A LevelMathsEdexcelPureExam QuestionsAlgebra & FunctionsFurther Modelling with Functions

Further Modelling with Functions (Edexcel A Level Maths: Pure): Exam Questions

Exam code: 9MA0

4 hours32 questions
Easy
Medium
Hard
Very Hard
1a
1 mark

The height of water in a wave tank, h cm, t seconds after the tank is switched on is modelled by the equation

h = 20 \; \text{sin}(15t)^{\circ} \qquad t \geq 0

where h = 0 represents the level of calm water.

According to the model, write down the maximum height of the water.

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1b
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1 mark

Find the time taken for the water to first reach its maximum height.

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1c
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1 mark

According to the model, find the height of the water exactly 8 seconds after the tank is switched on.

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2a
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1 mark

A skydiver jumps from a moving aircraft directly above a fixed point O on the ground. The height of the skydiver above the ground, h metres, at a horizontal distance of x metres from O is modelled by the equation

h = 4900 - x^{2} \qquad x \geq 0

According to the model, write down the height from which the skydiver jumped.

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2b
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1 mark

According to the model, find the height of the skydiver when their horizontal distance from O is exactly 50 m.

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2c
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2 marks

With reference to the model, explain why it is not appropriate to use this equation for x > 70.

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3a
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3 marks

An aerobatic display team uses smoke trails. Each plane holds exactly 100 litres of smoke. The amount of smoke remaining in a plane's tank, S litres, t seconds after it starts being used is modelled by the equation

S = 100e^{-0.02t} \qquad t \geq 0

According to the model, find the amount of smoke remaining in the tank exactly 10 seconds after it starts being used.

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3b
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3 marks

According to the model, find the amount of smoke remaining in the tank exactly 40 seconds after it starts being used.

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3c
1 mark

With reference to the equation of the model, explain why the tank will never completely empty.

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4a
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1 mark

The number of hours of daylight, h, received by an allotment t months after 1st January is modelled by the equation

h = 11 + 7 \; \text{cos}(30t)^{\circ} \qquad t \geq 0

According to the model, state the maximum and the minimum number of hours of daylight.

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4b
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1 mark

According to the model, find the number of hours of daylight on 1st January.

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4c
1 mark

State the month in which the allotment receives the most daylight.

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4d
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1 mark

According to the model, find the number of hours of daylight in April (t = 3).

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4e
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2 marks

Find the number of months of the year for which the allotment receives at least 15 hours of daylight.

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5a
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3 marks

A company sells a particular item. The total revenue, £R, is calculated by multiplying the selling price of the item by the number of items sold.

Last year, the company sold exactly 800 items at a price of £20 each. The company predicts that for this year, for every £1 increase in the selling price, exactly 40 fewer items will be sold. This is modelled by letting the number of items sold be 800 - 40x and the selling price of each item be £(20 + x), where x is the price increase in pounds (£).

Show that the expected total revenue, R, can be written as

R = 16\,000 + 400x - 40x^{2}

and find the value of x that should not be exceeded, giving a reason for your answer.

How did you do?

5b
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3 marks

According to the model,

(i) find the maximum expected revenue,

(ii) find the selling price the company should set to maximise this revenue.

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6a
1 mark

A business owner invests some money in an account paying 1.14% interest per year. The value of the investment, £V, t years after it is made is modelled by the equation

V = 30\,000(1.0114)^{t} \qquad t \geq 0

With reference to the model, interpret the value of the constant 30,000.

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6b
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3 marks

According to the model, find the number of whole years it will take for the value of the investment to double.

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6c
1 mark

Another business owner invests £25,000 in a different account paying 1.3% interest per year.

Write down a complete equation for this new model linking V and t.

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7a
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2 marks

The altitude of a hot air balloon ascending from the ground, a metres, t minutes after it begins its ascent is modelled by the equation

a = 5t^{3} + 5t^{2} \qquad 0 \leq t \leq 10

According to the model, find the altitude of the balloon exactly 2 minutes and exactly 6 minutes after it begins its ascent.

