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Date	November 2021	Marks available	2	Reference code	21N.2.SL.TZ0.3
Level	Standard Level	Paper	Paper 2	Time zone	Time zone 0
Command term	Justify and Find	Question number	3	Adapted from	N/A

Question

A wind turbine is designed so that the rotation of the blades generates electricity. The turbine is built on horizontal ground and is made up of a vertical tower and three blades.

The point $A$ is on the base of the tower directly below point $B$ at the top of the tower. The height of the tower, $AB$ , is $90 m$ . The blades of the turbine are centred at $B$ and are each of length $40 m$ . This is shown in the following diagram.

The end of one of the blades of the turbine is represented by point $C$ on the diagram. Let $h$ be the height of $C$ above the ground, measured in metres, where $h$ varies as the blade rotates.

Find the

The blades of the turbine complete $12$ rotations per minute under normal conditions, moving at a constant rate.

The height, $h$ , of point $C$ can be modelled by the following function. Time, $t$ , is measured from the instant when the blade $[BC]$ first passes $[AB]$ and is measured in seconds.

$h (t) = 90 - 40 \cos (72 t °), t \geq 0$

Looking through his window, Tim has a partial view of the rotating wind turbine. The position of his window means that he cannot see any part of the wind turbine that is more than $100 m$ above the ground. This is illustrated in the following diagram.

maximum value of $h$ .

[1]

a.i.

minimum value of $h$ .

[1]

a.ii.

Find the time, in seconds, it takes for the blade $[BC]$ to make one complete rotation under these conditions.

[1]

b.i.

Calculate the angle, in degrees, that the blade $[BC]$ turns through in one second.

[2]

b.ii.

Write down the amplitude of the function.

[1]

c.i.

Find the period of the function.

[1]

c.ii.

Sketch the function $h (t)$ for $0 \leq t \leq 5$ , clearly labelling the coordinates of the maximum and minimum points.

[3]

Find the height of $C$ above the ground when $t = 2$ .

[2]

e.i.

Find the time, in seconds, that point $C$ is above a height of $100 m$ , during each complete rotation.

[3]

e.ii.

At any given instant, find the probability that point $C$ is visible from Tim’s window.

[3]

f.i.

The wind speed increases. The blades rotate at twice the speed, but still at a constant rate.

At any given instant, find the probability that Tim can see point $C$ from his window. Justify your answer.

[2]

f.ii.

Markscheme

maximum $h = 130$ metres A1

[1 mark]

a.i.

minimum $h = 50$ metres A1

[1 mark]

a.ii.

$(60 \div 12 =) 5 seconds$ A1

[1 mark]

b.i.

$360 \div 5$ (M1)

Note: Award (M1) for $360$ divided by their time for one revolution.

$= 72 °$ A1

[2 marks]

b.ii.

(amplitude =) $40$ A1

[1 mark]

c.i.

(period $= \frac{360}{72} =$ ) $5$ A1

[1 mark]

c.ii.

Maximum point labelled with correct coordinates. A1

At least one minimum point labelled. Coordinates seen for any minimum points must be correct. A1

Correct shape with an attempt at symmetry and “concave up" evident as it approaches the minimum points. Graph must be drawn in the given domain. A1

[3 marks]

$h = 90 - 40 \cos (144 °)$ (M1)

$(h =) 122 m (122.3606 \dots)$ A1

[2 marks]

e.i.

evidence of $h = 100$ on graph OR $100 = 90 - 40 \cos (72 t)$ (M1)

$t$ coordinates $3.55 (3.54892 . . .)$ OR $1.45 (1.45107 . . .)$ or equivalent (A1)

Note: Award A1 for either $t$ -coordinate seen.

$= 2.10$ seconds $(2.09784 \dots)$ A1

[3 marks]

e.ii.

$5 - 2.09784 \dots$ (M1)

$\frac{(2.902153 \dots)}{5}$ (M1)

$0.580 (0.580430 \dots)$ A1

[3 marks]

f.i.

METHOD 1

changing the frequency/dilation of the graph will not change the proportion of time that point $C$ is visible. A1

$0.580 (0.580430 . . .)$ A1

METHOD 2

correct calculation of relevant found values

$\frac{(2.902153 \dots) / 2}{5 / 2}$ A1

$0.580 (0.580430 . . .)$ A1

Note: Award A0A1 for an unsupported correct probability.

[2 marks]

f.ii.

Examiners report

Judging by the responses in parts (a), (b) and (c), transferring and interpreting the information from a diagram is a skill that requires further nurturing. The amplitude should be expressed as a positive value. Overall, the sketch of $h (t)$ reflected the correct general shape. Common flaws included a lack of symmetry about the mean, 'concave up' not evident as the curve approached the minimum points, and the curve being drawn beyond the given domain. At least one correct pair of coordinates was seen, though some gave their answers inaccurately, suggesting they found an approximate solution using the "trace" feature in their GDC. Most were able to find the height of point $C$ when $t = 2$ and make an attempt to find a time at which point $C$ is at a height of $100 m$ . It was pleasing to see a number of candidates draw $h = 100$ on their sketch, which would no doubt have assisted the candidates in visualizing the solution. Part (f) proved to be a high-grade discriminator, with few attaining full marks. Premature rounding in part (f)(i) resulted in an inaccurate final answer. It is recommended that candidates retrieve and use unrounded values from previous calculations in their GDC. Though many recognized the probability was independent of the speed of rotation, most were not able to support their answer through a correct calculation or written explanation.