IBMaths: AA HLDPExam Questions2. Functions2.4 Other Functions & Graphs

Other Functions & Graphs (DP IB Maths: AA HL)

Exam Questions

3 hours28 questions
Medium
Hard
Very Hard
1a
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Let f open parentheses x close parentheses equals fraction numerator 3 x minus 2 over denominator 2 x plus 1 end fraction, for x not equal to negative 1 half, and g open parentheses x close parentheses equals negative x minus 2,for x element of bold real numbers
The graphs of f and g intersect at points straight A and straight B.

Find the coordinates of straight A and straight B.

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1b
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Find the length of the line segment AB.

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2a
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Consider the functions f left parenthesis x right parenthesis equals negative x to the power of 5 plus 2020 and g left parenthesis x right parenthesis equals fraction numerator 1 over denominator square root of open parentheses 1 minus x close parentheses cubed end root end fraction minus 2 .

Find the coordinates of the y-intercepts for the graph of

(i)

f

(ii)
g

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2b
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Find the coordinates of the x-intercepts for the graph of

(i)

f

(ii)
g

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2c
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For the graph of g , find the equation of

(i)

the vertical asymptote

(ii)

the horizontal asymptote.

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3a
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Consider the function f defined by f open parentheses x close parentheses equals fraction numerator x plus 2 over denominator 2 x minus 3 end fraction, for x not equal to 3 over 2, and the line x minus 7 y plus 2 equals 0.
The graph of f and the line intersect at points A and B.

Find the coordinates of A and B.

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3b
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Find the midpoint of the line segment AB.

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4a
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Let f left parenthesis x right parenthesis equals ln left parenthesis x plus 2 right parenthesis comma x greater than negative 2 .

Find the coordinates of:

(i)

the x minusintercept

(ii)
the y minusintercept

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4b
Sme Calculator2 marks

State the equation of the vertical asymptote to the graph of f

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4c
Sme Calculator2 marks

The graph of y equals f left parenthesis x right parenthesis  intersects with its inverse, twice.

Find the two coordinates where f left parenthesis x right parenthesis equals f to the power of negative 1 end exponent left parenthesis x right parenthesis.

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5a
Sme Calculator3 marks

Let f left parenthesis x right parenthesis equals 0.5 e to the power of 2 x end exponent plus 1 comma for minus 1 less or equal than x less or equal than 2.

On the following grid, sketch the graph of y equals f left parenthesis x right parenthesis.

ib5a-ai-sl-2-4-ib-maths-medium

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5b
Sme Calculator4 marks

The inverse of f can be written in the form of f to the power of negative 1 end exponent left parenthesis x right parenthesis equals A space l n space invisible function application b left parenthesis x minus c right parenthesis.
Find the values of A comma b and of c.

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6a
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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 equals m subscript 0 e to the power of negative k t end exponent

where m subscript 0 space and space k are constants.

For an object initially containing 100g of carbon-14, write down the value of  m subscript 0.



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6b
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Briefly explain why, if m subscript 0 equals 100, m will equal 50 space g  when t equals 5700 space years.

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6c
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Using the values from part (b), show that the value of k is 1.22 cross times 10 to the power of negative 4 end exponent to three significant figures.

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6d
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A different object currently contains 60g of carbon-14.
In 2000 years’ time how much carbon-14 will remain in the object?

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7a
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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 equals P subscript 0 space y to the power of k

to predict future years’ profits.

£ P is the profit in the y to the power of t h end exponent year of business.

P subscript 0 and k are constants.

Write down two equations connecting P subscript 0 and k.

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7b
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Find the values of P subscript 0 and k.

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7c
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Find the predicted profit for years 3 and 4.

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7d
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Show that

P equals P subscript 0 y to the power of k

can be written in the form

l o g P equals l o g P subscript 0 plus k space l o g invisible function application y

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8a
Sme Calculator1 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 equals 16 e to the power of 0.85 t end exponent

straight 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.

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8b
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According to this model, how many birds will be in the reserve after 3 years?

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8c
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How long will it take for the population of birds within the reserve to reach 500?

