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UNIVERSITY OF CAMBRIDGE INTERNATIONAL EXAMINATIONS International General Certificate of Secondary Education

0580/04, 0581/04

May/June 2009 2 hours 30 minutes

Electronic calculator

Mathematical tables (optional)

Geometrical instruments Tracing paper (optional)

*8086281837*MATHEMATICS Paper 4 (Extended)

Candidates answer on the question paper. Additional Materials:

READ THESE INSTRUCTIONS FIRST

Write your Centre number, candidate number and name on all the work you hand in. Write in dark blue or black pen.

You may use a soft pencil for any diagrams or graphs.

Do not use staples, paper clips, highlighters, glue or correction fluid. DO NOT WRITE IN ANY BARCODES.

Answer all questions.

If working is needed for any question it must be shown below that question. Electronic calculators should be used.

If the degree of accuracy is not specified in the question, and if the answer is not exact, give the answer to three significant figures.

Give answers in degrees to one decimal place. For π use either your calculator value or 3.142.

At the end of the examination, fasten all your work securely together.

The number of marks is given in brackets [ ] at the end of each question or part question. The total of the marks for this paper is 130.

For Examiner's Use

This document consists of 19 printed pages and 1 blank page.

IB09 06_0580_04/5RP © UCLES 2009

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1 Marcus receives $800 from his grandmother.

(a) He decides to spend $150 and to divide the remaining $650 in the ratio

For

Examiner's Use

savings : holiday = 9 : 4.

Calculate the amount of his savings.

ii Answer(a) $

[2]

(b) () He uses 80% of the $150 to buy some clothes. Calculate the cost of the clothes.

i Answer(b)(i) $

[2]

(ii) The money remaining from the $150 is 371

2% of the cost of a day trip to Cairo. Calculate the cost of the trip.

Answer(b)(ii) $

[2]

(c) () Marcus invests $400 of his savings for 2 years at 5 % per year compound interest. Calculate the amount he has at the end of the 2 years. Answer(c)(i) $ [2]

() Marcus’s sister also invests $400, at r % per year simple interest. At the end of 2 years she has exactly the same amount as Marcus. Calculate the value of r. Answer(c)(ii) r = [3]

A normal die, numbered 1 to 6, is rolled 50 times.

For Examiner's Use

24The results are shown in the frequency table.

Score

1 2 3 4 5 6 Frequency 15 10 7 5 6 7

(a) Write down the modal score.

(b) Find the median score.

(d) The die is then rolled another 10 times.

The mean score for the 60 rolls is 2.95.

Calculate the mean score for the extra 10 rolls.

Answer(a)

[1]

Answer(b)

[1]

Answer(c)

[2]

Answer(d)

[3]

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PNOT TOSCALE10 cm14 cmQR

In triangle PQR, angle QPR is acute, PQ = 10 cm and PR = 14 cm.

(a) The area of triangle PQR is 48 cm2.

Calculate angle QPR and show that it rounds to 43.3°, correct to 1 decimal place. You must show all your working. Answer (a) [3]

(b) Calculate the length of the side QR. Answer(b) QR = cm [4]

For Examiner's Use

North ii

North A i

126° B 250 m North 23° P

NOT TO SCALE PB =250 m, angle APB = 23° and angle BAP = 126°.

(a) Calculate the length of the road AB. Answer(a) AB =

(b) The bearing of A from P is 303°. Find the bearing of

() B from P, Answer(b)(i)

() A from B. Answer(b)(ii)

The diagram shows three straight horizontal roads in a town, connecting points P, A and B.

m[3]

[1]

[2]

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5 (a) The table shows some values for the equation y=

x y

–4 –3 –2 –1.5 –1 –0.5 0.5 1 1.5 2 3 4 –1.5 –0.83 0 0.58

–3.75 –0.58 0 0.83 1.5 x_2 for – 4 Y x Y=–0.5 and 0.5 Y x Y 4. 2xFor Examiner's Use

() Write the missing values of y in the empty spaces. [3]

() On the grid, draw the graph of y=x2_2x for – 4 Y x Y=–0.5 and 0.5 Y x Y 4.

y 4 3 2 iii1 x –4 –3 –2 –1 0 1 2 3 4 –1 –2 –3 –4

[5]

(b) Use your graph to solve the equation

Answer(b) x =

or x =

[2]

x_2=1. 2xFor Examiner's Use

() Write down the gradient of the graph where x = –2.

