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Example Questions
Example Question #3 : Fundamental Theorem Of Calculus
Evaluate when .
Via the Fundamental Theorem of Calculus, we know that, given a function , . Therefore, .
Example Question #3 : Fundamental Theorem Of Calculus
Evaluate when .
Via the Fundamental Theorem of Calculus, we know that, given a function , . Therefore, .
Example Question #1 : Fundamental Theorem Of Calculus
Suppose we have the function
What is the derivative, ?
We can view the function as a function of , as so
where .
We can find the derivative of using the chain rule:
where can be found using the fundamental theorem of calculus:
So we get
Example Question #1 : Fundamental Theorem Of Calculus
If , what is ?
By the Fundamental Theorem of Calculus, we know that given a function, .
Thus,
Example Question #4 : Fundamental Theorem Of Calculus
If , what is ?
By the Fundamental Theorem of Calculus, we know that given a function, .
Thus,
Example Question #2 : Fundamental Theorem Of Calculus
If , what is ?
By the Fundamental Theorem of Calculus, we know that given a function, .
Thus,
Example Question #5 : Fundamental Theorem Of Calculus
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 #6 : Fundamental Theorem Of Calculus
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 #11 : Fundamental Theorem Of Calculus
Given
, what is ?
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, since
, .
Therefore,
.
Example Question #12 : Fundamental Theorem Of Calculus
Given , what is ?
According to the Fundamental Theorem of Calculus, if is a continuous function on the interval with as the function defined for all on as , then . Therefore, if , then . Thus, .
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