The course follows the book Differential Equations with Boundary-Value Problems by D. G. Zill, and W. S. Wright, 8th Ed, Cengage Learning, 2012
The other usefull sources, which were helpful to prepare my notes:
- Ordinary Differential Equations (Dover Books on Mathematics) by Morris Tenenbaum, Harry Pollard
- James Stewart's Calculus
- Paul's Online Math Notes
- Dr. Howell's Lecture Notes
- S. O. S. Mathematics
By Miroslav Stibor, Zaman University. You can get all the below chapters in one PDF (5 MB):
List of chapters
First order DE
- Introduction to differential equations
- Solution by separating variables
- Solution of linear DE
- Solution of exact (total) DE
- Solution by substitution
- Numerical method to solve first order DE (Euler's method)
Modeling with first order DE
Higher order DE
- Introduction to higher order linear DE
- Homogeneous linear DE
- Reduction of order method (for higher order linear DE with non-constant coefficients)
- Homogeneous linear DE with constant coefficients
- Nonhomogeneous linear DE with constant coefficients: Undetermined coefficients to find $y_p()$
- Variation of parameters method to find $y_p()$ from $y_c()$
- Cauchy-Euler equation (a special type of linear DE with non-constant coefficients)
- System of linear DE with constant coefficients (by means of operator $D$)
- Nonlinear DE of higher order (substitution $u=y'$, Taylor series)
Modeling with higher order DE
Series solution of DE
The Laplace Transform
- Definition of the Laplace Transform
- Solving DE with the Laplace Transform
- Additional properties and operations
- Solving partial DE using Laplace transform
