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Example Questions
Example Question #121 : Derivative Review
What is the slope of the tangent line to the function
when
The slope of the tangent line to a function at a point is the value of the derivative at that point. To calculate the derivative in this problem, the product rule is necessary. Recall that the product rule states that:
.
In this example,
Therefore,
, and
At x = 1, this dervative has the value
.
Example Question #121 : Derivative Review
Find the derivative of the following function at :
The derivative of the function is
and was found using the following rules:
,
,
where in the chain rule.
Plug in 0 in the derivative function to get
Example Question #122 : Derivative Review
What is the slope of at ?
We define slope as the first derivative of a given function.
Since we have
, we can use the Power Rule
for all to determine that
.
We also have a point with a -coordinate , so the slope
.
Example Question #123 : Derivative Review
What is the slope of at ?
None of the above
We define slope as the first derivative of a given function.
Since we have
, we can use the Power Rule
for all to determine that
.
We also have a point with a -coordinate , so the slope
.
Example Question #124 : Derivative Review
What is the slope of at ?
None of the above
We define slope as the first derivative of a given function.
Since we have
, we can use the Power Rule
for all to determine that
.
We also have a point with a -coordinate , so the slope
.
Example Question #21 : Computation Of Derivatives
Find the slope of the tangent line to the function at .
The slope of the tangent line to a function at a point is the value of the derivative of the function at that point. In this problem, is a quotient of two functions, , so the quotient rule is needed.
In general, the quotient rule is
.
To apply the quotient rule in this example, you must also know that and that .
Therefore, the derivative is
The last step is to substitute for in the derivative, which will tell us the slope of the tangent line to at .
Example Question #125 : Derivative Review
What is the slope of at the point ?
We define slope as the first derivative of a given function.
Since we have , we can use the Power Rule
for all to determine that
.
We also have a point with a -coordinate , so the slope
.
Example Question #126 : Derivative Review
What is the slope of at the point ?
We define slope as the first derivative of a given function.
Since we have , we can use the Power Rule
for all to determine that
.
We also have a point with a -coordinate , so the slope
.
Example Question #127 : Derivative Review
What is the slope of at the point ?
We define slope as the first derivative of a given function.
Since we have , we can use the Power Rule
for all to determine that
.
We also have a point with a -coordinate , so the slope
.
Example Question #121 : Derivatives
Find the derivative of the following function at :
The derivative of the function is
and was found using the following rules:
, ,
where , , and
Simply plug in into the first derivative function and solve:
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