All Precalculus Resources
Example Questions
Example Question #21 : Find The Inverse Of A Function
If , find .
Set , thus .
Now switch with .
So now,
.
Simplify to isolate by itself.
So
Therefore,
.
Now substitute with ,
so
, and
.
Example Question #22 : Find The Inverse Of A Function
Find the inverse of this function:
Write the equation in terms of x and y:
Switch the x and y (this inverts the relationship of the two variables):
Solve for y:
Rewrite to indicate this is the inverse:
Example Question #365 : Gre Subject Test: Math
Find for
To find the inverse of a function, first swap the x and y in the given function.
Solve for y in this re-written form.
Example Question #32 : Inverse Functions
Find the inverse of:
Interchange the variables and solve for .
Add on both sides.
Divide by four on both sides.
The answer is:
Example Question #24 : Find The Inverse Of A Function
Find the inverse function () of the function
None of these answers are correct.
f(x) can be called y. Switch x and y, and solve for y. The resulting new equation is the inverse of f(x).
To double check your work, substitute into its inverse or vice versa. Both substitutions should equal x.
Example Question #181 : Algebra
Which of the following is the inverse of ?
Which of the following is the inverse of ?
To find the inverse of a function, we need to swap x and y, and then rearrange to solve for y. The inverse of a function is basically the function we get if we swap the x and y coordinates for every point on the original function.
So, to begin, we can replace the h(x) with y.
Next, swap x and y
Now, we need to get y all by itself; we can to begin by dividng the three over.
Now, recall that
And that we can rewrite any log as an exponent as follows:
So with that in mind, we can rearrange our function to get y by itself:
Becomes our final answer:
Example Question #31 : Inverse Functions
Find the inverse function of this function: .
The inverse of this function is not a function.
Interchange the variables:
Solve for y:
Because f(x) passes the horizontal line test, its inverse must be a function.
Example Question #31 : Find The Inverse Of A Function
Find the inverse of the given function:
To find the inverse function, we want to switch the values for domain in range. In other words, switch out the and variables in the function:
Example Question #111 : Functions
Find the inverse of the following function:
To find an inverse, simple switch f(x) and x and then solve for f(x). Thus, the inverse is:
Example Question #33 : Find The Inverse Of A Function
Find the inverse of the following function:
The inverse of the function can be found by "reversing" the operations performed on , i.e. subtracting from the final solution, and then finding the third root of that number, or, in mathematical terms,