һ
ͼеα˴ơ \(AB/CB = p\)εı߳Ϊ\(d\) \( \displaystyle CF = \frac{d}{p}, AD = pd\)
\( \displaystyle X = \frac{pd^2}{2}, Y = \frac{d^2}{2p}XY = \frac{d^4}{4} \)
ԣ \( \displaystyle d^2 = 2\sqrt{XY} \)
ڶ⣬ Ϊ\( \displaystyle 2021 = 43 \times 47 \)
\( 1 = \log_{2021}2021 = \log_{2021}(43\) x \( \displaystyle47) = \log_{2021}43+ \log_{2021}47 = \frac{1}{x} + \frac{1}{y}\)
ӷĸͬʱ \(xy \), ʽ \( \displaystyle\frac{x + 4xy +y}{2xy - x -y}= \frac{4 + \frac{1}{x}+ \frac{1}{y}}{2 - \frac{1}{x}- \frac{1}{y}} =5 \)
ͼеα˴ơ \(AB/CB = p\)εı߳Ϊ\(d\) \( \displaystyle CF = \frac{d}{p}, AD = pd\)
\( \displaystyle X = \frac{pd^2}{2}, Y = \frac{d^2}{2p}XY = \frac{d^4}{4} \)
ԣ \( \displaystyle d^2 = 2\sqrt{XY} \)
ڶ⣬ Ϊ\( \displaystyle 2021 = 43 \times 47 \)
\( 1 = \log_{2021}2021 = \log_{2021}(43\) x \( \displaystyle47) = \log_{2021}43+ \log_{2021}47 = \frac{1}{x} + \frac{1}{y}\)
ӷĸͬʱ \(xy \), ʽ \( \displaystyle\frac{x + 4xy +y}{2xy - x -y}= \frac{4 + \frac{1}{x}+ \frac{1}{y}}{2 - \frac{1}{x}- \frac{1}{y}} =5 \)
���༭ʱ��: 2021-10-25 23:20:23
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