Kategorier: Alle - homogeneous - laplace

av Tyler Knudson 10 år siden

1301

How To Solve A Differential Equation

Solving differential equations involves several methods depending on the order and type of the equation. For first-order equations, the process begins by checking if the equation can be directly integrated.

How To Solve A Differential Equation

How To Solve A Differential Equation

Higher Order

Second Order Method
High Order Method

Homogeneous

System Method

System of DE's

Form the Characteristic Eq of the Matrix
Solve for the Eigenvalues

Plug in those Eigenvalues

Obatin Eigenvectors

Form the General Solution

Second Order?

Homogeneous?
Form The Characteristic Equation

Using the C.E's, Find its roots

Complex Imaginary Roots

Solution: y(t)=e^(At)(c1cosBt+c2sinBt)

Repeated Roots

Solution: y(t)=c1e^(r1t)+c2te^(r1t)

Real Roots

Solution: y(t)=c1e^(r1t)+c2e^(r2t)

Non-Homogeneous
Subtopic
First, Find the Homogenous Solution

Then Find the Particular Solution

Variation of Parameters Method

Undetermined Coefficeint Method

Any Order IVP

Use the Laplace
Solve for Y

Take the Inverse of the Laplace

Is it a First Order?

Can You Integrate Directly?
No: Is it Seperable?

Seperable?

No: Can you use the Integrating Factor Method?

Integrating Factor Method

What is the Integrating Factor?

Multiply by the Integrating Factor

Finally, Solve for Y

Yes: Integrate and solve for Y

Yes: Inegrate and solve for Y