Modelling with Logarithms & Exponentials (Cambridge (CIE) AS Maths: Pure 2): Exam Questions

Exam code: 9709

3 hours42 questions
1
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4 marks

State whether the following functions could represent exponential growth or exponential decay.

(i) f(x)=5e2x

(ii) f(t)=100et

(iii) f(a)=20eka ,  k>0

(iv) f(t)=Aekt ,  A,k>0

2
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3 marks

Write the following in the form ,ekx where k is a constant and k>0.

(i) e3x×e2x

(ii) 5x

(iii) 2x

3
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3 marks

Write the following in the form ekx, where k is a constant and k>0.

(i) e2xe4x

(ii) (15)x

(iii) (12)x

4
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3 marks

The diagram below shows a sketch of the graph of y=ex.

On the diagram, add the graph of y=e2x labelling the point at which the graph intersects the y-axis.

Write down the equation of any asymptotes on the graph.

q5-6-3-modelling-with-exponentials-and-logarithms-edexcel-a-level-pure-maths-easy
5a
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3 marks

By taking logarithms (base e) of both sides show that the equation

y=Aekx

can be written in the form ln y=kx+ln A

5b
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4 marks

Hence ...

(i) write the equation y=2e0.01x in the form ln y=kx+ln A.

(ii) write the equation ln y=0.3x + In 5 in the form y=Aekx.

6a
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1 mark

In an effort to prevent extinction scientists released 24 rare birds into a newly constructed nature reserve.

The population of birds, within the reserve, is modelled by

B=Ae0.4t

B is the number of birds after t years of being released into the reserve.

A is a constant.

Write down the value of A.

6b
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2 marks

According to this model, how many birds will be in the reserve after 2 years?

6c
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2 marks

How many years after release will it take for the population of birds to double?

7a
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1 mark

A simple model for the acceleration of a rocket, A ms2, is given as 

A=10e0.1t

where t is the time in seconds after lift-off.  

What is the meaning of the value 10 in the model?

7b
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2 marks

Find the acceleration of the rocket 15 seconds after lift-off.

7c
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3 marks

Find how long it takes for the acceleration to reach 100 ms2.

8a
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1 mark

An exponential growth model for the number of bacteria in an experiment is of the form N=Aekt

N is the number of bacteria and t is the time in hours since the experiment began.

A are k constants.

A scientist records the number of bacteria every hour for 3 hours.

The results are shown in the table below.

 t,hours

0

1

2

3

4

 N, no. of bacteria

100

210

320

730

1580

 ln N  (3SF)

4.61

5.35

5.77

6.59

7.37

Plot the observations on the graph below - plotting ln N against t.

q8-6-3-modelling-with-exponentials-and-logarithms-edexcel-a-level-pure-maths-easy
8b
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2 marks

Using the points (0, 4.61) and (4, 7.37), find an equation for a line of best fit in the form ln N=mt+ln c, where m and c are constants to be found.

8c
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2 marks

Hence estimate the values of A and k.

1a
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1 mark

Write (13)x  in the form  ekx.

1b
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2 marks

Write (27)t  in the form  ekt.

State whether this would represent exponential growth or exponential decay.

2a
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1 mark

Write (710)x  in the form  ekx.

2b
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2 marks

Sketch the graph of y=(710)x.

State the coordinates of the y-axis intercept. Write down the equation of the asymptote.

3a
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1 mark

By taking logarithms (base e) of both sides show that the equation

y=5e0.1x

can be written as

ln y=0.1x+ln 5

3b
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2 marks

Given  y=Aekx  and  ln y=4.1x+ln 8, find the values of A and k.

4a
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1 mark

By taking logarithms (base 10) of both sides show that the equation

y=2x3.2

can be written as

log y=3.2 log x+log 2

4b
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2 marks

Given  y=Axb and  log y=1.8 log x+log 5, find the values of A and b.

5a
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1 mark

By taking logarithms (base 2) of both sides show that the equation

y=3×24x

can be written as

log2 y=4x+log2 3

5b
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2 marks

Given y=Abkx  and log3 y=5x+log3 7 , find the values of A,b and k.

6a
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1 mark

In an effort to prevent extinction scientists released some rare birds into a newly constructed nature reserve.

The population of birds, within the reserve, is modelled by

B=16e0.85t

B is the number of birds after t years of being released into the reserve.

Write down the number of birds the scientists released into the nature reserve.

6b
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2 marks

According to this model, how many birds will be in the reserve after 3 years?

6c
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2 marks

How long will it take for the population of birds within the reserve to reach 500?

7a
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1 mark

A simple model for the acceleration of a rocket,A ms2 , is given as

 A=A0e0.2t

where t is the time in seconds after lift-off.  A0 is a constant.

What does the constant A0 represent?

