Post on 26-May-2017
Name
For Edexcel
GCSE MathematicsPaper 3I (Non-Calculator)
Higher TierTime: 1 hour and 45 minutes
Materials required
Ruler, protractor, compasses,pen, pencil, eraser.Tracing paper may be used.
Instructions and Information for Candidates
Write your name in the box at the top of the page.Answer all the questions in the spaces provided in this question paper.The marks for each question and for each part of a question are shown in brackets.The total number of marks for this paper is 100. There are 23 questions in this paper.Calculators must not be used.
Advice to Candidates
Show all stages in any calculation.Work steadily through the paper. Do not spend too long on one question.If you cannot answer a question, leave it and attempt the next one.Return at the end to those you have left out.
Written by Shaun Armstrong
Only to be copied for use in the purchaser's school or college
EH3I 09 Page 1 © Churchill Maths Limited
GCSE Mathematics
Formulae: Higher Tier
Volume of a prism = area of cross section × length
Volume of sphere = 43 πr3 Volume of cone = 1
3 πr2h
Surface area of sphere = 4πr2 Curved surface area of cone = πrl
In any triangle ABC The Quadratic Equation
The solutions of ax2 + bx + c = 0where a ≠ 0, are given by
x = −b± b2−4ac
2a
Sine Rule a
sin A =
bsin B
= c
sinC
Cosine Rule a2 = b2 + c2 – 2bc cos A
Area of triangle = 12 ab sin C
EH3I 09 Page 2 © Churchill Maths Limited
sectioncross
length
r
l h
r
c B
C
A
b a
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Q1
Answer ALL TWENTY THREE questions.
Write your answers in the spaces provided.
You must write down all the stages in your working.
You must NOT use a calculator.
1. Nathan asked 25 people who they thought was the best male tennis player of all time.Here are their answers.
Bjorn Borg Roger Federer Roger Federer Rod Laver Pete Sampras
Roger Federer Pete Sampras Pete Sampras Roger Federer Andre Agassi
Pete Sampras Roger Federer Roger Federer Rod Laver Roger Federer
John McEnroe Roger Federer Bjorn Borg Rafael Nadal Roger Federer
Roger Federer Bjorn Borg Roger Federer Pete Sampras Rafael Nadal
Design and complete a suitable data collection sheet that Nathan could use to record this information.
(Total 4 marks)
EH3I 09 Page 3 © Churchill Maths Limited
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Q2
Q3
2. Alex, Beth and Clive are all collecting football cards.
The ratio of the number of cards Alex has to the number Beth has is 2 : 1The ratio of the number of cards Beth has to the number Clive has is 3 : 2
Beth has 45 cards.
(a) Work out how many cards Alex, Beth and Clive have between them.
…………………………(3)
(b) Work out the ratio
number of cards Alex has : number of cards Clive has
Give your answer in its simplest form.
…………………………(1)
(Total 4 marks)
3. (a) Solve 18x
= 3
x = ……………………(2)
(b) Solve 19 + 2y = 15
y = ……………………(2)
(Total 4 marks)
EH3I 09 Page 4 © Churchill Maths Limited
Q5
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Q6
Q4
4. Estimate the value of 89.7
30.1 × 5.92
…………………………
(Total 3 marks)
5. Martin buys a jacket which costs £80 plus 17 12 % VAT.
Work out the total cost of the jacket.
£ ……………………
(Total 3 marks)
6. (a) Work out 53 – 112
…………………………(2)
(b) Find the value of x such that
3x = 9 3
x = ……………………(2)
(Total 4 marks)
EH3I 09 Page 5 © Churchill Maths Limited
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Q7
7. (a) Diagram NOTaccurately drawn
Find the size of an interior angle of a regular hexagon.
°…………………
(2)
(b) Diagram NOTaccurately drawn
A child is playing with pieces of plastic in the shape of different regular polygons.She finds that a square, a regular hexagon and one other piece fit together at a point as shown.
Work out how many sides the third piece has.
…………………(3)
(Total 5 marks)
EH3I 09 Page 6 © Churchill Maths Limited
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Q9
1 2 43 5–1
1
3
2
4
5
6
–5 –4 –3 –2 –1 O x
y
A (0, 6)
C (0, –1)
B (2, 2)
7
Q8
8. Change 2.4 m2 to cm2.
………………………… cm2
(Total 2 marks)
9.
A is the point (0, 6).B is the point (2, 2).C is the point (0, –1).
Find an equation of the straight line that is parallel to AB and passes through C.
…………………………
(Total 3 marks)
EH3I 09 Page 7 © Churchill Maths Limited
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Q10
A
CB
D
10.
The diagram is a scale drawing of a rectangular wall-hanging ABCD.The scale of the diagram is 2 cm represents 1 m.
(a) Use the diagram to find the actual width (AD) of the wall-hanging.
……………………… m(2)
(b) The wall-hanging is made up of pieces of different materials.One of these pieces covers the region that is
nearer to AB than BCand more than 4 m from D.
On the diagram, shade the region covered by this piece of material.
(3)
(Total 5 marks)
EH3I 09 Page 8 © Churchill Maths Limited
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Q11
16 cm
12 cm
Q12
11. Diagram NOTaccurately drawn
The diagram shows a rhombus.
The diagonals of the rhombus have lengths of 12 cm and 16 cm.
(a) Find the area of the rhombus.State the units of your answer.
