PAÜ .:. Eğitim Öğretim Bilgi Sistemi

COURSE INFORMATION

Course Code	Course Title	L+P Hour	Semester	ECTS
ELK 528	THEORY OF FUNCTIONS WITH COMPLEX VARIABLES	3 + 0	1st Semester	7,5

COURSE DESCRIPTION

Course Level	Master's Degree
Course Type	Elective
Course Objective	To create math substructure that is required for the study in master, and to provide support that is required to solve special problems in a variety of expertise .
Course Content	General repeat of complex analysis, General complex integrals and applications, Complex planes, Complex plane conversion techniques, Conformal Mapping.
Prerequisites	No the prerequisite of lesson.
Corequisite	No the corequisite of lesson.
Mode of Delivery	Face to Face

COURSE LEARNING OUTCOMES

1	To provide the solution of special problems in a variety of expertise.
2	To provide the mathematical substructure that is required for theoretical studies.

COURSE'S CONTRIBUTION TO PROGRAM

	PO 01	PO 02	PO 03	PO 04	PO 05	PO 06	PO 07	PO 08	PO 09	PO 10	PO 11
LO 001	5	5	4	4	4	3	3	4	2	4	2
LO 002	5	5	2	4	4	2	2	5	2	3	2
Sub Total	10	10	6	8	8	5	5	9	4	7	4
Contribution	5	5	3	4	4	3	3	5	2	4	2

ECTS ALLOCATED BASED ON STUDENT WORKLOAD BY THE COURSE DESCRIPTION

Activities	Quantity	Duration (Hour)	Total Work Load (Hour)
Course Duration (14 weeks/theoric+practical)	14	3	42
Hours for off-the-classroom study (Pre-study, practice)	14	5	70
Assignments	1	15	15
Mid-terms	1	23	23
Final examination	1	30	30
Presentation / Seminar Preparation	1	15	15
Total Work Load ECTS Credit of the Course			195 7,5

COURSE DETAILS

Select Year

	Course Term	No	Instructors
Details	2023-2024 Fall	1	CEYHUN KARPUZ

Course Details

Course Code	Course Title	L+P Hour	Course Code	Language Of Instruction	Course Semester
ELK 528	THEORY OF FUNCTIONS WITH COMPLEX VARIABLES	3 + 0	1	Turkish	2023-2024 Fall

Course Coordinator	E-Mail	Phone Number	Course Location	Attendance
Prof. Dr. CEYHUN KARPUZ	ckarpuz@pau.edu.tr		MUH A0488	%

Goals		To create math substructure that is required for the study in master, and to provide support that is required to solve special problems in a variety of expertise .
Content		General repeat of complex analysis, General complex integrals and applications, Complex planes, Complex plane conversion techniques, Conformal Mapping.

Topics

Weeks	Topics
1	General repeat of complex analysis
2	General repeat of complex analysis
3	General repeat of complex analysis
4	General complex integrals and applications
5	General complex integrals and applications
6	Complex planes
7	Midterm exam
8	Complex planes
9	Complex plane conversion techniques
10	Complex plane conversion techniques
11	Conformal Mapping Applications
12	Conformal Mapping Applications
13	Conformal Mapping Applications
14	Conformal Mapping Applications

Materials

Materials are not specified.

Resources

Resources	Resources Language
1. E. KREYSZIG, “Advanced Engineering Mathematics”, John Wiley and Sons, Inc.	English
2. Bekir KARAOĞLU, “Fizik ve Mühendislikte Matematik Yöntemler”, Güven Yayınları.	Türkçe
3. Prof. Dr. Mehmet AYDIN vs, “Diferansiyel Denklemler ve Uygulamaları”, Barış Yayınları.	Türkçe

Course Assessment

Assesment Methods	Percentage (%)	Assesment Methods Title
Final Exam	50	Final Exam
Midterm Exam	50	Midterm Exam

L+P: Lecture and Practice
PQ: Program Learning Outcomes
LO: Course Learning Outcomes

Prospective Student