The differential equation must be linear and homogeneous.

The differential equation must have constant coefficients.

The differential equation must be nonhomogeneous with continuous functions.

The differential equation must be of first order.

Find the particular solution directly.

Calculate the Wronskian.

Determine the coefficients of the differential equation.

Solve the corresponding homogeneous differential equation.

Add an extra factor of x to one of the terms.

Multiply the roots by a constant.

Use the roots directly in the exponential form.

Use only one root in the solution.

To solve the characteristic equation.

To find the particular solution.

To verify the linear independence of solutions.

To determine the coefficients of the differential equation.

Power rule

Quotient rule

Chain rule

Product rule

Calculate the Wronskian.

Find the complementary function.

Integrate the expressions.

Solve the characteristic equation.

By differentiating the particular solution.

By integrating the homogeneous solution.

By solving the characteristic equation.

By adding the complementary function and the particular solution.