Question:
Water is dripping from a filter in the shape of an inverted right circular cone at a rate of $\rm5\ cm^3/s$. The altitude of the filter is $\rm10\, cm$ and its base radius is $\rm 5\ cm$.At the same time, water is pouring into the filter. Given that the water level is rising at a rate of $\rm \frac{1}{2\pi}\ cm/s$ when the depth of water is $\rm8\ cm$, what is the pouring rate of water into the filter at this moment?
I have tried using similar triangles to find the radius of the volume of water at $\rm 8\ cm$, and I think I am supposed to find the rate of pouring water into the filter, which is the change of volume minus the loss of water. How can I organize all this into one equation?