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7b
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2 marks

According to the model, find the change in altitude of the balloon between t = 5 and t = 9.

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7c
1 mark

With reference to the equation of the model, explain why it is not appropriate to use this model for larger values of t.

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1
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5 marks

The height of water in a wave tank, h cm, t seconds after the tank is switched on is modelled by the equation

h = 15 \; \text{sin}(18t)^{\circ} \qquad t \geq 0

where h = 0 represents the level of calm water.

According to the model,

(i) write down the maximum height of the water,

(ii) find the time taken for one complete wave,

(iii) hence find the number of waves per minute,

(iv) find the time interval between successive instants when the water is at the calm level,

(v) state one limitation of the model.

How did you do?

2
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7 marks

A skydiver jumps from a moving aircraft directly above a fixed point O on the ground. The height of the skydiver above the ground, h metres, at a horizontal distance of x metres from O is modelled by the equation

h(x) = 3200 - 0.5x^{2} \qquad x \geq 0

According to the model,

(i) state the significance of the constant 3200,

(ii) find the horizontal distance covered by the skydiver when they land,

(iii) sketch the graph of h against x,

(iv) explain why the model is not suitable for x > 80.

How did you do?

3a
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3 marks

The White Blades aerobatic team uses smoke trails during their displays. Initially, a plane's tank holds exactly 180 litres of white smoke.

In a model, the amount of white smoke remaining in the tank, W litres, is inversely proportional to (t + 25), where t is the total time, in seconds, that the smoke has been used.

Find a complete equation for the model linking W and t.

How did you do?

3b
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3 marks

The smoke mechanism becomes unreliable when the amount of white smoke remaining in the tank drops below 7% of its initial amount.

According to the model, find the maximum number of whole minutes for which the mechanism can be used reliably.

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3c
1 mark

State one problem with the model for large values of t.

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4
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4 marks

The number of hours of daylight, h, is modelled by the equation

h = 12 + 5 \; \text{sin}\left(\frac{2\pi t}{365}\right) \qquad t \geq 0

where t is the number of days and t = 0 represents the first day of the model.

(i) According to the model, find the number of hours of daylight on the 100th day.

(ii) According to the model, state the maximum and the minimum number of hours of daylight.

(iii) Assuming the model is for a location in the UK, suggest one reason why the first day of the model most likely does not correspond to 1st January.

How did you do?

5a
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3 marks

A company, BuoysToys, sells boats. The total revenue, £R, is calculated by multiplying the selling price of a boat by the number of boats sold.

Last year, BuoysToys sold exactly 6000 boats at a price of £40 each, generating a total revenue of £240,000. For this year, the company predicts that for every £2 increase in the selling price, exactly 200 fewer boats will be sold. Let x be the number of £2 increases in the selling price.

Show that the expected total revenue, R, can be written as

R = 240\,000 + 4000x - 400x^{2}

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5b
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3 marks

By completing the square, show that

R = 250\,000 - 400(x - 5)^{2}

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5c
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2 marks

Hence find the selling price the company should set to maximise the revenue, and state this expected maximum revenue.

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6a
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2 marks

The value of an investment, £V, t years after the initial investment is made, is modelled by the equation

V = I\left(1 + \frac{r}{100}\right)^{t} \qquad t \geq 0

where I is the initial amount invested and r% is the interest rate.

An initial amount of £1000 is invested at an interest rate of 0.8%.

According to the model, find the value of the investment after 12 years.

How did you do?

6b
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3 marks

A different initial amount of £400 is invested. After exactly 8 years, the value of the investment is £448.82.

According to the model, find the interest rate, r, giving your answer to 3 significant figures.

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6c
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4 marks

An initial amount of £20,000 is invested at an interest rate of 3.4%.

Find the least number of years it will take for the value of the £20,000 investment to double.

