📝 题目
4.设 $z=x^{2} y-x y^{2}, x=r \cos \theta, y=r \sin \theta$ ,求 $\frac{\partial z}{\partial r} 、 \frac{\partial z}{\partial \theta}$ .
💡 答案与解析
[AI解答]
[AI解答]
已知函数: $$ z = x^{2} y - x y^{2}, \quad x = r \cos\theta, \quad y = r \sin\theta. $$
首先,将 $x$ 和 $y$ 代入 $z$,得到 $z$ 关于 $r$ 和 $\theta$ 的显式表达式: $$ z = (r\cos\theta)^2 (r\sin\theta) - (r\cos\theta)(r\sin\theta)^2 = r^{3}\cos^{2}\theta \sin\theta - r^{3}\cos\theta \sin^{2}\theta. $$ 提取公因式: $$ z = r^{3} \cos\theta \sin\theta (\cos\theta - \sin\theta). $$
现在分别求偏导数。
**求 $\displaystyle{\frac{\partial z}{\partial r}}$**: 将 $\theta$ 视为常数,对 $r$ 求导: $$ \frac{\partial z}{\partial r} = 3r^{2} \cos\theta \sin\theta (\cos\theta - \sin\theta). $$
**求 $\displaystyle{\frac{\partial z}{\partial \theta}}$**: 将 $r$ 视为常数,对 $\theta$ 求导。使用乘积法则: $$ \frac{\partial z}{\partial \theta} = r^{3} \frac{\partial}{\partial\theta}\big[ \cos\theta \sin\theta (\cos\theta - \sin\theta) \big]. $$
先令 $f(\theta) = \cos\theta \sin\theta$,$g(\theta) = \cos\theta - \sin\theta$,则: $$ f'(\theta) = -\sin^{2}\theta + \cos^{2}\theta = \cos 2\theta, $$ $$ g'(\theta) = -\sin\theta - \cos\theta. $$
由乘积法则: $$ \frac{\partial}{\partial\theta}(f g) = f' g + f g' = \cos 2\theta (\cos\theta - \sin\theta) + \cos\theta \sin\theta (-\sin\theta - \cos\theta). $$
化简第二项: $$ \cos\theta \sin\theta (-\sin\theta - \cos\theta) = -\cos\theta \sin^{2}\theta - \cos^{2}\theta \sin\theta. $$
因此: $$ \frac{\partial z}{\partial \theta} = r^{3} \big[ \cos 2\theta (\cos\theta - \sin\theta) - \cos\theta \sin^{2}\theta - \cos^{2}\theta \sin\theta \big]. $$
也可利用恒等式 $\cos 2\theta = \cos^{2}\theta - \sin^{2}\theta$ 进一步化简,但上述形式已为最终结果。
最终答案为: $$ \boxed{\frac{\partial z}{\partial r} = 3r^{2} \cos\theta \sin\theta (\cos\theta - \sin\theta)}, $$ $$ \boxed{\frac{\partial z}{\partial \theta} = r^{3} \big[ \cos 2\theta (\cos\theta - \sin\theta) - \cos\theta \sin^{2}\theta - \cos^{2}\theta \sin\theta \big]}. $$
难度:★☆☆☆☆