平均數不等式

平均數不等式者，又云平均值不等式、均值不等式，乃數學之朋不等式，亦基本不等式之推廣也。曰：

$x_{1}, x_{2}, \dots, x_{n} \in ℝ_{+} \Rightarrow \frac{n}{\sum_{i = 1}^{n} \frac{1}{x_{i}}} \leq \sqrt[n]{\prod_{i = 1}^{n} x_{i}} \leq \frac{\sum_{i = 1}^{n} x_{i}}{n} \leq \sqrt{\frac{\sum_{i = 1}^{n} x_{i}^{2}}{n}}$

其乃 $H_{n} \leq G_{n} \leq A_{n} \leq Q_{n}$ 。

中： $H_{n} = \frac{n}{\sum_{i = 1}^{n} \frac{1}{x_{i}}} = \frac{n}{\frac{1}{x_{1}} + \frac{1}{x_{2}} + \dots + \frac{1}{x_{n}}}$

$G_{n} = \sqrt[n]{\prod_{i = 1}^{n} x_{i}} = \sqrt[n]{x_{1} x_{2} \dots x_{n}}$

$A_{n} = \frac{\sum_{i = 1}^{n} x_{i}}{n} = \frac{x_{1} + x_{2} + \dots + x_{n}}{n}$

$Q_{n} = \sqrt{\frac{\sum_{i = 1}^{n} x_{i}^{2}}{n}} = \sqrt{\frac{x_{1}^{2} + x_{2}^{2} + \dots + x_{n}^{2}}{n}}$

當且僅為 $x_{1} = x_{2} = \dots = x_{n}$ ，等號成立。

即對此正數：調和平均數 $\leq$ 幾何平均數 $\leq$ 算術平均數 $\leq$ 平方平均數。簡記云：“調幾算方”。

時 $n = 2$

一不等云：

${(x_{1} - x_{2})}^{2} = x_{1}^{2} - 2 x_{1} x_{2} + x_{2}^{2}$	$\geq 0$
${(x_{1} + x_{2})}^{2} = x_{1}^{2} + 2 x_{1} x_{2} + x_{2}^{2}$	$\geq 4 x_{1} x_{2}$
$1$	$\geq \frac{4 x_{1} x_{2}}{{(x_{1} + x_{2})}^{2}}$
$1$	$\geq \frac{2 \sqrt{x_{1} x_{2}}}{x_{1} + x_{2}}$
$\sqrt{x_{1} x_{2}}$	$\geq \frac{2 x_{1} x_{2}}{x_{1} + x_{2}} = \frac{2}{\frac{1}{x_{1}} + \frac{1}{x_{2}}}$

二不等云：

${(x_{1} - x_{2})}^{2} = x_{1}^{2} - 2 x_{1} x_{2} + x_{2}^{2}$	$\geq 0$
${(x_{1} + x_{2})}^{2} = x_{1}^{2} + 2 x_{1} x_{2} + x_{2}^{2}$	$\geq 4 x_{1} x_{2}$
${(\frac{x_{1} + x_{2}}{2})}^{2}$	$\geq x_{1} x_{2}$
$\frac{x_{1} + x_{2}}{2}$	$\geq \sqrt{x_{1} x_{2}}$

三不等云：

$(\frac{x_{1} - x_{2}}{2})^{2} = \frac{x_{1}^{2} - 2 x_{1} x_{2} + x_{2}^{2}}{4}$	$\geq 0$
$\frac{x_{1}^{2} + x_{2}^{2}}{2} = \frac{x_{1}^{2} + x_{2}^{2} + x_{1}^{2} + x_{2}^{2}}{4}$	$\geq \frac{2 x_{1} x_{2} + x_{1}^{2} + x_{2}^{2}}{4} = \frac{(x_{1} + x_{2})^{2}}{4}$
$\sqrt{\frac{x_{1}^{2} + x_{2}^{2}}{2}}$	$\geq \frac{x_{1} + x_{2}}{2}$

平均數不等式

時n=2

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時 $n = 2$