5.5 Substitution

Calculus volume 1 Page 1 / 6

Use substitution to evaluate indefinite integrals.
Use substitution to evaluate definite integrals.

The Fundamental Theorem of Calculus gave us a method to evaluate integrals without using Riemann sums. The drawback of this method, though, is that we must be able to find an antiderivative, and this is not always easy. In this section we examine a technique, called integration by substitution , to help us find antiderivatives. Specifically, this method helps us find antiderivatives when the integrand is the result of a chain-rule derivative.

At first, the approach to the substitution procedure may not appear very obvious. However, it is primarily a visual task—that is, the integrand shows you what to do; it is a matter of recognizing the form of the function. So, what are we supposed to see? We are looking for an integrand of the form $f [g (x)] g^{'} (x) d x .$ For example, in the integral $\int {(x^{2} - 3)}^{3} 2 x d x,$ we have $f (x) = x^{3}, g (x) = x^{2} - 3,$ and $g' (x) = 2 x .$ Then,

f [g (x)] g^{'} (x) = {(x^{2} - 3)}^{3} (2 x),

and we see that our integrand is in the correct form.

The method is called substitution because we substitute part of the integrand with the variable u and part of the integrand with du . It is also referred to as change of variables because we are changing variables to obtain an expression that is easier to work with for applying the integration rules.

Substitution with indefinite integrals

Let $u = g (x),,$ where $g^{'} (x)$ is continuous over an interval, let $f (x)$ be continuous over the corresponding range of g , and let $F (x)$ be an antiderivative of $f (x) .$ Then,

\begin{matrix} \int f [g (x)] g^{'} (x) d x & = \int f (u) d u \\ = F (u) + C \\ = F (g (x)) + C . \end{matrix}

Proof

Let f , g , u , and F be as specified in the theorem. Then

\begin{matrix} \frac{d}{d x} F (g (x)) & = F^{'} (g (x)) g^{'} (x) \\ = f [g (x)] g^{'} (x) . \end{matrix}

Integrating both sides with respect to x , we see that

\int f [g (x)] g^{'} (x) d x = F (g (x)) + C .

If we now substitute $u = g (x),$ and $d u = g' (x) d x,$ we get

\begin{matrix} \int f [g (x)] g^{'} (x) d x & = \int f (u) d u \\ = F (u) + C \\ = F (g (x)) + C . \end{matrix}

□

Returning to the problem we looked at originally, we let $u = x^{2} - 3$ and then $d u = 2 x d x .$ Rewrite the integral in terms of u :

{\int \underset{u}{\underset{︸}{(x^{2} - 3)}}}^{3} \underset{d u}{\underset{︸}{(2 x d x)}} = \int u^{3} d u .

Using the power rule for integrals, we have

\int u^{3} d u = \frac{u^{4}}{4} + C .

Substitute the original expression for x back into the solution:

\frac{u^{4}}{4} + C = \frac{{(x^{2} - 3)}^{4}}{4} + C .

We can generalize the procedure in the following Problem-Solving Strategy.

Problem-solving strategy: integration by substitution

Look carefully at the integrand and select an expression $g (x)$ within the integrand to set equal to u . Let’s select $g (x) .$ such that $g^{'} (x)$ is also part of the integrand.
Substitute $u = g (x)$ and $d u = g^{'} (x) d x .$ into the integral.
We should now be able to evaluate the integral with respect to u . If the integral can’t be evaluated we need to go back and select a different expression to use as u .
Evaluate the integral in terms of u .
Write the result in terms of x and the expression $g (x) .$

Using substitution to find an antiderivative

Use substitution to find the antiderivative of $\int 6 x {(3 x^{2} + 4)}^{4} d x .$

The first step is to choose an expression for u . We choose $u = 3 x^{2} + 4 .$ because then $d u = 6 x d x .,$ and we already have du in the integrand. Write the integral in terms of u :

\int 6 x {(3 x^{2} + 4)}^{4} d x = \int u^{4} d u .

