Cambridge International Examinations
Cambridge Secondary 1 Checkpoint
Paper 2
April 2018
1 hour
Candidates answer on the Question Paper.
Additional Materials:
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, graphs or rough working.
Do not use staples, paper clips, glue or correction fluid.
DO NOT WRITE IN ANY BARCODES.
Answer all questions.
Calculator allowed.
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You should show all your working in the booklet.
The number of marks is given in brackets [ ] at the end of each question or part question.
The total number of marks for this paper is 50.
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This document consists of 19 printed pages and 1 blank pages.
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
1112/02
MATHEMATICS
2
1
Write a negative number in each box to make the calculation correct.

=
18
[1]
2
Complete these sentences.
The probability that a football team wins a match is 0.6 and the probability it does not win
is
.
The probability that a player scores a goal is
player does not score a goal is
and the probability that the
3
8
The probability that a fan supports a team is 72% and the probability that the fan does not
support the team is
%.
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[2]
3
3
The scatter graph shows the value (thousands of dollars) and the age (years) of eight cars.
16
14
12
Value
(thousands
of dollars)
10
8
6
4
2
0
0
1
2
3
4
5
6
Age (years)
7
8
9
10
A ninth car has a value of 11 thousand dollars and is 5 years old.
(a) Plot the information for the ninth car on the grid.
[1]
(b) Find the median age of the nine cars.
years
[1]
(c) Describe the relationship between the value of a car and its age.
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[1]
4
4
Mia’s house has increased in value by $12 000 in 15 months.
(a) Work out the rate of increase in the value of Mia’s house.
Give your answer in dollars per month.
$
per month
[1]
(b) Oliver’s house has increased in value by $10 200 in 12 months.
Tick () to show whose house has increased in value at a greater rate.
Mia’s house
Oliver’s house
Show how you worked out your answer.
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[1]
5
5
Angelique leaves home at 8.30 am.
She walks at a constant speed to a shop which is 3 kilometres from her home.
She arrives at the shop at 9.10 am and stays there for 15 minutes.
She then walks at a constant speed back home, arriving there at 10.10 am.
Draw a travel graph to show Angelique’s journey.
4
3
Distance
from home 2
(kilometres)
1
0
8.30 am
9.00 am
9.30 am
10.00 am
10.30 am
Time
[2]
6
A candle loses 22.4 cm of height when it burns for 7 hours.
An identical candle burns for 4 hours.
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cm
m
Work out how much height the candle loses.
6
7
The diagram shows a sketch of a kite.
NOT TO
SCALE
4 cm
A
6 cm
B
5 cm
Use a ruler and compasses to construct the kite in the space below.
The diagonal AB has been drawn for you.
Leave in your construction lines.
A
B
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[2]
7
8
Saki has 1865 apples.
She packs them into crates.
Each crate can hold 48 apples.
Work out the largest number of crates that she can fill completely.
crates [2]
9
(a) Carlos has some toy bricks.
Each brick is either red or blue.
The ratio of red bricks to blue bricks is 3 : 4
Draw a ring around the fraction of the bricks that are blue.
1
3
3
4
4
4
3
7
[1]
(b) Gabriella also has some toy bricks.
Her bricks are either yellow or green.
The ratio of yellow to green bricks is 4 : 1
She has 50 bricks altogether.
Work out how many green bricks Gabriella has.
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[1]
8
10 A hotel has 250 rooms.
175 rooms are occupied.
Calculate the percentage of the rooms that are occupied.
% [2]
11 Find the nth term of each sequence.
The first one has been done for you.
Sequence
nth term
3, 6, 9, 12, …
3n
6, 12, 18, 24, …
……………..
5, 8, 11, 14, …
……………...
[2]
12 Here are some number cards.
6
10
5
11
Use two of the cards to make a fraction which is less than
7
1
2
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[1]
9
13 The diagram shows a triangle on a grid.
On the grid, draw 6 more of the same triangle to show how it tessellates.
[1]
14 Chen has 1.6 kilograms of flour.
He uses one quarter of the flour to make a cake.
He uses a further 325 grams of the flour to make some biscuits.
Calculate how much flour Chen has left.
Give your answer in grams.
g
[2]
15 A train travels at 300 kilometres per hour.
Work out how far the train travels in 25 minutes.
