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Example Questions
Example Question #21 : First And Second Derivatives Of Functions
Use the chain rule to find the derivative of the function
None of these answers
The formula for the chain rule works as follows;
Setting , we have
Hence
.
(Keep in mind that the derivative of is )
Example Question #22 : First And Second Derivatives Of Functions
Find the second derivative of:
The derivative of secant is:
Since the inner function of secant is not , we will need to use chain rule, which is to multiply the derivative of the inner function .
Solve for the first derivative.
To take the second derivative, we will need to use the product rule and chain rule.
The product rule is:
To avoid confusion, let and . Their derivatives are then:
The derivative of in terms of and by product rule is:
Resubstitute the functions and derivative functions into the equation.
Simplify. The answer is:
Example Question #22 : First And Second Derivatives Of Functions
Find the derivative of:
Write the derivative of secant.
Since the inner function is , we will need to apply the chain rule to solve this derivative.
Take the derivative of . Do not mix this with the integration, which is .
The derivative of is then:
The answer is:
Example Question #21 : First And Second Derivatives Of Functions
What is the second derivative of ?
We use the chain rule to get the first derivative:
This gives us . Now we must take the derivative again, which means we have to use the product rule *and* the chain rule. As a reminder, the product rule says that
Which means the second derivative of the original function is
. With some simplifying we can see that this is equal to
Example Question #23 : First And Second Derivatives Of Functions
Evaluate the first and second derivative of the function
when
We must find the first and second derivatives.
To do so we use the power rule which states
As such
To find the second derivative we apply the power rule again
We find that
and
We then evaluate each for and get
Example Question #221 : Derivatives
Find the first and second derivatives of the function
We must find the first and second derivatives.
We use the properties that
- The derivative of is
- The derivative of is
As such
To find the second derivative we differentiate again and use the product rule which states
Setting
and
we find that
As such
Example Question #21 : First And Second Derivatives Of Functions
Find the derivative of the following function:
The derivative of the function is equal to
and was found using the following rules:
, , ,
Example Question #24 : First And Second Derivatives Of Functions
Find the derivative of the function:
The derivative of the function is equal to
and was found using the following rules:
, , ,
Example Question #223 : Derivative Review
Find the second derivative of the function:
The first derivative of the function is equal to
and was found using the following rules:
, , ,
The second derivative of the function is equal to
and was found using the same rules as above, along with
,
Example Question #131 : Derivatives
Find the derivative of the function
None of the other answers.
We find the answer using the quotient rule
and the product rule
and then simplifying.
or . The extra brackets in the denominator are optional.
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