Prove that √n is not a rational number, if n is not a perfect square.
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sin45 cos45 ka kya answer hoga
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√n is not a rational number because rational number are the numbers that can be written in the form p/q but here √n cannot be written in the form p/q
if we take a example like √3 that is not a perfect square it's square will be 1.732050807568877.....
never ending and a recurring decimal so it can't be a rational number it is a irrational number
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