| Course Language |
Turkish |
| Compulsory or Elective |
Compulsory |
| Equipment |
- |
| Instructor |
Department of Mathematics |
| Course Contents |
Series; Fourier Series; Limit, Continuity, Partial Derivatives, Total Differential of Functions of Several Variables; Derivatives of Compound, Closed and Inverse Functions; Change of Variable; Problems of Maxima and Minima; Vector Analysis; Double Integrals (Change of Variables, Volume Calculus, Areas of Surface ), Triple Integrals, Line Integrals, Surface Integrals. |
| Course Objectives |
- To give fundamentals of mathematics knowledge.
- To be able to analyse problems which are met in the field of mathematics and to gain the ability of problem solving.
- To gain analytical thinking, discussion and evaluation.
|
Course Outcomes
(The
knowledge and the skills that the student will gain at the end of
the course) |
- To have the fundamentals of mathematical knowledge and culture.
- To have analytical thinking and evaluation.
- The skill of evaluation and studying problems which occur in other disciplines.
|
| Textbook |
- Course Notes
|
| Additional References |
- "Calculus" Thomas-Finney Addison-Wesley, 1998
- "Calculus" Schaum's outline series, Frank Ayres, 1979
- "Yüksek Matematik" volume 1 , Ahmet Karadeniz, 1993
| |