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Mathematics for Architecture
Course Code | Semester |
Course Name |
LE/RC/LA |
Course Type |
Language of Instruction |
ECTS |
MBT2002 |
1 |
Mathematics for Architecture |
3/0/0 |
BSC |
Türkçe |
3 |
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Course Goals |
To be able to apply mathematics skills in architecture areas |
Prerequisite(s) |
- |
Corequisite(s) |
- |
Special Requisite(s) |
- |
Instructor(s) |
Assist. Prof. Dr. Uğur Gönüllü |
Course Assistant(s) |
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Schedule |
Thursday 11:00-14:00
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Office Hour(s) |
Thursday 10:00-11:00, 3A-15 |
Teaching Methods and Techniques |
Lecture and application |
Principle Sources |
1.Kalkülüs Eksiksiz Bir Ders, Robert A. Adams, Christopher Essex (Çevirenler: Mehmet Terziler, Tahsin Öner), Palme Yayıncılık, 2015
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Other Sources |
-* Thomas Kalkülüs , George B. Thomas, Maurice D. Weir, Joel R. Hass, (Çeviri Editörü: Mustafa Bayram), Pearson
* Temel Matematik Cilt II, Prof. Dr. Mahmut Kartal, Yrd. Doç. Dr. Yalçın Karagöz, Yrd. Doç. Dr. Zafer Kartal, Nobel |
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Course Schedules |
Week |
Contents |
Learning Methods |
1. Week |
Catesian Coordinates in the plane
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Lecture and Application |
2. Week |
Graphs of Quadratic Equations Functions and Their Graphs
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Lecture and Application |
3. Week |
Combining Functions to Make New Functions
Polynomials and Rational Functions
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Lecture and Application |
4. Week |
The Trigonometric Functions
Limits of Functions |
Lecture and Application |
5. Week |
Limits at Infinity and Infinite Limits
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Lecture and Application |
6. Week |
Continuity,
Tangent Lines and Their Slopes,
Differentation Rules |
Lecture and Application |
7. Week |
Chain Rule, Derivatives of Trigonometric Functions The Mean-Value Theorem
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Lecture and Application |
8. Week |
Midterm Exam
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Exam |
9. Week |
Sketching the Graph of a Function
FINAL |
Lecture and Application |
10. Week |
Sketching the Graph of a Function, Maximum-Minimum problems |
Lecture and Application |
11. Week |
Integral of a Continuous Function,
The Fundamental Theorem of Calculus |
Lecture and Application |
12. Week |
Integral of a Continuous Function,
The Fundamental Theorem of Calculus |
Lecture and Application |
13. Week |
Integration by Part, Integrals of Rational Functions Applications of Integrations
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Lecture and Application |
14. Week |
Integration by Part, Integrals of Rational Functions Applications of Integrations |
Lecture and Application |
15. Week |
FINAL |
Exam |
16. Week |
FINAL |
Exam |
17. Week |
FINAL |
Exam |
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Assessments |
Evaluation tools |
Quantity |
Weight(%) |
Homework / Term Projects / Presentations |
1 |
50 |
Final Exam |
1 |
50 |
Program Outcomes |
PO-1 | Interpreting advanced theoretical and applied knowledge in Mathematics and Computer Science. | PO-2 | Critiquing and evaluating data by implementing the acquired knowledge and skills in Mathematics and Computer Science. | PO-3 | Recognizing, describing, and analyzing problems in Mathematics and Computer Science; producing solution proposals based on research and evidence. | PO-4 | Understanding the operating logic of computer and recognizing computational-based thinking using mathematics as a discipline. | PO-5 | Collaborating as a team-member, as well as individually, to produce solutions to problems in Mathematics and Computer Science. | PO-6 | Communicating in a foreign language, and interpreting oral and written communicational abilities in Turkish. | PO-7 | Using time effectively in inventing solutions by implementing analytical thinking. | PO-8 | Understanding professional ethics and responsibilities. | PO-9 | Having the ability to behave independently, to take initiative, and to be creative. | PO-10 | Understanding the importance of lifelong learning and developing professional skills continuously. | PO-11 | Using professional knowledge for the benefit of the society. |
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Learning Outcomes |
LO-1 | 1. To have a complete review of main terms and methods of manipulative mathematics
| LO-2 | 2. To be able to apply mathematics skills in architecture areas
| LO-3 | 3. To be able to think analytic
| LO-4 | 4. To be able to understand the numbers in business life and to make some comments about the numbers
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Course Assessment Matrix: |
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| PO 1 | PO 2 | PO 3 | PO 4 | PO 5 | PO 6 | PO 7 | PO 8 | PO 9 | PO 10 | PO 11 | LO 1 | | | | | | | | | | | | LO 2 | | | | | | | | | | | | LO 3 | | | | | | | | | | | | LO 4 | | | | | | | | | | | |
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