All AP Calculus AB Resources
Example Questions
Example Question #64 : Chain Rule And Implicit Differentiation
Given the function , find its derivative.
Given the function , we can find its derivative using the chain rule, which states that
where and for . We have and , which gives us
Example Question #151 : Computation Of The Derivative
Find .
Let
Then
can be rewritten as
Let
The function can now be rewritten as
Applying the chain rule twice:
Example Question #61 : Chain Rule And Implicit Differentiation
Find the derivative of the function
To find the derivative of the function, you must apply the chain rule, which is as follows:
Using the function from the problem statement, we have that
and
Following the rule, we get
Example Question #161 : Computation Of The Derivative
Find the derivative of the function
To find the derivative of the function, you must apply the chain rule, which is as follows:
Using the function from the problem statement, we have that
and
Following the rule, we get
Example Question #62 : Chain Rule And Implicit Differentiation
Find .
None of the other choices gives the correct response.
Let
Then
and
Apply the chain rule:
Substitute back for :
Apply the sum rule:
After some simple algebra:
Example Question #161 : Computation Of The Derivative
is a function of . Solve for in this differential equation:
The expressions with can be separated from those with by multiplying both sides by :
Find the indefinite integral of both sides:
Set . Then , or , and
Substitute back:
;
Raise to both powers:
.
The correct choice is
Example Question #241 : Derivatives
Find the derivative using the chain rule.
Use the chain rule to find the derivative:
Thus,
Example Question #251 : Derivatives
Find the derivative using the chain rule.
Use the chain rule to find the derivative.
Example Question #252 : Derivatives
Find the derivative using the chain rule.
Use the chain rule to find the derivative.
Example Question #253 : Derivatives
Find the derivative using the chain rule.
Use the chain rule to find the derivative.