# GAZI UNIVERSITY INFORMATION PACKAGE - 2019 ACADEMIC YEAR

COURSE DESCRIPTION
DIFFERANTIAL EQUATIONS II/MAT298
 Course Title: DIFFERANTIAL EQUATIONS II Credits 3 ECTS 3 Course Semester 4 Type of The Course Elective
COURSE INFORMATION
-- (CATALOG CONTENT)
-- (TEXTBOOK)
-- (SUPPLEMENTARY TEXTBOOK)
-- (PREREQUISITES AND CO-REQUISITES)
-- LANGUAGE OF INSTRUCTION
Turkish
-- COURSE OBJECTIVES
-- COURSE LEARNING OUTCOMES
1. Finding the serial solution of differential equations
To learn the application of differential equations to physics.
Find properties and solutions of Bessel differential equation.
Find properties and solutions of Bessel differential equation.

-- MODE OF DELIVERY
The mode of delivery is face to face
 --WEEKLY SCHEDULE 1. Week Linear differential equations with variable coefficients - Changing the dependent variable - Changing the independent variable - Factoriza 2. Week Non-linear differential equations with variable coefficients - Not including the dependent variable equations - Not including the independent 3. Week - Exact differential equations (Sarrus’s Method) - Homogeneous differential equations 4. Week Applications of physics for second order linear differential equations with constant coefficients 5. Week Applications of physics for second order linear differential equations with constant coefficients 6. Week Laplace transforms, Laplace transforms properties, Convolution theorem, the Dirac delta function 7. Week Inverse Laplace transform, Laplace transform to apply to the initial value problem 8. Week Power series, radius of convergence and interval of convergence, analytic functions, ordinary and singular points, series solutions for ordinary point 9. Week Method of Frobenius and Frobenius smooth singular points and Sequential Solution Method 10. Week Method of Frobenius and Frobenius smooth singular points and Sequential Solution Method 11. Week Beta and Gamma functions 12. Week Bessel's differential equation and Bessel functions 13. Week Bessel's differential equation and Bessel functions 14. Week Legendre differential equations and Legendre functions 15. Week 16. Week
-- TEACHING and LEARNING METHODS
-- ASSESSMENT CRITERIA
 Quantity Total Weighting (%) Midterm Exams 1 40 Assignment 0 0 Application 0 0 Projects 0 0 Practice 0 0 Quiz 0 0 Percent of In-term Studies 40 Percentage of Final Exam to Total Score 60