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Real-World Applicationshard
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A water reservoir is shaped like an inverted cone with height H=12H=12H=12 m and top radius R=4R=4R=4 m. Water is being pumped into the reservoir at a constant rate of 2π2\pi2π m3^33/min. How fast is the water level rising (dh/dtdh/dtdh/dt) when the depth hhh is 666 m? (Volume of a cone V=13πr2hV = \frac{1}{3}\pi r^2 hV=31​πr2h)