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1. MATHEMATICS 0580/43
Paper 4 (Extended) May/June 2014
2 hours 30 minutes
Candidates answer on the Question Paper.
Additional Materials: Electronic calculator Geometrical instruments
Tracing paper (optional)
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 an HB pencil for any diagrams or graphs.
Do not use staples, paper clips, glue or correction fl uid.
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 specifi ed in the question, and if the answer is not exact, give the answer to
three signifi cant fi gures. 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.
This document consists of 16 printed pages.
[Turn over
IB14 06_0580_43/2RP
© UCLES 2014
*9468931136*
Cambridge International Examinations
Cambridge International General Certifi cate of Secondary Education
The syllabus is approved for use in England, Wales and Northern Ireland as a Cambridge International Level 1/Level 2 Certifi cate.

2. 2
1 In July, a supermarket sold 45 981 bottles of fruit juice.
(a) The cost of a bottle of fruit juice was $1.35 .
Calculate the amount received from the sale of the 45 981 bottles.
Give your answer correct to the nearest hundred dollars.
5 of the 45 981 bottles are recycled.
Calculate the number of bottles that are recycled.
© UCLES 2014 0580/43/M/J/14
Answer(a) $ ................................................ [2]
(b) The number of bottles sold in July was 17% more than the number sold in January.
Calculate the number of bottles sold in January.
Answer(b) ................................................ [3]
(c) There were 3 different fl avours of fruit juice.
The number of bottles sold in each fl avour was in the ratio apple : orange : cherry = 3 : 4 : 2.
The total number of bottles sold was 45 981.
Calculate the number of bottles of orange juice sold.
Answer(c) ................................................ [2]
(d) One bottle contains 1.5 litres of fruit juice.
Calculate the number of 330 ml glasses that can be fi lled completely from one bottle.
Answer(d) ................................................ [3]
(e) 9
Answer(e) ................................................ [2]
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3. 3
2
4
3
2
1
0 10 20 30
40 50 60
Amount ($x)
Frequency
density
A survey asked 90 people how much money they gave to charity in one month.
The histogram shows the results of the survey.
(a) Complete the frequency table for the six columns in the histogram.
Amount ($x) 0 < x Y 10
Frequency 4
[5]
(b) Use your frequency table to calculate an estimate of the mean amount these 90 people gave to charity.
Answer(b) $ ................................................ [4]
__________________________________________________________________________________________
© UCLES 2014 0580/43/M/J/14 [Turn over

4. 4
3 (a)
P
12 cm NOT TO
X
Q
© UCLES 2014 0580/43/M/J/14
R
17 cm
SCALE
The diagram shows triangle PQR with PQ = 12 cm and PR = 17 cm.
The area of triangle PQR is 97 cm2 and angle QPR is acute.
(i) Calculate angle QPR.
Answer(a)(i) Angle QPR = ................................................ [3]
(ii) The midpoint of PQ is X.
Use the cosine rule to calculate the length of XR.
Answer(a)(ii) XR = .......................................... cm [4]

5. 5
(b)
9.4 cm 42° a cm
37°
NOT TO
SCALE
Calculate the value of a.
Answer(b) a = ................................................ [4]
(c) sin x = cos 40°, 0° Y x Y 180°
Find the two values of x.
Answer(c) x = .................. or x = .................. [2]
__________________________________________________________________________________________
© UCLES 2014 0580/43/M/J/14 [Turn over

6. 6
1
x + x , x ≠ 0.
4 The table shows some values for the function y = 2
x –3 –2 –1 –0.5 0.5 1 2 3 4
y –2.89 –1.75 3.5 2 2.25 4.06
(a) Complete the table of values. [3]
(b) On the grid, draw the graph of y = 2
1
x + x for –3 Y x Y – 0.5 and 0.5 Y x Y 4.
y
–3 –2 –1 0 1 2 3 4
© UCLES 2014 0580/43/M/J/14
x
5
4
3
2
1
–1
–2
–3
[5]

7. 7
1
x + x – 3 = 0 .
(c) Use your graph to solve the equation 2
Answer(c) x = ..................... or x = ..................... or x = ..................... [3]
1
x + x = 1 – x.
(d) Use your graph to solve the equation 2
Answer(d) x = ................................................ [3]
(e) By drawing a suitable tangent, fi nd an estimate of the gradient of the curve at the point where x = 2.
Answer(e) ................................................ [3]
(f) Using algebra, show that you can use the graph at y = 0 to fi nd 3 -1 .
Answer(f)
[3]
__________________________________________________________________________________________
© UCLES 2014 0580/43/M/J/14 [Turn over

8. 8
5 (a)
5
4
3
2
1
0
1 2 3 4 5 6 7 8
© UCLES 2014 0580/43/M/J/14
x
y
A
B
(i) Write down the position vector of A.
Answer(a)(i) f p [1]
(ii) Find ì ì , the magnitude of .
Answer(a)(ii) ................................................ [2]
(b)
p
q
O
Q
S
P R
NOT TO
SCALE
O is the origin, = p and = q.
OP is extended to R so that OP = PR.
OQ is extended to S so that OQ = QS.
(i) Write down in terms of p and q.
Answer(b)(i) = ................................................ [1]
(ii) PS and RQ intersect at M and RM = 2MQ.
Use vectors to fi nd the ratio PM : PS, showing all your working.
Answer(b)(ii) PM : PS = ....................... : ....................... [4]
__________________________________________________________________________________________

