Course Information
SemesterCourse Unit CodeCourse Unit TitleT+P+LCreditNumber of ECTS Credits
3EEM 201Engineering Mathematics4+0+047

Course Details
Language of Instruction Turkish
Level of Course Unit Bachelor's Degree
Department / Program Electrical and Electronics Engineering
Mode of Delivery Face to Face
Type of Course Unit Compulsory
Objectives of the Course To teach fundamentals of differential equations and problem solving methods theory and using for application of enginnering
Course Content Linear differential equations and solving theory and method of the related equations, Laplace Transform method and solving differential equations using Laplace Transform
Course Methods and Techniques
Prerequisites and co-requisities ( MAT 164 )
Course Coordinator Associate Prof.Dr. S. Cumhur BAŞARAN
Name of Lecturers Prof.Dr. SIDDIK CUMHUR BAŞARAN
Assistants None
Work Placement(s) No

Recommended or Required Reading
Resources H. Hilmi Hacısalihoğlu, Differantial Equations , Third adition, SCHAUM series
Erwin Kreyszig, Advanced Enginering Mathematics ,John Wiley High Education

Course Category
Mathematics and Basic Sciences %50
Engineering %20
Engineering Design %10
Science %10
Field %10

Planned Learning Activities and Teaching Methods
Activities are given in detail in the section of "Assessment Methods and Criteria" and "Workload Calculation"

Assessment Methods and Criteria
In-Term Studies Quantity Percentage
Mid-terms 1 % 30
Assignment 2 % 5
Attendance 1 % 5
Final examination 1 % 60
Total
5
% 100

 
ECTS Allocated Based on Student Workload
Activities Quantity Duration Total Work Load
Course Duration 14 4 56
Hours for off-the-c.r.stud 14 2 28
Assignments 10 1,50 15
Mid-terms 1 15 15
Final examination 1 24 24
Total Work Load   Number of ECTS Credits 5 138

Course Learning Outcomes: Upon the successful completion of this course, students will be able to:
NoLearning Outcomes
1 Modelling of basic engineering and Electrical and Electronics Engineering problems by differantial equations
2 To teach sloving methods and theory of differential equations
3 To teach sloving of differential equations using Laplace Transform method


Weekly Detailed Course Contents
WeekTopicsStudy MaterialsMaterials
1 Fundamentals of differential equations, classification of first order ordinary and solving methods Advanced Engineering Mathematics, chapter 1-2
2 Homogenous differential equations, the differential equations can be converted to homogeneous form Advanced Engineering Mathematics, chapter 1-2
3 Exact differential equations, the differential equations can be converted to exact form Advanced Engineering Mathematics, chapter 1.4
4 First order separable homogeneous differential equations Advanced Engineering Mathematics, chapter 1.3
5 Engineering applications of first order linear differential equations and their solving theory "Advanced Engineering Mathematics, chapter 1 4 Diferansiyel Denklemler (SCHAUM serisi)
6 Bernoulli and Riccati differential equations Advanced Engineering Mathematics, chapter 1.5
7 Second order linear differential equations with constant coefficient Advanced Engineering Mathematics, chapter 2
8 Second order linear equation with variable coefficients, Euler-Cauchy differential equations Advanced Engineering Mathematics, Bölüm 2
9 High order linear differential equations with constant coefficient Advanced Engineering Mathematics, Bölüm 3
10 High order linear differential equations with variable coefficient Advanced Engineering Mathematics, chapter 3
11 Laplace transform methods Advanced Engineering Mathematics,chapter 6
12 Inverse Laplace transform methods Advanced Engineering Mathematics, Bölüm 6
13 Solving of the differential equations using Laplace transform Advanced Engineering Mathematics, Bölüm 6
14 Applications of engineering problem defined by differential equations and their solving via Laplace equations Advanced Engineering Mathematics,chapter 6 Diferansiyel Denklemler (SCHAUM serisi) chapter 24
 


Contribution of Learning Outcomes to Programme Outcomes
P1 P2 P3 P4 P5 P6 P7 P8 P9 P10 P11
C1 4 5 3 2 1 1 1 1 2 1 1
C2 4 5 3 2 1 1 2 1 2 1 1
C3 4 4 3 2 1 1 2 1 2 1 1

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