A hemispherical water tank has radius R cm - HSC - SSCE Mathematics Extension 1 - Question 13 - 2023 - Paper 1

To find the time it takes for the tank to fill, we set ( h = R ) when the tank is full. From part (i), we found:

$\frac{dh}{dt} = - \frac{k}{\pi h}$

This means:

$dt = - \frac{\pi h}{k} \cdot dh$

Integrating from 0 to T while h goes from 0 to R gives:

$T = -\frac{\pi}{k} \int_{0}^{R} h \, dh = -\frac{\pi}{k} \left[\frac{h^2}{2}\right]_{0}^{R}$

Computing this yields:

$T = -\frac{\pi}{k} \cdot \frac{R^2}{2} = \frac{\pi R^2}{2k}$

When the tank is full, the rate of volume change during emptying is similar in form:

$\frac{dV}{dt} = -k(2R - h)$

At maximum height (full), h = R, thus:

$\frac{dV}{dt} = -k(2R - R) = -kR$

The volume of the full tank is given by:

$V = \frac{\pi}{3}R^3$

Using the relationship:

$T_{empty} = \frac{V}{kR} = \frac{\frac{\pi}{3}R^3}{kR} = \frac{\pi R^2}{3k}$

Since we previously derived that:

$T_{full} = \frac{\pi R^2}{2k}$

Then:

$T_{empty} = 3T_{full},$ meaning the tank takes three times as long to empty as it did to fill.