9. 9
6 In this question, give all your answers as fractions.
N A T I O N
The letters of the word NATION are printed on 6 cards.
(a) A card is chosen at random.
Write down the probability that
(i) it has the letter T printed on it,
Answer(a)(i) ................................................ [1]
(ii) it does not have the letter N printed on it,
Answer(a)(ii) ................................................ [1]
(iii) the letter printed on it has no lines of symmetry.
Answer(a)(iii) ................................................ [1]
(b) Lara chooses a card at random, replaces it, then chooses a card again.
Calculate the probability that only one of the cards she chooses has the letter N printed on it.
Answer(b) ................................................ [3]
(c) Jacob chooses a card at random and does not replace it.
He continues until he chooses a card with the letter N printed on it.
Find the probability that this happens when he chooses the 4th card.
Answer(c) ................................................ [3]
__________________________________________________________________________________________
© UCLES 2014 0580/43/M/J/14 [Turn over

10. 10
7 (a)
F
E D
Y A B X
© UCLES 2014 0580/43/M/J/14
C
x°
x°
32°
t °
q° p°
NOT TO
SCALE
ABCDEF is a hexagon.
AB is parallel to ED and BC is parallel to FE.
YFE and YABX are straight lines.
Angle CBX = 32° and angle EFA = 90°.
Calculate the value of
(i) p,
Answer(a)(i) p = ................................................ [1]
(ii) q,
Answer(a)(ii) q = ................................................ [2]
(iii) t,
Answer(a)(iii) t = ................................................ [1]
(iv) x.
Answer(a)(iv) x = ................................................ [3]

11. 11
(b)
R
x°
63°
y°
Q
S
NOT TO
SCALE
T P U
P, Q, R and S are points on a circle and PS = SQ.
PR is a diameter and TPU is the tangent to the circle at P.
Angle SPT = 63°.
Find the value of
(i) x,
Answer(b)(i) x = ................................................ [2]
(ii) y.
Answer(b)(ii) y = ................................................ [2]
__________________________________________________________________________________________
© UCLES 2014 0580/43/M/J/14 [Turn over

12. 12
2x -3 = 1 can be simplifi ed to 2x2 + 3x – 6 = 0 .
7
x + + 2
8 (a) (i) Show that the equation 4
Answer(a)(i)
© UCLES 2014 0580/43/M/J/14
[3]
(ii) Solve the equation 2x2 + 3x – 6 = 0 .
Show all your working and give your answers correct to 2 decimal places.
Answer(a)(ii) x = ........................... or x = ........................... [4]
(b) The total surface area of a cone with radius x and slant height 3x is equal to the area of a circle with
radius r.
Show that r = 2x.
[The curved surface area, A, of a cone with radius r and slant height l is A = πrl.]
Answer(b)
[4]
__________________________________________________________________________________________

13. 13
9 f(x) = 4 – 3x g(x) = 3–x
(a) Find f(2x) in terms of x.
Answer(a) f(2x) = ................................................ [1]
(b) Find ff(x) in its simplest form.
Answer(b) ff(x) = ................................................ [2]
(c) Work out gg(–1).
Give your answer as a fraction.
Answer(c) ................................................ [3]
(d) Find f –1(x), the inverse of f(x).
Answer(d) f –1(x) = ................................................ [2]
(e) Solve the equation gf(x) = 1.
Answer(e) x = ................................................ [3]
__________________________________________________________________________________________
© UCLES 2014 0580/43/M/J/14 [Turn over

14. 14
10 (a)
8 cm
r cm
© UCLES 2014 0580/43/M/J/14
NOT TO
SCALE
The three sides of an equilateral triangle are tangents to a circle of radius r cm.
The sides of the triangle are 8 cm long.
Calculate the value of r.
Show that it rounds to 2.3, correct to 1 decimal place.
Answer(a)
[3]
(b)
8 cm
12 cm
NOT TO
SCALE
The diagram shows a box in the shape of a triangular prism of height 12 cm.
The cross section is an equilateral triangle of side 8 cm.
Calculate the volume of the box.
Answer(b) ......................................... cm3 [4]

15. 15
(c) The box contains biscuits.
Each biscuit is a cylinder of radius 2.3 centimetres and height 4 millimetres.
Calculate
(i) the largest number of biscuits that can be placed in the box,
Answer(c)(i) ................................................ [3]
(ii) the volume of one biscuit in cubic centimetres,
Answer(c)(ii) ......................................... cm3 [2]
(iii) the percentage of the volume of the box not fi lled with biscuits.
Answer(c)(iii) ............................................ % [3]
__________________________________________________________________________________________
Question 11 is printed on the next page.
© UCLES 2014 0580/43/M/J/14 [Turn over

16. 16
11
Diagram 1 Diagram 2 Diagram 3
The fi rst three diagrams in a sequence are shown above.
Diagram 1 shows an equilateral triangle with sides of length 1 unit.
In Diagram 2, there are 4 triangles with sides of length 1 2
unit.
In Diagram 3, there are 16 triangles with sides of length 4
1
1
1 unit.
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.
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.
© UCLES 2014 0580/43/M/J/14
1 unit.
(a) Complete this table for Diagrams 4, 5, 6 and n.
Diagram 1 Diagram 2 Diagram 3 Diagram 4 Diagram 5 Diagram 6 Diagram n
Length of side 1 2
4
Length of side
as a power of 2 20 2–1 2–2
[6]
(b) (i) Complete this table for the number of the smallest triangles in Diagrams 4, 5 and 6.
Diagram 1 Diagram 2 Diagram 3 Diagram 4 Diagram 5 Diagram 6
Number of smallest
triangles 1 4 16
Number of smallest
triangles as a power of 2 20 22 24
[2]
(ii) Find the number of the smallest triangles in Diagram n, giving your answer as a power of 2.
Answer(b)(ii) ................................................ [1]
(c) Calculate the number of the smallest triangles in the diagram where the smallest triangles have sides of
length 128
Answer(c) ................................................ [2]