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9a
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Rebecca recently had the COVID-19 vaccine. The volume, straight V of the vaccine in her blood over time can be modelled by an equation of the form V subscript 1 left parenthesis t right parenthesis equals 1.7 t e to the power of negative 1.25 t end exponent , where straight V is the concentration (in mg) of the vaccine in the bloodstream and  is time measured in days after 9am on Monday.

On the following grid, sketch the graph of y equals V subscript 1 left parenthesis t right parenthesis.

ib9a-ai-sl-2-4-ib-maths-medium

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9b
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Find, to the nearest minute, the time when the vaccine volume straight V subscript 1, reaches a maximum value.

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9c
Sme Calculator3 marks

Rebecca experienced side-effects from the vaccine between the times when the volume reached its maximum value until it had dropped to half of its maximum value. Find, to the nearest minute, the length of time that Rebecca experienced side-effects from taking the vaccine.

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9d
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The vaccine is medically determined to be no longer in Rebecca’s bloodstream when it drops down to 1% of its maximum value. Find the time that the vaccine is no longer in Rebecca’s bloodstream.

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9e
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Rebecca’s friend, Zara, also had the vaccine on the same day. The volume in Zara’s bloodstream can be modelled by an equation of the form of V subscript 2 left parenthesis t right parenthesis equals 1.766 t e to the power of negative 1.3 t end exponentCalculate, to the nearest minute, how much faster V subscript 2 took to reach a maximum volume compared to straight V subscript 1.

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10a
Sme Calculator2 marks

Let f open parentheses x close parentheses = e to the power of x plus 1 and g open parentheses x close parentheses = 4 x plus a, where x element of straight real numbers and a is a constant.

Find open parentheses g ring operator f close parentheses open parentheses x close parentheses.

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10b
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Given that open parentheses g ring operator f close parentheses open parentheses 0 close parentheses equals 2, find the value of a.

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10c
Sme Calculator3 marks

Solve the equation open parentheses g ring operator f close parentheses open parentheses x close parentheses equals 0.

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11a
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Let f open parentheses x close parentheses equals a b to the power of x, where x comma a comma b space element of straight real numbersand x greater-than or slanted equal to 0, a,b > 1.

The graph of f contains the points (0, 3) and (2, 75).

Find the values of a and b.

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11b
Sme Calculator3 marks

Find an expression for f to the power of negative 1 end exponent open parentheses x close parentheses.

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11c
Sme Calculator2 marks

Find the value of f to the power of negative 1 end exponent(375).

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12a
Sme Calculator2 marks

Consider f open parentheses x close parentheses equals In open parentheses square root of x squared minus 16 end root close parentheses.

Find the largest possible domain straight D subscript f for f to be a function.

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12b
Sme Calculator3 marks

Let f open parentheses x close parentheses equals In space open parentheses square root of x squared minus 16 end root close parentheses, for  x element of straight D subscript f.

Explain why

(i)
f is an even function

(ii)
the inverse function f to the power of negative 1 end exponent does not exist.

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13a
Sme Calculator5 marks

Let f open parentheses x close parentheses equals fraction numerator 2 open parentheses x plus 1 close parentheses over denominator x minus 1 end fraction, for x not equal to 1, and  g open parentheses x close parentheses equals x plus 1 comma for x element of straight real numbers.

The graphs of f and g intersect at points straight A and straight B.

Find the coordinates of straight A and straight B.

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13b
Sme Calculator3 marks

Find the equation of the straight line at passes through straight A and straight B, giving your answer in the form a x plus b y plus d equals 0.

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13c
Sme Calculator2 marks

Write down the gradient of the line that is perpendicular to the line passing through straight A and straight B.

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1a
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Consider the function f left parenthesis x right parenthesis equals a left parenthesis 0.75 right parenthesis to the power of x plus b where a and b are constants. The graph of f passes through the points left parenthesis 0 comma 18 right parenthesis and left parenthesis 2 comma 11 right parenthesis and is shown below.

ib1a-ai-sl-2-4-ib-maths-hard

Write down two equations relating a and b .

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1b
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Find the value of a and b.

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1c
Sme Calculator2 marks

Write down the equation of the horizontal asymptote of the graph of f.