7b
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2 marks

After 10 seconds, the acceleration is 20 ms2. Find the value of A0.

7c
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2 marks

Find how long it takes for the acceleration of the rocket to reach 100 ms2

8a
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1 mark

Carbon-14 is a radioactive isotope of the element carbon.

Carbon-14 decays exponentially – as it decays it loses mass.

Carbon-14 is used in carbon dating to estimate the age of objects.

The time it takes the mass of carbon-14 to halve (called its half-life) is approximately 5700 years.

 A model for the mass of carbon-14, m g, in an object of age t years is

m=m0ekt

where m0 and k are constants.

For an object initially containing 100g of carbon-14, write down the value of m0.

8b
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2 marks

Briefly explain why, if m0=100,m  will equal 50g  when t=5700 years.

8c
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2 marks

Using the values from part (b), show that the value of k is 1.22×104 to three significant figures.

8d
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2 marks

A different object currently contains 60g of carbon-14. In 2000 years’ time how much carbon-14 will remain in the object?

9a
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1 mark

An exponential growth model for the number of bacteria in an experiment is of the form N=N0 akt. N is the number of bacteria and t is the time in hours since the experiment began.N0, a and k are constants.  A scientist records the number of bacteria at various points over a six-hour period.  The results are shown in the table below.

  t, hours

0

2

4

6

  N, no. of bacteria

100

180

340

620

  log3 N (3SF)

4.19

4.73

5.31

5.85

Plot the observations on the graph below - plotting log3 N against t.

q9a-6-3-modelling-with-exponentials-and-logarithms-edexcel-a-level-pure-maths-easy
9b
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2 marks

Using the points (0, 4.19) and (6, 5.85), find an equation for a line of best fit in the form log3 N=mt+log3 c, where m and c are constants to be found.

9c
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2 marks

The equation N=N0 akt  can be written in the form  loga N=kt+loga N0.

Use your answer to part (b) to estimate the values of , N0,a , and k.

10a
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2 marks

An exponential model of the form  D=Aekt  is used to model the amount of a pain-relieving drug (D mg/ml) there is in a patient’s bloodstream, t hours after the drug was administered by injection. A  and k are constants.

The graph below shows values of In D plotted against t with a line of best fit drawn.

q10a-6-3-modelling-with-exponentials-and-logarithms-edexcel-a-level-pure-maths-medium

(i) Use the graph and line of best fit to estimate ln D at time t=0.

(ii) Work out the gradient of the line of best fit.

10b
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1 mark

Use your answers to part (a) to write down an equation for the line of best fit in the form ln D=mt+ln c,  where m and c are constants.

10c
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1 mark

Show that D=Aekt can be rearranged to give ln D=kt+ln A

10d
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2 marks

Hence find estimates for the constants A and k.

10e
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2 marks

Find the time when the amount of the pain-relieving drug in the patient’s bloodstream is 1.5 mg/ml.

11a
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2 marks

A small company makes a profit of £2500 in its first year of business and £3700 in the second year.  The company decides they will use the model

P=P0 yk

to predict future years’ profits.

£P is the profit in the yth year of business.

P0 and k are constants.

Write down two equations connecting P0 and k.

11b
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2 marks

Find the values of P0 and k.

11c
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2 marks

Find the predicted profit for years 3 and 4.

11d
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2 marks

Show that

P=P0 yk

can be written in the form

log P=log P0+k log y

1a
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2 marks

Write  (35)x in the form ekx , giving the value of k to three significant figures.

1b
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2 marks

Write (47)3t  in the form ekt , giving the value of k to three significant figures.

State, and justify, whether this would represent exponential growth or decay.

2a
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2 marks

Write (0.7)x+1  in the form  Aekx.

2b
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2 marks

Sketch the graph of y=(0.7)x+13.

State the coordinates of the y-axis intercept.

Write down the equation of the asymptote.

3a
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2 marks

Show that the equation

x=7e0.2t

can be written as

ln x=ln 70.2t

3b
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2 marks

Rewrite the equation ln y=4.1x+ln 8 in the form  y=Aekx.

4a
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2 marks

Show that the equation

y=2x34

can be written as

log y=0.75 log x+log 2

4b
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2 marks

Rewrite the equation log y=4.7 log x+log 12 in the form  y=Axb.

5a
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2 marks

Show that the equation

y=0.1×20.01x

can be written as

log2 y=0.01xlog2 10

5b
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2 marks

Rewrite the equation log3 y=6.3x+log3 4 in the form  y=Abkx.

6a
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1 mark

Scientists introduced a small number of rare breed deer to a large wildlife sanctuary.

The population of deer, within the sanctuary, is modelled by

D=20e0.1t

D is the number of deer after t years of first being introduced to the sanctuary.

