GEP0804 Islamic PhilosophyBahçeşehir UniversityDegree Programs MATHEMATICSGeneral Information For StudentsDiploma SupplementErasmus Policy StatementNational QualificationsBologna Commission
MATHEMATICS
Bachelor TR-NQF-HE: Level 6 QF-EHEA: First Cycle EQF-LLL: Level 6

Course Introduction and Application Information

Course Code Course Name Semester Theoretical Practical Credit ECTS
GEP0804 Islamic Philosophy Spring 3 0 3 4
This catalog is for information purposes. Course status is determined by the relevant department at the beginning of semester.

Basic information

Language of instruction: English
Type of course: GE-Elective
Course Level: Bachelor’s Degree (First Cycle)
Mode of Delivery: Face to face
Course Coordinator : Dr. BURCU ALARSLAN ULUDAŞ
Course Lecturer(s): Dr. Öğr. Üyesi MUSTAFA EMRE DORMAN
Recommended Optional Program Components: None
Course Objectives: This course is designed to present the student with a solid introduction to the major thinkers in classical Islamic philosophy, with emphasis placed on developing a properly philosophical understanding of the issues and arguments. Topics include: Reason and revelation (can the human mind reach the truth without the aid of revelation?); the existence of God; creation, eternity, and infinity. Causality and Miracles. Human nature and knowledge; the nature of ethical obligations; and the constitution of the ideal political state. Philosophers to be studied include al-Kindi, al-Razi, al-Farabi, Ibn Sina (Avicenna), al-Ghazali, Ibn Baja, Ibn Tufail, and Ibn Rushd (Averroes).

Learning Outcomes

The students who have succeeded in this course;
1-Acquired a broad understanding of islamic philosophical tradition deepened by approaches from various perspectives: through study of foundotional texts; the development of philosophical thinking in its historical context; and the taught of modern muslim thinkers.
2-Become familiar with the key concepts of and principles of islamic philosophical schools
3-Acquired knowledge of main philosophers and classical texts of classical islamic philosophy, and been given the opportunity to develop the skill of reading the pholosophical texts and commenting on them critically

Course Content

This course is designed to present the student with a solid introduction to the major thinkers in classical Islamic philosophy, with emphasis placed on developing a properly philosophical understanding of the issues and arguments.

Weekly Detailed Course Contents

Week Subject Related Preparation
1) Introduction to the course: Try to define the meaning of islamic philosophy
2) Sources of islamic philosophy and theology: İslamic and non islamic sources
3) Early discussions and divisions between theological schools: Asharita and Muthadhili kalam
4) Beginning of Systematic Philosophy: al-Kindi and Peripatetic School
5) Farabi: From onthology to political philosophy
6) İbn Sina: Problem of Being and existence of God.
7) İbn Sina’s philosophy of religion
8) Ghazali’s criticism of Philosophy: Tahafut
9) İbn Khaldun and philosophy of history
10) Andalusian Philosophy and emergence of İslamic Philosophy in the west: İbn Bajjah, İbn Tufail
11) İbn Rushd and his approach to Reason and Revelation
12) Philosophy as Mysticism: İbn Arabi, Mulla Sadra
13) Mysticism in otoman philosophy: Maulana Rumi and Yunus Emre
14) Revision
15) Final exam
16) Final exam

Sources

Course Notes / Textbooks:
References: 1- M.M. Sharif, A History of Muslim Philosophy, Pakistan Philosophical Congress, (İslam Felsefesi Tarihi) İnsan Yayınları. 2 Cilt.
2- Macit Fahri, İslam Felsefesi Tarihi, Nehir Yayınları. 2001, İstanbul
3- Mamut Kaya, İslam Filozoflarından Felsefe Metinleri, Klasik Yayınları, 2008, İst
4- Kindi, Felsefi Risaleler, Klasik Yayınları, 2007, İstanbul
5- Farabi, İdeal Devlet (El-Medinetü’l-fadila), çev: Ahmet Arslan, Divan Kitap Yayınları. 2009
6- İslam Düşüncesi Tarihi, Açık Öğretim Fakültesi Yayınları, Eskişehir. 2010
7- H. Corbin (with S.H. Nasr and O. Yahya), History of Islamic Philosophy, (London, 1993).
8- Arnaldez, Roger, Averroes: A Rationalist in Islam (Notre Dame: University of Notre Dame Press, 2000).

Evaluation System

Semester Requirements Number of Activities Level of Contribution
Attendance 14 % 10
Homework Assignments 2 % 10
Presentation 1 % 10
Seminar 1 % 10
Midterms 1 % 20
Final 1 % 40
Total % 100
PERCENTAGE OF SEMESTER WORK % 60
PERCENTAGE OF FINAL WORK % 40
Total % 100

ECTS / Workload Table

Activities Number of Activities Duration (Hours) Workload
Course Hours 14 3 42
Presentations / Seminar 1 3 3
Homework Assignments 2 10 20
Midterms 1 15 15
Final 1 15 15
Total Workload 95

Contribution of Learning Outcomes to Programme Outcomes

No Effect 1 Lowest 2 Low 3 Average 4 High 5 Highest
           
Program Outcomes Level of Contribution
1) To have a grasp of basic mathematics, applied mathematics and theories and applications in Mathematics
2) To be able to understand and assess mathematical proofs and construct appropriate proofs of their own and also define and analyze problems and to find solutions based on scientific methods,
3) To be able to apply mathematics in real life with interdisciplinary approach and to discover their potentials,
4) To be able to acquire necessary information and to make modeling in any field that mathematics is used and to improve herself/himself,
5) To be able to tell theoretical and technical information easily to both experts in detail and non-experts in basic and comprehensible way,
6) To be familiar with computer programs used in the fields of mathematics and to be able to use at least one of them effectively at the European Computer Driving Licence Advanced Level,
7) To be able to behave in accordance with social, scientific and ethical values in each step of the projects involved and to be able to introduce and apply projects in terms of civic engagement,
8) To be able to evaluate all processes effectively and to have enough awareness about quality management by being conscious and having intellectual background in the universal sense, 4
9) By having a way of abstract thinking, to be able to connect concrete events and to transfer solutions, to be able to design experiments, collect data, and analyze results by scientific methods and to interfere, 4
10) To 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, 4
11) To be able to adapt and transfer the knowledge gained in the areas of mathematics ; such as algebra, analysis, number theory, mathematical logic, geometry and topology to the level of secondary school,
12) To be able to conduct a research either as an individual or as a team member, and to be effective in each related step of the project, to take role in the decision process, to plan and manage the project by using time effectively.