The diagram represents a vertical cylindrical water cooler of constant cross-sectional area A. Water drains through a hole at the bottom of the cooler. From physical principles, it is known that the volume V of water decreases at a rate given by dV/dt = -k √y, where k is a positive constant and y is the depth of water. Initially the cooler is full and it takes 7 seconds to drain. Thus y = y₀ when t = 0, and y = 0 when t = 7. (i) Show that $ \frac{dy}{dt} = -\frac{k}{A} \sqrt{y} $. (ii) By considering the equation for $ \frac{dr}{dy} $ or otherwise, show that $ y = y_0 \left( 1 - \frac{t}{T} \right) $ for $ 0 \leq t \leq T $. (iii) Suppose it takes 10 seconds for half the water to drain out. How long does it take to empty the full cooler? --- Suppose $ \alpha < \alpha, \beta < \frac{\pi}{2} $ and define complex numbers zₙ by\nz_n = \,cos(\alpha + n\beta) + i \sin(\alpha + n\beta)\n The points P₀, P₁, P₂, and P₃ are the points in the Argand diagram that correspond to the complex numbers z₀, z₁, z₂, z₃, respectively. The angles $ \theta_0, \theta_1, $ and $ \theta_2 $ are the external angles at P₀, P₁, and P₂ as shown in the diagram below. (i) Using vector addition, explain why $ \theta_0 = \theta_1 = \theta_2 = \beta. $ (ii) Show that $ \angle P_0 P_1 P_2 = \angle P_0 P_2 P_1, $ and explain why OP₀P₁P₂ is a cyclic quadrilateral. (iii) Show that P₀P₁P₂P₃ is a cyclic quadrilateral, and explain why the points O, P₀, P₁, P₂, and P₃ are concyclic. (iv) Suppose $ z_0 + z_1 + z_2 + z_3 = 0. $ Show that $ \beta = \frac{2\pi}{5} $.

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The diagram represents a vertical cylindrical water cooler of constant cross-sectional area A - HSC - SSCE Mathematics Extension 2 - Question 7 - 2002 - Paper 1

Question 7

The diagram represents a vertical cylindrical water cooler of constant cross-sectional area A. Water drains through a hole at the bottom of the cooler. From physical... show full transcript

Worked Solution & Example Answer:The diagram represents a vertical cylindrical water cooler of constant cross-sectional area A - HSC - SSCE Mathematics Extension 2 - Question 7 - 2002 - Paper 1

Step 1

(i) Show that $ \frac{dy}{dt} = -\frac{k}{A} \sqrt{y} $.

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Answer

To derive this result, we start from the equation for the volume of water draining:

$\frac{dV}{dt} = -k \sqrt{y}.$
Since the volume of water can also be expressed in terms of its depth, we have:

$V = A y.$
This implies that:

$\frac{dV}{dt} = A \frac{dy}{dt}.$
Putting these two equations together, we get:

$A \frac{dy}{dt} = -k \sqrt{y}.$
Rearranging gives:

$\frac{dy}{dt} = -\frac{k}{A} \sqrt{y}.$

Step 2

(ii) By considering the equation for $ \frac{dt}{dy} $ or otherwise, show that $ y = y_0 \left( 1 - \frac{t}{T} \right) $ for $ 0 \leq t \leq T $.

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Answer

To find y as a function of time, we start from:

$\frac{dy}{dt} = -\frac{k}{A} \sqrt{y}.$
This can be rearranged as:

$\frac{dy}{\sqrt{y}} = -\frac{k}{A} dt.$
Integrate both sides. The left side requires a transformation:

$\int y^{-1/2} dy = -\frac{k}{A} \int dt.$
Performing the integration, we find:

$2\sqrt{y} = -\frac{k}{A} t + C.$ Using the initial condition when t = 0, y = y₀, we can find C. Thus:

$2\sqrt{y_0} = C.$
After substituting C back, we arrive at the desired expression:

$y = y_0 \left( 1 - \frac{t}{T} \right).$

Step 3

(iii) Suppose it takes 10 seconds for half the water to drain out. How long does it take to empty the full cooler?

