If the domain of the function is the interval , then is equal to:
- A
- B
- C
- D
If the domain of the function is the interval , then is equal to:
Correct answer:A
Standard Method
Given:
Find: The value of where the domain is .
For the sum to be defined, both inverse trigonometric expressions must be defined. Hence we need:
and
First solve
This gives two inequalities.
So,
Using the critical points and , this holds for
So,
Using the critical points and , this holds for
Hence,
Now solve
Again split into two parts.
Its discriminant is
Since the coefficient of is positive, this inequality is true for all real .
So,
Thus,
Now take the intersection:
Therefore,
So,
Then,
Therefore, the correct option is A.](streamdown:incomplete-link)
Checking the domain of only one inverse trigonometric term is incorrect because the sum is defined only where both terms are defined. Always intersect the two individual domains.
Ignoring the condition for and leads to an incomplete domain. Both upper and lower bounds must be solved.
While solving rational inequalities, treating the denominator as if it can be multiplied across without sign consideration is wrong. First bring the expression to one side and use critical points of numerator and denominator.
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