All Calculus 2 Resources
Example Questions
Example Question #83 : Derivative Review
Given the function , find the slope of the point .
The slope cannot be determined.
To find the slope at a point of a function, take the derivative of the function.
The derivative of is .
Therefore the derivative becomes,
since .
Now we substitute the given point to find the slope at that point.
Example Question #1 : Derivative At A Point
Find the value of the following derivative at the point :
To solve this problem, first we need to take the derivative of the function. It will be easier to rewrite the equation as from here we can take the derivative and simplify to get
From here we need to evaluate at the given point . In this case, only the x value is important, so we evaluate our derivative at x=2 to get.
Example Question #2 : Derivative At A Point
Evaluate the value of the derivative of the given function at the point :
To solve this problem, first we need to take the derivative of the function.
From here we need to evaluate at the given point . In this case, only the x value is important, so we evaluate our derivative at x=1 to get
.
Example Question #22 : Computation Of Derivatives
Find the value of the derivate of the given function at the point :
To solve this problem, first we need to take the derivative of the function. To do this we need to use the quotient rule and simplified as follows:
From here we need to evaluate at the given point . In this case, only the x value is important, so we evaluate our derivative at x=2 to get
.
Example Question #1 : Derivative At A Point
Find the slope at for the function .
The derivative of is:
Substitute the point at .
Example Question #21 : Computation Of Derivatives
What is the slope of at ?
In order to find the slope of a function at a certain point, plug in that point into the first derivative of the function. Our first step here is to take the first derivative.
Since we see that f(x) is composed of two different functions, we must use the product rule. Remember that the product rule goes as follows:
Following that procedure, we set equal to and equal to .
,
which can be simplified to
.
Now plug in 1 to find the slope at x=1.
Remember that .
Example Question #1 : Derivative At A Point
Consider the function: . What is the derivative at ?
To solve for the derivative of , use implicit differentiation which means to take the derivative of each term with respect to the variable in that term.
Substitute the point into the derivative.
Example Question #3 : Chain Rule And Implicit Differentiation
Use implicit differentiation to find the slope of the tangent line to at the point .
We must take the derivative because that will give us the slope. On the left side we'll get
, and on the right side we'll get .
We include the on the left side because is a function of , so its derivative is unknown (hence we are trying to solve for it!).
Now we can factor out a on the left side to get
and divide by in order to solve for .
Doing this gives you
.
We want to find the slope at , so we can sub in for and .
.
Example Question #1 : Derivative At A Point
Find the derivative of the following function at the point .
Here, we must use the product rule.
Assuming and , our expression becomes
.
The question asks us to evaluate this at .
Example Question #1 : Derivative At A Point
Given the function , what is the slope at the point ?
As slope is defined as the derivative of a given function at a given point, we will need to take the derivative of and substitute in the -value of the point .
Using the Power Rule for all , . Subbing in , .