Integration by U-substitution

Jose Llopis
Integration by U-substitution

Integration by U-substitution method

When the integrand is formed by a product (or a division, which we can treat like a product) it's recommended the use of the method known as integration by u-substitution, that consists in applying the following formula:

u-substitution formula

Even though it's a simple formula, it has to be applied correctly. Let's see a few tips on how to apply it well:

  • 1. Select u and dv correctly: as a rule, we will call u all powers and logarithms; and dv exponentials, fractions and trigonometric functions (circular functions).

  • 2. Don't change our minds about the selection: Sometimes we need to apply the method more than once for the same integral. When this happens, we need to call u the result of du from the first integral we applied the method to.

  • 3. Cyclic integrals: Sometimes, after applying integration by u-substitution twice we have to isolate the very integral from the equality we've obtained in order to resolve it. An example of this is example 3.


Examples

Example 1:

resolving integrals by u-substitution step by step

resolving integrals by u-substitution step by step

Notes: it's important to choose

x = u, so dx = du

because by doing so we're reducing the monomials degree (from 1 to 0). If we choose

x = dv, so v = x^2/2

we increase the degree (from 1 to 2) and we complicate the integral more because the exponential factor remains the same.


Example 2:

resolving integrals by u-substitution step by step

In this integral we don't have an explicit product of functions, but we don't know what the logarithms primitive function is, so we differentiate it, that way u = ln(x).

resolving integrals by u-substitution step by step


Example 3 (cyclic integral):

resolving integrals by u-substitution step by step

In this example it doesn't matter which factors are u and dv, because when integrating and differentiating e -x we obtain –e -x and when integrating and differentiating cos(x) we get ±sin(x). This is a cyclical integral in which we have to apply integration by u-substitution twice (with the same choices so we don't go backwards) and we have to isolate the integral from the mathematical expression we obtain.

resolving integrals by u-substitution step by step


More examples: U-substitution method.

Creative Commons License
Matesfacil.com by J. Llopis is licensed under a Creative Commons Attribution-NonCommercial 4.0 International License.