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Pie charts & waffle diagrams

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visibility 161update 8 months agobookmarkshare

🎯 In this topic you will

Draw and interpret pie charts and waffle diagrams

🧠 Key Words

label
pie chart
proportions
sector
waffle diagram

Show Definitions

label: A word or number used to identify parts of a diagram or chart.
pie chart: A circular chart divided into sectors to show proportions of a whole.
proportions: The relative size or ratio of parts compared to the whole.
sector: A slice of a circle in a pie chart that represents a proportion of the whole.
waffle diagram: A grid of squares used to represent percentages or proportions visually.

You can use a pie chart to display data showing how an amount is divided or shared. It shows proportions, not actual amounts.

You draw a pie chart as a circle divided into sections called sectors. The angles at the centres of all the sectors add up to $360^\circ$. When you draw a pie chart, you must make sure that you label each sector and draw the angles accurately.

Worked example

a. Ninety people were asked what type of holiday they had last year. The table shows the results.

Type of holiday	Number of people
activity	32
beach	27
city break	24
other	7

i. Draw a pie chart to represent the data.
ii. What percentage of the people went on a beach holiday?

Pie chart of holiday types for 90 people (activity 128°, beach 108°, city break 96°, other 28°)

b. The pie chart shows where the 90 people went on holiday last year.

i. What fraction of the population went to Spain?
ii. What percentage of the population went to Greece?
iii. How many people went to other countries?

Holiday destination pie chart with sectors: Spain 30°, USA 133°, Greece 72°, Thailand 45°, Other countries 80°

Answer:

a. i. Degrees per person: $\dfrac{360^\circ}{90}=4^\circ$.

Activity: $32 \times 4^\circ = 128^\circ$, Beach: $27 \times 4^\circ = 108^\circ$, City break: $24 \times 4^\circ = 96^\circ$, Other: $7 \times 4^\circ = 28^\circ$.

Check: $128^\circ+108^\circ+96^\circ+28^\circ=360^\circ$.

a. ii. $\dfrac{27}{90}\times 100 = 30\%$.

b. i. Spain $=\dfrac{30}{360}=\dfrac{1}{12}$.

b. ii. Greece $=\dfrac{72}{360}=\dfrac{1}{5}=20\%$.

b. iii. Known degrees: $30+133+72+45=280^\circ$ so Other countries $=360^\circ-280^\circ=80^\circ$.

Fraction $=\dfrac{80}{360}=\dfrac{2}{9}$, people $=\dfrac{2}{9}\times 90 = 20$.

Pie charts from tables. Convert counts to angles using $360^\circ \div \text{total people}$. Multiply each count by the “degrees per person” to get each sector, and ensure they sum to $360^\circ$.

Reading given pie charts. Use sector angles as fractions of $360^\circ$. Simplify to get fractions or percentages, and multiply the fraction by the population to find numbers of people.

🧠 PROBLEM-SOLVING Strategy

Draw & Interpret Pie Charts and Waffle Diagrams

Convert counts ↔ fractions ↔ percentages ↔ angles, label clearly, and always check totals.

Find the total, T. Sum all category frequencies.
Choose your route.
• Direct to angle: angle = (category/T) × 360°

• Via percent: % = (category/T) × 100%, then angle = % × 3.6

• Degrees per one: dp1 = 360°/T, then angle = dp1 × category
Draw the pie chart. Use a protractor from a fixed baseline. Plot each sector in order, label sectors, add a legend/title.
Waffle diagrams (grids of equal squares).
• Each square represents the same amount (often 1 item).

• Percent = (squares of category / total squares) × 100%.

• Angle for pie = (squares/total) × 360°.
Interpret quickly.
• Compare proportions by angle size, fraction of 360°, or percentage.

• To get counts from a given pie: count = (angle/360°) × T.
Check totals. Angles sum to 360°, percentages to 100%, waffle squares to the full grid.

Mini examples

• Degrees per person: 90 people ⇒ dp1 = 360°/90 = 4°. Category 27 ⇒ 27×4° = 108°.
• From waffle to pie: 50 squares total; vinegar has 14 squares ⇒ angle = 14/50 × 360° = 100.8°; % = 28%.
• From pie to count: sector 72° out of 360° with total 90 ⇒ 90×(72/360)=18 people.

Common slips to avoid

Forgetting to use the total T as the base for all categories.
Angles that don’t sum to 360° (rounding: adjust the last sector slightly).
Unlabelled sectors or missing legend/title.
Counting waffle squares inaccurately—use tick marks or tally as you count.

Quick formulas — Fraction: f = category/T · Percentage: 100f% · Angle: 360f°

❓ EXERCISES

1. The table shows the number of different makes of car in a car park.

Make of car	Frequency
Ford	12
Vauxhall	18
Toyota	10
Nissan	20

a. Copy and complete the calculations below to work out the number of degrees for each sector of a pie chart, to show the information given in the table.

👀 Show answer

Total number of cars = $12+18+10+20=60$.

