题目内容
14.(1)(log2125+log425+log85)(log52+log254+log1258);(2)($\root{3}{25}-\sqrt{125}$)÷$\root{4}{25}$.
分析 (1)利用换底公式与对数的运算性质即可得出.
(2)利用指数幂的运算性质即可得出.
解答 解:(1)原式=$({log_2}{5^3}+\frac{{{{log}_2}25}}{{{{log}_2}4}}+\frac{{{{log}_2}5}}{{{{log}_2}8}})({log_5}2+\frac{{{{log}_5}4}}{{{{log}_5}25}}+\frac{{{{log}_5}8}}{{{{log}_5}125}})$
=$(3{log_2}5+\frac{{2{{log}_2}5}}{{2{{log}_2}2}}+\frac{{{{log}_2}5}}{{3{{log}_2}2}})({log_5}2+\frac{{2{{log}_5}2}}{{2{{log}_5}5}}+\frac{{3{{log}_5}2}}{{3{{log}_5}5}})$
=$(3+1+\frac{1}{3}){log_2}5•3{log_5}2$
=$13•\frac{{{{log}_5}5}}{{{{log}_5}2}}•{log_5}2$
=13.
(2)原式=$\frac{{5}^{\frac{2}{3}}-{5}^{\frac{3}{2}}}{{5}^{\frac{1}{2}}}$=${5}^{\frac{1}{6}}$-5
=$\root{6}{5}$-5.
点评 本题考查了对数换底公式与对数的运算性质、指数幂的运算性质,考查了推理能力与计算能力,属于基础题.
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