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Question

Prove that (452) is an irrational number.

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Solution

Consider, 4−5√2
Let 4−5√2 = (a/b) a rational number
⇒ −5√2 = (a/b) − 4
⇒ −5√2 = (a − 4b)/b
⇒ √2 = (a − 4b)/(−5b)
Since a, b are integers, then (a − 4b)/(−5b) represents a rational number.
But this is a contradiction since RHS is a rational number where as LHS (√2) is an irrational number
Hence our assumption that " 4−5√2 = (a/b) is a rational number" is incorrect.
Thus 4−5√2 is an irrational number


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