Physical Address
304 North Cardinal St.
Dorchester Center, MA 02124
This module develops the numerical competence required for success in the Ghana National Fire Service aptitude test. Mathematics in fire service operations is practical and applied — involving measurement, estimation, time calculation, resource allocation, and quick decision-making under pressure.
The module progresses from foundational arithmetic to applied problem-solving scenarios relevant to logistics, emergency timing, and operational efficiency.
UNIT 1: BASIC ARITHMETIC OPERATIONS
1.1 Introduction
Basic arithmetic forms the foundation of all numerical reasoning. Candidates must demonstrate speed and accuracy in performing calculations without reliance on calculators (unless stated).
The four fundamental operations are:
-
Addition
-
Subtraction
-
Multiplication
-
Division
1.2 Addition
Addition combines quantities.
Example:
45 + 78 = 123
Properties of Addition
| Property | Explanation | Example |
|---|---|---|
| Commutative | a + b = b + a | 4 + 7 = 7 + 4 |
| Associative | (a + b) + c = a + (b + c) | (2 + 3) + 4 = 2 + (3 + 4) |
| Identity | a + 0 = a | 9 + 0 = 9 |
1.3 Subtraction
Subtraction finds the difference between quantities.
Example:
100 − 37 = 63
Important:
Subtraction is NOT commutative.
8 − 3 ≠ 3 − 8
1.4 Multiplication
Multiplication is repeated addition.
7 × 5 = 35
Properties of Multiplication
| Property | Explanation | Example |
|---|---|---|
| Commutative | a × b = b × a | 3 × 6 = 6 × 3 |
| Associative | (a × b) × c = a × (b × c) | (2 × 3) × 4 |
| Identity | a × 1 = a | 12 × 1 = 12 |
| Zero Property | a × 0 = 0 | 5 × 0 = 0 |
1.5 Division
Division distributes quantities equally.
20 ÷ 4 = 5
Division is NOT commutative.
1.6 Order of Operations
Use BODMAS:
B – Brackets
O – Orders (powers, roots)
D – Division
M – Multiplication
A – Addition
S – Subtraction
Example:
5 + 3 × 2 = 5 + 6 = 11
UNIT 2: FRACTIONS, DECIMALS, AND PERCENTAGES
2.1 Fractions
A fraction represents part of a whole.
a/b where:
a = numerator
b = denominator
Types of Fractions
| Type | Example |
|---|---|
| Proper | 3/5 |
| Improper | 7/4 |
| Mixed | 1 3/4 |
Operations with Fractions
Addition:
a/b + c/b = (a + c)/b
If denominators differ:
Find LCM first.
Example:
1/2 + 1/3
LCM = 6
= 3/6 + 2/6 = 5/6
2.2 Decimals
Decimals represent fractions in base 10.
0.25 = 25/100 = 1/4
Converting Fractions to Decimals
Divide numerator by denominator.
3/4 = 3 ÷ 4 = 0.75
2.3 Percentages
Percentage means “per hundred”.
Percentage formula:
Percentage = (Part / Whole) × 100
Example:
If 30 out of 50 candidates passed:
Percentage = (30/50) × 100 = 60%
Percentage Increase
Percentage Increase = (Increase / Original) × 100
Percentage Decrease
Percentage Decrease = (Decrease / Original) × 100
UNIT 3: RATIOS AND PROPORTIONS
3.1 Ratio
A ratio compares two quantities.
a : b
Example:
If 4 fire trucks serve 2 districts:
Ratio = 4 : 2 = 2 : 1
3.2 Proportion
A proportion is an equation of two ratios.
a/b = c/d
Cross multiplication rule:
a × d = b × c
Example:
3/5 = x/10
3 × 10 = 5 × x
30 = 5x
x = 6
Direct Proportion
y ∝ x
y = kx
Inverse Proportion
y ∝ 1/x
y = k/x
UNIT 4: AVERAGES
Average (Mean) formula:
Mean = Sum of Values / Number of Values
Example:
Response times: 5, 6, 7 minutes
Mean = (5 + 6 + 7) / 3 = 6 minutes
Weighted Mean (Senior Level)
Weighted Mean = (Σfx) / Σf
Where:
f = frequency
x = value
UNIT 5: WORD PROBLEMS AND APPLICATIONS
Strategy for Solving Word Problems
-
Read carefully
-
Identify known values
-
Identify what is required
-
Choose correct formula
-
Solve step-by-step
Example:
A fire tanker carries 2,500 liters. It uses 400 liters per operation. How many operations can it perform?
2500 ÷ 400 = 6 remainder 100
It can perform 6 full operations.
Senior-Level Application:
Multi-step percentage + ratio problems.
UNIT 6: TIME, SPEED, AND DISTANCE
Core Formula:
Speed = Distance / Time
Distance = Speed × Time
Time = Distance / Speed
Example:
A fire engine travels 120 km in 2 hours.
Speed = 120 ÷ 2 = 60 km/h
Unit Conversion Table:
| Unit | Conversion |
|---|---|
| 1 hour | 60 minutes |
| 1 minute | 60 seconds |
| 1 km | 1000 m |
| 1 m | 100 cm |
Senior-Level Concept:
Average Speed (if distances equal)
Average Speed = (2 × Speed1 × Speed2) / (Speed1 + Speed2)
UNIT 7: MEASUREMENT CONVERSIONS
Length
1 km = 1000 m
1 m = 100 cm
1 cm = 10 mm
Mass
1 tonne = 1000 kg
1 kg = 1000 g
Volume
1 liter = 1000 ml
Area
Area of Rectangle = Length × Width
Volume
Volume of Cuboid = Length × Width × Height
Practical Application:
Water tank capacity calculation.
