QuestionFind the limit, if it exists. (If an answer does not exist, enter DNE.)
Studdy Solution
STEP 1
1. We are given the function .
2. We need to find the limit as approaches negative infinity.
STEP 2
1. Analyze the behavior of the numerator and the denominator as .
2. Simplify the expression to identify dominant terms.
3. Evaluate the limit of the simplified expression as .
STEP 3
Consider the behavior of the numerator as . The numerator tends towards negative infinity.
STEP 4
Consider the behavior of the denominator as . The term tends towards negative infinity, while oscillates between and .
STEP 5
To simplify the expression, factor out from the denominator:
This simplifies to:
STEP 6
Evaluate the limit of the simplified expression as :
Since approaches as (because is bounded and tends to negative infinity), the expression becomes:
The limit is:
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