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Course Information

Course Name
Turkish Mühendislik Matematiği 2020
English Mühendislik Matematiği (Engineering Mathematics) 2020
Course Code
UUM 535E Credit Lecture
(hour/week)
Recitation
(hour/week)
Laboratory
(hour/week)
Semester 1
3 3 - -
Course Language English
Course Coordinator Mehmet Şahin
Course Objectives Introduce graduate student to the applications of linear systems and complex analysis methods in engineering problems.
Course Description Vectors and vectors spaces; Matris representation and system of linear equations; Eigenvalue problems; Spectral decomposition; Characteristic and minimal polynomials; Inner product spaces and orthogonality; Orthogonal and Hermitian matrices; Hilbert spaces; Fourier series and transform; Laplace transform; Limit, continuity and differentiability of functions of a complex variable; Cauchy-Riemann equations; Complex integration and Cauchy’s theorem; Taylor and Laurent series; Residue theorem; Complex mapping and its application to boundary value problems; Vector differential and integral calculus; Numerical mathematics.
Course Outcomes M.Sc./Ph.D. students who successfully pass this course gain knowledge, skill and competency in the following subjects;
1. Able use basic vector and matrix operations
2. Able to reduce a matrix into a row-reduced echelon form
3. Able to compute eigenvalues and eigenvectors of a matrix
4. Able to apply Fourier transform to a periodic function and use Fourier transform
5. Able to use Laplace transform
6. Able to compute complex line integrals
7. Able to use complex mapping for some boundary value problems
8. Able to use Gauss divergence theorem, Stokes’ theorem, Green theorem
9. Able to apply numerical methods for engineering problems
Pre-requisite(s) SHOULD ATTEND AT LEAST 70 PER CENT OF THE SCHEDULED COURSE OR RECEIVE A GRADE OF 70/100 OR ABOVE FROM THE MID-TERM EXAM.
Required Facilities
Other
Textbook
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