Which statement is correct for the proofs of (\sqrt{2}), (\sqrt{3}), and (\sqrt{5})?

Q: What is the correct answer to this Mathematics MCQ?

The correct answer is A. तीनों में पहले परिमेय मानकर सरलतम भिन्न लिखते हैं / In all three, we first assume rationality and write a lowest-form fraction.

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Question

कौन सा कथन (\sqrt{2}), (\sqrt{3}), और (\sqrt{5}) के प्रमाणों के लिए सही है?
Which statement is correct for the proofs of (\sqrt{2}), (\sqrt{3}), and (\sqrt{5})?

Accepted Answer

तीनों में पहले परिमेय मानकर सरलतम भिन्न लिखते हैं / In all three, we first assume rationality and write a lowest-form fraction. Step 1: All three proofs are based on contradiction. Step 2: At the start, the number is assumed rational and written as a lowest-form fraction. Step 3: Then a common factor gives a contradiction.

Answer

तीनों में पहले परिमेय मानकर सरलतम भिन्न लिखते हैं / In all three, we first assume rationality and write a lowest-form fraction

Answer

तीनों में पहले संख्या को शून्य मानते हैं / In all three, we first assume the number is zero

Answer

तीनों में केवल दशमलव मान लिखते हैं / In all three, we only write decimal values

Answer

तीनों में वर्गमूल को अंदर की संख्या के बराबर मानते हैं / In all three, we take the square root equal to the number under it

कौन सा कथन \(\sqrt{2}\), \(\sqrt{3}\), और \(\sqrt{5}\) के प्रमाणों के लिए सही है?

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