Midterm
- A Introduction of Basic Ordinary Differential Equation Concept
- Separable First-Order ODEs, Exact ODEs, Integrating factors, and Linear ODEs
- Second-Order Linear ODEs: Homogeneous Linear ODEs with Constant Coefficient, CharacteristicEquation and Euler-Cauchy Equations
- Second-Order Linear ODEs: Non-homogeneous ODEs and Solution of variation of parameter
- Higher-Order Linear Differential Equations with Constant Coefficients and with Variable Coefficients
- System of ODEs: Constant Coefficient System
- A Introduction of Basic Ordinary Differential Equation Concept
- Separable First-Order ODEs, Exact ODEs, Integrating factors, and Linear ODEs
- Second-Order Linear ODEs: Homogeneous Linear ODEs with Constant Coefficient, CharacteristicEquation and Euler-Cauchy Equations
- Second-Order Linear ODEs: Non-homogeneous ODEs and Solution of variation of parameter
- Higher-Order Linear Differential Equations with Constant Coefficients and with Variable Coefficients
- System of ODEs: Constant Coefficient System
- Introduction to Laplace Transforms: s-Shifting Theory and Transform of Derivative
- Laplace Transforms for solving Differential Equation
- Laplace transform of Integral and Unit Step Function
- Laplace Transforms: Convolution, Differentiation and Integration of Transforms and System of ODES
- Introduction to Fourier Series, Fourier Cosine Series, Fourier Sine Series
- Partial Differential Equation, Numerical Solution of Differential Equations: The Finite Difference Method and The Taylor Series Expansion
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