Answer ALL questions



MATHS

Year 11

IGCSE 4H

JAN 2017

TIME: 2 HOURS

PAPER TOTAL: 100

Name …………………….

Tutor Group………………

Class Teacher…………………..

Instructions to candidates

CALCULATORS MAY BE USED

______________________________________________

JUMEIRAH ENGLISH SPEAKING SCHOOL

ARABIAN RANCHES

International GCSE MATHEMATICS

FORMULAE SHEET – HIGHER TIER

[pic]

Answer ALL TWENTY FIVE questions.

Write your answers in the spaces provided.

You must write down all stages in your working.

1 (a) Work out the value of [pic]

Give your answer as a decimal.

Write down all the figures on your calculator display.

..............................................................................................

(2)

(b) Write your answer to part (a) correct to 3 significant figures.

......................................................

(1)

(Total for Question is 3 marks)

2 D = 3e2 + 4e

Work out the value of D when e = –5

D = ......................................................

(Total for Question is 2 marks)

3 Here are 8 cards.

There is a number on each of six cards.

Two cards are blank.

[pic]

Uzma wants the mean of the numbers on the 8 cards to be 4

She wants the range of the numbers on the 8 cards to be 9

Find the numbers that she should write on the two blank cards.

............................ and ............................

(Total for Question is 3 marks)

4 Karen has a spinner.

When the spinner is spun once, the probability that it will land on yellow is [pic]

Karen spins the spinner 30 times.

Work out an estimate for the number of times the spinner lands on yellow.

......................................................

(2)

(Total for Question is 4 marks)

5

[pic]

ABC and EDC are straight lines.

AE is parallel to BD.

Angle EAC = 40°

Angle ACE = 30°

Work out the size of angle x.

Give reasons for your answer.

x = ......................................................°

(Total for Question is 3 marks)

6 E = {whole numbers}

A = {factors of 100}

B = {multiples of 5}

List the members of the set A ∩ B

............................................................................................................

(Total for Question is 2 marks)

7 Here are a rectangle and a square.

[pic]

The rectangle has length 8 cm and area 48 cm2

The perimeter of the square is the same as the perimeter of the rectangle.

Calculate the area of the square.

....................................................... cm2

(Total for Question is 4 marks)

8 B is the point with coordinates (1, 4)

C is the point with coordinates (6, 9)

Find the coordinates of the midpoint of BC.

(......................................... , ........................................)

(Total for Question is 2 marks)

9 Mr Rowland has a class of 30 students.

He gave them 24 words to spell.

The table shows information about the number of correct spellings for each student.

|Number of correct spellings |Frequency |

|0 − 4 |1 |

|5 – 9 |5 |

|10 – 14 |6 |

|15 – 19 |10 |

|20 − 24 |8 |

(a) Write down the modal class.

.......................................................

(1)

(b) Work out an estimate for the mean number of correct spellings.

Give your answer to 1 decimal place.

.......................................................

(4)

(Total for Question is 5 marks)

10 (a) Complete the table of values for y = x2 – 4x + 2

|x |–1 |

|Mediterranean Sea |2.97 × 106 |

|East China Sea |1.25 × 106 |

|Baltic Sea |4.22 × 105 |

|Red Sea |4.38 × 105 |

|Okhotsk Sea |1.59 × 106 |

a) Write 1.59 × 106 as an ordinary number.

.....................................................

(1)

(b) Work out the difference, in square kilometres, between the largest surface area and

the smallest surface area for these five seas.

Give your answer in standard form.

..................................................... km2

(2)

(Total for Question is 3 marks)

15

[pic]

The shaded shape is made by cutting a semicircle from a rectangular piece of

card, ABCF, as shown in the diagram.

FEDC is a straight line.

The centre of the semicircle lies on ED.

AF = BC = 10 cm, AB = 20 cm, FE = DC = 4 cm.

Work out the perimeter of the shaded shape.

Give your answer correct to 3 significant figures.

..................................................... cm

(Total for Question is 3 marks)

16 Simplify fully (2x + 3)2 – (2x – 3)2

.....................................................

(Total for Question is 3 marks)

17 M is directly proportional to p3

M = 128 when p = 8.

(a) Find a formula for M in terms of p.

........................................................

(3)

(b) Find the value of M when p = 5.

........................................................

(1)

(Total for Question is 4 marks)

___________________________________________________________________________

18 Simplify [pic]

........................................................

(Total for Question is 3 marks)

___________________________________________________________________________

19 (a) Write [pic] as a single fraction in its simplest form.

........................................................

(3)

(b) Simplify (8a9e6)[pic]

........................................................

(2)

(c) Solve [pic]

Show clear algebraic working.

y = ........................................................

(3)

(Total for Question is 8 marks)

___________________________________________________________________________

20 In a bag there is a total of 20 coins.

10 coins are 20 cent coins

6 coins are 10 cent coins

4 coins are 5 cent coins

Emma takes at random two of the coins from the bag.

(a) Complete the probability tree diagram.

(2)

[pic]

(b) Work out the probability that Emma takes two 5 cent coins.

........................................................

(2)

(c) Work out the probability that the total value of the two coins is 20 cents or less.

........................................................

(3)

(Total for Question is 7 marks)

___________________________________________________________________________

21 f is the function such that f(x) = 2x – 5

g is the function such that g(x) = x2 – 10

(a) Find f(4)

........................................................

(1)

(b) Find fg(–4)

........................................................

(2)

(c) Express the inverse function f–1 in the form f–1(x) = ...

f–1(x) = ........................................................

(2)

(d) Solve gf(x) = –1

........................................................

(4)

(Total for Question is 9 marks)

___________________________________________________________________________

22 Miss Cook asked each student in her class how long it took them, in minutes, to travel to

school that morning.

The incomplete histogram shows information about the times it took the students who

took no more than 30 minutes to travel to school.

[pic]

9 students took between 15 minutes and 30 minutes to travel to school.

(a) How many students took no more than 30 minutes to travel to school?

........................................................

(2)

12 students took between 30 and 55 minutes to travel to school.

(b) Use this information to complete the histogram.

(2)

(Total for Question is 4 marks)

23

[pic]

AB is parallel to DC

DC = 2AB

M is the midpoint of BC

[pic] = 2b

[pic] = 4a

(a) Find [pic]in terms of a and b.

Give your answer in its simplest form.

......................................................

(2)

N is the point such that DCN is a straight line and DC : CN = 2 : 1

(b) Show that AMN is a straight line.

(2)

(Total for Question is 4 marks)

___________________________________________________________________________

24 The sketch shows the curve with equation y = x2 + 4 and the line with equation y = x + 10

[pic]

The line cuts the curve at the points A and B.

M is the midpoint of AB.

Find the coordinates of M.

Show clear algebraic working.

......................................................

(Total for Question is 6 marks)

___________________________________________________________________________

25 y = at2 – 2at

x =2a[pic]

Express y in terms of x and a.

Give your answer in the form

[pic]

where p, q, m and n are integers.

......................................................

(Total for Question is 4 marks)

END OF EXAMINATION

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