[1]
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km
10
16 Triangle ABC is enlarged by a scale factor of 2 to give triangle XYZ.
7 cm
Y
B
14 cm
9 cm
35°
A
C
X
Z
NOT TO
SCALE
(a) Side YZ is 9 cm.
Find the length of side BC.
cm
[1]
°
[1]
(b) Angle BAC is 35°
Find angle YXZ.
17 Write these masses in order of size, starting with the smallest.
0.14 kg
1200 g
0.08 kg
smallest
45 g
largest
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[1]
11
18 The values of x and y are directly proportional.
Complete the table by filling in the missing number.
x
4
y
72
63
[1]
19  and  are both positive whole numbers smaller than 20
2 – 3 = 102
Work out the value of  and the value of 
=
[1]
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=
12
20 The cost of a visit by a plumber is in two parts.
A charge of 70 dollars
and
30 dollars for each hour of the visit.
(a) Complete this formula for the cost, y dollars, of a visit that lasts x hours.
y=
x+
[1]
(b) Draw a graph to show the costs of visits lasting up to 5 hours.
y
250
200
150
Cost
(dollars)
100
50
0
0
1
2
3
Time (hours)
4
5
x
[1]
(c) A visit costs 115 dollars.
e.
[1]
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Use your graph to estimate the length of the visit, in hours.
13
21 Here is a drawing of the net of a cube.
40 cm
Work out the surface area of the cube.
cm2
[2]
22 These two mapping diagrams are equivalent to each other.
Divide by 0.2
Multiply by .........
[1]
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Complete the second mapping diagram by writing in a whole number.
14
23 Fifty children take a mathematics test.
Three weeks later they take a second mathematics test.
The graph shows their scores, out of 10, in both tests.
Number of
children
20
18
16
14
12
10
8
6
4
2
0
0
1
2
3
4
5
6
7
8
9
10
Score out of 10
score in first test
score in second test
Write a statement to compare the scores of the children in the two tests.
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[1]
15
24 Aiko is investigating the question
How did the area of forest in South America change between 1990 and 2005?
She finds these pie charts for the years 1990 and 2005 on the internet.
1990
South
America
22%
Oceania
3%
North and
Central
America
20%
2005
Africa
14%
South
America
21%
Asia
13%
Africa
13%
Asia
14%
Oceania
3%
North and
Central
America
21%
Europe
28%
Total area of forest in the world:
3860 million hectares
Europe
28%
Total area of forest in the world:
3790 million hectares
They show the proportion of the world’s total forest area in each continent.
They also give the total area of forest in the world.
Use the information in the pie charts to find the decrease in the area of forest in
South America from 1990 to 2005.
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million hectares
16
25 The diagram shows the position of two mountains, A and B.
N
N
A
B
A third mountain, C, is
on a bearing of 145° from A
and
on a bearing of 270° from B.
Mark the position of C on the diagram.
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[2]
17
26
NOT TO
SCALE
1.9 cm
120°
2.4 cm
The length of the longest side of this triangle is 1.9 2  2.4 2  (1.9  2.4)
(a) Calculate the length.
Write down your full calculator answer.
cm
[1]
cm
[1]
(b) Round your answer to part (a) to an appropriate degree of accuracy.
27 Pierre is an electrician.
He uses this formula to work out the amount, $C, to charge for a job that takes t hours.
C = 20 + 30t
He starts a job at 9.30 am and finishes at 1 pm.
Work out his charge for this job.
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$
18
28 Yuri rolls a six-sided dice 200 times.
Lily rolls the same dice 250 times.
The table shows their relative frequencies for a score of six.
Yuri
Lily
Number of throws
200
250
Relative frequency for a six
0.18
0.22
Work out how many sixes they rolled altogether.
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[2]
19
29 The diagram shows a shape made from two identical parallelograms and a triangle.
NOT TO
SCALE
8 cm
8 cm
12 cm
11 cm
Calculate the total area of the shape.
[2]
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cm2
20
BLANK PAGE
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To avoid the issue of disclosure of answer-related information to candidates, all copyright acknowledgements are reproduced online in the Cambridge
International Examinations Copyright Acknowledgements Booklet. This is produced for each series of examinations and is freely available to download at
www.cie.org.uk after the live examination series.
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publisher will be pleased to make amends at the earliest possible opportunity.
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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.