Doctoral Thesis (MATH697) Course Detail

Course Name Course Code Season Lecture Hours Application Hours Lab Hours Credit ECTS
Doctoral Thesis MATH697 1. Semester 0 0 0 0 150
Pre-requisite Course(s)
N/A
Course Language English
Course Type Compulsory Departmental Courses
Course Level Ph.D.
Mode of Delivery
Learning and Teaching Strategies .
Course Coordinator
Course Lecturer(s)
Course Assistants
Course Objectives To contribute accumulation on the knowledge of mathematics by performing research oriented work, thus obtaining deepened methodological knowledge in the subject area.
Course Learning Outcomes The students who succeeded in this course;
  • Systematic acquisition and understanding of knowledge in mathematics
  • Develop research skills to conceptualize, model, design and implement a research project in the light of unforeseen problems.
  • Gain an attitude to undertake pure and applied research and development at advanced level.
  • Attain professional skills of personal responsibility and autonomous initiative in complex and unpredictable situations in professional environments.
Course Content Thesis topic as stated in the thesis protocol.

Weekly Subjects and Releated Preparation Studies

Week Subjects Preparation

Sources

Evaluation System

Requirements Number Percentage of Grade
Attendance/Participation - -
Laboratory - -
Application - -
Field Work - -
Special Course Internship - -
Quizzes/Studio Critics - -
Homework Assignments - -
Presentation - -
Project - -
Report - -
Seminar - -
Midterms Exams/Midterms Jury - -
Final Exam/Final Jury - -
Toplam 0 0
Percentage of Semester Work
Percentage of Final Work 100
Total 100

Course Category

Core Courses X
Major Area Courses
Supportive Courses
Media and Managment Skills Courses
Transferable Skill Courses

The Relation Between Course Learning Competencies and Program Qualifications

# Program Qualifications / Competencies Level of Contribution
1 2 3 4 5
1 Is independently able to build a problem in the area of study, solve the problem by developing solution techniques and assess the solutions. X
2 Is capable of creating a groundwork in the fundamental branches of mathematics as well as in his/her research area X
3 follows the latest national and international literature in Mathematics and in his/her area of research; and uses them in his/her related studies X
4 observes and adopts the scientific ethical values in his/her professional and social life X
5 presents in Turkish and English in academic/scientific events the results of his/her research or the latest studies and findings on a special topic and participates in discussions X
6 Develops skills to work independently or as a member of a team X
7 Develops competences in the areas of creative and critical thinking, problem solving and producing original studies. Follows recent scientific studies, is capable of making an analysis, synthesis and assessment of the knowledge acquired X
8 Is open to lifelong improvement of his/her acquired knowledge, skills and competences. X
9 Is able to apply the acquired knowledge and problem-solving skills to interdisciplinary studies, proposes different solution methods to problems in terms of mathematical models and from a mathematical point of view X
10 Uses the mathematical based softwares, informatics and communication technologies for scientific purposes X

ECTS/Workload Table

Activities Number Duration (Hours) Total Workload
Course Hours (Including Exam Week: 16 x Total Hours) 16 100 1600
Laboratory
Application
Special Course Internship
Field Work
Study Hours Out of Class 14 100 1400
Presentation/Seminar Prepration 6 50 300
Project
Report
Homework Assignments
Quizzes/Studio Critics
Prepration of Midterm Exams/Midterm Jury 6 60 360
Prepration of Final Exams/Final Jury 1 90 90
Total Workload 3750