GAZI UNIVERSITY INFORMATION PACKAGE - 2019 ACADEMIC YEAR

COURSE DESCRIPTION
APPLIED MATHEMATICS/4440028
Course Title: APPLIED MATHEMATICS
Credits 3 ECTS 7.5
Semester 1 Compulsory/Elective Elective
COURSE INFO
 -- LANGUAGE OF INSTRUCTION
  Turkish
 -- NAME OF LECTURER(S)
  Prof.Dr. Ziya ARGÜN
 -- WEB SITE(S) OF LECTURER(S)
  www.gazi.edu.tr/~ziya
 -- EMAIL(S) OF LECTURER(S)
  ziya@gazi.edu.tr
 -- LEARNING OUTCOMES OF THE COURSE UNIT
Students should be able to obtain and use some formulas which are used in Physical Siences and Engineering by differential calculus and complex variab
 -- MODE OF DELIVERY
  The mode of delivery of this course is Face to face
 -- PREREQUISITES AND CO-REQUISITES
  There is no prerequisite or co-requisite for this course.
 -- RECOMMENDED OPTIONAL PROGRAMME COMPONENTS
  There is no recommended optional programme component for this course.
 --COURSE CONTENT
1. Week  Construct ideas about solving current problems like physic, chemistry, biology arise from Physical Siences and Engineering
2. Week  Vectorial differential calculus
3. Week  Complex variable and it's applications
4. Week  integrals on curve and surface
5. Week  integral theorems
6. Week  Taylor and Laurent series and applications
7. Week  Complex integrals on curves and applications, Series and Convolution, Fourier Integrals
8. Week  Mid-term examination
9. Week  Numerical Methods
10. Week   Linear and Nonlinear Equations, Orthogonalization and Eigenvalue ProblemsInitial-Value Problems
11. Week   (Ordinary Differential Equations, Stability and the Phase Plane and Chaos)
12. Week  Combinatorics (Spanning Trees and Shortest Paths, The Marriage Problem)
13. Week  Optimization
14. Week  Introduction to Linear Programming, The Simplex Method and Karmarkar's
15. Week  End-term examination
16. Week  
 -- RECOMMENDED OR REQUIRED READING
  A. Altın, Uygulamalı Matematik Ders Notları B.İ. Yaşar, Uygulamalı Matematik E. Altan, Yüksek Matematiğe Giriş I ve II E. C. Young, Vector and Tensor Analysis N. Piskunov, Differential and Integral Calculus B.M.Budak-S.V.Fomin, Multiple Integrals Field Theory and Series M. R. Spiegel, Advanced Calculus (Schaum's Outline Series) B. J. Rice, Applied Analysis for Physics and Engineers C.R.Wylie, Advanced Engineering Mathematics M.R. Spiegel, Laplace Transforms (Schaum's Outline Series)
 -- PLANNED LEARNING ACTIVITIES AND TEACHING METHODS
  Lecture, Question & Answer, Demonstration, Drill - Practise
 -- WORK PLACEMENT(S)
  -
 -- ASSESSMENT METHODS AND CRITERIA
 
Quantity
Percentage
 Mid-terms
1
40
 Assignment
0
0
 Exercises
0
0
 Projects
0
0
 Practice
0
0
 Quiz
0
0
 Contribution of In-term Studies to Overall Grade  
40
 Contribution of Final Examination to Overall Grade  
60
 -- WORKLOAD
 Efficiency  Total Week Count  Weekly Duration (in hour)  Total Workload in Semester
 Theoretical Study Hours of Course Per Week
14
4
56
 Practising Hours of Course Per Week
14
2
28
 Reading
14
1
14
 Searching in Internet and Library
14
1
14
 Designing and Applying Materials
7
2
14
 Preparing Reports
0
 Preparing Presentation
4
5
20
 Presentation
1
2
2
 Mid-Term and Studying for Mid-Term
1
20
20
 Final and Studying for Final
1
20
20
 Other
0
 TOTAL WORKLOAD: 
188
 TOTAL WORKLOAD / 25: 
7.52
 ECTS: 
7.5
 -- COURSE'S CONTRIBUTION TO PROGRAM
NO
 PROGRAM LEARNING OUTCOMES
1
2
3
4
5
1X
2X
3X
4X
5X
6X
7X
8X
9X
10X