QuestionFind the limit: .
Studdy Solution
STEP 1
Assumptions1. We are asked to find the limit of the function as approaches . . The function is defined for all real numbers except .
STEP 2
We can see that if we substitute directly into the function, we will get an indeterminate form of type . To resolve this, we can use the conjugate of the numerator to simplify the function.
The conjugate of is .
STEP 3
Multiply the numerator and the denominator by the conjugate of the numerator.
STEP 4
implify the numerator using the difference of squares formula .
STEP 5
implify the expression further.
STEP 6
implify the numerator.
STEP 7
Cancel out the common factor from the numerator and the denominator.
STEP 8
Now, substitute into the simplified function.
STEP 9
implify the expression to get the limit.
So, .
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