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Ders Tanımı

Ders Kodu Yarıyıl T+U Saat Kredi AKTS
DIFFERENTIAL EQUATIONS MAT 211 3 4 + 0 4 6
Ön Koşul Dersleri
Önerilen Seçmeli Dersler
Dersin Dili Türkçe
Dersin Seviyesi Lisans
Dersin Türü ZORUNLU
Dersin Koordinatörü Prof.Dr. ŞEVKET GÜR
Dersi Verenler Prof.Dr. UĞUR ARİFOĞLU
Dr.Öğr.Üyesi MEHMET SANDALCI
Doç.Dr. NEZAKET PARLAK
Dr.Öğr.Üyesi ZEKERİYA PARLAK
Prof.Dr. EKREM BÜYÜKKAYA
Dr.Öğr.Üyesi ALPER KİRAZ
Doç.Dr. YALÇIN YILMAZ
Prof.Dr. ÖMER FARUK GÖZÜKIZIL
Prof.Dr. ŞEVKET GÜR
Dr.Öğr.Üyesi ÜNAL UYSAL
Arş.Gör.Dr. ABDULLAH HULUSİ KÖKÇAM
Dr.Öğr.Üyesi FARROKH MAHNAMFAR
Öğr.Gör.Dr. EMİNE ÇELİK
Dersin Yardımcıları
Dersin Kategorisi
Dersin Amacı

The general pourpose of this course is to provide an understanding of ordinary differential equations (ODEs), and to give methods for solving them. Because differential equations express relationships between changing quantities, this material is applicable to many fields, and is essential for students of engineering and physical sciences.

Dersin İçeriği

Basic concepts and classifying differential equations, variable separated differential equations, Homogenous differential equations, exact differential equation, Integrator method, First order linear differential equations, finding solution for a linearized differential equations, Bernoulli differential equations, Ricatti differential equations, separation of variables, First order high degree differential equations, Singular solution of differential equations. Clairaut differential equation, Lagrange differential equation, Numeric solutions of differential equations, Taylor series method, Picard iteration method, Runge-Kutta method, High order linear differential equations, Criteria for linear independence, Solution of high order, one side, constant coefficient linear differential  equation. Undetermined coefficients method, Exchange of Lagrange constants method. General solution of Euler differential equations. Decreasing the degree of a differential equation. Solution of constant coefficient differential equation with operator method. Linear differential equations. State equations. Solutions of differential equations with one side. Solution of differential equation systems with Eigen characteristic equation. Laplace conversion. Laplace transformation of derivatives. Methods of separation to basic fractions. Reverse Laplace transformation. Solution of constant coefficient linear differential equations with Laplace transformation. Convolution. Application of Convolution theorem to integral equations. Laplace transformation of periodic functions. Solution of partial derivative differential equations with Laplace transformation. Laplace transformation of step functions. Laplace transformation of impulse functions. Solution of differential equations with series. Bessel functions. Gamma function.

Dersin Öğrenme Çıktıları Öğretim Yöntemleri Ölçme Yöntemleri
1 - Understands the terminology about the differential equations. 1 - 2 - 3 - 4 - A - C -
2 - Verify that a given function is solution of a differential equation 1 - 2 - 4 - A - C -
3 - Solve problems of ordinary differential equations and system of differential equations 1 - 2 - 3 - 4 - 15 - A - C -
4 - Apply knowledge of differential equations in order to solve real-world engineering problems 1 - 2 - 3 - 4 - 15 - A - C -
5 - 1 - 2 - 3 - 4 - 15 - A - C -
6 - 1 - 2 - 3 - 4 - 15 - A - C -
7 - 1 - 2 - 3 - 4 - 15 - A - C -
Öğretim Yöntemleri: 1:Lecture 2:Question-Answer 3:Discussion 4:Drilland Practice 15:Problem Solving
Ölçme Yöntemleri: A:Testing C:Homework

