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प्रश्न
Prove that `1/sqrt(3)` is irrational, given that `sqrt(3)` is irrational.
सिद्धांत
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उत्तर
Given: `sqrt(3)` is irrational.
To Prove: `1/sqrt(3)` is irrational.
Proof [Step-wise]:
1. Suppose, for contradiction, that `1/sqrt(3)` is rational.
2. Then there exist integers a and b, b ≠ 0, with gcd(a, b) = 1, such that `1/sqrt(3) = a/b`.
3. Multiply both sides by `sqrt(3) : 1`
= `(asqrt(3))/b`
So, `sqrt(3) = b/a`.
4. But `b/a` is rational, so this shows `sqrt(3)` is rational contradicting the given that `sqrt(3)` is irrational.
5. Therefore, the supposition that `1/sqrt(3)` is rational is false.
Hence, `1/sqrt(3)` is irrational.
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