COURSE INFORMATON
Course Title Code Semester L+P Hour Credits ECTS
Mathematics for Physics FZ   238 4 4 4 7

Prerequisites and co-requisites
Recommended Optional Programme Components None

Language of Instruction Turkish
Course Level First Cycle Programmes (Bachelor's Degree)
Course Type
Course Coordinator Prof. Dr. Hamide KAVAK
Instructors
Prof. Dr.AYŞE POLATÖZ1. Öğretim Grup:A
Prof. Dr.AYŞE POLATÖZ2. Öğretim Grup:A
 
Assistants
Goals
As all applied sciences, build a bridge between courses equire the use of a high level and a heavier mathematics in the physics disciplines as well
Content
omplex analysis; Complex numbers, algebra of complex numbers Complex plane and polar form of complex numbers De Moivre formula, Euler formula Region in complex plane, basic complex functions, mapping of complex functions Analytical functions, derivative, limit and continuity, Cauchy-Riemann equation, Harmonic functions. İntegral in complex plane and series Cauchy thaorem Basic formulas for integral calculation, Cauchy integral formula Series expansion of analytic functions Residue theorem, techniques to calculate Residue and calculation of integrals

Learning Outcomes
1) Defines the complex numbers, makes the four operations
2) define regions in the complex plane
3) define analytical function
4) Define and calculate the harmonic conjugate
5) take complex integral