Write down the number of deer the scientists introduced to the sanctuary.

6b
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2 marks

How many years does it take for the deer population to double?

6c
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1 mark

Give one criticism of the model for population growth.

6d
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2 marks

The scientists suggest that the population of deer are separated after either 25 years or when their population exceeds 400.

Find the earliest time the deer should be separated.

7a
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2 marks

A simple model for the acceleration of a rocket,A ms2 , is given as

A=5ekt

where t is the time in seconds after lift-off. k  is a constant.

After 4 seconds the acceleration of the rocket is 10 ms2. Find the value of k.

7b
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2 marks

Find the time at which the acceleration of the rocket has increased by 200%.

7c
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2 marks

Sketch the graph of the acceleration of the rocket, against time, stating the coordinates of the point that shows the initial acceleration of the rocket.

8a
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2 marks

Carbon-14 is a radioactive isotope of the element carbon.

Carbon-14 decays exponentially – as it decays it loses mass.

Carbon-14 is used in carbon dating to estimate the age of objects.

The time it takes the mass of carbon-14 to halve (called its half-life) is approximately 5700 years

A model for the mass of carbon-14, y g, in an object originally containing 100 g, at time t years is

y=100ekt

where k is a constant.

Find the value of k, giving your answer to three significant figures.

8b
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2 marks

The object is considered as having no radioactivity once the mass of carbon-14 it contains falls below 0.5 g. Find out how old the object would have to be, to be considered non-radioactive.

8c
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2 marks

A different object currently contains 25g of carbon-14. In 500 years’ time how much carbon-14 will remain in the object?

9a
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2 marks

An exponential growth model for the number of bacteria in an experiment is of the form

N=N0 akt

N is the number of bacteria and t is the time in hours since the experiment began. N0,a and k are constants.

 A scientist records the number of bacteria at various points over a six-hour period.

The results are in the table below.

 t, hours

0

2

4

6

 N, no. of bacteria

200

350

600

1100

Plot the observations on the graph below - plotting log5 N against t.

Draw a line of best fit.

q10a-6-3-modelling-with-exponentials-and-logarithms-edexcel-a-level-pure-maths-hard
9b
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2 marks

Find an equation for your line of best fit in the form log5 N=mt+log5c

9c
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2 marks

Estimate the values of ,N0 ,a and k.

10a
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2 marks

An exponential model of the form

D=Aekt

is used to model the amount of a pain-relieving drug (D mg/ml) there is in a patient’s bloodstream, t hours after the drug was administered by injection.  A and k are constants.

The graph below shows values of ln D plotted against t

q11a-6-3-modelling-with-exponentials-and-logarithms-edexcel-a-level-pure-maths-hard

Using the points marked P and Q, find an equation for the line of best fit, giving your answer in the form ln D=mt+ln c, where m and c are constants to be found.

10b
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2 marks

Hence find estimates for the constants A and  k

10c
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2 marks

The patient is allowed a second injection of the drug once the amount of drug in the bloodstream falls below 1% of the initial dose.

Find, to the nearest minute, how long until the patient is allowed a second injection of the drug.

11a
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2 marks

The annual profits, in thousands of pounds, of a small company in the first 4 years of business are given in the table below.

  a, years in business

1

2

3

4

  P,annual profit 

£3100

£4384

£5369

£6200

Using this data the company uses the model

P=P1ak

to predict future years’ profits. P1  and k are constants.

Use data from the table to find the values of P1 and k.

11b
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2 marks

Show that log P=k log a+log P1, where P1 and k take the values found in part (a).

11c
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1 mark

State a potential problem with using the model to predict the profit in the company’s 12th year of business.

1a
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1 mark

Write  (0.8)x in the form ekx , giving the value of k to three significant figures.

1b
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4 marks

(i) Write  (23)4t+1  in the form  Aekt, giving the values of A and k to three significant figures where necessary.

(ii) State, and justify, whether this would represent exponential growth or decay.

(iii) Write down the initial value of Aekt.

2
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4 marks

Sketch the graph of  y=(35)2x+14.

State the coordinates of any points where the graph intercepts the coordinate axes.

Write down the equations of any asymptotes.

3a
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2 marks

Rewrite the equation ln x=2t+ln 6 in the form  x=Aekt.

3b
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2 marks

Sketch the graph of ln =2t+ln 6 by plotting  ln x  against t.

4a
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2 marks

Rewrite the equation  y=3.6x0.4  in the form log y=log Ablog x

4b
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2 marks

Sketch the graph of log y against  log x.

5a
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3 marks

Rewrite the equation y=23×50.2x  in the form logb y=logb pqx  where b is an integer and p and q are rational numbers.

5b
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2 marks

Sketch the graph of logb y against x.