……………………………(3)
(b) Find the length of one side of the rhombus.
………………………… cm(2)
(Total 5 marks)
12. Simplify
(a) y10 × y –5
……………………(1)
(b) (5a5b)2
……………………(2)
(Total 3 marks)
EH3I 09 Page 9 © Churchill Maths Limited
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Q13
13. A primary school has 180 pupils who all come from 4 villages.
This accurate pie chart gives information about the number of pupils from each village.
There are 74 pupils from Monton.
(a) Use the pie chart to find the number of pupils from each of the other villages.
Nelvy …………………
Oxber …………………
Pudney …………………(3)
The governors of the school want to look at the work of a stratified sample of 40 pupils according to the village they come from.
(b) Calculate the number of pupils from Monton that should be in the sample.
…………………………(2)
(Total 5 marks)
EH3I 09 Page 10 © Churchill Maths Limited
Pudney
Oxber
Monton
Nelvy
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Q15
Q14
14. Convert 45 metres per second into kilometres per hour.
………………………… km/h
(Total 3 marks)
15. Solve the simultaneous equations
2p – 3q = 21
5p + 2q = 5
p = ……………………
q = ……………………
(Total 4 marks)
EH3I 09 Page 11 © Churchill Maths Limited
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Q16
l cm
r cm16. Diagram NOT
accurately drawn
The shape in the diagram is made up of a square of side l cm and 4 semicircles of radius r cm.
(a) Find a formula for the perimeter of the shape, P cm, in terms of l and r.
…………………………(3)
(b) The area of the shape, A cm2, is given by the formula
A = l 2 + 2πr2
Make r the subject of this formula.
r = ……………………(3)
(Total 6 marks)
EH3I 09 Page 12 © Churchill Maths Limited
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Q17
17. A group of 50 students each had to choose to play one outdoor sport and one indoor sport.
The outdoor sport had to be rugby or hockey.The indoor sport had to be badminton or squash.
The table gives information about the sports the students chose.
At the start of one lesson a student is picked at random to get the keys to the cupboard.
(a) Write down the probability that this student had chosen to play badminton.
……………………(2)
At the end of an outdoor lesson two students are picked to check the equipment.One of these is picked at random from those doing rugby and the other at random from those doing hockey.
(b) Work out the probability that both students picked had also chosen to play squash.
……………………(3)
(Total 5 marks)
EH3I 09 Page 13 © Churchill Maths Limited
Badminton Squash
Hockey
Rugby 10
12
20
8
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Q18
18. Shelley is making patterns with matchsticks.
Her first pattern has one stick. To make a new pattern she adds two matchsticks to the end of each matchstick at the top of the pattern.
Pattern 1 Pattern 2 Pattern 3 Pattern 4
Shelley notices that the numbers of matchsticks she adds each time form a sequence.
(a) Find the number of matchsticks that Shelley adds to Pattern 5 to make Pattern 6.
………………………(2)
(b) Complete this table of values for powers of 2.
21 22 23 24
(1)
(c) Find an expression, in terms of n, for the total number of matchsticks in Pattern n.
………………………(3)
(Total 6 marks)
EH3I 09 Page 14 © Churchill Maths Limited
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Q19
a
b
A
C
B
O
X
E D
19. Diagram NOTaccurately drawn
OABCDE is a regular hexagon.
OA = a and OE = b.
X is the point on AE such that AX : XE = 1 : 2
(a) Find, in terms of a and b, the vectors
(i) AE
…………………………
(ii) OX
…………………………
(iii) OB
…………………………(5)
(b) Hence, explain why OXB is a straight line.
………………………………………………………………………………………
………………………………………………………………………………………(2)
(Total 7 marks)
EH3I 09 Page 15 © Churchill Maths Limited
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Q20
Time (t minutes)10 15 2520 305
Frequencydensity
O
20. The incomplete histogram and table show information about how long it took 50 contestants to complete a puzzle in a competition.
Time (t minutes) Frequency
5 ≤ t < 10 8
10 ≤ t < 12
12 ≤ t < 14
14 ≤ t < 20 15
20 ≤ t < 30 8
(a) Use the histogram to complete the table.(2)
(b) Use the table to complete the histogram.(2)
(Total 4 marks)
EH3I 09 Page 16 © Churchill Maths Limited
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Q21
Q22
8 cm
21. Express
4 − 2 2
as simply as possible with a rational denominator.
…………………………
(Total 3 marks)
22. Diagram NOTaccurately drawn
The diagram shows a solid square prism.
The length of the prism is 8 cm.The volume of the prism is 72 cm3.
Find the surface area of the prism.
………………………… cm2
(Total 4 marks)
EH3I 09 Page 17 © Churchill Maths Limited
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y
xO
y = 4
P (x, y)
23. Diagram NOTaccurately drawn
The diagram shows the line y = 4 and the locus of the point P (x, y).
The locus of P is defined as follows:
The distance of the point P from the origin, O, is equal to the distance of the point P from the line y = 4.
(a) Show that the locus of P is the curve with equation 8y = 16 – x2
(4)
EH3I 09 Page 18 © Churchill Maths Limited
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Q23
(b) Find, using algebra, the coordinates of the points where the straight line y = x – 4 intersects the curve 8y = 16 – x2
……………………………………………(4)
(Total 8 marks)
TOTAL FOR PAPER: 100 MARKS
END
EH3I 09 Page 19 © Churchill Maths Limited