从几何意义出发产生的不等式
在单位圆上任意两点 \( A(\cos\theta_1, \sin\theta_1) \) ,点 \( B(\cos\theta_2, \sin\theta_2) \) ,有 \( |AB|<\widehat{AB} \) ,则(翻译为代数语言为):\[ \sqrt{(\cos\theta_1-\cos\theta_2)^2+(\sin\theta_1-\sin\theta_2)^2}<\theta_2-\theta_1 \]
将它求和(累加)起来,得:
\[ \sum_{i=1}^n\sqrt{1-cos(\theta_{i+1}-\theta_{i})}<\frac{\theta_n-\theta_1}{\sqrt2}-\sqrt{1-cos(\theta_{n}-\theta_{1})} \]
换成星形线,得到:
\[ \sqrt{(\cos^3\theta_1-\cos^3\theta_2)^2+(\sin^3\theta_1-\sin^3\theta_2)^2}<\text{星形线的弧长} \]
请问:推广的形式为什么样?
http://kuing.orzweb.net/viewthread.php?tid=2338&page=1&extra=#pid6697
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