\[\log{\frac{75}{16}}-2\log{\frac{5}{9}}+\log{\frac{32}{243}}=\log{2}\]
1
使用指數法則: logbxc=clogbx\log_{b}{{x}^{c}}=c\log_{b}{x}
log7516log(59)2+log32243=log2\log{\frac{75}{16}}-\log{{(\frac{5}{9})}^{2}}+\log{\frac{32}{243}}=\log{2}

2
使用除法分配財產: (xy)a=xaya{(\frac{x}{y})}^{a}=\frac{{x}^{a}}{{y}^{a}}
log7516log5292+log32243=log2\log{\frac{75}{16}}-\log{\frac{{5}^{2}}{{9}^{2}}}+\log{\frac{32}{243}}=\log{2}

3
簡化 52{5}^{2}2525
log7516log2592+log32243=log2\log{\frac{75}{16}}-\log{\frac{25}{{9}^{2}}}+\log{\frac{32}{243}}=\log{2}

4
簡化 92{9}^{2}8181
log7516log2581+log32243=log2\log{\frac{75}{16}}-\log{\frac{25}{81}}+\log{\frac{32}{243}}=\log{2}

5
使用乘積法則: logb(xy)=logbx+logby\log_{b}{(xy)}=\log_{b}{x}+\log_{b}{y}
log(75162581×32243)=log2\log{(\frac{\frac{\frac{75}{16}}{25}}{81}\times \frac{32}{243})}=\log{2}

6
簡化 75162581\frac{\frac{\frac{75}{16}}{25}}{81}7516×25×81\frac{75}{16\times 25\times 81}
log(7516×25×81×32243)=log2\log{(\frac{75}{16\times 25\times 81}\times \frac{32}{243})}=\log{2}

7
簡化 16×2516\times 25400400
log(75400×81×32243)=log2\log{(\frac{75}{400\times 81}\times \frac{32}{243})}=\log{2}

8
簡化 400×81400\times 813240032400
log(7532400×32243)=log2\log{(\frac{75}{32400}\times \frac{32}{243})}=\log{2}

9
簡化 7532400\frac{75}{32400}1432\frac{1}{432}
log(1432×32243)=log2\log{(\frac{1}{432}\times \frac{32}{243})}=\log{2}

10
使用此法則:ab×cd=acbd\frac{a}{b} \times \frac{c}{d}=\frac{ac}{bd}
log(1×32432×243)=log2\log{(\frac{1\times 32}{432\times 243})}=\log{2}

11
簡化 1×321\times 323232
log(32432×243)=log2\log{(\frac{32}{432\times 243})}=\log{2}

12
簡化 432×243432\times 243104976104976
log32104976=log2\log{\frac{32}{104976}}=\log{2}

13
簡化 32104976\frac{32}{104976}26561\frac{2}{6561}
log26561=log2\log{\frac{2}{6561}}=\log{2}

14
由於log26561=log2\log{\frac{2}{6561}}=\log{2}為假,因此沒有答案。
沒有答案

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