Let and .
Then the domain of is:
- A
- B
- C
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- D
](streamdown:incomplete-link)
Let and .
Then the domain of is:
](streamdown:incomplete-link)
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Correct answer:A
Standard Method
Given: and .
Find: The domain of .
For to be defined, we need
because is defined only for positive arguments.
Now examine the denominator:
The quadratic equation
has discriminant
Since the discriminant is negative, the denominator has no real roots, so it is never zero for any real .
Thus, the expression is defined for all real . The solution further concludes that for all real , so is defined for every real number.
Therefore, the domain of is . The correct option is A.
Using the extracted solution logic
Given: and .
Find: The set of all real for which exists.
Since
we must have
Now,
First check the denominator. For
the discriminant is
So the denominator has no real zero and does not vanish for any real .
The extracted solution then observes that the expression remains positive and concludes
Hence every real number is allowed in the composition.
Therefore, the domain is .
Checking only where the denominator of is nonzero and forgetting that requires its input to be positive. For a composite function , you must ensure lies in the domain of , so the correct condition is .
Assuming the domain of is the same as the domain of . This is wrong because the outer function imposes an extra restriction. Always combine the domain of the inner function with the input condition of the outer function.
Mistaking as being defined at and choosing an option involving . The logarithm is defined only for strictly positive arguments, so zero is not allowed.](streamdown:incomplete-link)
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