[1] Answer(c)(ii)

i i (d) () On the grid, draw the line y = – x for – 4 Y x Y4. [1]

x2 () Use your graphs to solve the equation _=_x.

i or x = [2] Answer(d)(ii) x =

(e) Write down the equation of a straight line which passes through the origin and does not

x2intersect the graph of y=_.

2x [2] Answer(e)

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6 (a)

Biii

NOT TOSCALE(x + 1) cmii

A(x + 6) cmD(x + 2) cmC

In triangle ABC, the line BD is perpendicular to AC. iAD = (x + 6) cm, DC = (x + 2) cm and the height BD = (x + 1) cm. The area of triangle ABC is 40 cm2.

() Show that x2 + 5x – 36 = 0.

Answer (a)(i) [3]

() Solve the equation x2 + 5x – 36 = 0. Answer(a)or x =

[2]

(ii) x = () Calculate the length of BC. Answer(a)(iii) BC = cm [2]

0580/04/M/J/09

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(b) Amira takes 9 hours 25 minutes to complete a long walk. () Show that the time of 9 hours 25 minutes can be written as

For

Examiner's Use

113 hours. 12 Answer (b)(i)

i [1]

() She walks (3y + 2) kilometres at 3 km/h and then a further (y + 4) kilometres at 2 km/h.

iii

Show that the total time taken is Answer(b)(ii)

9y+16

hours. 6

[2]

ii9y+16113

= . () Solve the equation

i Answer(b)(iii) y =

(v) Calculate Amira’s average speed, in kilometres per hour, for the whole walk. Answer(b)(iv)

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612

[2]

km/h [3]

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NOT TOx cm SCALE250 cm x cm

A solid metal bar is in the shape of a cuboid of length of 250 cm. The cross-section is a square of side x cm. The volume of the cuboid is 4840 cm3.

(a) Show that x = 4.4. Answer (a) [2]

(b) The mass of 1 cm3 of the metal is 8.8 grams. Calculate the mass of the whole metal bar in kilograms. kg [2]

Answer(b)

(c) A box, in the shape of a cuboid measures 250 cm by 88 cm by h cm. 120 of the metal bars fit exactly in the box. Calculate the value of h. Answer(c) h = [2]

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(d) One metal bar, of volume 4840 cm3, is melted down to make 4200 identical small spheres. All the metal is used.

() Calculate the radius of each sphere. Show that your answer rounds to 0.65 cm, correct to

2 decimal places.

[The volume, V, of a sphere, radius r, is given by V=4πr3.]

3 Answer(d)(i)

ii i [4]

() Calculate the surface area of each sphere, using 0.65 cm for the radius. [The surface area, A, of a sphere, radius r, is given by A=4πr2.]

ii cm2 [1] Answer(d)(ii) i

() Calculate the total surface area of all 4200 spheres as a percentage of the surface area of the

metal bar.

%[4] Answer(d)(iii)

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FirstSecondThirdCalculatorCalculatorCalculatorii

pFFpFqNFNFi

qFFNFNF F = faultyNFNF = not faulty

The tree diagram shows a testing procedure on calculators, taken from a large batch.

Each time a calculator is chosen at random, the probability that it is faulty (F) is

201.

(a) Write down the values of p and q. Answer(a) p =

and q =

(b) Two calculators are chosen at random. Calculate the probability that

() both are faulty,

Answer(b)(i)

() exactly one is faulty.

