कौन-सा कथन ग्राफ \(y=-\sqrt{x-3}+2\) के लिए सही है?

Which statement is correct for the graph \(y=-\sqrt{x-3}+2\)?

Explanation opens after your attempt
Correct Answer

A. प्रांत \([3,\infty\)) और परिसर (\(-\infty,2]\)domain \([3,\infty\)) and range (\(-\infty,2]\)

Step 1

Concept

From \(x-3\ge0\), the domain is \([3,\infty\)), and the negative sign gives \(y\le2\). In exams, check both the square root and the outside negative sign.

Step 2

Why this answer is correct

The correct answer is A. प्रांत \([3,\infty\)) और परिसर (\(-\infty,2]\) / domain \([3,\infty\)) and range (\(-\infty,2]\). From \(x-3\ge0\), the domain is \([3,\infty\)), and the negative sign gives \(y\le2\). In exams, check both the square root and the outside negative sign.

Step 3

Exam Tip

\(x-3\ge0\) से प्रांत \([3,\infty\)) है और ऋण चिह्न से \(y\le2\)। परीक्षा में वर्गमूल और बाहरी ऋण दोनों का प्रभाव देखें।

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FAQs

Mathematics Answer, Explanation and Revision Hints

कौन-सा कथन ग्राफ \(y=-\sqrt{x-3}+2\) के लिए सही है? / Which statement is correct for the graph \(y=-\sqrt{x-3}+2\)?

Correct Answer: A. प्रांत \([3,\infty\)) और परिसर (\(-\infty,2]\) / domain \([3,\infty\)) and range (\(-\infty,2]\). Explanation: \(x-3\ge0\) से प्रांत \([3,\infty\)) है और ऋण चिह्न से \(y\le2\)। परीक्षा में वर्गमूल और बाहरी ऋण दोनों का प्रभाव देखें। / From \(x-3\ge0\), the domain is \([3,\infty\)), and the negative sign gives \(y\le2\). In exams, check both the square root and the outside negative sign.

Which concept should I revise for this Mathematics MCQ?

From \(x-3\ge0\), the domain is \([3,\infty\)), and the negative sign gives \(y\le2\). In exams, check both the square root and the outside negative sign.

What exam hint can help solve this Mathematics question?

\(x-3\ge0\) से प्रांत \([3,\infty\)) है और ऋण चिह्न से \(y\le2\)। परीक्षा में वर्गमूल और बाहरी ऋण दोनों का प्रभाव देखें।