Math, asked by KnightLyfe, 1 month ago

✩Question:-
Prove that $\sqrt{n}$ is not a rational number, if n is not perfect square.

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Answered by Anonymous

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Prove that $\sqrt{n}$ is not a rational number, if n is not perfect square.

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$\sqrt{4}$ = 2 where 2 is a rational number . Here n is perfect square the $\sqrt{n}$ is rational number

$\sqrt{5}$ = 2.236.. is not rational number But it is irrational number.here n is not a perfect square the $\sqrt{n}$ is irrational number

So $\sqrt{n}$ is not irrational number if n is perfect square.

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