| Course Unit Code | Course Unit Title | Type of Course Unit | Year of Study | Semester | Number of ECTS Credits | | AEK110B | Maths II | Compulsory | 1 | 2 | 5 |
|
| Level of Course Unit |
| Short Cycle |
| Objectives of the Course |
| To acquire the ability to apply mathematical knowledge and skills required for student profession to work |
| Name of Lecturer(s) |
| ÖĞR. GÖR. DR. RAMAZAN ŞİMŞEK |
| Learning Outcomes |
| 1 | Complex numbers and related operations are done correctly implements the profession. | | 2 | Exponential functions and logarithms related operations do, draw graphs and implements the profession. | | 3 | Applications of derivatives and related operations are done correctly and apply the profession. | | 4 | Integral and applications of integration-related operations are conducted in faultless and professional. |
|
| Mode of Delivery |
| Normal Education |
| Prerequisites and co-requisities |
| None |
| Recommended Optional Programme Components |
| None |
| Course Contents |
| Definition of complex numbers, Representation of vectors, Four operations of complex numbers in cartesian form, Polar and Cartesian transformations of complex numbers, Four operations in polar form of complex numbers, Professional use of complex numbers, Properties and operations of exponential functions, Logarithm function definition and logarithms The use of the derivative on the functions, The use of the derivative on the functions, The use of the profession on the derivative, Definition of the integral and methods of taking the integral, The application of the integral on the functions, The use of the professional on the integral. |
| Weekly Detailed Course Contents |
|
| 1 | Definition of Complex Numbers, Vector Presentation | | | | 2 | Four Numbers in Cartesian Form of Complex Numbers | | | | 3 | Polar and Cartesian Transforms of Complex Numbers | | | | 4 | Using the Professional Area of Complex Numbers | | | | 5 | Exponential Functions Properties and Operations | | | | 6 | Definition of Logarithm Function and Logarithmic Retrieval Methods | | | | 7 | Using the Logarithm Function in the Professional Area | | | | 8 | Midterm | | | | 9 | Definition of Derivative and Derivative Methods | | | | 10 | Application of Derivative on Functions | | | | 11 | Application of Derivative on Functions | | | | 12 | Using the Derivative Professional Area | | | | 13 | Definition of Integral and Methods of Integration | | | | 14 | Application of Integral on Functions | | | | 15 | Using the Integral Professional Area | | | | 16 | final examination | | |
|
| Recommended or Required Reading |
| Mustafa BALCI, Temel Matematik, 2016, Palme Yayınları
Mustafa BALCI, Genel Matematik 1, 2016, Palme Yayınları |
| Planned Learning Activities and Teaching Methods |
|
| Assessment Methods and Criteria | |
| Midterm Examination | 1 | 100 | | SUM | 100 | |
| Final Examination | 1 | 100 | | SUM | 100 | | Term (or Year) Learning Activities | 40 | | End Of Term (or Year) Learning Activities | 60 | | SUM | 100 |
| | Language of Instruction | | Turkish | | Work Placement(s) | | None |
|
| Workload Calculation |
|
| Midterm Examination | 1 | 1 | 1 |
| Final Examination | 1 | 2 | 2 |
| Attending Lectures | 14 | 3 | 42 |
| Self Study | 14 | 3 | 42 |
| Individual Study for Mid term Examination | 1 | 20 | 20 |
| Individual Study for Final Examination | 1 | 30 | 30 |
|
| Contribution of Learning Outcomes to Programme Outcomes |
|
| * Contribution Level : 1 Very low 2 Low 3 Medium 4 High 5 Very High |
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