6a
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2 marks

Scientists introduced a small number of apes into a previously unpopulated forest.

The population of apes in the forest is modelled by

A=16ekm

where A is the number of apes after m months of first being introduced to the forest.

State, with a reason, whether you would expect the value of k to be positive or negative.

6b
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2 marks

After 8 months, the number of apes in the forest has increased by 50%.

Find the value of k.

6c
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2 marks

Scientists believe the forest cannot sustain a population of apes greater than 3000.

What length of time is the model for the population of the apes reliable for?

7a
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4 marks

A manufacturer claims their flask will keep a hot drink warm for up to 7 hours.

In this sense, warm is considered to be 50°C or higher.

Assuming a hot drink is made at 85°C and its temperature inside the flask is 50°C after exactly 7 hours, find:

(i) a linear model for the temperature of the drink inside the flask of the form T=a+bt, and

(ii) an exponential model for the temperature of the drink inside the flask of the form T=Aekt

where T°C is the temperature of the drink in the flask after t hours and a,b,A and k are constants.

7b
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2 marks

Compare the rate of change of the temperature of the drink inside the flask of both models after 3 hours.

7c
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1 mark

A user of the flask suggests that hot drinks are only kept warm for 5 hours.

Suggest a reason why the user’s experience may not be up to the claims of the manufacturer.

8a
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2 marks

A simple model for the acceleration of a rocket, A ms1, is given as

A=Rekt

where t is the time in seconds after lift-off.  R and k are constants.

Negative time is often used in rocket launches as a way of counting down until lift off. Despite this the model above is still not suitable for use with negative  t values Briefly explain why.

8b
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3 marks

After 5 seconds the acceleration of the rocket is 12 ms2 and after 20 seconds its acceleration is 50 ms2.  Find the values of R and k.

8c
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1 mark

A space enthusiast suggests that a linear model (of the form A=R+ct) would be more suitable.

Using the figures in (b), explain why the enthusiast’s model is unrealistic.

9a
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1 mark

Carbon-14 is a radioactive isotope of the element carbon.

Carbon-14 decays exponentially – as it decays it loses mass.

Carbon-14 is used in carbon dating to estimate the age of objects.

The time it takes carbon-14 to halve (called its half-life) is approximately 5700 years.

A model for the mass of carbon-14, m g, in an object, at time t years is

m=M0 ekt

where M0 and k are constants.

Briefly explain the meaning of the constant M0.

9b
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3 marks

Find the value of k, giving your answer in the form ln ab, where a and b are integers to be found.

9c
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2 marks

An object currently contains 200 g of carbon-14. In 20 000 years’ time, how much carbon-14, to the nearest gram, remains in the object?

9d
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3 marks

The half-life of carbon-14 is believed to only be accurate to ±40 years.

A fossilised bone currently contains 3×106 g of carbon-14.

It is estimated the bone would have originally contained 1×102 g of carbon-14.

Find upper and lower estimates for the age of the bone, giving your answers to two significant figures.

10a
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3 marks

An exponential growth model for the number of bacteria in an experiment is of the form

N=N0akt

N is the number of bacteria and t is the time in hours since the experiment began. N0,a and k  are constants.

A scientist records the number of bacteria at various points over a six-hour period.

The results are in the table below.

  t, hours

0

1.5

3

4.5

6

  N, no. of bacteria

120

190

360

680

1230

By plotting log2 N against t, drawing a line of best fit and finding its equation, estimate the values of N0,a , and k.

q10a-6-3-modelling-with-exponentials-and-logarithms-edexcel-a-level-pure-maths-veryhard
10b
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2 marks

What does the model predict for the value of N after twelve hours?

Comment on the reliability of this prediction.

11a
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3 marks

An exponential model of the form

D=Aekt

is used to model the concentration of a pain-relieving drug (D mg/ml) in a patient’s bloodstream t hours after the drug was administered by injection.  A and k are constants.

The graph below shows values of ln D plotted against t

q11a-6-3-modelling-with-exponentials-and-logarithms-edexcel-a-level-pure-maths-veryhard

Find estimates for the constants A and k.

11b
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2 marks

Find the time, to the nearest minute, at which the rate of decrease of the concentration of the drug in the patient’s bloodstream is 12 mg/ml/hour.

12a
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3 marks

The annual profits, in thousands of pounds, of a small company in the first 4 years of business are given in the table below.

  a, years in business

1

2

3

4

  log P£P is annual profit)

3.74

3.86

3.94

4.01

Using this data the company uses the model

P=P1ak

to predict future years’ profits. P1  and k are constants.

Use the results in the table to estimate the values of P1 and k.

12b
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1 mark

Many new companies make a loss in their first year of business.

Briefly explain why, in such circumstances, a model of the form used above would not be suitable.