同济高数 第9章 第9-2-10题

[AI解答]

[AI解答]

**（1）验证** 设 $$ y = e^{-k n^{2} t} \sin(n x) $$ 先求对 $t$ 的偏导数： $$ \frac{\partial y}{\partial t} = \frac{\partial}{\partial t}\left( e^{-k n^{2} t} \sin(n x) \right) = \sin(n x) \cdot \left( -k n^{2} e^{-k n^{2} t} \right) = -k n^{2} e^{-k n^{2} t} \sin(n x) $$ 再求对 $x$ 的二阶偏导数： 一阶偏导： $$ \frac{\partial y}{\partial x} = e^{-k n^{2} t} \cdot n \cos(n x) $$ 二阶偏导： $$ \frac{\partial^{2} y}{\partial x^{2}} = e^{-k n^{2} t} \cdot \left( -n^{2} \sin(n x) \right) = -n^{2} e^{-k n^{2} t} \sin(n x) $$ 于是 $$ k \frac{\partial^{2} y}{\partial x^{2}} = k \cdot \left( -n^{2} e^{-k n^{2} t} \sin(n x) \right) = -k n^{2} e^{-k n^{2} t} \sin(n x) $$ 比较得 $$ \frac{\partial y}{\partial t} = k \frac{\partial^{2} y}{\partial x^{2}} $$ 成立。

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**（2）验证** 设 $$ r = \sqrt{x^{2} + y^{2} + z^{2}} $$ 先求对 $x$ 的一阶偏导： $$ \frac{\partial r}{\partial x} = \frac{x}{\sqrt{x^{2}+y^{2}+z^{2}}} = \frac{x}{r} $$ 再求二阶偏导： $$ \frac{\partial^{2} r}{\partial x^{2}} = \frac{\partial}{\partial x}\left( \frac{x}{r} \right) = \frac{1 \cdot r - x \cdot \frac{\partial r}{\partial x}}{r^{2}} = \frac{r - x \cdot \frac{x}{r}}{r^{2}} = \frac{r - \frac{x^{2}}{r}}{r^{2}} = \frac{r^{2} - x^{2}}{r^{3}} $$ 同理可得： $$ \frac{\partial^{2} r}{\partial y^{2}} = \frac{r^{2} - y^{2}}{r^{3}}, \quad \frac{\partial^{2} r}{\partial z^{2}} = \frac{r^{2} - z^{2}}{r^{3}} $$ 求和： $$ \frac{\partial^{2} r}{\partial x^{2}} + \frac{\partial^{2} r}{\partial y^{2}} + \frac{\partial^{2} r}{\partial z^{2}} = \frac{(r^{2} - x^{2}) + (r^{2} - y^{2}) + (r^{2} - z^{2})}{r^{3}} = \frac{3r^{2} - (x^{2}+y^{2}+z^{2})}{r^{3}} $$ 而 $x^{2}+y^{2}+z^{2} = r^{2}$，代入得： $$ \frac{3r^{2} - r^{2}}{r^{3}} = \frac{2r^{2}}{r^{3}} = \frac{2}{r} $$ 因此原式成立。

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