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Question
Show that `4sqrt2` is an irrational number.
Sum
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Solution
Let us assume that `4sqrt2` is a rational number.
`=> 4 sqrt2 = p/q`, where p and q are the integers and q ≠ 0.
`=> sqrt 2 = p/(4q)`
Since, p,q and 4 are integers. So, `p/(4q)` is a rational number.
But this contradicts the fact that `sqrt 2` is an irrational number.
This contradiction has arisen due to the wrong assumption that `4 sqrt 2` is a rational number.
Hence, `4 sqrt 2` is an irrational number.
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