0 6
4 170300401701 REAL ANALYSIS Compulsory 4 0 0 0
5 210300407100 REAL ANALYSIS Compulsory 4 0 0 0
Total 16 0 0 6
 
8. Semester
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 170300401800 ELECTIVE COURSE Elective - - - 0
2 170300401801 FUNCTIONAL ANALYSIS Compulsory 4 0 0 0
3 170300401803 NUMBER THEORY II Compulsory 4 0 0 6
Total 8 0 0 6
 
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 210300403105 KÜME TEORİSİ Elective 3 0 0 0
2 210300403106 MATEMATİK VE BİLİM FELSEFESİ Elective 3 0 0 0
ELECTİVE COURSE
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 210300404105 PROFESSIONAL FOREIGN LANGUAGE Elective 3 0 0 0
2 210300404106 INTRODUCTION TO GRAPH THEORY Elective 3 0 0 0
ELECTIVE COURSE
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 170300401506 PROFESSIONAL FOREIGN LANGUAGE I Elective 3 0 0 0
2 170300401507 MATRIX THEORY I Elective 3 0 0 0
3 170300401508 FUNCTION SERIES AND SERIES Elective 3 0 0 0
4 170300401509 FRACTAL GEOMETRY Elective 3 0 0 0
5 170300401510 PROJECTIVE GEOMETRY Elective 3 0 0 0
6 190000000000 ACADEMIC TURKISH Elective 2 0 0 0
7 9900000148 BİLİMLERİN DİLİNDEN YARATILIŞ Elective 2 0 0 2
8 9900000149 SAĞLIKLI YAŞAM, MANEVİ BAKIM VE DEĞER Elective 2 0 0 0
ELECTİVE COURSE
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 210300405106 PARTIAL DIFFERENTIAL EQUATIONS - I Elective 4 0 0 0
ELECTİVE COURSE
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 210300405104 MATRIX THEORY - I Elective 3 0 0 0
2 210300405105 FUNCTION SEQUENCES AND SERIES Elective 3 0 0 0
3 210300405107 FRACTAL GEOMETRY Elective 3 0 0 0
4 210300405108 PROJECTIVE GEOMETRY Elective 3 0 0 0
ELECTIVE COURSE
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 170300401606 PROFESSIONAL FOREIGN LANGUAGE II Elective 3 0 0 0
2 170300401607 MATRIX THEORY II Elective 3 0 0 0
3 170300401608 LINEAR PROGRAMMING Elective 3 0 0 0
4 170300401609 NONLINEAR DYNAMIC SYSTEMS Elective 3 0 0 0
5 9900000000 INFORMATION TECHNOLOGIES ADDICTION Elective 2 0 0 0
6 9900001158 GÖNÜLLÜLÜK ÇALIŞMASI Elective 1 2 0 0
ELECTİVE COURSE
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 210300406106 PARTIAL DIFFERENTIAL EQUATIONS - II Elective 4 0 0 0
ELECTİVE COURSE
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 210300406104 MATRIX THEORY - II Elective 3 0 0 0
2 210300406105 LINEAR PROGRAMMING Elective 3 0 0 0
3 210300406107 TENSOR ANALYSIS Elective 3 0 0 0
ELECTIVE COURSE
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 170300401704 VARIABLE ALGEBRA I Elective 3 0 0 0
2 170300401705 VECTORAL ANALYSIS Elective 3 0 0 0
3 170300401706 NUMERICAL ANALYSIS Elective 3 0 0 6
4 170300401706 NUMERICAL ANALYSIS Elective 3 0 0 6
5 170300401707 TRANSFORMERS AND GEOMETRY Elective 3 0 0 0
6 170300401708 SURFACE THEORY I Elective 3 0 0 0
7 170300401709 IDEAL THEORY Elective 3 0 0 0
8 170300401710 KUATERNIONS THEORY Elective 3 0 0 0
9 170300401711 GEOMETRY OF LOWER GEOMETRY I Elective 3 0 0 0
10 170300401712 ADVANCED PROGRAMMING I Elective 3 0 0 0
11 170300401713 MEASUREMENT THEORY Elective 3 0 0 0
12 170300401715 GAME THEORY Elective 3 0 0 0
13 180300507124 ENTREPRENEURSHIP Elective 3 0 0 0
ELECTIVE COURSE
No Course Unit Code Course Unit Title Type of Course T P L ECTS
1 170300401802 PARTIAL DIFFERENTIAL EQUATIONS II Elective 3 0 0 0
2 170300401804 VARIABLE ALGEBRA II Elective 3 0 0 0
3 170300401805 MODULE THEORY Elective 3 0 0 0
4 170300401806 PROJECTIVE GEOMETRY Elective 3 0 0 0
5 170300401807 ALGEBRA GEOMETRY Elective 3 0 0 0
6 170300401808 THE SURFACE THEORY II Elective 3 0 0 0
7 170300401809 MOTION GEOMETRY Elective 3 0 0 0
8 170300401810 APPLIED MATHEMATICS Elective 3 0 0 6
9 170300401810 APPLIED MATHEMATICS Elective 3 0 0 6
10 170300401811 GEOMETRY OF LOWER GEOMETRY II Elective 3 0 0 0
11 170300401812 ADVANCED PROGRAMMING II Elective 3 0 0 0
12 170300401813 FINANCE MATHEMATICS Elective 3 0 0 0
 
Iğdır University, Iğdır / TURKEY • Tel (pbx): +90 476 226 13 14 • e-mail: info@igdir.edu.tr