The diagram shows a conical soap dispenser of radius 5 cm and height 20 cm - HSC - SSCE Mathematics Extension 1 - Question 12 - 2016 - Paper 1

Given the volume of the soap is ( v = \frac{1}{3} \pi r^2 h ), we substitute ( r = \frac{h}{4} ) into this equation:

[ v = \frac{1}{3} \pi \left( \frac{h}{4} \right)^2 h = \frac{1}{3} \pi \frac{h^2}{16} h = \frac{\pi}{48} h^3 ]

Now, differentiating the volume with respect to time t gives:

[ \frac{dv}{dt} = \frac{\pi}{48} \cdot 3h^2 \frac{dh}{dt} = \frac{\pi}{16} h^2 \frac{dh}{dt} ]

From part (ii), we can express ( \frac{dv}{dt} ) as:

[ \frac{dv}{dt} = -0.04 \text{ cm}^3/ ext{s} ]

Equating gives:

[ \frac{\pi}{16} h^2 \frac{dh}{dt} = -0.04 ]

Rearranging, we have:

[ \frac{dh}{dt} = \frac{-0.04 \cdot 16}{\pi h^2} = -0.32 \frac{1}{h^2} ]

Now substituting ( r = \frac{h}{4} ) also connects ( h ) and ( r ).

Thus we find:

[ \frac{dh}{dt} = -0.32 \frac{r}{h} ]

Substituting ( h = 10 ) into our expression for ( \frac{dh}{dt} ):

[ \frac{dh}{dt} = -0.32 \frac{r}{10} ]

Using ( r = \frac{10}{4} = 2.5 ), we find:

[ \frac{dh}{dt} = -0.32 \frac{2.5}{10} = -0.08 \text{ cm/s} ]

Using this value in ( \frac{dv}{dt} ):

[ \frac{dv}{dt} = \frac{\pi}{16} (10)^2 (-0.08) = -\frac{\pi}{16} \cdot 80 = -5\pi \text{ cm}^3/s ]

Let the mass of X and Y be ( x ) and ( y ) respectively. Since the total mass is 500 g:

[ x + y = 500 \quad \Rightarrow \quad y = 500 - x ]

The rate at which the mass of compound X is increasing is given as:

[ \frac{dx}{dt} = k y = k(500 - x) ]

The equation follows the form derived earlier. Substituting into the equation gives:

[ y = 500 - x \quad \Rightarrow \quad \frac{dx}{dt} = k (500 - x)]

Given ( \frac{dx}{dt} = 2 ) when ( x = 0 ):

At t = 0:

[ 2 = k(500 - 0) \Rightarrow k = \frac{2}{500} = 0.004 ]

Now solving the equation:

[ x = 500 - Ae^{-0.004t} ]

Using the initial condition, when t = 0:

[ 0 = 500 - A \Rightarrow A = 500 ]