1.
The length of a field, 1.2 km long is represented on a map by a line 40 mm long. What is the scale of the map?
1 : 100
1 : 300
1 : 1000
1 : 3000
1 : 30000
2.
If 2x = 5(x - 2) + 7, find the value of x.
-5
-1
1
5
3.
The bar chart shows the mark distribution of pupils in a test. Use it to answer the question below

How many pupils took the test?
5
20
25
29
30
4.
In an examination, 60% of the candidates passed. The number that passed was 240. How many candidates failed?
140
160
360
400
600
5.
Mensah packed 1,800 apples into a number of boxes. If each box contained 120 apples, how many boxes were fully packed?
15
16
18
17
6.
Which of the following is equivalent to 22 × 63?
26 × 33
25 × 33
24 × 3
23 × 33
7.
Find the tangent of the angle marked y in the diagram below.

8.
Solve the inequality 2x + 10 ≥ x - 5.
x ≥ 10
x ≤ 10
x ≤ 40
x ≥ 40
9.
The angle formed by one complete revolution is equivalent to
one right angle
two right angles
three right angles
four right angles
10.
Madam Nancy wants to know which of the teachers in her school is liked best by most of the students. Which of the following methods is most suitable for collecting the data?
Experiment
Database
Questionnaire
Observation
11.
Simplify x - x
x
x
x
x
12.
Find the highest (greatest) common factor of 63 and 81.
3
7
9
21
27
13.
Solve 25x + 450 ≤ 3000.
x ≥ 102
x ≤ 102
x ≥ 138
x ≤ 138
14.
If the gradient of a straight line is zero, then the line
is vertical.
is horizontal.
falls to the right.
rises to the right.
15.
If a = 22 × 23 ÷ 24, find the value of a
29
25
22
2
20
16.
Find the missing members in the set {5, 10, 15, _ , 25, _ , _ ,40}
20 and 30
30 and 35
20 and 35
20, 30 and 35
30, 35 and 45
17.
In the relation v = u+ at, find v when u = 6, a = 10 and t = 2
18
26
32
48
120
18.
Which of the following is the set of prime factors of 12?
{2, 3}
{1, 2, 3}
{1, 2, 4, 6}
{2, 3, 4, 6}
19.
Use the mapping below to answer the question below.
| x | 1 | 2 | 3 | 4 | 5 |
| ↓ | ↓ | ↓ | ↓ | ↓ | ↓ |
| y | -4 | -2 | 0 | 2 | m |
What is the rule for this mapping?
x→ 2(x - 3)
x→ x - 5
x→ 2(x - 2)
x→ 2x-3
20.
A fair coin and a fair die are rolled together once. Find the probability of obtaining a tail and an odd number.
21.

In the diagram above, the bearing of point B from A is
340o
220o
140o
50o
22.
Use the information below to answer the question below
The scores obtained by 8 pupils in a test are 2, 3, 4, 5, 7, 8, 8 and 9
Find the mean score.
4.50
5.75
6.00
8.75
10.00
23.
Evaluate .
-2
-12
24.
If 4956 × 25 = 123,900, evaluate 495.6 × 2.5 leaving the answer in standard form.
1.239 × 102
1.239 × 103
1.239 × 104
1.239 × 105
25.
Which of the following can be made from the net below?

Triangular prism
Square pyramid
Triangular pyramid
Cuboid
26.
An angle which is greater than 180o but less than 360o is
a right angle.
an acute angle.
an obtuse angle.
a reflex angle.
27.
Find the missing number in the following binary operation:
| 1 | 1 | 0 | 0 | 1 | 1 | 0 | |
| - | * | * | * | * | * | * | * |
| 1 | 1 | 1 | 0 | 1 | 1 |
111011
101001
100011
101110
101011
28.

In the diagram, ∠ QPR = 30° and |QR| = 5 cm.
[Take sin 30° = ].
Find the length of PQ.
2.5 cm
5.0 cm
12.0 cm
10.0 cm
29.
If the set P = {1, 2, 3, 4, 5} which of the following statements best describes P?
Set of whole numbers up to 6
Set of counting numbers less than 6
Set of counting numbers greater than 6
Set of integers less than 6
30.
A trader sold half of a piece of cloth and used two-fifths of the remaining to sew a dress.
What fraction of the cloth was left?
31.
Find the rule for the mapping:
| 1 | 2 | 3 | 4 | 5 | ... | n |
| ↓ | ↓ | ↓ | ↓ | ↓ | ↓ | ↓ |
| 10 | 21 | 32 | 43 | 54 | ... | - |
n → 10n
n → (10n + 1)
n → (11n - 1)
n → (7n + 3)
32.

Which of the following inequalities is represented on the number line?
-2>y>2
-2≤ y < 2
-2 ≥ y > 2
-2 < y ≤ 2
33.
The pie chart shows how Kwaku spends his monthly salary.

