If , then at is equal to:
- A
- B
- C
- D
If , then at is equal to:
Correct answer:D
Standard Method
Given:
Find: at .
Differentiate both sides with respect to :
So,
At ,
Therefore,
Differentiate again:
Hence,
Now put and :
Therefore,
Therefore, the correct option is D, and the value is .
Using explicit form of $$y$$
From , we get
Then,
At ,
so
This confirms the exponent used in the final evaluation.
The second provided approach contains an intermediate appearance of in places where should be used, but its final conclusion still matches the first approach and the correct option. Using the consistent substitution gives .
Using is wrong. The correct value is , so . Evaluate the inverse sine first, then multiply by .
Differentiating as if it were just is incorrect. Since is a function of , use chain rule: .
While differentiating , treating as a constant is incorrect. Both and depend on , so product or quotient rule must be applied carefully.
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