Linear Systems and Differential Equations

Multiple equations with multiple dependent variables

A system with only independent variables

A single equation with one dependent variable

An equation with no dependent variables

Dependent variables

Constants

Independent variables

Coefficients

To simplify the equations

To determine the independent variable

To eliminate dependent variables

To find a unique solution

Partial fraction decomposition

Separation of variables

Integration by parts

Laplace transform

e^(-x)

ln(x)

e^(x)

x^2

By using the initial condition for y1

By integrating y1

By setting y1 equal to zero

By differentiating y1

C1 x + C2 e^(-x)

C1 e^x + C2 x

C1 e^(2x) + C2 e^x

C1 e^x + C2 e^(-x)

Because it has multiple solutions

Because it has no nonlinear functions

Because it involves quadratic terms

Because it includes exponential functions

They can include terms like x^2

They have dependent variables in nonlinear functions

They always have a unique solution

They do not have powers higher than one

Solving nonlinear equations

Applying numerical methods

Exploring quadratic systems

Understanding the complexity of systems