All AP Calculus BC Resources
Example Questions
Example Question #51 : Integrals
Given
, what is ?
None of the above.
By the Fundamental Theorem of Calculus, for all functions that are continuously defined on the interval with in and for all functions defined by by , we know that .
Thus, for
,
.
Therefore,
Example Question #1 : Fundamental Theorem Of Calculus And Techniques Of Antidifferentiation
Given
, what is ?
None of the above.
By the Fundamental Theorem of Calculus, for all functions that are continuously defined on the interval with in and for all functions defined by by , we know that .
Given
, then
.
Therefore,
.
Example Question #161 : Ap Calculus Bc
Evaluate
Use the fundamental theorem of calculus to evaluate:
Example Question #162 : Ap Calculus Bc
Use the Fundamental Theorem of Calculus and evaluate the integral at both endpoints:
Example Question #2 : Fundamental Theorem Of Calculus With Definite Integrals
Use the Fundamental Theorem of Calculus and evaluate the integral at both endpoints:
Example Question #51 : Integrals
Evaluate the following integral
Evaluate the following integral
Let's begin by recalling our "reverse power rule" AKA, the antiderivative form of our power rule.
In other words, all we need to do for each term is increase the exponent by 1 and then divide by that number.
Let's clean it up a little to get:
Now, to evaluate our integral, we need to plug in 5 and 0 for x and find the difference between the values. In other words, if our integrated function is F(x), we need to find F(5)-F(0).
Let's start with F(5)
Next, let's look at F(0). If you look at our function carefully, you will notice that F(0) will cancel out all of our terms except for +c. So, we have the following:
Finding the difference cancels out the c's and leaves us with 185.
Example Question #161 : Ap Calculus Bc
Evaluate:
First, we will find the indefinite integral using integration by parts.
We will let and .
Then and .
To find , we use another integration by parts:
, which means that , and
, which means that, again, .
Since
, or,
for all real , and
,
by the Squeeze Theorem,
.
Example Question #12 : Fundamental Theorem Of Calculus And Techniques Of Antidifferentiation
Evaluate:
The integral does not converge
First, we will find the indefinite integral, .
We will let and .
Then,
and .
and
Now, this expression evaluated at is equal to
.
At it is undefined, because does not exist.
We can use L'Hospital's rule to find its limit as , as follows:
and , so by L'Hospital's rule,
Therefore,
Example Question #162 : Ap Calculus Bc
Evaluate:
Rewrite the integral as
.
Substitute . Then
and . The lower bound of integration stays , and the upper bound becomes , so
Since , the above is equal to
.
Example Question #1 : Improper Integrals
Evaluate .
By the Formula Rule, we know that . We therefore know that .
Continuing the calculation:
By the Power Rule for Integrals, for all with an arbitrary constant of integration . Therefore:
.
So,
.