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6d
1 mark

State one refinement to the model that would make it more realistic.

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7a
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4 marks

The altitude of a hot air balloon, a feet, t minutes after it begins its ascent is modelled by the equation

a = 8t^{3} - 132t^{2} + 726t \qquad 0 \leq t \leq 11

According to the model,

(i) find the cruising altitude of the balloon, given that it takes exactly 11 minutes to reach this altitude,

(ii) show that the balloon rises by exactly 250 feet between t = 3 and t = 8, and hence suggest how the pilot flew the balloon during its ascent.

How did you do?

7b
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4 marks

Show that there is only one real solution to the equation a = 0, and hence explain why the model cannot be used indefinitely.

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8a
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3 marks

The height of water in a wave tank, h cm, t seconds after the tank is switched on is modelled by the equation

h = 12 \; \text{cos}(20t)^{\circ} \qquad t \geq 0

where h = 0 represents the level of calm water.

Sketch the graph of h against t for 0 \leq t \leq 54.

How did you do?

8b
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4 marks

According to the model,

(i) write down the maximum height of the water,

(ii) find the frequency of the waves,

(iii) find how often the water is at the calm level,

(iv) find the time at which the peak of the 12th wave passes.

How did you do?

8c
1 mark

Comment on the suitability of this model for actual sea waves.

How did you do?

1a
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4 marks
Diagram of a Ferris wheel with labelled height "H". It shows structural spokes and passenger cabins around the circular frame, viewed from the side.
Figure 4
Graph showing a parabolic curve with time (t) on the horizontal axis and height (H) on the vertical axis, peaking in the middle. The curve starts at a positive value of H when t=0, increases to a peak, then decreases to H=0 near the right of the graph. At that point the curve begins to go back up again, without crossing the horizontal axis.
Figure 5

Figure 4 shows a sketch of a Ferris wheel.

The height above the ground, H m, of a passenger on the Ferris wheel, t seconds after the wheel starts turning, is modelled by the equation

H equals open vertical bar A sin left parenthesis b t plus alpha right parenthesis degree close vertical bar

where A, b and alpha are constants.

Figure 5 shows a sketch of the graph of H against t, for one revolution of the wheel.

Given that

  • the maximum height of the passenger above the ground is 50 m

  • the passenger is 1 m above the ground when the wheel starts turning

  • the wheel takes 720 seconds to complete one revolution

find a complete equation for the model, giving the exact value of A, the exact value of b and the value of alpha to 3 significant figures.

How did you do?

1b
1 mark

Explain why an equation of the form

H equals open vertical bar A sin left parenthesis b t plus alpha right parenthesis degree close vertical bar plus d

where d is a positive constant, would be a more appropriate model.

How did you do?

2a
2 marks
Graph showing an oscillating curve with amplitude and frequency decreasing over time. The curve intersects the x-axis several times.
Figure 3

Figure 3 shows a sketch of part of the curve with equation y equals straight f open parentheses x close parentheses where

straight f open parentheses x close parentheses equals 10 straight e to the power of negative 0.25 x end exponent sin space x

Sketch the graph of H against t where

H open parentheses t close parentheses equals open vertical bar 10 straight e to the power of negative 0.25 t end exponent sin space t close vertical bar

showing the long-term behaviour of this curve.

How did you do?

2b
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3 marks

The x-coordinates of the turning points of the curve with equation y equals straight f open parentheses x close parentheses satisfy the equation tan space x equals 4.

The function H open parentheses t close parentheses is used to model the height, in metres, of a ball above the ground t seconds after it has been kicked.

Using this model, find the maximum height of the ball above the ground between the first and second bounce.

How did you do?

2c
1 mark

Explain why this model should not be used to predict the time of each bounce.

How did you do?

