# GAZI UNIVERSITY INFORMATION PACKAGE - 2019 ACADEMIC YEAR

COURSE DESCRIPTION
ANALYTIC METHODS IN CIVIL ENGINEERING/5011308
 Course Title: ANALYTIC METHODS IN CIVIL ENGINEERING Credits 3 ECTS 7.5 Course Semester 1 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
Understand analytical methods,
Formulate engineering problems,
Solve differential equations,
Use analytical methods in engineering applications.
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-- MODE OF DELIVERY
The mode of delivery of this course is face to face.
 --WEEKLY SCHEDULE 1. Week Introduction to Ordinary Differential Equations, Solution Functions, Linear Dependence, Wronskian Determinant 2. Week First order differential equations, linear Bernoulli equation, derivative notations, solutions of constant coefficient differential equations, solutio 3. Week Method of change of parameters, Euler equation and its solution 4. Week Applications of differential equations, buckling of columns under different boundary conditions, Vibration problem 5. Week Formulation and solution of governing differential equation for mass conservation and stable laminar flow in circular pipe 6. Week Formulation and solution of governing differential equation for flexible beams, Newton's cooling law, Fourier's law, governing differential equation 7. Week 1st Midterm Examination 8. Week Laplace transform, transformations for derivative and integral, solution of initial value problems 9. Week Partial fraction expansion, Heaviside function and applications in differential equation solution 10. Week Convolution and its application in the solution of differential equations, Dirac delta function 11. Week Differential equation systems, homogeneous equation systems with constant coefficients 12. Week Solution of differential equation systems, operator method in linear differential equation systems 13. Week Midterm Exam 14. Week Power series, Taylor series, Analytic function, Series solutions of differential equations 15. Week Singularity points and Frobenius Method 16. Week -
-- TEACHING and LEARNING METHODS
-- ASSESSMENT CRITERIA
 Quantity Total Weighting (%) Midterm Exams 2 80 Assignment 0 20 Application 0 0 Projects 0 0 Practice 0 0 Quiz 0 0 Percent of In-term Studies 50 Percentage of Final Exam to Total Score 50