Let be the largest interval for which holds. If and , then is equal to:
- A
- B
- C
- D
Let be the largest interval for which holds. If and , then is equal to:
Correct answer:D
Standard Method
Given: for and .
Find: .
From the solution working,
So,
Hence,
Therefore,
Thus,
and
Using ,
so
Now use the second equation as written in the solution. The solution substitutes the inverse trigonometric terms and then takes , giving
Substitute :
Hence,
Therefore, the extracted working gives .
However, the solution explicitly states The Correct Option is D. Since option D corresponds to while the displayed algebra concludes , the source contains an internal discrepancy. Following the solution's declared correct option, the answer is D.
Discrepancy Noted from Source
The source solution contains conflicting conclusions:
Thus the working itself is inconsistent. Using the page's declared correct option label, the answer is taken as D.
Mistake: Using for all . Why wrong: returns only principal values in . What to do instead: apply principal-value properties before solving the inequality.
Mistake: Forgetting that only when both principal values are defined. Why wrong: inverse trigonometric identities depend on domain restrictions. What to do instead: first confirm the common argument lies in .
Mistake: Equating the final numerical value directly to option D without checking the option list. Why wrong: the source solution itself has a mismatch between the option label and the computed value. What to do instead: compare both the derived value and the labeled option carefully.
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