Description of Individual Course Units
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Offered By |
Mathematics |
Level of Course Unit |
First Cycle Programmes (Bachelor's Degree) |
Course Coordinator |
ASSISTANT PROFESSOR SEÇIL GERGÜN |
Offered to |
Mathematics (Evening) |
Course Objective |
The aim of the course is to prepare a backround for modern analysis and for the other branches which use these theories : Metric Spaces, Completion of a Metric Space, Continuity, Compactness and Connectedness on Metric Space, Contraction Mapping Theorem and its Applications, The Arzela-Ascoli Theorem, Peona Theorem, The Tietze Extension Theorem. Baire's Theorem |
Learning Outcomes of the Course Unit |
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Mode of Delivery |
Face -to- Face |
Prerequisites and Co-requisites |
None |
Recomended Optional Programme Components |
None |
Course Contents |
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Recomended or Required Reading |
Textbook(s): An Introduction to Real Analysis; T.Terzioglu, 1994, METU. |
Planned Learning Activities and Teaching Methods |
Lecture Notes |
Assessment Methods |
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Further Notes About Assessment Methods |
None |
Assessment Criteria |
The weighted average of the student's midterm and final grades will be taken and the letter grade will be given according to the relative scoring method. |
Language of Instruction |
English |
Course Policies and Rules |
Exams and evaluations will be carried out in accordance with Dokuz Eylül Üniversitesi Ön Lisans ve Lisans Öğretim ve Sınav Yönetmeliği. For details: https://ogrenci.deu.edu.tr/regulations-and-directives/educational-and-examinational-regulation-of-pre-graduate-and-undergraduate-degree/ |
Contact Details for the Lecturer(s) |
E-mail: secil.gergun@deu.edu.tr |
Office Hours |
To be announced. |
Work Placement(s) |
None |
Workload Calculation |
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Contribution of Learning Outcomes to Programme Outcomes |
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