All Calculus 2 Resources
Example Questions
Example Question #731 : Integrals
We first need to simplify the expression by dividing the numerator by the denominator.
Now, we integrate each part. Since this is an indefinite integral, we need to add a constant to the ending.
Remember to rewrite the last term to make use of the power rule.
Example Question #732 : Integrals
Integrate:
To integrate, we must use integration by parts, which is given by the following:
Now, we must designate our u and dv, and differentiate and integrate respectively:
,
,
Note that we don't include the constant of integration during this step.
The rules used are as follows:
,
Now, use the above formula to rewrite the integral:
Next, we integrate to get our final answer:
The integration was performed using the following rule:
Example Question #733 : Integrals
Remember that when integrating, raise the exponent by 1 and then put that result on the denominator. A constant yields an integral of x. Therefore, your answer is: . Remember to add a +C because it is an indefinite integral: .
Example Question #734 : Integrals
To integrate, remember that you add one to the exponent and then also put that result on the denominator. After integrating, you get: . Simplify and get . Then, remember to add +C because it is an indefinite integral:
Example Question #735 : Integrals
First off, multiply the binomials using FOIL: . Then, integrate, remembering to raise the exponent by 1 and then putting that result on the denominator: . Simplify and add a +C because it is an indefinite integral: .
Example Question #102 : Indefinite Integrals
Recall that when integrating a single variable on the denominator, take ln of that term. Therefore, the integration is . Then, evaluate at 3 and then 1. Subtract the results: .
Example Question #737 : Integrals
The first step here should be multiplying the binomials:
.
Then, integrate. Remember to raise each power by one and then also put that result on the denominator.
Add a +C at the end because it is an indefinite integral.
Therefore, your answer should like this:
.
Example Question #738 : Integrals
To integrate this, first pull the 2 outside of the integral sign:
.
Then, when integrating, remember to add 1 to the exponent and then also put that result on the denominator:
.
Then, simplify:
.
Then, add a +C because it is an indefinite integral:
.
Example Question #739 : Integrals
Use u substitution here to integrate.
Assign
,
.
Substitute in to rewrite the expression:
.
Recall that when integrating a single variable on the denominator, you take the natural log of that term.
Therefore, after integrating, you get
.
Substitute in your initial expression to get
.
Remember to add a C because it is an indefinite integral:
.
Example Question #740 : Integrals
First, put the 9 on the outside of the integral sign:
.
Then, when integrating, remember to raise the exponent by 1 and put that result on the denominator:
.
Simplify:
.
Remember to add a plus C at the end because it is an indefinite integral:
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