All Calculus 2 Resources
Example Questions
Example Question #11 : Solving Integrals By Substitution
Evaluate the integral:
To evaluate the integral, we must recognize that what we were given looks very similar to the following integral:
To make our integral look like the one above, we must perform the following substiution:
Now, rewrite our integral:
It looks like the one above, so we can integrate now:
Finally, replace u with our original term:
Example Question #12 : Solving Integrals By Substitution
Evaluate the following integral:
To integrate, we must break the integral into three integrals:
The first integral is equal to
and was found using the following rule:
The second integral is equal to
and was found using the following rule:
The final integral is found by performing the following substitution:
Now, rewrite and integrate:
The integral was found using the following rule:
Finally, rewrite the integral in terms of by replacing with the original term, and add all three integrals together to get a final answer of
Example Question #13 : Solving Integrals By Substitution
Evaluate the following integral:
To integrate, we must make the following substitution:
The derivative was found using the following rule:
Now, rewrite the integral:
Notice that we changed
Next, distribute and integrate:
The integral was found using the following rule:
Finally, replace with our original term:
Example Question #14 : Solving Integrals By Substitution
Evaluate the following integral:
To solve the integral, we must make the following substitution:
Now, rewrite the integral and integrate:
The integral was found using the following rule:
Finally, replace with our original term:
Example Question #21 : Solving Integrals By Substitution
Evaluate the following integral:
To evaluate the integral, we first must rewrite it as the following:
Now, perform the following subsitution:
Next, rewrite the integral and integrate:
The integral was performed using the following rule:
Finally, replace with the term:
Example Question #22 : Solving Integrals By Substitution
Evaluate the following integral:
To evaluate the integral, we must first make the following substitution:
Now, rewrite the integral and integrate:
The integral was performed using the following rule:
Finally, replace u with the x term:
Example Question #23 : Solving Integrals By Substitution
Evaluate the following integral:
To integrate, we must first make the following substitution:
Now, rewrite the integral in terms of u, and integrate:
The integration was performed using the following rule:
Finally, replace u with our original term:
Example Question #21 : Solving Integrals By Substitution
Evaluate the following integral:
To evaluate the integral, we first must make the following substitution:
Now, rewrite the integral, and integrate:
We used the following rule for integration:
Finally, replace with our original term:
Example Question #23 : Solving Integrals By Substitution
Evaluate the following integral:
To evaluate the integral, first we must make the following substitution:
The derivative was found using the following rule:
Now, rewrite the integral and integrate:
The integral was performed using the following rule:
Finally, replace with the containing term:
Note that we removed the absolute value sign because the output of a square root is always positive.
Example Question #26 : Solving Integrals By Substitution
Evaluate the following integral:
To evaluate the integral, we must split it into two integrals:
The first integral is equal to
and was found using the following rule:
The second integral is solved by performing the following substitution:
Now, rewrite the integral and integrate:
The integration was performed using the following rule:
Finally, replace with our original term and add the two results of the integrations together: