Question

Each DE in Problemsis a Bernoulli equation. In Problemssolve the given differential equation by using an appropriate substitution.

Short answer

Answer:

The solution of the given differential equation is

Step-by-step solution

Define substitution method for differentiation.

Often, the first step in solving a differential equation is to use a substitution to change it into another differential equation. In the differential equation , if can any real number, it is called a Bernoulli’s equation. If and , Bernoulli’s equation is linear. If and , the substitution reduces Bernoulli’s equation to a linear equation.

Find the derivative of the function using chain rule.

Expand and rearrange the equation into the standard form. Divide the equation on both sides by .

………. (1)

Let, and take the derivative ofwith respect to.

Define the derivative of the function using the chain rule as shown below.

Substitute the values of and in equation (1).

Separate the variables and integrate the function.

Let the integrating factor be,

Integrate on both sides.

Substituteforinto the above equation.

Thus, the solution of the given differential equation is.