To find a particular solution to a non-homogeneous differential equation

To solve linear first-order homogeneous differential equations

To determine the stability of a differential equation

To solve linear algebraic equations

Find the Wronskian of the solutions

Integrate to find the particular solution

Solve the corresponding homogeneous differential equation

Use Laplace transforms to find the solution

To calculate the Wronskian

To determine the nature of the roots

To find the particular solution

To solve algebraic equations

R = 1 and R = -2

R = 0 and R = 3

R = -1 and R = 1

R = 2 and R = -1

To calculate the characteristic equation

To determine the linear independence of solutions

To find the particular solution

To solve the homogeneous equation

The characteristic equation

The Wronskian

The complementary function

The original non-homogeneous function

Y(x) = C1 * e^(2x) + C2 * e^(-x) + 1/4 * e^(3x)

Y(x) = C1 * e^(x) + C2 * e^(-2x) + 1/3 * e^(3x)

Y(x) = C1 * e^(2x) + C2 * e^(x) + 1/3 * e^(3x)

Y(x) = C1 * e^(3x) + C2 * e^(x) + 1/4 * e^(2x)