Does there exist a quadratic equation whose cofficient are all district irrational but both the root the root are rational justify your answer
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Yes, there may be a quadratic equation whose coefficients are all distinct irrationals, but both the roots are rational. Hence roots are rational.
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Nope It is because If the roots are rational then automatically after calculation the product will also be rational and if the roots are irrational then the roots will also be irrational.I'm talking about quadratic equations but in bi-quadratic equations the case is not possible if the coefficients are irrational then the roots can be rational
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