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2a
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The average fat-free mass, M, in kg, of footballers as a function of their age,a , in years, can be given by the logarithmic function:

M left parenthesis a right parenthesis equals 10 space log invisible function application left parenthesis space a minus 15 right parenthesis plus 50 comma space space space space space space 16 less or equal than a less or equal than 25.

Calculate the average fat free mass of players aged:

(i)

16 years

(ii)
25 years.

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2b
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Find an expression for a linear model using your answers to part (a) (i) and (ii).

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3a
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The number of bacteria, n, in a dish, after t minutes is given by n equals 5231 e to the power of 0.12 t end exponent

Find the initial amount of bacteria.

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3b
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Find the amount of bacteria after 12 minutes. Give your answer in the form a cross times 10 to the power of k comma where 1 less or equal than a less than 10 comma k element of Z.

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3c
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Find the value of t when n equals 2.7 cross times 10 to the power of 4.

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4a
Sme Calculator2 marks

Let f left parenthesis x right parenthesis equals e to the power of negative x end exponent plus 1 and g left parenthesis x right parenthesis equals 2 x minus m, for x element of straight real numbers, where m is a constant.

Find left parenthesis g ring operator f right parenthesis left parenthesis x right parenthesis.

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4b
Sme Calculator3 marks

Given that limit as x rightwards arrow infinity of left parenthesis g ring operator f right parenthesis left parenthesis x right parenthesis equals negative 1 find the value of m.

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5a
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Consider the functions space f left parenthesis x right parenthesis equals 2 space ln invisible function application left parenthesis 5 x minus 1 right parenthesis  and  g left parenthesis x right parenthesis equals l n left parenthesis 5 x minus 1 right parenthesis squared   where the domain for each function is as large as possible.

  (i)     Write down the domain for f and the domain for g.

  (ii)    Write down the set of values of x for which f left parenthesis x right parenthesis equals g left parenthesis x right parenthesis.

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5b
Sme Calculator4 marks

  (i)     Find the inverse function of f.

   (ii)    Explain why g does not have an inverse.

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5c
Sme Calculator4 marks

The function h is the same as function g but with its domain restricted to x less or equal than k commawhere k element of straight integer numbers, so that h has an inverse.

  (i)     Write down the largest possible value of k.

  (ii)    Find the inverse function of h.

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6a
Sme Calculator3 marks

Consider the function f left parenthesis x right parenthesis equals 1 half open parentheses e to the power of x plus e to the power of negative x end exponent close parentheses comma x element of R.

Sketch the graph of f  and write down its range.

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6b
Sme Calculator4 marks

(i)     For k greater than 1 , show that   f left parenthesis x right parenthesis equals k  leads to the equation  e squared x minus 2 k e to the power of x plus 1 equals 0 .

(ii)    Find the two solutions in terms of k.

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6c
Sme Calculator3 marks

The domain of f  is now restricted to x less or equal than p so that it has an inverse.

(i)      Write down the largest value of f .

(ii)     Sketch the graph of f to the power of negative 1 end exponent and state its domain and range.

(iii)    Use the solution to (b) to write down the inverse of f.

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7
Sme Calculator4 marks

Show that the function f, defined by f open parentheses x close parentheses equals ln open parentheses fraction numerator e to the power of x plus 1 over denominator e to the power of x minus 1 end fraction close parentheses,  is a self-inverse function.

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1a
Sme Calculator2 marks

A function is defined by f left parenthesis x right parenthesis equals straight e to the power of x squared plus b x plus 4 end exponent. The graph of f has an axis of symmetry of x equals 2.

Find the value of b.

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1b
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Find the range of f.

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1c
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Another function is defined by g left parenthesis x right parenthesis equals negative fraction numerator open parentheses x squared minus 25 close parentheses over denominator 5 end fraction. The graph of f and g intersect at points

A and B.

Find the equation of the line passing through points A and B. Give your answer in the form y equals m x plus c.

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1d
Sme Calculator2 marks

Find the distance of the line AB.