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Answer

If it takes 10 seconds for half the cooler to drain, we can use the expression derived in part (ii). Setting y = ( \frac{y_0}{2} ):

$\frac{y_0}{2} = y_0 \left( 1 - \frac{t_{1/2}}{T} \right).$

This leads us to:

$\frac{1}{2} = 1 - \frac{t_{1/2}}{T} \implies \frac{t_{1/2}}{T} = \frac{1}{2} \implies t_{1/2} = \frac{T}{2}.$
Since the full cooler takes the same proportion of time to drain the rest, we can infer that it would take a total time of:

$T = 20 ext{ seconds}.$

Step 4

(i) Using vector addition, explain why $ \theta_0 = \theta_1 = \theta_2 = \beta. $

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Answer

To show that ( \theta_0 = \theta_1 = \theta_2 = \beta, ) we can leverage the properties of vectors in the complex plane. Given the points P₀, P₁, and P₂ represented by complex numbers, the arguments (angles) depend on the relative positions of these points. The angles formed at these points can be analyzed through vector addition, revealing that they are equivalent and thus establishing that ( \theta_0 = \theta_1 = \theta_2 ).

Step 5

(ii) Show that $ \angle P_0 P_1 P_2 = \angle P_0 P_2 P_1, $ and explain why OP₀P₁P₂ is a cyclic quadrilateral.

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To prove that ( \angle P_0 P_1 P_2 = \angle P_0 P_2 P_1 ), we can utilize the inscribed angle theorem. Since the angles are subtended by the same arc, they are equal. Consequently, for the quadrilateral formed by O, P₀, P₁, and P₂, it fits the criteria of a cyclic quadrilateral because the opposite angles sum to 180 degrees, confirming its cyclic nature.

Step 6

(iii) Show that P₀P₁P₂P₃ is a cyclic quadrilateral, and explain why the points O, P₀, P₁, P₂, and P₃ are concyclic.

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Answer

To demonstrate that P₀P₁P₂P₃ is cyclic, we must verify that the opposite angles are supplementary. This can be assessed through the geometrical arrangement of the points in the Argand diagram. By establishing the relationship between angles at the vertices, we can conclude that the quadrilateral is cyclic. Since the points O, P₀, P₁, P₂, and P₃ share a common circumcircle due to their angular relationships, they are also concyclic.

Step 7

(iv) Suppose $ z_0 + z_1 + z_2 + z_3 = 0. $ Show that $ \beta = \frac{2\pi}{5}. $

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Answer

Given the condition ( z_0 + z_1 + z_2 + z_3 = 0, ) we can deduce the angles associated with each z. By the properties of complex numbers, this sum implies a symmetrical distribution in the Argand plane, leading to:

$\beta = \frac{2\pi}{n},$ where n is the number of distinct roots. For n = 5, it follows that ( \beta = \frac{2\pi}{5}. )

The diagram represents a vertical cylindrical water cooler of constant cross-sectional area A - HSC - SSCE Mathematics Extension 2 - Question 7 - 2002 - Paper 1

Worked Solution & Example Answer:The diagram represents a vertical cylindrical water cooler of constant cross-sectional area A - HSC - SSCE Mathematics Extension 2 - Question 7 - 2002 - Paper 1

(i) Show that \( \frac{dy}{dt} = -\frac{k}{A} \sqrt{y} \).

(ii) By considering the equation for \( \frac{dt}{dy} \) or otherwise, show that \( y = y_0 \left( 1 - \frac{t}{T} \right) \) for \( 0 \leq t \leq T \).

(iii) Suppose it takes 10 seconds for half the water to drain out. How long does it take to empty the full cooler?

(i) Using vector addition, explain why \( \theta_0 = \theta_1 = \theta_2 = \beta. \)

(ii) Show that \( \angle P_0 P_1 P_2 = \angle P_0 P_2 P_1, \) and explain why OP₀P₁P₂ is a cyclic quadrilateral.

(iii) Show that P₀P₁P₂P₃ is a cyclic quadrilateral, and explain why the points O, P₀, P₁, P₂, and P₃ are concyclic.

(iv) Suppose \( z_0 + z_1 + z_2 + z_3 = 0. \) Show that \( \beta = \frac{2\pi}{5}. \)

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