Türkçe English Curriculum Key Learning Outcomes
Mathematics Education
General Description
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Brief History
Department of Mathematics Education offers bachelor’s degree since the academic years of 2008-2009. The department also offers masters and Ph.D. degrees. The department currently has two full professors, three assistant professors, and two teaching assistants.
The primary aim of the department is to prepare outstanding Mathematics teachers to be employed in both public and private schools under the Ministry of National Education. The graduates may work as teachers, teacher trainers or academicians.
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Qualification Awarded
The department offers 240 ECTS credits in the field of Mathematics Education degree. Graduates who successfully completed the program with established qualifications shall have a bachelor degree in Mathematics Education.
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Level of Qualification
First Cycle
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Specific Admission Requirements
Candidates must have high school diploma and an eligible score from the University Entrance Exam.
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Specific arrangements for the recognition of prior learning
The provisions in “Regulation on Transfer among Associate and Undergraduate Degree Programs, Double Major, and Subspecialty and the Principals of Credit Transfer among Institutions in Higher Education Institutions” are applied.
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Qualification Requirements and Regulations
To obtain bachelor´s degree in Mathematics Education program the students must successfully complete the required and elective courses (total 240 ECTS) and maintain the minimum cumulative GPA of 2.0/4.0.
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Profile of The Programme
The primary mission of the Department of Mathematics Education is to educate mathematics teachers with criticizing, thinking, having self-confidence. Furthermore, the department aims to prepare educators, scholars, and researchers who are advanced in their field of study, and are well skilled in the repertoire of research methods rooted in various paradigms, the effective uses of technology and the analysis, design, development, implementation and evaluation of instructional practices.
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Key Learning Outcomes & Classified & Comparative
1. Knows and loves the basic and applied concepts in the field of mathematics and able to disseminate them to his/her students
2. Prepares teaching environment, methods, materials, and activities that take into consideration of the needs of 11-15 age students
3. Well immersed himself/herself in the academic language of the field, and able to use it in both written and oral forms
4. Able to make plans for his/her teaching by applying theories of mathematics teaching
5. Able to grasp the systematic nature of mathematics, and understands differences and similarities among the topics in math
6. To produce able teachers who are well informed in techniques of research methods and use them effectively in fields of mathematics teaching
7. To understand mathematical concepts and generalizations, to grasp their connection to each other, and to be able to make proof analysis by using mathematical proof methods
8. Improves quality of mathematics teaching by using technology, and quality internet sources
9. To be able to adopt theories of classroom management ın emerging and challenging conditions
10. Communicates well verbally and in writing, speaks at least one foreign language, follows the international literature, and communicates with foreign colleagues
11. Designs and uses proper evaluation methods and tools which are developed to meet the aims of his/her teaching, and are geared towards performance based evaluation
12. Be aware of legal aspects of his/her job and has professional and ethical responsibility in the field
13. To identify all aspects of teaching profession and educational sciences and Turkish national education system and school management
14. To grasp the characteristics of students ' development and to grasp the use of different approaches to learning in the classroom
15. To have knowledge and skills to do lesson planning, to use different measuring techniques
16. To grasp the tasks of the teacher's guidance and the ways of how to recognize students
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Occupational Profiles of Graduates With Examples
Our graduates are employed as elementary school mathematics teachers and/or administrators in private or public schools. Additionally, the graduates who have been admitted to masters and Ph.D. programs in the field of Mathematics Education can get positions as a faculty member in the universities.
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Access to Further Studies
Upon successful completion of undergraduate degree, candidate can study in postgraduate program if s/he has eligible ALES exam score and has sufficient knowledge of a foreign language.
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Examination Regulations, Assessment and Grading
A variety of assessment methods such as mid-term(s), assignment(s), exercise(s), project(s), practice(s), and a final exam are implemented in the program. Assessment methods may include classical test(s), multiple-choice test(s), homework(s), performance evaluation(s), and product evaluation(s). In order to graduate from the program, cumulative GPA must be minimum 2.00. A course grade is constituted by evaluating the above stated elements and given by using letters. To succeed in a course, students must get at least 40 points from the final exam and have at least 50 points average. Students who get AA, AA, BA, BB, CB and CC are considered successful. DC and DD are notes that conditionally successful.
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Graduation Requirements
To complete the bachelor´s degree in Mathematics Education program the students must successfully complete the required and elective courses (total 240 ECTS) and maintain the minimum cumulative GPA of 2,0/4,0.
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Mode of Study
Full-Time
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Address and Contact Details
Anabilim Dalı Başkanı
Prof. Dr. Rıdvan Ezentaş
Telefon: +90 (224) 294 2287
rezentas@uludag.edu.tr
Bologna Koordinatörü
Doç.Dr.Menekşe Seden TAPAN BROUTIN
Telefon:+90 224 2955021
Belgegeçer: +90 224 294 21 99
tapan@uludag.edu.tr
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Facilities
Educational activities are carried out in well-equipped classrooms and in the computer laboratories. We have two smart board classrooms for use of mathematics education faculty.
