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Course Title: |
CALCULUS I(DIFFERENTIAL CALCULATIONS) |
| 2 |
Course Code: |
MAT1071 |
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Type of Course: |
Compulsory |
| 4 |
Level of Course: |
First Cycle |
| 5 |
Year of Study: |
1 |
| 6 |
Semester: |
1 |
| 7 |
ECTS Credits Allocated: |
6 |
| 8 |
Theoretical (hour/week): |
3 |
| 9 |
Practice (hour/week) : |
2 |
| 10 |
Laboratory (hour/week) : |
0 |
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Prerequisites: |
none |
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Recommended optional programme components: |
None |
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Language: |
Turkish |
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Mode of Delivery: |
Face to face |
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Course Coordinator: |
Prof. Dr. OSMAN BİZİM |
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Course Lecturers: |
Prof. Dr. Osman Bizim
Öğr.Gör. Dr. Betül Gezer |
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Contactinformation of the Course Coordinator: |
Uludag University, Art and Science Faculty Department of Mathematics, 16059 Görükle Bursa-TURKEY
0 224 294 17 57/ obizim@uludag.edu.tr
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Website: |
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Objective of the Course: |
The aim of this course is to give basic subjects of mathematics. |
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Contribution of the Course to Professional Development |
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| Week |
Theoretical |
Practical |
| 1 |
Sets, real numbers and their properties, and properties of absolute value. |
Examples of the sets, real numbers, and absolute value |
| 2 |
Systems of equations, coordinates, relations and their properties. |
Examples of the systems of equations, coordinates and relation. |
| 3 |
The concept of function and special functions (trigonometric, inverse trigonometric, exponential, logarithmic, hyperbolic, inverse hyperbolic). |
Examples of the functions. |
| 4 |
The conics (circle, ellipse, parabola, hyperbola) and their properties. |
Examples of the conics |
| 5 |
Polar coordinates, parametric equations and their properties |
Examples of the polar coordinates, parametric equations. |
| 6 |
Limit concept and properties |
Examples of the limit |
| 7 |
The right-left limit, infinite limit and their properties |
Examples of the right-left limit, infinite limit |
| 8 |
Continuity and properties of continuous functions |
Examples of the continuity and properties of continuous functions. |
| 9 |
The derivation and properties |
Examples of the derivation |
| 10 |
Geometrical and physical interpretation of the derivative |
Examples of the geometrical and physical interpretation of the derivative |
| 11 |
The properties of the differentiable functions |
Examples of the properties of the differentiable functions |
| 12 |
The differential and differentiable functions, their properties |
Examples of the differential |
| 13 |
Increasing and decreasing functions, concavity of curves |
Examples of the increasing and decreasing functions, concavity of curves |
| 14 |
Local and absolute max-min, problems of maxima and minima, curve sketching. |
Examples of the local and absolute max-min, problems of maxima and minima, curve sketching. |
