On which interval is \(\cos^{-1}x\) a decreasing function?
Explanation opens after your attempt
Correct Answer
A. \(\left[-1,1\right]\)
Step 1
Concept
By making \(\cos x\) one-one on \(\left[0,\pi\right]\), \(\cos^{-1}x\) becomes decreasing on \(\left[-1,1\right]\). The graph direction also confirms this.
Step 2
Why this answer is correct
The correct answer is A. \(\left[-1,1\right]\). By making \(\cos x\) one-one on \(\left[0,\pi\right]\), \(\cos^{-1}x\) becomes decreasing on \(\left[-1,1\right]\). The graph direction also confirms this.
Step 3
Exam Tip
\(\cos x\) को \(\left[0,\pi\right]\) पर एक-एक बनाने से \(\cos^{-1}x\) \(\left[-1,1\right]\) पर घटता है। ग्राफ की दिशा से भी पुष्टि करें।
Mathematics Answer, Explanation and Revision Hints
\(\cos^{-1}x\) किस अंतराल पर घटता हुआ फलन है? / On which interval is \(\cos^{-1}x\) a decreasing function?
Correct Answer: A. \(\left[-1,1\right]\). Explanation: \(\cos x\) को \(\left[0,\pi\right]\) पर एक-एक बनाने से \(\cos^{-1}x\) \(\left[-1,1\right]\) पर घटता है। ग्राफ की दिशा से भी पुष्टि करें। / By making \(\cos x\) one-one on \(\left[0,\pi\right]\), \(\cos^{-1}x\) becomes decreasing on \(\left[-1,1\right]\). The graph direction also confirms this.
Which concept should I revise for this Mathematics MCQ?
By making \(\cos x\) one-one on \(\left[0,\pi\right]\), \(\cos^{-1}x\) becomes decreasing on \(\left[-1,1\right]\). The graph direction also confirms this.
What exam hint can help solve this Mathematics question?
\(\cos x\) को \(\left[0,\pi\right]\) पर एक-एक बनाने से \(\cos^{-1}x\) \(\left[-1,1\right]\) पर घटता है। ग्राफ की दिशा से भी पुष्टि करें।
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