\(333^{4^5}=\left(3.111\right)^{4^5}=3^{4^5}.111^{4^5}\)
\(3^{444^5}=3^{\left(4.111\right)^5}=3^{4^5.111^5}=\left(3^{4^5}\right)^{111^5}=3^{4^5}.\left(3^{4^5}\right)^{111^5-1}=3^{4^5}.\left(81^5\right)^{111^5-1}\)
\(3^{4^{555}}=3^{4^5.4^{550}}=\left(3^{4^5}\right)^{4^{550}}\)
+) Dễ có: \(3^{4^5}.111^{4^5}\) < \(3^{4^5}.\left(81^5\right)^{111^5-1}\)
=> \(333^{4^5}\) < \(3^{444^5}\) (1)
+) Ta có: \(\left(3^{4^5}\right)^{111^5}\) < \(\left(3^{4^5}\right)^{4^{550}}\) vì \(111^5\) < \(4^{550}=\left(4^5\right)^{110}=1024^{110}\)
=> \(3^{444^5}\) < \(3^{4^{555}}\) (2)
(1)(2) => \(333^{4^5}\) < \(3^{444^5}\) < \(3^{4^{555}}\)
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