Решебник по алгебре и начала математического анализа 11 класс Колягин Задание 1088

\[r\ - радиус\ основания;\]

\[\text{h\ } - высота\ цилиндра.\]

\[1)\ Диагональ:\]

\[(2r)^{2} + h^{2} = d^{2}\]

\[4r^{2} + h^{2} = (2R)^{2}\]

\[4r^{2} = 4R^{2} - h^{2}\]

\[r^{2} = R^{2} - \frac{h^{2}}{4}.\]

\[2)\ V(h) = \pi r^{2}h =\]

\[= \text{πh}\left( R^{2} - \frac{h^{2}}{4} \right) = \pi hR^{2} - \frac{\pi h^{3}}{4};\]

\[V^{'}(h) = \pi R^{2}(h)^{'} - \frac{\pi}{4}\left( h^{3} \right)^{'} =\]

\[= \pi R^{2} - \frac{3\pi}{4}h^{2}.\]

\[3)\ Промежуток\ возрастания:\]

\[\pi R^{2} - \frac{3\pi}{4}h^{2} \geq 0\]

\[4\pi R^{2} - 3\pi h^{2} \geq 0\]

\[3\pi h^{2} \leq 4\pi R^{2}\]

\[h^{2} \leq \frac{4R^{2}}{3}\]

\[- \frac{2R}{\sqrt{3}} \leq h \leq \frac{2R}{\sqrt{3}}.\]

\[4)\ Точка\ максимума:\]

\[h = \frac{2R}{\sqrt{3}}.\]

\[Ответ:\ \ \frac{2R}{\sqrt{3}}.\]