3a
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4 marks

A skydiver jumps from a moving aircraft at an altitude of 10 000 feet directly above a fixed point O on the ground. The height of the skydiver above the ground, h metres, at a horizontal distance of x metres from O is modelled by the equation

h(x) = 3048 - 0.5x^{2} \qquad x \geq 0

According to the model,

(i) suggest why the value 10 000 does not appear in the equation,

(ii) find the height of the skydiver when their horizontal distance from O is exactly 60 m,

(iii) find the horizontal distance covered by the skydiver when they land.

How did you do?

3b
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3 marks

(i) Using a straight line approximation, find the total distance travelled by the skydiver.

(ii) Given that the skydiver takes exactly 84 seconds to land, use your answer to (b)(i) to find an approximation for their average speed, and state whether this is an overestimate or an underestimate.

How did you do?

4a
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6 marks

The Blue Blades aerobatic team uses smoke trails during their displays. Initially, a plane's tank holds exactly 360 litres of white smoke.

The amount of white smoke remaining in the tank, w litres, t seconds after it starts being used is modelled by the equation

w = \frac{k}{t + p} - q \qquad t \geq 0

where k, p and q are constants.

Given that q = 90 and that it takes exactly 50 seconds for the amount of white smoke in the tank to halve,

(i) find the value of k and the value of p,

(ii) hence find the time, in minutes, that a 360 litre tank of white smoke lasts.

How did you do?

4b
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3 marks

For another display, the team uses blue smoke trails. The amount of blue smoke remaining in a tank, b litres, t seconds after it starts being used is modelled by the equation

b = \frac{8400}{t + 40} - 30 \qquad t \geq 0

According to the model, find the initial amount of blue smoke in the tank and the time, in minutes, that this tank lasts.

How did you do?

5
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5 marks

The number of hours of daylight, h, is modelled by the equation

h(t) = 12 - a \; \text{sin}\left(\frac{2\pi t}{365}\right) \qquad t \geq 0

where t is the number of days and a is a positive constant.

According to the model,

(i) given that the maximum number of hours of daylight is 16, find the value of a,

(ii) a gardener needs at least 9 hours of daylight to play golf after gardening. Find the number of days on which the gardener cannot play golf.

How did you do?

6
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6 marks

A company, Toys2Go, sells doll's houses. The total revenue, £R, is calculated by multiplying the selling price of a doll's house by the number of doll's houses sold.

Toys2Go sold exactly 120 000 doll's houses at a price of £80 each. The company predicts that for every £5 increase in the selling price, exactly 5000 fewer doll's houses will be sold. Let x be the number of £5 increases in the selling price.

(i) Show that the expected total revenue, R, can be written in the form

R = 10\,000\,000 - 25\,000(x - 4)^{2}

(ii) Hence find the selling price the company should set to maximise the revenue, and state this expected maximum revenue.

How did you do?

7a
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3 marks

The height of a bouncing unicorn above the ground, h metres, at a horizontal distance of x metres from its starting point is modelled by the equation

h(x) = |a \; \text{sin} \; bx| \qquad x \geq 0

where a and b are positive constants.

According to the model,

(i) explain the meaning of the constant b in context,

(ii) given that the maximum height is 2.5 metres and the horizontal distance per jump is \frac{2\pi}{3} metres, find the value of a and the value of b.

How did you do?

7b
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5 marks

Given that it takes exactly 3 seconds for the unicorn to complete one jump, estimate the time during a single jump spent 1.5 metres or more above the ground, stating any assumptions you have made.

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8a
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5 marks

The value of an investment, £V, t years after the initial investment is made, is modelled by the equation

V = I\left(1 + \frac{r}{100}\right)^{t} \qquad t \geq 0

where I is the initial amount invested and r% is the interest rate.

According to the model,

(i) given that an initial amount of £7500 is invested and after exactly 5 years the value of the investment is £8250, find the interest rate, r,

(ii) find the least number of years it will take for an investment to triple in value at an interest rate of 5.6%.

How did you do?