Answer(b)(ii)

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[1]

[2]

(c) If exactly one out of two calculators tested is faulty, then a third calculator is chosen at random. Calculate the probability that exactly one of the first two calculators is faulty and the third one

is faulty.

[2] Answer(c)

(d) The whole batch of calculators is rejected

ether if the first two chosen are both faulty or if a third one needs to be chosen and it is faulty. Calculate the probability that the whole batch is rejected.

i [2] Answer(d)

(e) In one month, 1000 batches of calculators are tested in this way. How many batches are expected to be rejected? [1] Answer(e)

For Examiner's Use

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9 The heights of 100 students are measured.

The results have been used to draw this cumulative frequency diagram.

Cumulativefrequency10090807060504030201000150155160165170175180185190Height (cm)

(a) Find

(i) the median height,

Answer(a)(i)

cm[1]

For Examiner's Use

() the lower quartile, cm [1] Answer(a)(ii)

() the inter-quartile range, i i i cm [1] Answer(a)(iii)

(v) the number of students with a height greater than 177 cm. Answer(a)(iv) [2]

(b) iThe frequency table shows the information about the 100 students who were measured.

iiiHeight (h cm) Frequency

150 < h Y=160 160 < h Y=170 170 < h Y=180 180 < h Y=190

47 18 ii

() Use the cumulative frequency diagram to complete the table above.

() Calculate an estimate of the mean height of the 100 students. Answer(b)(ii)

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[1]

cm [4]

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10 f(x) = 2x – 1 g(x) = x2 + 1 h(x) = 2x

(a) Find the value of

() f(_12),

Answer(a)(i)

() g(_

5), Answer(a)(ii)

() h(_3). Answer(a)(iii)

(b) Find the inverse function f –1(x).

iii

ii Answer(b) f –1(x) =

i (c) g(x) = z.

Find x in terms of z. Answer(c) x =

(d) Find gf(x), in its simplest form. Answer(d) gf(x) =

[1]

[2]

(e) h(x) = 512. Find the value of x. Answer(e) x =

(f) Solve the equation 2f(x) + g(x) = 0, giving your answers correct to 2 decimal places.

i or x = Answer(f) x =

(g) Sketch the graph of

() y = f(x), (ii) y = g(x).

yyFor

Examiner's Use

[1]

[5] OxOx

(i) y = f(x) (ii) y = g(x)

[3]

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Diagram 1Diagram 2Diagram 3Diagram 4 The first four terms in a sequence are 1, 3, 6 and 10. They are shown by the number of dots in the four diagrams above.

(a) Write down the next four terms in the sequence. Answer(a) , , ,

(b) (i) The sum of the two consecutive terms 3 and 6 is 9. The sum of the two consecutive terms 6 and 10 is 16. Complete the following statements using different pairs of terms.

The sum of the two consecutive terms and is . The sum of the two consecutive terms

and

() What special name is given to these sums?

Answer(b)(ii) (c) () The formula for the nth term in the sequence 1, 3, 6, 10… is

n(n+1)where k is an integer. k

Find the value of k.

Answer(c)(i) k =

[2] [1]

[1]

() Test your formula when n = 4, showing your working. Answer (c)(ii) [1]

() Find the value of the 180th term in the sequence.

ii Answer(c)(iii) [1]

(d) () Show clearly that the sum of the nth and the (n + 1)th terms is (n + 1)2. Answer (d)(i)

iii [3]

(ii) Find the values of the two consecutive terms which have a sum of 3481. Answer(d)(ii) and [2]

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Permission to reproduce items where third-party owned material protected by copyright is included has been sought and cleared where possible. Every reasonable effort has been made by the publisher (UCLES) to trace copyright holders, but if any items requiring clearance have unwittingly been included, the publisher will be pleased to make amends at the earliest possible opportunity.

University of Cambridge International Examinations is part of the Cambridge Assessment Group. Cambridge Assessment is the brand name of University of Cambridge Local Examinations Syndicate (UCLES), which is itself a department of the University of Cambridge.

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