August 2022 1 72 Report
при [tex]\displaystyle\mathtt{\left\{{{x\ \textgreater \ 0}\atop{x\neq1}}\right}[/tex] найдите значение выражения:

[tex]\displaystyle\mathtt{\frac{\log_{\sqrt[1998]{x^2}}(x^{999})^{-\frac{2\log_3\frac{1}{\sqrt[3]{19683}}}{3}}}{1998}-\log_2\frac{(\log_{\sqrt{2}}8)^{\log_{216^{tg^2(\frac{\pi}{6})}}273^{\log_{\sqrt{273}}2}}}{4}}[/tex]
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