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本帖最后由 hbghlyj 于 2021-5-31 15:34 编辑 仿照Kuing的做法,如下
最大值$\left\{\frac{1}{45} \left(37+8 \sqrt{10}\right),\left\{x\to 3 \sqrt{\frac{2}{5}},y\to \sqrt{\frac{2}{5}}\right\}\right\}$
证明:
\[\left(x+\frac{21}{10}\right)^2+\left(y-\frac{2}{10}\right)^2-\frac{37+8 \sqrt{10}}{45} \left(\left(x+\frac{15}{10}\right)^2+(y-1)^2\right)\\=\frac{-\sqrt{10}-8}{15} \left(\frac{x^2}{2}-2 y^2-1\right)+\frac{-13 \sqrt{10}+40}{90} \left(x-3 \sqrt{\frac{2}{5}}\right)^2+\frac{2}{45} \left(-7 \sqrt{10}-20\right) \left(y-\sqrt{\frac{2}{5}}\right)^2\]
最小值$\left\{\frac{1}{45} \left(37-8 \sqrt{10}\right),\left\{x\to -3 \sqrt{\frac{2}{5}},y\to -\sqrt{\frac{2}{5}}\right\}\right\}$
证明:
\[\left(x+\frac{21}{10}\right)^2+\left(y-\frac{2}{10}\right)^2-\frac{37-8 \sqrt{10}}{45} \left(\left(x+\frac{15}{10}\right)^2+(y-1)^2\right)\\=\frac{\sqrt{10}-8}{15} \left(\frac{x^2}{2}-2 y^2-1\right)+\frac{13 \sqrt{10}+40}{90} \left(x+3 \sqrt{\frac{2}{5}}\right)^2+\frac{2}{45} \left(7 \sqrt{10}-20\right) \left(y+\sqrt{\frac{2}{5}}\right)^2\] |
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kuing
发表于 2021-5-31 15:10