The University’s Central library as well as the school of education’s own library is open to both students and faculty members’ use.
1. Semester
Course Code Course Title Type of Course T1 U2 L3 ECTS
GKZ0003 DIGITAL TECHNOLOGIES IN MATHEMATICS EDUCATION Compulsory 3 0 0 5
GKZ0005 HISTORY OF MATHEMATICS Compulsory 2 0 0 3
İMÖ1007 CAREER PLANNING Compulsory 1 0 0 1
İMÖ1009 FUNDAMENTALS OF MATHEMATICS Compulsory 3 0 0 5
İMÖ1011 ANALYSIS 1 Compulsory 4 0 0 8
MBZ0001 INTRODUCTION TO EDUCATION Compulsory 2 0 0 3
ATA101 ATATURK'S PRINCIPALS AND HISTORY OF REVOLUTIONS I Compulsory 2 0 0 2
TUD101 TURKISH LANGUAGE I Compulsory 2 0 0 2
YAD101 FOREIGN LANGUAGE I Compulsory 2 0 0 2
Total 31
2. Semester
Course Code Course Title Type of Course T1 U2 L3 ECTS
İMÖ1008 EUCLIDIAN GEOMETRY Compulsory 3 0 0 5
İMÖ1010 ANALYSIS II Compulsory 4 0 0 6
İMÖ1012 ABSTRACT MATHEMATICS Compulsory 3 0 0 5
İMÖ1014 PROBLEM SOLVING IN MATHEMATICS EDUCATION Compulsory 2 0 0 5
MBZ0004 PSYCHOLOGY OF EDUCATION Compulsory 2 0 0 3
ATA102 ATATURK'S PRINCIPLES AND HISTORY OF REVOLUTIONS II Compulsory 2 0 0 2
TUD102 TURKISH LANGUAGE II Compulsory 2 0 0 2
YAD102 FOREIGN LANGUAGE II Compulsory 2 0 0 2
Total 30
3. Semester
Course Code Course Title Type of Course T1 U2 L3 ECTS
İMÖ2003 LINEAR ALGEBRA I Compulsory 2 0 0 3
İMÖ2009 METHODS OF SPECIAL TEACHING Compulsory 2 0 0 3
İMÖ2011 ANALYTICAL GEOMETRY Compulsory 2 0 0 2
İMÖ2013 ANALYSIS III Compulsory 4 0 0 4
MBZ0007 TEACHING TECHNOLOGIES Compulsory 2 0 0 3
MBZ0008 PRINCIPLES AND METHODS OF INSTRUCTION Compulsory 2 0 0 3
Click to choose optional courses. 12
Total 30
4. Semester
Course Code Course Title Type of Course T1 U2 L3 ECTS
GKZ0004 COMMUNITY SERVICES Compulsory 2 0 0 3
İMÖ2002 SECONDARY SCHOOL MATHEMATICS TEACHING PROGRAMS Compulsory 2 0 0 3
İMÖ2004 LINEAR ALGEBRA II Compulsory 2 0 0 2
İMÖ2008 PROBABILITY Compulsory 2 0 0 3
İMÖ2010 TECHNOLOGY SUPPORTED MATHEMATICS EDUCATION Compulsory 3 0 0 5
MBZ0005 HISTORY OF TURKISH EDUCATION Compulsory 2 0 0 3
MBZ0006 RESEARCH METHODS IN EDUCATION Compulsory 2 0 0 3
Total 22
5. Semester
Course Code Course Title Type of Course T1 U2 L3 ECTS
İMÖ3001 TEACHING OF NUMBERS Compulsory 3 0 0 5
İMÖ3007 ALGEBRA Compulsory 2 0 0 2
İMÖ3009 TEACHING OF GEOMETRY AND MEASUREMENT Compulsory 3 0 0 5
İMÖ3011 STATISTICS Compulsory 2 0 0 3
MBZ0012 CLASSROOM MANAGEMENT Compulsory 2 0 0 3
Total 18
6. Semester
Course Code Course Title Type of Course T1 U2 L3 ECTS
İMÖ3004 TEACHING OF PROBABILITY AND STATISTICS Compulsory 3 0 0 4
İMÖ3006 THE ATTRIBUTION IN MATHEMATICS TEACHING Compulsory 3 0 0 4
İMÖ3008 TEACHING OF ALGEBRA Compulsory 3 0 0 4
MBZ0009 TURKISH EDUCATIONAL SYSTEM AND SCHOOL MANAGEMENT Compulsory 2 0 0 3
MBZ0010 MEASUREMENT AND EVALUATION IN EDUCATION Compulsory 2 0 0 3
