DI Method in Integration by Parts

To break the integral into two parts: one to differentiate and one to integrate.

To use substitution to simplify the integral.

To find the antiderivative directly.

To use numerical methods for integration.

Because the integral involves a trigonometric function.

Because the derivative of the inside function is not a constant.

Because substitution only works for polynomial functions.

Because the integral is already in its simplest form.

cos(3x)

-(1/3)cos(3x)

(1/3)cos(3x)

-cos(3x)

Continue differentiating.

Switch to integration.

Restart the process.

Stop the process.

Because ln(x) cannot be differentiated.

Because ln(x) is a polynomial function.

Because differentiating ln(x) is easier than integrating it.

Because integrating ln(x) is straightforward.

(1/4)x^5

4x^5

(1/5)x^5

5x^4

You switch to differentiation.

You continue integrating.

You restart the process.

You stop the process.