If , then is equal to:
- A
- B
- C
- D
If , then is equal to:
Correct answer:C
Standard Method
Given:
Find:
Using the small-angle and Taylor expansions shown in the solution:
So the numerator becomes
and the denominator becomes
Hence the limit reduces to
For this limit to exist and be finite, the constant term and the coefficient of in the numerator must vanish.
Therefore,
and
Now compute
Therefore, the correct option is C.
Taylor Expansion Method
Given:
Find:
Using the expansions stated in the solution:
Substituting these into the numerator,
which simplifies to
The solution states that for the limit to be finite, the lower-order terms must vanish. Thus,
and
Now,
Therefore, the value of is , so the correct option is C.
Setting only the constant term to zero and forgetting the coefficient of . Since the denominator behaves like , both the constant term and the linear term in the numerator must vanish to keep the limit finite.
Using only and but mishandling . Near , the correct first terms are , not .
Confusing the condition 'limit equals ' with directly equating the numerator to . The limit is determined by matching the order of the numerator with the denominator, not by comparing isolated constants.
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