UNIT 8: SIMPLE ALGEBRAIC EXPRESSIONS
8.1 Expressions
3x + 4
8.2 Solving Linear Equations
Example:
3x + 5 = 20
3x = 15
x = 5
8.3 Formulas
Perimeter of Rectangle:
P = 2(L + W)
Area of Circle:
A = πr²
Circumference:
C = 2πr
π ≈ 3.142
Senior-Level Word Algebra:
If 3 hoses spray x liters per minute and total output is 90 liters:
3x = 90
x = 30 liters per minute
Perfect! Let’s expand Module 2: Mathematics & Numerical Aptitude with worked examples for each unit, so candidates can clearly see step-by-step solutions. I’ll keep formulas intact and add explanations suitable for both junior and senior levels.
WORKED EXAMPLES
UNIT 1: BASIC ARITHMETIC OPERATIONS
Example 1: Addition
Add 467 + 389
Solution:
467
+ 389
------
856
Explanation: Start from the units column: 7 + 9 = 16 → write 6, carry 1. Tens: 6 + 8 + 1 (carry) = 15 → write 5, carry 1. Hundreds: 4 + 3 + 1 (carry) = 8.
Example 2: Subtraction
Subtract 752 − 468
Solution:
752
- 468
------
284
Explanation: Borrow where necessary: 2 − 8 → borrow 1 from tens. Complete subtraction column by column.
Example 3: Multiplication
Multiply 36 × 24
Solution:
36
× 24
-----
144 (36 × 4)
720 (36 × 20)
-----
864
Explanation: Multiply ones first, then tens, sum partial products.
Example 4: Division
Divide 945 ÷ 15
Solution:
945 ÷ 15 = 63
Explanation: 15 × 60 = 900 → remainder 45 → 15 × 3 = 45 → quotient = 63
UNIT 2: FRACTIONS, DECIMALS, AND PERCENTAGES
Example 1: Fractions
Add 3/4 + 2/5
Solution:
LCM of 4 and 5 = 20
3/4 = 15/20, 2/5 = 8/20
15/20 + 8/20 = 23/20 = 1 3/20
Explanation: Convert to common denominator, then add numerators.
Example 2: Decimals
Subtract 12.75 − 8.46
Solution:
12.75
-8.46
------
4.29
Explanation: Align decimal points, subtract column by column.
Example 3: Percentage
What is 20% of 250 liters?
Solution:
Percentage = (Part / Whole) × 100
Part = 20/100 × 250 = 50 liters
Explanation: Multiply the total by the percentage in decimal form.
Example 4: Percentage Increase
Price of a fire extinguisher increases from 120 GHS to 150 GHS. Find % increase.
Solution:
Increase = 150 − 120 = 30
% Increase = (30 / 120) × 100 = 25%
UNIT 3: RATIOS AND PROPORTIONS
Example 1: Ratio
If 12 firemen serve 3 fire stations, find the ratio of firemen to stations.
Solution:
Ratio = 12 : 3 = 4 : 1
Example 2: Proportion
Solve 5/8 = x/32
Solution:
Cross multiply: 5 × 32 = 8 × x
160 = 8x
x = 20
UNIT 4: AVERAGES
Example 1: Mean
Response times (minutes): 5, 7, 6, 8, 9
Find the average response time.
Solution:
Mean = (5+7+6+8+9)/5 = 35/5 = 7 minutes
Example 2: Weighted Mean
Operation type | Time (min) | Frequency (f)
Extinguish Fire | 5 | 3
Rescue | 7 | 2
Inspection | 4 | 5
Weighted Mean = Σ(f×x)/Σf
Σ(f×x) = (3×5) + (2×7) + (5×4) = 15+14+20=49
Σf = 3+2+5=10
Weighted Mean = 49/10 = 4.9 minutes
UNIT 5: WORD PROBLEMS AND APPLICATIONS
Example 1: Single-Step
A tanker carries 2,500 liters and uses 400 liters per operation. How many operations?
Solution:
Operations = 2500 ÷ 400 = 6 remainder 100
Answer: 6 full operations
Example 2: Multi-Step
A fire station has 8 trucks. Each truck carries 500 liters. If 3 trucks are in use, how much water remains?
Solution:
Total capacity = 8×500 = 4000 liters
In use = 3×500 = 1500 liters
Remaining = 4000−1500 = 2500 liters
UNIT 6: TIME, SPEED, AND DISTANCE
Example 1: Speed
Fire engine travels 180 km in 3 hours. Find speed.
Solution:
Speed = Distance / Time = 180 ÷ 3 = 60 km/h
Example 2: Average Speed (Senior Level)
Fire engines travel to a fire 60 km away at 40 km/h and return at 30 km/h. Find average speed.
Solution:
Average Speed = (2 × 40 × 30)/(40 + 30) = 2400/70 ≈ 34.29 km/h
UNIT 7: MEASUREMENT CONVERSIONS
Example 1: Volume
Convert 5 m³ to liters.
Solution:
1 m³ = 1000 liters
5 m³ = 5 × 1000 = 5000 liters
Example 2: Area
Area of rectangle: length = 12 m, width = 8 m
Solution:
Area = Length × Width = 12 × 8 = 96 m²
UNIT 8: SIMPLE ALGEBRAIC EXPRESSIONS
Example 1: Solve Linear Equation
3x + 7 = 22
Solution:
3x = 22 − 7 = 15
x = 15 ÷ 3 = 5
Example 2: Practical Application
3 hoses deliver x liters per minute. Total = 90 liters. Find x.
Solution:
3x = 90
x = 90 ÷ 3 = 30 liters/min
