Solving Differential Equations Steps

Integrating both sides of the equation

Solving for the particular solution

Rewriting the equation in standard form

Finding the integrating factor

As the derivative of y

As the coefficient of y

As the integrating factor

As the constant term

2x

ln(x)

x^2

e^(2x)

Subtracting the integrating factor from both sides

Adding the integrating factor to both sides

Multiplying both sides by the integrating factor

Dividing both sides by the integrating factor

The derivative of the product of the integrating factor and y

The integral of the product of the integrating factor and y

The sum of the integrating factor and y

The difference between the integrating factor and y

The integrating factor

A new differential equation

The general solution

The particular solution

To transform the equation into an exact differential

To find the particular solution directly

To simplify the equation to a standard form

To eliminate the constant term

By integrating the general solution

By substituting the initial condition into the general solution

By differentiating the general solution

By multiplying the general solution by the integrating factor

c = -1

c = 2

c = 0

c = 1

y = x^2 - c/x^2

y = x^2 + c/x^2

y = x^2 - 1/x^2

y = x^2 + 1/x^2