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| \begin{array}{c} | |
| 换底公式之推导:\\ | |
| 证实:\quad \log_{a}{b}=\frac{\log_{c}{b}}{\log_{c}{a}} \\ | |
| 设:\\ | |
| \log_{a}{b} =r\\ | |
| \log_{c}{b} =m\\ | |
| \log_{c}{a} =n\\ | |
| 即:\\ | |
| a^r=b\\ | |
| c^m=b\\ | |
| c^n=a\\ | |
| \because a^r=(c^n)^r=b\\ | |
| \because c^m=b\\ | |
| \therefore c^m=c^{nr}\\ | |
| \therefore m=nr\\ | |
| \because r=\frac{m}{n} \\ | |
| \therefore \log_{a}{b}=\frac{\log_{c}{b}}{\log_{c}{a}}\\ | |
| \end{array} |
正文完