8b
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3 marks

In 1998, the interest rate was 6.33%. In 2019, the interest rate was 1.39%. An investor aims to have an investment value of exactly £1,000,000 after 25 years.

Find roughly how many times greater the initial investment made in 2019 needs to be compared to the initial investment made in 1998 to achieve this aim.

How did you do?

9
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4 marks

The number of hours of daylight, h, is modelled by the equation

h(t) = a + b \; \text{sin}\left(\frac{2\pi}{365}t\right) \qquad t \geq 0

where t is the number of days and a and b are positive constants. Note that t = 0 corresponds to the first day of the model.

According to the model,

(i) given that the maximum number of hours of daylight is 17 and the minimum number of hours of daylight is 7, find the value of a and the value of b,

(ii) explain the significance of \frac{2\pi}{365},

(iii) suggest, with a reason, the date on which the model starts.

How did you do?

1a
2 marks
Graph with two intersecting lines labelled NA and NB, on axes t (horizontal) and N (vertical) The NB line is made of two line segments, one with positive gradient, then a line with a negative gradient. The NA line is made of two line segments, one with negative gradient, then a line with a positive gradient. NA and NB intersect in two places, and both stop at t=5.
Figure 2

The number of subscribers to two different music streaming companies is being monitored.

The number of subscribers, N subscript A , in thousands, to company A is modelled by the equation

N subscript A equals open vertical bar t minus 3 close vertical bar plus 4 space space space space space space space space t greater or equal than 0

where t is the time in years since monitoring began.

The number of subscribers, N subscript B, in thousands, to company B is modelled by the equation

N subscript B equals 8 minus open vertical bar 2 t minus 6 close vertical bar space space space space space space space space t greater or equal than 0

where t is the time in years since monitoring began.

Figure 2 shows a sketch of the graph of N subscript A and the graph of N subscript B over a 5-year period.

Use the equations of the models to answer parts (a), (b), (c) and (d).

Find the initial difference between the number of subscribers to company A and the number of subscribers to company B.

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1b
2 marks

When t equals T company A reduced its subscription prices and the number of subscribers increased.

Suggest a value for T, giving a reason for your answer.

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1c
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5 marks

Find the range of values of t for which N subscript A greater than N subscript B giving your answer in set notation.

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1d
1 mark

State a limitation of the model used for company B.

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2a
4 marks

Figure 1 shows a graph of the height of water in a wave tank, h cm, t seconds after the tank is switched on.

q1a-2-13-further-modelling-with-functions-a-level-only-edexcel-a-level-pure-maths-veryhard

Using the graph,

(i) write down the maximum height of the water,

(ii) find the frequency of the waves,

(iii) find an equation for the height of the water in the form

h(t) = A \; \text{sin}(Bt)^{\circ} \qquad t \geq 0

where A and B are constants to be found.

How did you do?

2b
2 marks

A new model is proposed for the height of the water in the wave tank. This model has double the amplitude of the original model and exactly 15 waves per minute.

Write down a complete equation for this new model.

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2c
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1 mark

Suggest one improvement that could be made to the model to make it more realistic for simulating actual sea waves.

How did you do?

3
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6 marks

A skydiver jumps from a moving aircraft directly above a fixed point O on the ground. The height of the skydiver above the ground, h metres, at a horizontal distance of x metres from O is modelled by the equation

h(x) = 4000 - 0.1x^{2} \qquad x \geq 0

According to the model,

(i) write down the altitude from which the skydiver jumped,

(ii) find the height of the skydiver when their horizontal distance from O is exactly 60 m,

(iii) find the horizontal distance covered by the skydiver when they land.

The skydiver lands exactly in the centre of a circular landing zone of area 90\,000 m².

(iv) Determine whether the point O is within the landing zone.

How did you do?

4a
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5 marks

The Red Blades aerobatic team uses smoke trails during their displays. Initially, a plane's tanks hold exactly 270 litres of white smoke and exactly 90 litres of red smoke.

