📝 题目
4.求曲线 $x=a \cos ^{3} t, y=a \sin ^{3} t$ 在 $t=t_{0}$ 相应的点处的曲率.
💡 答案与解析
[AI解答]
[AI解答]
已知曲线的参数方程为: $$ x = a \cos^3 t, \quad y = a \sin^3 t $$ 我们需要求在 $ t = t_0 $ 处的曲率。
**第一步:求一阶导数**
$$ x'(t) = a \cdot 3 \cos^2 t \cdot (-\sin t) = -3a \cos^2 t \sin t $$ $$ y'(t) = a \cdot 3 \sin^2 t \cdot \cos t = 3a \sin^2 t \cos t $$
**第二步:求二阶导数**
$$ x''(t) = -3a \left[ 2\cos t (-\sin t) \sin t + \cos^2 t \cos t \right] $$ 更规范地计算: $$ x'(t) = -3a \cos^2 t \sin t $$ 求导: $$ x''(t) = -3a \left[ 2\cos t (-\sin t) \sin t + \cos^2 t \cos t \right] = -3a \left[ -2\cos t \sin^2 t + \cos^3 t \right] $$ 即 $$ x''(t) = -3a (\cos^3 t - 2\cos t \sin^2 t) $$
对于 $y'(t) = 3a \sin^2 t \cos t$,求导: $$ y''(t) = 3a \left[ 2\sin t \cos t \cdot \cos t + \sin^2 t (-\sin t) \right] = 3a \left[ 2\sin t \cos^2 t - \sin^3 t \right] $$
**第三步:曲率公式**
对于参数方程,曲率公式为: $$ \kappa = \frac{|x'(t) y''(t) - x''(t) y'(t)|}{\left[ (x'(t))^2 + (y'(t))^2 \right]^{3/2}} $$
先计算分子: $$ x'(t) y''(t) = (-3a \cos^2 t \sin t) \cdot 3a (2\sin t \cos^2 t - \sin^3 t) $$ $$ = -9a^2 \cos^2 t \sin t (2\sin t \cos^2 t - \sin^3 t) $$ $$ = -9a^2 \cos^2 t \sin t \cdot \sin t (2\cos^2 t - \sin^2 t) $$ $$ = -9a^2 \cos^2 t \sin^2 t (2\cos^2 t - \sin^2 t) $$
再计算: $$ x''(t) y'(t) = (-3a (\cos^3 t - 2\cos t \sin^2 t)) \cdot (3a \sin^2 t \cos t) $$ $$ = -9a^2 \sin^2 t \cos t (\cos^3 t - 2\cos t \sin^2 t) $$ $$ = -9a^2 \sin^2 t \cos t \cdot \cos t (\cos^2 t - 2\sin^2 t) $$ $$ = -9a^2 \sin^2 t \cos^2 t (\cos^2 t - 2\sin^2 t) $$
于是分子差为: $$ x' y'' - x'' y' = -9a^2 \cos^2 t \sin^2 t (2\cos^2 t - \sin^2 t) + 9a^2 \cos^2 t \sin^2 t (\cos^2 t - 2\sin^2 t) $$ 提取公因式: $$ = 9a^2 \cos^2 t \sin^2 t \left[ - (2\cos^2 t - \sin^2 t) + (\cos^2 t - 2\sin^2 t) \right] $$ 括号内化简: $$ -2\cos^2 t + \sin^2 t + \cos^2 t - 2\sin^2 t = -\cos^2 t - \sin^2 t = -1 $$ 因此: $$ x' y'' - x'' y' = 9a^2 \cos^2 t \sin^2 t \cdot (-1) = -9a^2 \cos^2 t \sin^2 t $$ 取绝对值: $$ | x' y'' - x'' y' | = 9a^2 \cos^2 t \sin^2 t $$
**第四步:计算分母**
$$ (x'(t))^2 + (y'(t))^2 = 9a^2 \cos^4 t \sin^2 t + 9a^2 \sin^4 t \cos^2 t $$ $$ = 9a^2 \cos^2 t \sin^2 t (\cos^2 t + \sin^2 t) = 9a^2 \cos^2 t \sin^2 t $$
因此分母为: $$ \left[ 9a^2 \cos^2 t \sin^2 t \right]^{3/2} = (9a^2)^{3/2} |\cos t \sin t|^3 = 27 |a|^3 |\cos t \sin t|^3 $$
**第五步:曲率表达式**
$$ \kappa(t) = \frac{9a^2 \cos^2 t \sin^2 t}{27 |a|^3 |\cos t \sin t|^3} = \frac{1}{3|a|} \cdot \frac{1}{|\cos t \sin t|} $$
注意 $\cos t \sin t = \frac{1}{2} \sin 2t$,因此: $$ \kappa(t) = \frac{1}{3|a|} \cdot \frac{2}{|\sin 2t|} = \frac{2}{3|a| |\sin 2t|} $$
在 $t = t_0$ 处的曲率为: $$ \boxed{\kappa(t_0) = \frac{2}{3|a| |\sin 2t_0|}} $$
**难度评级**:★★★☆☆ (需要熟练运用参数方程曲率公式及三角恒等变形,计算稍复杂,但思路清晰)