Course Code	Semester	Course Name	LE/RC/LA	Course Type	Language of Instruction	ECTS
MBT2001	1	Mathematics	3/0/0	BSC	Turkish	5

Course Goals	Mathematics is a universal language. For this reason, it is very important to establish the mathematical model of the problem and solution of it which arises in any field. Therefore, our main goal is to give basic mathematical knowledge, to develop mathematical thinking and to train individuals with enough mathematical knowledge to analyze the complex problems which the business manager encounters in a systematic way and to apply some techniques when it is necessary.
Prerequisite(s)	None
Corequisite(s)	None
Special Requisite(s)	None
Instructor(s)	Professor Mert Çağlar
Course Assistant(s)
Schedule	Day, hours, XXX Campus, classroom number.
Office Hour(s)	Instructor name, day, hours, XXX Campus, office number.
Teaching Methods and Techniques	-Resitation and Oral Presantation
Principle Sources	-Thomas Calculus, 12.Edition, PEARSON
Other Sources	1. R.A. Adams and C. Essex (2010). Calculus-A Complete Course (Seventh Edition), Pearson 2. Paul, Richard S.-, Shaevel, M.Leonard, Essentials of Technical mathematics 3. Hockett Sternstein, Second Edition, Applied Calculus

Course Schedules
Week	Contents	Learning Methods
1. Week	Numbers, Inequalitis and Absolute Value / Plane Geometry and Lines / Graphs of Second Order Equations / Trigonometry	Resitation and Oral Presentation
2. Week	Functions / Function Types	Resitation and Oral Presentation
3. Week	Limit of a Function	Resitation and Oral Presentation
4. Week	Limit Rules / General Definition of a Limit	Resitation and Oral Presentation
5. Week	Continuity	Resitation and Oral Presentation
6. Week	The Derivative as a Rate of Change	Resitation and Oral Presentation
7. Week	The Derivative as a Function / Derivative Rules	Resitation and Oral Presentation
8. Week	Derivatives of Trigonometric Functions / The Chain Rule / Closed Türev	Resitation and Oral Presentation
9. Week	Inverse Functions / Exponentional Functions / Logarithmic Functions	Resitation and Oral Presentation
10. Week	Derivatives of Logarithmic Functions / Inverse Trigonometric Functions	Resitation and Oral Presentation
11. Week	Hyperbolic Functions / Indefinite Limits and L'Hopital Rule	Resitation and Oral Presentation
12. Week	Maximum and Minimum Values / The Mean Value Theorem	Resitation and Oral Presentation
13. Week	Curve Sketching and Concavity	Resitation and Oral Presentation
14. Week	Drawing a Function Graph	Resitation and Oral Presentation
15. Week	Final Exam	Final Exam
16. Week	Final Exam	Final Exam
17. Week	Final Exam	Final Exam

Assessments
Evaluation tools	Quantity	Weight(%)
Midterm(s)	1	40
Final Exam	1	60

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.

Learning Outcomes LO-1 Defines and discusses real numbers and real numbers lines, cartesian coordinates in the plane and graphs of second order equations. LO-2 Defines new functions by using polynomial, rational functions and some known functions and their graphs. LO-3 Defines trigonometric functions, inverse functions and inverse trigonometric functions. LO-4 Explains exponential and logarithmic functions. LO-5 Defines limits in functions, infinite limits and infinite limit functions. LO-6 Expresses the role of continuity. LO-7 Uses the tangent line and its slopes, derivatives and derivative rules. LO-8 Explains the importance of the chain rule; defines trigonometric functions, inverse functions, exponential and logarithmic functions, and inverse trigonometric functions; uses high-order derivatives. LO-9 Explains the importance of the chain rule; defines trigonometric functions, inverse functions, exponential and logarithmic functions, and inverse trigonometric functions; uses high-order derivatives. LO-10 Analyzes the mean value theorem and uses the derivative of closed functions. LO-11 Defines the indefinite limit and solves these limits by using the l'Hopital rule. LO-12 Defines endpoints and solves end-value problems. LO-13 Defines concepts of concavity and sketching popint. LO-14 Explains and discusses how to draw graph of a function.

Course Assessment Matrix:

	PO 1	PO 2	PO 3	PO 4	PO 5	PO 6	PO 7	PO 8	PO 9	PO 10	PO 11