Information Package / Course Catalogue
Numerical Method Of Heat Conduction
Course Code: ZTM622
Course Type: Area Elective
Couse Group: Third Cycle (Doctorate Degree)
Education Language: Turkish
Work Placement: N/A
Theory: 3
Prt.: 0
Credit: 3
Lab: 0
ECTS: 6
Objectives of the Course

Solutions of algebraic equation systems, gaus elimination method, gaus seidel repetition method, solution of linear equation systems by matrix method, finite difference method, solution of one dimensional heat conduction in continuous regime with finite difference method, solution of two dimensional heat conduction in continuous regime with finite difference method, discontinuous method solution of one dimensional heat conduction by finite difference method in open regime, open method, closed method, solution of two dimensional heat conduction in discontinuous regime by means of artificial difference method, thermal resistance and capacity, finite difference method for moving boundary problems, boundary conditions, Crank-Nicholson method, finite differences errors in network solutions.

Course Content

Solutions of algebraic equation systems, gaus elimination method, gaus seidel repetition method, solution of linear equation systems by matrix method, finite difference method, solution of one dimensional heat conduction in continuous regime with finite difference method, solution of two dimensional heat conduction in continuous regime with finite difference method, discontinuous method solution of one dimensional heat conduction by finite difference method in open regime, open method, closed method, solution of two dimensional heat conduction in discontinuous regime by means of artificial difference method, thermal resistance and capacity, finite difference method for moving boundary problems, boundary conditions, Crank-Nicholson method, finite differences errors in network solutions.

Name of Lecturer(s)
Learning Outcomes
1.Mastery of numerical methods
2. To be able to use numerical methods in heat conduction
3.Solutions of algebraic equations
4.Solution of linear equation systems by matrix method,
5. Finite difference method for moving boundary problems
Recommended or Required Reading
1.Çengel, Y. (2011). Isı ve kütle transferi . İstanbul: Güven Yayın.
Weekly Detailed Course Contents
Week 1 - Theoretical
Entrance
Week 2 - Theoretical
Solutions of algebraic equations
Week 3 - Theoretical
Gaus destruction method
Week 4 - Theoretical
Gaus destruction method
Week 5 - Theoretical
Solution of linear equation systems by matrix method,
Week 6 - Theoretical
Finite difference method
Week 7 - Theoretical
Finite difference method
Week 8 - Theoretical
Solution of one dimensional heat conduction in continuous regime by finite difference method
Week 9 - Theoretical
Solution of one dimensional heat conduction in continuous regime by finite difference method
Week 10 - Theoretical
Solution of one dimensional heat conduction in discontinuous regime by finite difference method,
Week 11 - Theoretical
Thermal resistance and capacity
Week 12 - Theoretical
Finite difference method for moving boundary problems
Week 13 - Theoretical
Boundary conditions, Crank-Nicholson method
Week 14 - Theoretical
Boundary conditions, Crank-Nicholson method
Assessment Methods and Criteria
Type of AssessmentCountPercent
Midterm Examination1%30
Final Examination1%70
Workload Calculation
ActivitiesCountPreparationTimeTotal Work Load (hours)
Lecture - Theory144398
Assignment53540
Midterm Examination1336
Final Examination1336
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
PÇ-8
PÇ-9
PÇ-10
PÇ-11
PÇ-12
OÇ-1
4
4
5
OÇ-2
OÇ-3
5
5
5
OÇ-4
OÇ-5
4
4
4
Adnan Menderes University - Information Package / Course Catalogue
2026