If the domain of the function is , then is equal to
- A
- B
- C
- D
If the domain of the function is , then is equal to
Correct answer:A
Standard Method
Given:
Find: where the domain is .
For the logarithmic term, the argument must be positive:
So,
For the inverse sine term, its argument must lie in :
For the inverse cosine term, its argument must also lie in :
Now intersect the interval conditions from the inverse trigonometric terms:
and
So the common interval is
Now intersect this with the logarithmic condition . Hence,
Thus, taking the interval as ,
Therefore,
Therefore, the correct option is A.
Intersection of domain conditions
Given: The domain comes from satisfying all three terms simultaneously.
Find: The value of .
Use the standard domain rules directly:
The two inverse trigonometric conditions give bounded intervals, whose intersection is
The logarithmic condition keeps only the part with
So the effective domain is
Using only one condition at a time instead of taking the intersection of all domain restrictions. This is wrong because every term in the function must be defined simultaneously. Always combine the logarithmic, inverse sine, and inverse cosine conditions by intersection.
Forgetting that the logarithmic argument must be strictly positive, not non-negative. This is wrong because is undefined. Use , not .
Making an error in the domain of inverse trigonometric functions by not enforcing for the argument. This is wrong because both and are defined only for arguments in that interval. First solve each double inequality carefully.
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