Course Information
Course Unit Title 
: 
Introduction to Mathematical Physics 
Course Unit Code 
: 
01FZK5103 
Type of Course Unit 
: 
Compulsory 
Level of Course Unit

: 
Second Cycle 
Year of Study

: 
Preb 
Semester

: 
255.Semester 
Number of ECTS Credits Allocated

: 
6,00 
Name of Lecturer(s) 
: 


Course Assistants 
: 

Learning Outcomes of The Course Unit 
: 
1) Using of mathematical knowledges in physical problems. 2) Using of orthogonal functions in physics. 3) Adaptation to mathematical models of physical problems. 4) ) Using of mathematical methods for solving of physical problems. 5) To define a problem and propose a solution for it, and to solve the problem, evaluate the results and apply them if it necessery in area of practice.

Mode of Delivery 
: 
FaceToFace

Prerequisities and Corequisities Courses 
: 
Unavailable

Recommended Optional Programme Components 
: 
Unavailable

Course Contents 
: 
Review of limit, and derivative and integral techniques. İmproper integrals: Gamma and betha integrals. Eigenvalues and eigenvectors of matrices. Diagonalisation of matrices. Orthogonal and unitary transformations. Orthogonal series expansion. Trigonometric and complex Fourier series. Fourier transform. Orthogonal coordinate systems and coordinates transforms. İntroduction to tensors. Curvilinear orthogonal coordinate systems. Complex functions.

Languages of Instruction 
: 
Turkish

Course Goals 
: 

Course Aims 
: 
Understanding of mathematical knowledges in physics.

WorkPlacement 

Not Available


Recommended or Required Reading
Textbook

: 
Lecture notes.

Additional Resources

: 
1. Mathematical methods for Physicists ?G. B. Arfken and H. J. Weber? Academic Press, 2000.
2. Advanced Mathematics for Eng. And Scientists, Murray R. Spiegel. McGrawHill Book Comp. 1983.

Material Sharing
Documents

: 

Assignments

: 
%50

Exams

: 
%50

Additional Material

: 


Planned Learning Activities and Teaching Methods
Lectures, Practical Courses, Presentation, Seminar, Project, Laboratory Applications (if necessary)


ECTS / Table Of Workload (Number of ECTS credits allocated)
Student workload surveys utilized to determine ECTS credits.

Activity

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Course Duration (Excluding Exam Week)

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Time Of Studying Out Of Class

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Homeworks

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Presentation

:


Project

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Lab Study

:


Field Study

:


Visas

:


Finals

:


Workload Hour (30)

:


Total Work Charge / Hour

:


Course's ECTS Credit

:



Assessment Methods and Criteria
Studies During Halfterm

: 

Visa

: 

Quiz

: 

Homework

: 

Attendance

: 

Application

: 

Lab

: 

Project

: 

Workshop

: 

Seminary

: 

Field study

: 




TOTAL

: 

The ratio of the term to success

: 

The ratio of final to success

: 

TOTAL

: 


Weekly Detailed Course Content
Week

Topics

1

Review of limit, and derivative and integral techniques.



2

İmproper integrals: Gamma and betha integrals.



3

İmproper integrals: Gamma and betha integrals.



4

Eigenvalues and eigenvectors of matrices. Diagonalisation of matrices.



5

Orthogonal and unitary transformations.



6

Orthogonal series expansion.



7

Complex functions.



8

Trigonometric and complex Fourier series.



9

Midterms



10

Fourier transform.



11

Orthogonal coordinate systems and coordinates transforms.



12

İntroduction to tensors.



13

İntroduction to tensors.



14

Curvilinear orthogonal coordinate systems.























































