Ders Akışı

Hafta Konular ÖnHazırlık
1 Basic Concepts and Classifying Differential Equations. Obtaining differential equations. Separable differential equations. Engineering applications.
2 Homogeneous functions, homogenous differential equations. Exact differential equations and engineering applications.
3 Non-Linear First Order linear Equations. Integration factor method. Change of variables method. Change of Lagrange variables method. Engineering Applications.
4 Solution of differential equations by changing to the linear form. Bernoulli differential equation. Ricatti differential equation. Engineering applications.
5 Second-Order Linear Equations: Linear Independence, Homogeneous Equations with Constant Coefficients
6 General solution of high order one sided, constant coefficient linear differential equations. Criteria of linear independence. Wronski determinant. Engineering applications.
7 General solution of high order two sided, constant coefficient linear differential equations. Undetermined coefficients method. LSD method. Engineering applications.
8 Euler differential equations. Decreasing the degree of a differential equation. Solution of constant coefficient differential equation with operator method.
9 Mid-Term Exam
10 Introduction to differential equation systems. Linear differential equation systems. Solution of one sided linear differential equation systems. Eigen characteristic equation. Engineering applications.
11 Solution of one sided linear differential equations. Undetermined coefficients method. Change of Lagrange constants method. Engineering applications.
12 Laplace transformation, Laplace transformation of derivati.ve. Reverse Laplace transformation. Separation of basic fractions. Engineering applications.
13 Laplace Transform Method
14 Solution of differential equations with series. Bessel functions. Gamma function.

Kaynaklar

Ders Notu

Çengel, Y. A. ve Palm, W. J. (Türkçesi: Tahsin Engin), 2012, Mühendisler ve Fen Bilimciler İçin Diferansiyel Denklemler, Güven Kitabevi, İzmir.

Ders Kaynakları

1. Türker, E. S. ve Başarır, M., 2003, Çözümlü Problemlerle Diferansiyel Denklemler, Değişim Kitabevi, Sakarya.
2. Bronson, R.,1993, Differantial Equations, Schaum´s Outlines, Nobel Kitabevi, Ankara.
3. Edwards, C. H.ve Penney, D. E., (Türkçesi: Ömer Akın) 2008, Diferansiyel Denklemler ve Sınır Değer Problemleri,Palme Yayıncılık.


Döküman Paylaşımı


Dersin Program Çıktılarına Katkısı

No Program Öğrenme Çıktıları KatkıDüzeyi
1 2 3 4 5
1 Engineering graduates with sufficient theoretical and practical background for a successful profession and with application skills of fundamental scientific knowledge in the engineering practice X
2 Engineering graduates with skills and professional background in describing, formulating, modeling and analyzing the engineering problem, with a consideration for appropriate analytical solutions in all necessary situations X
3 Engineering graduates with the necessary technical, academic and practical knowledge and application confidence in the design and assessment of machines or mechanical systems or industrial processes with considerations of productivity, feasibility and environmental and social aspects.
4 Engineering graduates with the practice of selecting and using appropriate technical and engineering tools in engineering problems, and ability of effective usage of information science technologies
5 Ability of designing and conducting experiments, conduction data acquisition and analysis and making conclusions
6 Ability of identifying the potential resources for information or knowledge regarding a given engineering issue
7 The abilities and performance to participate multi-disciplinary groups together with the effective oral and official communication skills and personal confidence
8 Ability for effective oral and official communication skills in Turkish Language and, at minimum, one foreign language
9 Engineering graduates with motivation to life-long learning and having known significance of continuous education beyond undergraduate studies for science and technology
10 Engineering graduates with well-structured responsibilities in profession and ethics
11 Engineering graduates who are aware of the importance of safety and healthiness in the project management, workshop environment as well as related legal issues

Değerlendirme Sistemi

YARIYIL İÇİ ÇALIŞMALARI SIRA KATKI YÜZDESİ
AraSinav 1 75
KisaSinav 1 10
KisaSinav 2 10
Odev 1 5
Toplam 100
Yıliçinin Başarıya Oranı 50
Finalin Başarıya Oranı 50
Toplam 100

AKTS - İş Yükü

Etkinlik Sayısı Süresi(Saat) Toplam İş yükü(Saat)
Course Duration (Including the exam week: 16x Total course hours) 16 4 64
Hours for off-the-classroom study (Pre-study, practice) 16 3 48
Mid-terms 1 5 5
Quiz 2 4 8
Assignment 1 10 10
Final examination 1 10 10
Toplam İş Yükü 145
Toplam İş Yükü /25(s) 5.8
Dersin AKTS Kredisi 5.8
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