QuestionFind the inverse of for .
Studdy Solution
STEP 1
Assumptions1. The function is . The domain of the function is 3. We need to find the inverse of the function
STEP 2
The first step in finding the inverse of a function is to replace the function notation with .
STEP 3
Next, we switch the roles of and . This means we replace every in our equation with and every with .
STEP 4
Now, we need to solve this equation for to get the inverse function. First, we square both sides of the equation to eliminate the square root.
STEP 5
implify the equation.
STEP 6
Add5 to both sides of the equation to isolate .
STEP 7
Now we have the inverse function. However, we need to consider the domain of the original function. The original function has a domain of , which means the range of the inverse function is . Therefore, we need to restrict the domain of the inverse function to to match the range of the original function.
The inverse function is for .
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