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2a
Sme Calculator2 marks

Consider the function f left parenthesis x right parenthesis equals 5 minus log invisible function application left parenthesis 6 minus 4 x right parenthesis. The line l subscript 1 intersects the graph of f at point Aleft parenthesis negative 1 comma y right parenthesis  and Bleft parenthesis x comma 5 right parenthesis .

Find the value of x spaceand y.

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2b
Sme Calculator2 marks

Find the equation of l subscript 1. Give your answer in the form y equals m x plus c, where m and c spaceare fractions.

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3a
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The function f is a quadratic in the form f left parenthesis x right parenthesis equals a x squared plus b x minus 2, for negative 10 less or equal than x less or equal than 10 .

The graph of f has x-intercepts open parentheses fraction numerator 1 plus square root of 5 over denominator 2 end fraction comma 0 close parentheses and open parentheses fraction numerator 1 minus square root of 5 over denominator 2 end fraction comma 0 close parentheses.  

Find the values of a and b.

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3b
Sme Calculator2 marks

Another function can be defined by g left parenthesis x right parenthesis equals 6 open parentheses 0.8 close parentheses to the power of negative x end exponent minus 1 , for negative 10 less or equal than x less or equal than 10.

The graph of f and g intersect at points straight A and straight B.

Find the coordinates of straight A and B.

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3c
Sme Calculator2 marks

olve the inequality f left parenthesis x right parenthesis less than g left parenthesis x right parenthesis.

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4a
Sme Calculator2 marks

Write down the domain and range of the logarithmic function y equals l o g subscript b invisible function application x comma where b greater than 0 and b not equal to 1

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4b
Sme Calculator6 marks

Given that l o g subscript left parenthesis y squared right parenthesis invisible function application x equals 16 l o g subscript x left parenthesis y squared right parenthesis, find all the expressions for x in terms of y.

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5a
Sme Calculator3 marks

Let f left parenthesis x right parenthesis equals 2 x to the power of 4 minus 2 x cubed minus 4 x squared plus x plus 1 comma where x element of straight real numbers.

Solve the inequality f left parenthesis x right parenthesis less than 0.

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5b
Sme Calculator3 marks

For the graph of f, find the coordinates of the

(i)

local maximum point.

(ii)
local minimum points.

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5c
Sme Calculator3 marks

Write down the possible domains f of for which f has an inverse and explain why the domain must be restricted.

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6a
Sme Calculator3 marks

Consider the function f defined by f left parenthesis x right parenthesis equals l n invisible function application left parenthesis x squared minus 64 right parenthesis comma for x greater than 8.

The following diagram shows part of the graph of  f  which crosses the x-axis at point A, with coordinates (a, 0).  The line L is the tangent to the graph of  f  at the point B.

ib6a-ai-sl-2-4-ib-maths-veryhard

Find the exact value of a.

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6b
Sme Calculator4 marks

The x-coordinate of B is 10. The y-coordinate of B can be written in the form p space ln invisible function application q, where p comma q element of Z.

Find the value of p spaceand the value of q.

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6c
Sme Calculator5 marks

The gradient of L is 5 over 9 . The equation of L can be written in the form y equals 5 over 9 x minus u left parenthesis v minus ln invisible function application w right parenthesis.

Find the values of u comma v and w.

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7a
Sme Calculator3 marks

A population of endangered birds,P , can be modelled by the equation

P subscript t equals P subscript 0 e to the power of k t

where P subscript 0 is the initial population and t is measured in years.

After three years, it is estimated that  P subscript 3 over P subscript 0equals 0.87 .

Find the value of k and interpret its meaning.

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7b
Sme Calculator5 marks

Find the least number of whole years for which P subscript t over P subscript 0less than 0.45.

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8a
Sme Calculator2 marks

The intensity of light,I , is assumed to be 100% at the surface of the ocean and decreases with depth, d, and can be estimated by the function

I left parenthesis d right parenthesis equals k open parentheses 1.08 close parentheses to the power of negative d end exponent

where I is expressed as a percentage, d is the depth below the surface, in metres, and k is a constant.

Calculate the value of a.

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8b
Sme Calculator2 marks

State the domain and range of I.

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8c
Sme Calculator2 marks

Calculate the intensity of light 6.2 m below the surface.

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