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COURSE INFORMATION
Course CodeCourse TitleL+P HourSemesterECTS
MAT 508NUMERICAL SOLUTIONS OF INTEGRAL EQUATIONS3 + 01st Semester7,5

COURSE DESCRIPTION
Course Level Master's Degree
Course Type Elective
Course Objective The aim of this course is to present numerical solution methods for the integral equations, which have an important role in science and engineering.
Course Content The numerical solutions of Fredholm and Volterra integral equations, The Methods dependent on the numerical integration, Block-by-block Methods, Runge-Kutta Methods, Taylor and Chebyshev Expansion Methods.
Prerequisites No the prerequisite of lesson.
Corequisite No the corequisite of lesson.
Mode of Delivery Face to Face

COURSE LEARNING OUTCOMES
1Finds the numerical solutions of Fredholm and Volterra integral equations.
2Learns the Methods dependent on the numerical integration.
3Knows the Block-by-block Methods, Runge-Kutta Methods, Taylor and Chebyshev Expansion Methods.

COURSE'S CONTRIBUTION TO PROGRAM
PO 01PO 02PO 03PO 04PO 05PO 06PO 07PO 08
LO 0015 45  45
LO 0024 44  5 
LO 0035 54  4 
Sub Total14 1313  135
Contribution50440042

ECTS ALLOCATED BASED ON STUDENT WORKLOAD BY THE COURSE DESCRIPTION
ActivitiesQuantityDuration (Hour)Total Work Load (Hour)
Course Duration (14 weeks/theoric+practical)14342
Hours for off-the-classroom study (Pre-study, practice)14798
Assignments155
Mid-terms11515
Final examination13535
Total Work Load

ECTS Credit of the Course






195

7,5
COURSE DETAILS
 Select Year   


 Course TermNoInstructors
Details 2023-2024 Fall1ALİ FİLİZ
Details 2021-2022 Spring1ALİ FİLİZ
Details 2010-2011 Spring1AYŞEGÜL DAŞCIOĞLU
Details 2009-2010 Spring1AYŞEGÜL DAŞCIOĞLU


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Course Details
Course Code Course Title L+P Hour Course Code Language Of Instruction Course Semester
MAT 508 NUMERICAL SOLUTIONS OF INTEGRAL EQUATIONS 3 + 0 1 Turkish 2023-2024 Fall
Course Coordinator  E-Mail  Phone Number  Course Location Attendance
Prof. Dr. ALİ FİLİZ alifiliz@pau.edu.tr FEN A0216 %
Goals The aim of this course is to present numerical solution methods for the integral equations, which have an important role in science and engineering.
Content The numerical solutions of Fredholm and Volterra integral equations, The Methods dependent on the numerical integration, Block-by-block Methods, Runge-Kutta Methods, Taylor and Chebyshev Expansion Methods.
Topics
WeeksTopics
1
2
3
4
5
6
7
8
9
10
11
12
13
14
Materials
Materials are not specified.
Resources
Course Assessment
Assesment MethodsPercentage (%)Assesment Methods Title
Final Exam50Final Exam
Midterm Exam50Midterm Exam
L+P: Lecture and Practice
PQ: Program Learning Outcomes
LO: Course Learning Outcomes