Remember that du is the derivative of the expression chosen for u , regardless of what is inside the integrand. Now we can evaluate the integral with respect to u :

\begin{array}{l} \int u^{4} d u & = \frac{u^{5}}{5} + C \\ = \frac{{(3 x^{2} + 4)}^{5}}{5} + C . \end{array}

Analysis

We can check our answer by taking the derivative of the result of integration. We should obtain the integrand. Picking a value for C of 1, we let $y = \frac{1}{5} {(3 x^{2} + 4)}^{5} + 1 .$ We have

y = \frac{1}{5} {(3 x^{2} + 4)}^{5} + 1,

\begin{matrix} y^{'} & = (\frac{1}{5}) 5 {(3 x^{2} + 4)}^{4} 6 x \\ = 6 x {(3 x^{2} + 4)}^{4} . \end{matrix}

This is exactly the expression we started with inside the integrand.

Got questions? Get instant answers now!

Questions & Answers

what is phylogeny

Odigie Reply

evolutionary history and relationship of an organism or group of organisms

AI-Robot

Deng

what is biology

Hajah Reply

the study of living organisms and their interactions with one another and their environments

AI-Robot

what is biology

Victoria Reply

HOW CAN MAN ORGAN FUNCTION

Alfred Reply

the diagram of the digestive system

Assiatu Reply

allimentary cannel

Ogenrwot

How does twins formed

William Reply

They formed in two ways first when one sperm and one egg are splited by mitosis or two sperm and two eggs join together

Oluwatobi

what is genetics

Josephine Reply

Genetics is the study of heredity

Misack

how does twins formed?

Misack

What is manual

Hassan Reply

discuss biological phenomenon and provide pieces of evidence to show that it was responsible for the formation of eukaryotic organelles

Joseph Reply

what is biology

Yousuf Reply

the study of living organisms and their interactions with one another and their environment.

Wine

discuss the biological phenomenon and provide pieces of evidence to show that it was responsible for the formation of eukaryotic organelles in an essay form

Joseph Reply

what is the blood cells

Shaker Reply

list any five characteristics of the blood cells

Shaker

lack electricity and its more savely than electronic microscope because its naturally by using of light

Abdullahi Reply

advantage of electronic microscope is easily and clearly while disadvantage is dangerous because its electronic. advantage of light microscope is savely and naturally by sun while disadvantage is not easily,means its not sharp and not clear

Abdullahi

cell theory state that every organisms composed of one or more cell,cell is the basic unit of life

Abdullahi

is like gone fail us

DENG

cells is the basic structure and functions of all living things

Ramadan

What is classification

ISCONT Reply

is organisms that are similar into groups called tara

Yamosa

in what situation (s) would be the use of a scanning electron microscope be ideal and why?

Kenna Reply

A scanning electron microscope (SEM) is ideal for situations requiring high-resolution imaging of surfaces. It is commonly used in materials science, biology, and geology to examine the topography and composition of samples at a nanoscale level. SEM is particularly useful for studying fine details,

Hilary

Got questions? Join the online conversation and get instant answers!

Jobilize.com Reply

<< Chapter < Page Page > Chapter >>

Practice Key Terms 2

Read also:

Get Jobilize Job Search Mobile App in your pocket Now!

100% Free Mobile Applications
Receive real-time job alerts and never miss the right job again

Source: OpenStax, Calculus volume 1. OpenStax CNX. Feb 05, 2016 Download for free at http://cnx.org/content/col11964/1.2

Google Play and the Google Play logo are trademarks of Google Inc.

Notification Switch

Would you like to follow the 'Calculus volume 1' conversation and receive update notifications?

Ask

©flickr: Tim	Hazard Quiz By Royalle Moore Start Quiz
©flickr: Gisela	Electrocardiogram Quiz By Anonymous User Start Quiz
	20 Sociology 20 Population Urbanization Environment By OpenStax Start Quiz
	7 Psychology MCQ 2010 Final Exam By John Gabrieli Start Exam
	14 Sociology 14 Marriage and Family MCQ By OpenStax Start Quiz
©flickr:	Health Reviewer MCQ By Edgar Delgado Start Quiz
	Power Enigeering types of bearing lubrication By Sam Luong Start Quiz
	2 Microeconomics 02 Choice in a World of Scarcity By OpenStax Start Flashcards
©flickr:	Anatomy Physiology By Jemekia Weeden Start Quiz
	Art Reviewer MCQ By Edgar Delgado Start Quiz