Information Package / Course Catalogue
Advanced Engineering Mathematics
Course Code: EEE503
Course Type: Area Elective
Couse Group: Second Cycle (Master's Degree)
Education Language: Turkish
Work Placement: N/A
Theory: 3
Prt.: 0
Credit: 3
Lab: 0
ECTS: 6
Objectives of the Course

To help engineering students complete their mathematical background necessary in graduate level researches.

Course Content

Ordinary differential equations and differential equation systems, series solution of ordinary differential equations (power series method, Legendre and Bessel equations, Frobenius method), Laplace transform, applications of engineering problems, Fourier Analysis and partial differential equations, Fourier Series, partial differential equations and Fourier series solutions, wave and heat equations, complex analysis, complex integration, complex numbers and functions, power series, conformal mapping, conformal transformations

Name of Lecturer(s)
Learning Outcomes
1.To be able to formulize and solve physical problems
2.To be able to construct mathematical relations and analyze the results
3.To be able to understand the mathematical methods used in engineering applications.
4.To be able to discuss the mathematical methods used in engineering applications.
5.To be able to apply the mathematical methods used in engineering applications.
Recommended or Required Reading
1.Erwin Kreyszig, Advanced Engineering Mathematics Seventh Edition, Wiley (2006)
2.W.E. Boyce & R.C. DiPrima, Elementary Differential Equations and Boundary Value Problems Eighth Edition, (2005).
3.Lecturer’s lecture Notes
Weekly Detailed Course Contents
Week 1 - Theoretical
Review of homogenous and non-homogenous, constant coefficient ordinary differential equations and differential equation systems
Week 2 - Theoretical
Review of ordinary differential equations and their solutions
Week 3 - Theoretical
Systems of differential equations and their solutions
Week 4 - Theoretical
Science&Engineering applications of ordinary differential equations (forced oscillatory motion, R-L-C circuits, and circuit systems, etc.)
Week 5 - Theoretical
Science&Engineering applications systems of differential equation systems (problems in mechanics, rate&speed change problems of physical quantities, DC/AC circuit solutions, etc.)
Week 6 - Theoretical
Fourier series, Fourier expansion, Science and engineering applications
Week 7 - Theoretical
Fourier and Laplace transform
Week 8 - Theoretical
Review-Midterm Exam
Week 9 - Theoretical
Science and engineering applications of Fourier and Laplace transform
Week 10 - Theoretical
Sturm-Liouville theory
Week 11 - Theoretical
Eigenvalue problems and Science&engineering applications
Week 12 - Theoretical
Infinite series and convergence tests
Week 13 - Theoretical
Power series, Taylor series and Binomial expansions
Week 14 - Theoretical
Power series solutions of differential equations
Assessment Methods and Criteria
Type of AssessmentCountPercent
Assignment2%10
Term Assignment1%5
Midterm Examination1%15
Final Examination1%70
Workload Calculation
ActivitiesCountPreparationTimeTotal Work Load (hours)
Lecture - Theory143384
Assignment25316
Term Project110212
Midterm Examination110212
Final Examination124226
TOTAL WORKLOAD (hours)150
Contribution of Learning Outcomes to Programme Outcomes
PÇ-1
PÇ-2
PÇ-3
PÇ-4
PÇ-5
PÇ-6
PÇ-7
OÇ-1
4
5
4
4
5
4
4
OÇ-2
5
5
5
4
4
5
4
OÇ-3
4
4
4
5
5
4
4
OÇ-4
5
5
4
4
4
4
4
OÇ-5
5
5
4
4
4
4
4
Adnan Menderes University - Information Package / Course Catalogue
2026