All Calculus AB Resources
Example Questions
Example Question #2 : Complete The Square With Integration
Show what the following equation will look like after completing the square.
In order to complete the square recognize that . We proceed as follows:
Example Question #3 : Complete The Square With Integration
Evaluate the following integral using complete the square.
In order to complete the square for the quadratic we first consider the denominator of the integral function.
Now our integral looks like . We will use a u substitutions where . Now we have the integral:
.
We know that the integral . So our integral proceeds as follows:
.
Example Question #1 : Complete The Square With Integration
What would be the proper difference of squares to use to integrate the following to be equal to ?
If we want to integrate the following to equal we first must recall that . We must consider the denominator the integral:
Now we use a u substitution where
We also know that so we can substitute that in as well
If we plug this back into our integral we can now solve this integral easily.
. The difference of two squares that we needed was
Example Question #5 : Complete The Square With Integration
Use complete the square to solve the following integral
To solve this integral, we must first complete the square of the denominator.
Plugging this back into our integral we have . Recall that
Using a u substitution we will let
Example Question #6 : Complete The Square With Integration
Use complete the square to solve the following integral
We start by considering the denominator.
Plugging this back into our integral we get . Using a u substitution, we will let .
Recall that
Example Question #1 : Complete The Square With Integration
True or False: We can only use complete the square if it gives us an exact formula for a solution to the integral.
False
True
False
This is not true. We use complete the square in order to get the integral into a familiar form but often times we need to use a u substitution in order to be able to complete the problem.
Example Question #1 : Complete The Square With Integration
True or False: We are able to complete the square by adding and subtracting the same term to our given equation. This is basically adding zero, and therefore it does not change the value of our equation.
False
True
True
Take for example. We are able to complete the square by adding and subtracting . When we do this, it does not change the value of our equation and this is because of and are identities of each other meaning that . By doing this with any number (adding and subtracting the same number) we are able to successfully complete the square without changing the value of our equation.
Example Question #1 : Complete The Square With Integration
What is complete the square?
We draw the remaining sides of a square
Method for manipulating a quadratic equation for the quadratic equation
Square the function
Method for manipulating a quadratic equation into something able to be factored
Method for manipulating a quadratic equation into something able to be factored
Say we have the equation . It is pretty hard to solve for in this way. Instead we can use a method called complete the square. Here we will add to both sides which will make it factorable.
Example Question #1 : Complete The Square With Integration
Why would one need to use complete the square when integrating?
To use the quadratic formula
Only when we are asked to in a problem
When we need to manipulate an equation into a recognizable identity often for a difference of squares.
To find the roots of a function
When we need to manipulate an equation into a recognizable identity often for a difference of squares.
While some of these answers can be obtained by using complete the square, they are not the goal of using complete the square to integrate. When we integrate, it is often hard to see when we may need to use a trigonometric identity or a log identity. Using complete the square, we are able to manipulate our integrals in order to see these identities.
Example Question #1 : Complete The Square With Integration
Use complete the square and show what the following equation would look like after it is applied .
To complete the square we can use one of two methods. We could use the formula and add . Or if we recognize a factor that could work we can follow that route as well. So I am going to demonstrate the latter since the former is simply plugging into a formula. We will consider . Now to factor our left hand side using complete the square we only consider .
looks similar to a common factorable equation . We can manipulate the equation by adding and subtracting in the same step.
We plug this back into our original equation: