BAYBURT University Information Package / Course Catalogue

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Description of Individual Course Units
Course Unit CodeCourse Unit TitleType of Course UnitYear of StudySemesterNumber of ECTS Credits
AE-MT104BCompulsory124
Level of Course Unit
First Cycle
Objectives of the Course
To be able to define trigonometric functions, trigonometric equations and solve trigonometric equations; To be able to define complex numbers and to deal with complex numbers; To be able to comprehend specific integral by expressing Riemann sum, to express indefinite integral, to calculate integrals with integrating methods and to be able to apply integrals; To be able to express and calculate non-integral integrals; Define series and determine whether they are convergent with convergence tests.
Name of Lecturer(s)
Prof. Dr. Rabil AYAZOĞLU
Learning Outcomes
11. Will be able to define trigonometric functions, trigonometric relations and solve trigonometric equations. .
2Will be able to define complex numbers.
3Will be able to express the Riemann sum.
4Define definite integral and indefinite integral
5Will be able to calculate integrals with the help of integration methods and make applications related to integrals.
6Will be able to express non-proprietary integrals and calculate them.
7Will be able to define series and determine whether they are convergent or not with the help of convergence tests.
Mode of Delivery
Normal Education
Prerequisites and co-requisities
Recommended Optional Programme Components
Course Contents
To be able to define trigonometric functions, trigonometric equations and solve trigonometric equations; To be able to define complex numbers and to deal with complex numbers; To be able to comprehend specific integral by expressing Riemann sum, to express indefinite integral, to calculate integrals with integrating methods and to be able to apply integrals; To be able to express and calculate non-integral integrals; Define series and determine whether they are convergent with convergence tests.
Weekly Detailed Course Contents
WeekTheoreticalPracticeLaboratory
1 Trigonometric functions, trigonometric relationsLecture and question solutions
2 Trigonometric equation solutionsLecture and question solutions
3Complex numbers and propertiesLecture and question solutions
4Complex numbers and propertiesLecture and question solutions
5Complex numbers and propertiesLecture and question solutions
6 Riemann sumLecture and question solutions
7 Specific integralLecture and question solutions
8 Indefinite integral, integration methodsLecture and question solutions
9 Indefinite integral, integration methodsLecture and question solutions
10 Applications of integral,Lecture and question solutions
11 Absolute integralsLecture and question solutions
12 Series and convergence testsLecture and question solutions
13 Series and convergence testsLecture and question solutions
14General evaluation of the courseLecture and question solutions
15Final exam
Recommended or Required Reading
Planned Learning Activities and Teaching Methods
Assessment Methods and Criteria
Term (or Year) Learning ActivitiesQuantityWeight
Midterm Examination1100
SUM100
End Of Term (or Year) Learning ActivitiesQuantityWeight
Final Examination1100
SUM100
Term (or Year) Learning Activities40
End Of Term (or Year) Learning Activities60
SUM100
Language of Instruction
Work Placement(s)
Workload Calculation
ActivitiesNumberTime (hours)Total Work Load (hours)
Midterm Examination155
Final Examination2510
Makeup Examination2510
Attending Lectures3515
Practice2510
Laboratory3515
Experiment2510
Report Preparation2510
Project Preparation3515
Project Presentation2510
Role Play/Dramatization2510
TOTAL WORKLOAD (hours)120
Contribution of Learning Outcomes to Programme Outcomes
PO
1		PO
2		PO
3		PO
4		PO
5		PO
6		PO
7		PO
8		PO
9		PO
10
LO1          
LO2          
LO3          
LO4          
LO5          
LO6          
LO7          
* Contribution Level : 1 Very low 2 Low 3 Medium 4 High 5 Very High