यदि \(\sqrt{5}\) को \(\frac{p}{q}\) मानकर (p) और (q) सहअभाज्य हैं, तो विरोधाभास किस बात से बनेगा?
If \(\sqrt{5}\) is assumed to be \(\frac{p}{q}\) where (p) and (q) are coprime, what creates the contradiction?
Explanation opens after your attempt
Correct Answer
A. (p) और (q) दोनों (5) से विभाज्य होंगेBoth (p) and (q) will be divisible by (5)
Concept
From \(\sqrt{5}=\frac{p}{q}\) we get \(p^2=5q^2\) so both (p) and (q) are divisible by (5). This contradicts the coprime condition.
Why this answer is correct
The correct answer is A. (p) और (q) दोनों (5) से विभाज्य होंगे / Both (p) and (q) will be divisible by (5). From \(\sqrt{5}=\frac{p}{q}\) we get \(p^2=5q^2\) so both (p) and (q) are divisible by (5). This contradicts the coprime condition.
Exam Tip
\(\sqrt{5}=\frac{p}{q}\) से \(p^2=5q^2\) मिलता है इसलिए (p) और (q) दोनों (5) से विभाज्य होते हैं। यह सहअभाज्य शर्त के विरुद्ध है।
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