| Course Unit Title | Course Unit Code | Type of Course Unit | Level of Course Unit | Year of Study | Semester | ECTS Credits |
|---|---|---|---|---|---|---|
| Mathematics I | OMP117 | Compulsory | Associate degree | 1 | Fall | 4 |
Name of Lecturer(s)
Associate Prof. Dr. Sinan AYDIN
Associate Prof. Dr. Murat Selim ÇEPNİ
Associate Prof. Dr. Hakan KÖYLÜ
Associate Prof. Dr. Aysen ŞİMŞEK KANDEMİR
Associate Prof. Dr. Ali TÜRKCAN
Assistant Prof. Dr. Nurettin İYİGÜL
Lecturer Eylem Nurşen AKBULUT
Lecturer Ümmühan AKHİSAR
Lecturer NEVIN ANTAR
Lecturer Ferit ARTKIN
Lecturer Nejdet ERDEM
Lecturer Kazım KAHRAMAN
Lecturer Engin KARAMAN
Lecturer Erkan KOCAKAYA
Lecturer Mahluga MURADOĞLU
Lecturer Arif Onur ÖZTÜRK
Lecturer Türker SELÇUK
Lecturer Hüseyin TAŞAR
Lecturer Osman UYANIK
Lecturer Dr. Barış DEMİR
Lecturer Dr. Şebnem ERKEBAY
Lecturer Dr. Bülent KOPARAN
Learning Outcomes of the Course Unit
1) Make the four arithmetic operations using numbers
1) Make the four arithmetic operations using numbers
2) Solve first degree equations and quadratic equations. Comprehend functions basically and classify functions according to their types
2) Solve first degree equations and quadratic equations. Comprehend functions basically and classify functions according to their types
3) Comprehend fundamental trigonometry and solve trignometric equations
3) Comprehend fundamental trigonometry and solve trignometric equations
4) Comprehend fundamental logarithm and solve logarithmic equations
4) Comprehend fundamental logarithm and solve logarithmic equations
5) Comprehend fundamental complex numbers and write a complex number in trigonometric form
5) Comprehend fundamental complex numbers and write a complex number in trigonometric form
6) Apply mathematical knowledge to his vacational courses
6) Apply mathematical knowledge to his vacational courses
Program Competencies-Learning Outcomes Relation
| Program Competencies | ||||||||||
| 1 | 2 | 3 | 4 | 5 | 6 | 7 | 8 | 9 | ||
| Learning Outcomes | ||||||||||
| 1 | High | No relation | No relation | No relation | High | No relation | No relation | No relation | No relation | |
| 1 | High | No relation | No relation | No relation | High | No relation | No relation | No relation | No relation | |
| 2 | High | No relation | No relation | No relation | High | No relation | No relation | No relation | No relation | |
| 2 | High | No relation | No relation | No relation | High | No relation | No relation | No relation | No relation | |
| 3 | No relation | No relation | No relation | No relation | High | No relation | No relation | No relation | No relation | |
| 3 | No relation | No relation | No relation | No relation | High | No relation | No relation | No relation | No relation | |
| 4 | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | No relation | |
| 4 | No relation | No relation | No relation | No relation | High | No relation | No relation | No relation | No relation | |
| 5 | No relation | No relation | No relation | No relation | High | No relation | No relation | No relation | No relation | |
| 5 | No relation | No relation | No relation | No relation | High | No relation | No relation | No relation | No relation | |
| 6 | No relation | No relation | No relation | No relation | High | No relation | No relation | No relation | No relation | |
| 6 | No relation | No relation | No relation | No relation | High | No relation | No relation | No relation | No relation | |
Mode of Delivery
Face to Face
Prerequisites and Co-Requisites
None
Recommended Optional Programme Components
absent
Course Contents
This course covers numbers, powered numbers, roots of numbers; algebra, factorization, rational numbers; first degree equations and quadratic equations; the first and the second degree inequalities; the definition of function, one to one functions, surjective functions, injective functions, inverse functions, the definition of composite functions; trigonometry, trigonometric functions, inverse trigonometric functions and identical functions; trigonometric equations and the graph of trigonometric functions, exponential functions and logarithm, properties of logarithm, logarithmic and exponential equations; complex numbers, four basic operations with complex numbers; polar coordinates (trigonometric expansion of complexs numbers), equations in complex numbers and samples.
Weekly Schedule
1) Numbers, powered numbers, radix numbers2) Algebra, factorization, rational numbers
3) Equations of the first degree
4) Quadratic equations and graph drawings
5) Inequalities of the first and the second degree
6) The definition of function, one to one functions, surjective functions, injective functions
7) The definition of inverse and composite functions
8) Midterm examination/Assessment
9) Trigonometry, trigonometric functions, inverse trigonometric functions and identical functions
10) Trigonometric equations and graphs of trigonometric function graphs
11) Exponential functions and logarithm
12) Logarithmic and exponential equations
13) Complexs numbers
14) Polar coordinates (Trigonometric expansion of complex numbers), equations ın complex numbers
15) Solving problems about how to apply mathematics knowledge to their vacational lessons
16) Final examination
Recommended or Required Reading
Planned Learning Activities and Teaching Methods
1) Lecture
2) Question-Answer
3) Group Study
4) Lab / Workshop
5) Project Based Learning
Assessment Methods and Criteria
Contribution of Semester Studies to Course Grade |
40% |
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|---|---|---|---|---|---|---|---|---|---|---|---|---|
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Contribution of Final Examination to Course Grade |
60% |
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Total | 100% | |||||||||||
Language of Instruction
Turkish
Work Placement(s)
Not Required