Class CBSE Class 12 Mathematics Inverse Trigonometric Functions Q #938
KNOWLEDGE BASED
APPLY
2 Marks 2025 VSA
Find domain of \(\sin^{-1}\sqrt{x-1}\).
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Step-by-Step Solution

The domain of \(\sin^{-1}(x)\) is \([-1, 1]\). Therefore, for \(\sin^{-1}\sqrt{x-1}\) to be defined, we must have:

\(-1 \le \sqrt{x-1} \le 1\)

Since the square root is always non-negative, we can simplify the inequality to:

\(0 \le \sqrt{x-1} \le 1\)

Squaring all parts of the inequality, we get:

\(0 \le x-1 \le 1\)

Adding 1 to all parts of the inequality, we get:

\(1 \le x \le 2\)

Therefore, the domain of \(\sin^{-1}\sqrt{x-1}\) is \([1, 2]\).

Correct Answer: [1, 2]

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Pedagogical Audit
Bloom's Analysis: This is an APPLY question because the student needs to apply the knowledge of the domain of the inverse sine function and the properties of square roots to find the domain of the given function.
Knowledge Dimension: PROCEDURAL
Justification: The question requires the student to follow a specific procedure to determine the domain of the function, involving understanding the domain restrictions of both the inverse sine function and the square root function.
Syllabus Audit: In the context of CBSE Class 12, this is classified as KNOWLEDGE. The question directly tests the student's understanding of the domain of inverse trigonometric functions, a concept covered in the textbook.

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