Can an irrational number, raised to an irrational power, give a rational result?

Take any rational number which is not zero, denote it by r. assume that for any irrational number x, r^(1/x) is rational. then we have a univalent function f:x-> r^(1/x) which maps irrational numbers to rational numbers, which is a contradiction because the set of rationals is countable and the set of irrationals is not - thus for some irrational x, r^(1/x) is not rational, and we have:

(r^(1/x))^x = r

Posted by ronen on 2005-01-12 19:10:24