Which statement correctly describes the difference between the proofs of (\sqrt{2}) and (\sqrt{3})?

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

The correct answer is A. (\sqrt{2}) में समता का तर्क मुख्य है, जबकि (\sqrt{3}) में (3) के अभाज्य गुणनखंड का तर्क मुख्य है / Evenness is central in (\sqrt{2}), while prime factor (3) is central in (\sqrt{3}).

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Question

कौन सा कथन (\sqrt{2}) और (\sqrt{3}) की सिद्धियों के अंतर को सही बताता है?
Which statement correctly describes the difference between the proofs of (\sqrt{2}) and (\sqrt{3})?

Accepted Answer

(\sqrt{2}) में समता का तर्क मुख्य है, जबकि (\sqrt{3}) में (3) के अभाज्य गुणनखंड का तर्क मुख्य है / Evenness is central in (\sqrt{2}), while prime factor (3) is central in (\sqrt{3}). Step 1: In (\sqrt{2}), (p^2=2q^2) gives the evenness argument. Step 2: In (\sqrt{3}), the primality of (3) gives the divisibility argument. Step 3: Choose the reasoning according to the number under the root.

Answer

(\sqrt{2}) में समता का तर्क मुख्य है, जबकि (\sqrt{3}) में (3) के अभाज्य गुणनखंड का तर्क मुख्य है / Evenness is central in (\sqrt{2}), while prime factor (3) is central in (\sqrt{3})

Answer

दोनों में (5) साझा गुणनखंड मिलता है / Both give common factor (5)

Answer

(\sqrt{2}) में (q=0), (\sqrt{3}) में (p=q) मिलता है / (\sqrt{2}) gives (q=0), and (\sqrt{3}) gives (p=q)

Answer

दोनों में वर्ग करने की जरूरत नहीं होती / Neither requires squaring

कौन सा कथन \(\sqrt{2}\) और \(\sqrt{3}\) की सिद्धियों के अंतर को सही बताता है?

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