Master Percentages with Step by Step Explanations, Worked Examples
Introduction
Percentages are one of the most useful mathematical concepts you will ever learn. Whether you are calculating a discount while shopping, comparing examination scores, interpreting statistical reports, reading graphs, analysing scientific data, or solving algebra problems, percentages appear almost everywhere.
In mathematics examinations, percentage questions often look simple, but they frequently test several concepts at the same time. A single problem may combine percentages with fractions, decimals, ratios, equations, graphs, probability, data analysis, or financial mathematics. Learning to recognise these connections is an important step towards becoming a confident problem solver.
A solid understanding of percentages is valuable for students preparing for the Digital SAT Math, PSAT, ACT Math, GCSE Mathematics, IGCSE Mathematics, Cambridge IGCSE Mathematics, Edexcel GCSE Mathematics, AQA GCSE Mathematics, OCR GCSE Mathematics, Scottish National 5 Mathematics, and many other secondary school mathematics courses around the world. Although examination styles may differ, the mathematical principles remain exactly the same.
This guide has been written from first principles. Every method is explained carefully, every algebraic step is shown, and every worked example follows a logical sequence so that you understand why each step works instead of simply memorising a formula.
After studying this chapter, you will be able to
• Understand the meaning of a percentage.
• Convert between percentages, fractions and decimals.
• Find the percentage of any quantity.
• Determine what percentage one number is of another.
• Solve percentage increase and percentage decrease problems.
• Apply percentage concepts to algebra and word problems.
• Develop the mathematical reasoning required for college entrance examinations and secondary school mathematics.
What Does the Word Percentage Mean?
The word percentage comes from the Latin phrase meaning per hundred.
Therefore,
1% means 1 out of every 100 equal parts.
Similarly,
10% means 10 parts out of 100.
25% means 25 parts out of 100.
75% means 75 parts out of 100.
100% means the entire quantity.
Understanding this simple idea makes every percentage calculation much easier.
Writing Percentages as Fractions
Every percentage can be written as a fraction whose denominator is 100.
Examples
25%
= 25/100
= 1/4
50%
= 50/100
= 1/2
75%
= 75/100
= 3/4
80%
= 80/100
= 4/5
125%
= 125/100
= 5/4
Notice that percentages greater than 100% are perfectly possible. They simply represent quantities larger than the original amount.
Writing Percentages as Decimals
Many Digital SAT, ACT, GCSE and IGCSE questions require changing percentages into decimals.
The rule is simple.
Divide the percentage by 100.
Examples
45%
= 45 ÷ 100
= 0.45
8%
= 8 ÷ 100
= 0.08
150%
= 150 ÷ 100
= 1.5
0.5%
= 0.5 ÷ 100
= 0.005
Moving the decimal point two places to the left produces exactly the same result.
Converting Decimals into Percentages
To change a decimal into a percentage,
multiply by 100.
Examples
0.6
= 0.6 × 100
= 60%
0.08
= 0.08 × 100
= 8%
1.25
= 1.25 × 100
= 125%
Always remember to write the percentage symbol after multiplying by 100.
Converting Fractions into Percentages
There are two common methods.
Method 1
Convert the fraction into a decimal first.
Example
3/5
Divide.
3 ÷ 5
= 0.6
Multiply by 100.
0.6 × 100
= 60%
Method 2
Multiply the fraction directly by 100.
Example
3/5 × 100
= 300/5
= 60%
Both methods produce the same answer.
Choose whichever method you find easier.
Finding the Percentage of a Number
One of the most common examination questions asks you to calculate a certain percentage of a quantity.
The general rule is
Percentage of a number = Percentage × Number ÷ 100
Example 1
Find 25% of 80.
Step 1
Write the formula.
Percentage of a number
= Percentage × Number ÷ 100
Step 2
Substitute the values.
25 × 80 ÷ 100
Step 3
Multiply.
25 × 80
= 2000
Step 4
Divide by 100.
2000 ÷ 100
= 20
Therefore,
25% of 80 is 20.
Example 2
Find 18% of 250.
Step 1
Write the formula.
Percentage × Number ÷ 100
Step 2
Substitute.
18 × 250 ÷ 100
Step 3
Multiply.
18 × 250
= 4500
Step 4
Divide.
4500 ÷ 100
= 45
Therefore,
18% of 250 equals 45.
Example 3
Find 12.5% of 96.
Step 1
Write the formula.
Percentage × Number ÷ 100
Step 2
Substitute.
12.5 × 96 ÷ 100
Step 3
Multiply.
12.5 × 96
= 1200
Step 4
Divide.
1200 ÷ 100
= 12
Therefore,
12.5% of 96 is 12.
Using Fractions Instead of Percentages
Sometimes converting the percentage into a fraction makes the calculation much faster.
Example
Find 50% of 240.
50%
= 1/2
Half of 240
= 120
No multiplication is necessary.
Find 25% of 64.
25%
= 1/4
One quarter of 64
= 16
Find 75% of 80.
75%
= 3/4
First find one quarter.
80 ÷ 4
= 20
Now multiply by 3.
20 × 3
= 60
This approach is often quicker during timed examinations.
What Percentage Is One Number of Another?
Another common examination question asks
"What percentage is one quantity of another?"
The formula is
Percentage
= (Part ÷ Whole) × 100
Example 4
A class contains 40 students.
Twenty-eight students passed an examination.
What percentage passed?
Step 1
Identify the part.
28
Step 2
Identify the whole.
40
Step 3
Use the formula.
(28 ÷ 40) × 100
Step 4
Divide.
28 ÷ 40
= 0.7
Step 5
Multiply.
0.7 × 100
= 70%
Therefore,
70% of the students passed the examination.
Example 5
A football team won 18 matches out of 24.
What percentage of matches did they win?
Step 1
Write the formula.
(Part ÷ Whole) × 100
Step 2
Substitute.
(18 ÷ 24) × 100
Step 3
Simplify.
18 ÷ 24
= 0.75
Step 4
Multiply.
0.75 × 100
= 75%
Therefore,
The team won 75% of its matches.
SAT Strategy
Many Digital SAT, ACT, GCSE and IGCSE questions disguise percentage problems inside word problems, graphs, tables or algebraic expressions. Before beginning any calculation, identify whether the question is asking you to find a percentage of a quantity, what percentage one quantity is of another, or how much a quantity changes by a given percentage. Recognising the type of problem before performing any arithmetic often saves valuable time during an examination.
Practice Questions
Find 35% of 240.
Find 12% of 350.
Find 62.5% of 160.
Express 7/20 as a percentage.
Express 0.84 as a percentage.
What percentage is 45 out of 60?
What percentage is 18 out of 48?
Find 5% of 640.
Find 125% of 48.
A school has 600 students. If 456 students attend on a particular day, what percentage attended?
Answers
84
42
100
35%
84%
75%
37.5%
32
60
76%