prove that under root 3 is not a rational number
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WE assume that √3 is rational no.
√3=a/b {were a and b are co prime and b is not equal to 0}
here a and b are rational but √3 is is not rational and we know that rational never equal to irrational this contradiction has arisen because of our wrong assumption that √3 is rational .there fore it is irrational
√3=a/b {were a and b are co prime and b is not equal to 0}
here a and b are rational but √3 is is not rational and we know that rational never equal to irrational this contradiction has arisen because of our wrong assumption that √3 is rational .there fore it is irrational
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