prove that 3√2 is an irrational number
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Let assume that 3√2 is an ration number
3√2 = a/b
a&b (b not equal to 0) is co-prime Number
Therefore Hcf =1
√2 = 3b
But we know that √2 is an irrational this contradicts our assumtion is wrong
So, 3√2 is an irration number
HENCE PROVED
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