Total 18
7. Semester
Course Code Course Title Type of Course T1 U2 L3 ECTS
İMÖ4003 MISCONCEPTIONS IN MATHEMATICS TEACHING Compulsory 2 0 0 3
İMÖ4007 MATERIAL DESIGN AND USE IN MATHEMATICS TEACHING Compulsory 3 0 0 3
MBİMÖ01 TEACHING PRACTICE I Compulsory 2 6 0 10
MBZ0013 GUIDANCE IN SCHOOLS Compulsory 2 0 0 3
MBZ0014 SPECIAL EDUCATION AND INCLUSION Compulsory 2 0 0 3
Total 22
8. Semester
Course Code Course Title Type of Course T1 U2 L3 ECTS
GKZ0006 MATHEMATICAL PHILOSOPHY Compulsory 2 0 0 3
İMÖ4004 MODELING IN MATHEMATICS TEACHING Compulsory 2 0 0 4
İMÖ4008 DIFFERENTIAL EQUATIONS Compulsory 3 0 0 3
MBİMÖ02 TEACHING PRACTICE II Compulsory 2 6 0 12
Total 22
3. Semester Optional Courses
Course Code Course Title Type of Course T1 U2 L3 ECTS
GKS0010 CULTURE AND LANGUAGE Optional 2 0 0 4
MBS0002 CHILD PSYCHOLOGY Optional 2 0 0 4
MBS0007 DRAMA IN EDUCATION Optional 2 0 0 4
MBS0009 PROGRAM DEVELOPMENT IN EDUCATION Optional 2 0 0 4
MBS0010 PROJECT DEVELOPMENT IN EDUCATION Optional 2 0 0 4
MBS0011 CRITICAL AND ANALYTICAL THINKING Optional 2 0 0 4
MBS0013 INCLUSIVE EDUCATION Optional 2 0 0 4
MBS0014 CHARACTER AND VALUES EDUCATION Optional 2 0 0 4
MBS0016 MICRO TEACHING Optional 2 0 0 4
MBS0017 MUSEUM EDUCATION Optional 2 0 0 4
MBS0018 OUT OF SCHOOL LEARNING ENVIRONMENTS Optional 2 0 0 4
MBS0021 SUSTAINABLE DEVELOPMENT AND EDUCATION Optional 2 0 0 4
FEN0122 STEM PROJECT I (DESIGN) Optional 2 0 0 4
FEN0123 STEM PROJECT II Optional 2 0 0 4
İMÖ0001 COMPUTER AIDED MATHEMATICS TEACHING Optional 2 0 0 4
İMÖ0002 DEVELOPING EFFICIENCY IN MATHEMATICS TEACHING Optional 2 0 0 4
İMÖ0003 MATERIAL DESIGN IN MATHEMATICS TEACHING Optional 2 0 0 4
İMÖ0004 ELEMENTARY MATHEMATICS TEACHING Optional 2 0 0 4
İMÖ0006 MATHEMATICS TEACHING WITH GAME Optional 2 0 0 4
İMÖ0008 MATHEMATICS COURSE BOOK REVIEW Optional 2 0 0 4
İMÖ0010 NON-SCHOOL LEARNING ENVIRONMENTS IN MATHEMATICS EDUCATION Optional 2 0 0 4
İMÖ0011 MATHEMATICS TEACHING FOR SUPERIOR TALENTED STUDENTS Optional 2 0 0 4
İMÖ0012 INCLUSIVE APPLICATIONS IN MATHEMATICS EDUCATION Optional 2 0 0 4
İMÖ0013 MATHEMATICAL LITERACY Optional 2 0 0 4
İMÖ0014 COMPUTER AIDED GEOMETRY TEACHING Optional 2 0 0 4
İMÖ0015 LINEAR ALGEBRA APPLICATIONS Optional 2 0 0 4
İMÖ0016 ANALYTICAL GEOMETRY APPLICATIONS Optional 2 0 0 4
İMÖ0018 GRAPHIC LITERACY Optional 2 0 0 4
İMÖ0019 LEARNING OBJECTS Optional 2 0 0 4
İMÖ0020 LOGICAL REASONING Optional 2 0 0 4
İMÖ0022 PROBLEM SETTING IN MATHEMATICS Optional 2 0 0 4
İMÖ0024 AFFECTIVE VARIABLES, METACOGNITION AND SELF-REGULATION IN MATHEMATICS EDUCATION Optional 2 0 0 4
İMÖ0026 ROBOTIC CODING IN MATHEMATICS EDUCATION Optional 2 0 0 4
Bologna İletişim
Mail : bologna@uludag.edu.tr
Tasarım & Kodlama
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