The amount of white smoke remaining, w litres, t seconds after it starts being used is modelled by the equation

w = \frac{30\,375}{t + p} - q \qquad t \geq 0

where p and q are constants.

Given that the white smoke runs out exactly 6 minutes after it starts being used, find the value of p and the value of q.

How did you do?

4b
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4 marks

The amount of red smoke remaining, r litres, t seconds after it starts being used is modelled by the equation

r = \frac{36\,000}{t + 240} - 60 \qquad t \geq 0

According to the models, find the time at which the white and red tanks have the same amount of smoke remaining. Comment on your answer.

How did you do?

5
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6 marks

A company, Toys-were-Us, sells games. The total revenue, £R, is calculated by multiplying the selling price of a game by the number of games sold.

Toys-were-Us sold exactly 3 000 000 games at a price of £50 each. The company predicts that for every £2 increase in the selling price, exactly 500 000 fewer games will be sold, and for every £2 decrease in the selling price, exactly 500 000 more games will be sold.

Find the selling price the company should set to maximise the revenue, state the expected number of games sold and the expected maximum revenue.

How did you do?

6a
2 marks

The height of a leaping unicorn above the ground, h metres, at a horizontal distance of x metres from its starting point is modelled by the equation

h(x) = |Ae^{-kx} \; \text{sin} \; x| \qquad x \geq 0

where A and k are positive constants.

According to the model, the jump length is constant but the maximum height of the jumps reduces over time.

(i) Write down the jump length.

(ii) Describe how changing the value of k affects the model.

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6b
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5 marks

During the first jump, the maximum height is exactly 1.288 m after covering a horizontal distance of exactly 1.471 m.

Find the value of A and the value of k.

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6c
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2 marks

Find the total ground distance when the unicorn is at the maximum height of its third jump.

How did you do?

7a
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3 marks

The value of an investment, £V, t years after an initial investment of £I is made, is modelled by the equation

V = I\left(1 + \frac{r}{100}\right)^{t} \qquad t \geq 0

where r% is the interest rate.

According to the model, find the interest rate, r, required for the investment to double in value in exactly 8 years.

How did you do?

7b
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5 marks

Figure 1 shows the details of two different investment options, Option 1 and Option 2.

q7b-2-13-further-modelling-with-functions-a-level-only-edexcel-a-level-pure-maths-veryhard

(i) Find the least initial amount that must be invested for Option 2 to give a greater return than Option 1.

(ii) A customer has exactly £8100 to invest. Advise the customer on which option they should choose, justifying your answer.

How did you do?

8a
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5 marks

The flight path of a hot air balloon is planned according to the graph below. The path is made up of three segments — ascent, cruising and descent.

q8a-2-13-further-modelling-with-functions-a-level-only-edexcel-a-level-pure-maths-veryhard

Point A(A_t, c) is the point where the flight path changes from ascent to cruising.

Point B(B_t, c) is the point where the flight path changes from cruising to descent.

The functions for the ascent and cruising segments of the flight are given below.

Ascent: f(t) = 8(t - 6)^{3} + 1728 \qquad 0 \leq t \leq A_t

Cruise: g(t) = 3456 + 200 \; \text{sin}(t - 12) \qquad A_t \leq t \leq B_t

where f(t) and g(t) give the altitude in feet at a time t minutes after the commencement of the balloon's flight.

The balloon begins and ends the cruising segment of its flight at an altitude midway between its minimum and maximum cruising altitudes.

Use the information given to deduce

(i) the values of A_t, B_t and c,

(ii) the difference between the maximum and minimum cruising altitudes.

How did you do?

8b
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4 marks

The total flight time is planned to be 60 minutes. The descent part of the journey is modelled by a linear function, h(t), where B_t \leq t \leq 60.

Find an equation for h(t).

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8c
1 mark

Describe a problem with attempting to model hot air balloon flights in this manner.

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