Use this information to answer the question below.
Kwaku earns GH₵630.00 a month. How much of this does he spend on food?
GH₵140.00
GH₵157.00
GH₵210.00
GH₵350.00
34.
One of the factors of the expression 4m2 + 12m - 8m - 24 is (4m - 8). Find the other factor.
m - 3
m + 3
2m + 3
2m - 3
35.
Express 34m 5cm 6mm in millimetres
340506 mm
342506 mm
34056 mm
30456 mm
34565 mm
36.
Which of the following numbers is the largest?
-70
-50
-3
-2
37.
Arrange the following fractions in descending order of magnitude:
,,,.
,,,
,,,
,,,
,,,
38.
Kofi bought 4 books at an average price of ₵2,500.00. If the total cost of 3 of the books was ₵6,500.00, find the cost of the fourth book.
₵3,500.00
₵4,000.00
₵4,500.00
₵6,500.00
₵10,000.00
39.
Write 0.01723 in standard form.
0.01723 x 10-2
0.01723 x 102
1.723 x 10-2
1.723 x 102
40.
The area of a rectangle is 18 cm2. If one of its sides is 2cm long, find its perimeter.
18 cm
20 cm
22 cm
36 cm
(a)
Copy and complete the table for the relation y = 5 - 2x for -3 ≤ x ≤ 4.
| x | -3 | -2 | -1 | 0 | 1 | 2 | 3 | 4 |
| y | 11 | 5 | 1 | -3 |
(b)
Using a scale of 2 cm to 1 unit on th x-axis and 2 cm to 2 units on the y-axis, draw on a graph sheet two perpendicular axes ox and oy for -5 ≤ x ≤ 5 and -12 ≤ y ≤ 12.
(c)
(i)
Using the table, plot all the points of the relation y = 5 - 2x.
(ii)
Draw a straight line through all the points.
(d)
Using the graph, find the:
(i)
value of y when x = -2.6;
(ii)
value of x when y = -2.8;
(iii)
gradient of the line.
(a)
Using a scale of 2 cm to 1 unit on both axes, draw on a graph sheet two perpendicular axes 0x and 0y for -5 ≤ x ≤ 5 and -5 ≤ y ≤ 5.
(i)
Plot, indicating the coordinates of all points P(1,1), Q(1,2),R(2,2) and S(2,1) on the graph sheet. Join the points to form square PQRS.
(ii)
Draw and indicate clearly all coordinates, the image P1Q1R1S1 of square PQRS under an enlargement from the origin with a scale factor of 2, where P → P1,Q → Q1, R → R1 and S → S1.
(iii)
Draw and indicate clearly all coordinates, the image P2Q2R2S2 of square P1Q1R1S1 under a reflection in the x-axis where P1 → P2,Q1 → Q2, R1 → R2 and S1 → S2.
(b)
Using the graph in (a), find the gradient of line R2S.

The diagram shows a running track ABCDEFA. AB and ED are the straight sides. The ends AFE and BCD are semi circular shapes.
|AB| = |ED| = 90 m and |AE| = |BD| = 70 m.
Find
(a)
the total length of the two semi circular ends, AFE and BCD;
(b)
the perimeter of the running track ABCDEFA;
(c)
the total area of the running track ABCDEF.
[Take π = ]
The table below shows the distribution of pupils in a JSS form one (1) class who speak some of the Ghanaian languages.
| Ghanaian Language | No. of students who speak the language |
| Nzema | 5 |
| Ga | 20 |
| Twi | 30 |
| Ewe | 25 |
| Fante | 10 |
(a)
Draw a pie chart for the distribution.
(b)
What is the modal Ghanaian language?
(c)
If a pupil is selected at random from the form, what is the probability that he speaks Ga?
(a)
Using a scale of 2 cm to 2 units on both axes, draw two perpendicular axes OX and OY on a graph sheet. On the same graph sheet, mark the x-axis from -10 to 10 and the y-axis from -10 to 10.
(i)
Plot A(2, 2), B(6, 2) and C(4, 6). Join AB, BC and AC
(ii)
Draw the image triangle A1B1C1 of triangle ABC under a clockwise rotation of 90° about the origin, where A→A1, B→B1 and C→C1.
(iii)
Draw the image triangle A2B2C2 of triangle ABC under a reflection in the y-axis, where A→A2, B→B2 and C→C2
(b)
When 12 is added to a certain number and the sum is multiplied by 4, the result is 60. Find the number
(a)
Simplify: (4x + 2)(x - 2) - 3x2
(b)
The following are the angles formed at the center of a circle: 40o, 60o, 100o, 3xo and 5xo.
Find the value of x.
(c)
The cost (C) in Ghana Cedis of producing a book of x pages is given by C = 25 + 0.6x.
(i)
Find the cost of producing a book with 220 pages.
(ii)
How many pages are in a book produced at a cost of GH₵ 145.00?