If the function is continuous at , then the value of is equal to
- A
- B
- C
- D
If the function is continuous at , then the value of is equal to
Correct answer:D
Standard Method
Given:
for , and is continuous at .
Find: .
By continuity at ,
Using standard expansions
From the solution, use the standard expansions as :
Then the numerator becomes
Using the given approximations,
So, according to the extracted working,
Hence,
Therefore, the correct option is D.
Using continuity incorrectly by substituting directly into the given expression. This gives the indeterminate form . Instead, continuity requires evaluating first and then setting that equal to .
Using incomplete small-angle expansions. For this question, treating as order is wrong because its leading term is order . Instead, use the correct behavior .
Forgetting that only when . Here , so the approximation must be applied to the whole quantity, not to alone.
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