Number of degrees per car = $360 \div 60 = 6$°.

Number of degrees for each sector:

Ford = $12 \times 6 = 72$°
Vauxhall = $18 \times 6 = 108$°
Toyota = $10 \times 6 = 60$°
Nissan = $20 \times 6 = 120$°

b. Draw a pie chart to show the information in the table. Remember to label each sector and to give the pie chart a title.

👀 Show answer

Draw a circle and divide it into sectors with the following angles:

Ford → 72°
Vauxhall → 108°
Toyota → 60°
Nissan → 120°

Label each sector clearly with the car make. Title: Car Park – Car Makes.

2. A group of 40 people are asked which type of music they prefer. The table shows the results. Draw a pie chart to show the information in the table.

Type of music	Frequency
Soul	5
Classical	20
Pop	8
Other	7

👀 Show answer

Total = 40 people → degrees per person = $360 \div 40 = 9°$.

Soul = $5 \times 9 = 45°$
Classical = $20 \times 9 = 180°$
Pop = $8 \times 9 = 72°$
Other = $7 \times 9 = 63°$

Pie chart sectors: Soul 45°, Classical 180°, Pop 72°, Other 63°.

3. A supermarket sells five types of milk made from plants. The pie chart shows the proportion of the different plant milks the supermarket sold one day.

Pie chart showing types of milk sold by a supermarket: soya, almond, coconut, oat, rice

a. Which milk was the most popular?

b. What fraction of the different plant milks sold was almond?

c. What percentage of the different plant milks sold was oat?

d. Altogether, the supermarket sold 180 litres on this day. How many litres of soya milk was sold on this day?

👀 Show answer

3a. Almond (largest sector: 120°).

3b. Almond fraction = $120 \div 360 = \tfrac{1}{3}$.

3c. Oat = 60° → $60 \div 360 = \tfrac{1}{6} = 16.7\%$.

3d. Soya = 90° → $90 \div 360 = \tfrac{1}{4}$.
$\tfrac{1}{4} \times 180 = 45$ litres.

🧠 Think like a Mathematician

Task: Work out the missing frequencies and totals from Alexi’s pie chart survey and justify your reasoning.

Scenario: Alexi asked people their favourite type of film and recorded the results in a table. Some numbers are missing:

Favourite type of film	Frequency	Number of degrees
Action	2	40
Romantic	7	?
Science fiction	?	80
Comedy	?	100

Questions:

a) Draw a pie chart from the completed table.

b) Discuss: i. Did you need to work out the missing frequencies? ii. How can you find the missing frequencies? iii. How many people did Alexi ask in total?

👀 show answer

Each frequency corresponds to $\dfrac{360}{\text{total people}}$ degrees. First, find degrees per person using Action: - 2 people = 40° → 1 person = 20°.
Romantic: 7 people × 20° = 140°.
Science fiction: 80° ÷ 20° = 4 people.
Comedy: 100° ÷ 20° = 5 people.
Completed table:

Favourite type of film	Frequency	Number of degrees
Action	2	40
Romantic	7	140
Science fiction	4	80
Comedy	5	100
Total	18	360

b i) Yes – to complete the pie chart you need the missing values.
b ii) Use the fact that 1 person = 20°.
b iii) Total = 18 people.

❓ EXERCISES

5. The waffle diagram shows the colours of the cars in a school’s staff car park.

Waffle diagram showing colours of cars in a staff car park

a. Copy the table and use the waffle diagram to complete it, showing the number of each colour car.

Colour of car	Number of cars
Red	3
Blue	4
Green	5
Yellow	2
White	6

👀 Show answer

Total cars = $3 + 4 + 5 + 2 + 6 = 20$.

Red: 3
Blue: 4
Green: 5
Yellow: 2
White: 6

b. Draw a pie chart to show the information given in the completed table.

👀 Show answer

Each car represents $360 \div 20 = 18°$ in the pie chart.

Red = $3 \times 18 = 54°$
Blue = $4 \times 18 = 72°$
Green = $5 \times 18 = 90°$
Yellow = $2 \times 18 = 36°$
White = $6 \times 18 = 108°$

Draw a circle, divide into the above angles, and label each sector with the car colour.

🧠 Think like a Mathematician

Task: Use the waffle diagram to draw a pie chart showing the number of people at a tennis tournament.

Scenario: The waffle diagram has 50 squares in total. Each square represents 1 person. The key shows: - Women (purple) = 20 squares - Men (green) = 10 squares - Girls (white) = 6 squares - Boys (orange) = 14 squares

Questions:

a) Draw a pie chart to show the information in the waffle diagram.

b i) What method did you use to work out the angles for the pie chart?

b ii) Will your method work in general, with any number of squares in a waffle diagram?

b iii) Now that you have compared your method with others, which do you think is the best? Explain why.

👀 show answer

Total squares = 50, so each square = $\tfrac{360}{50} = 7.2^\circ$.
Angles: - Women: 20 × 7.2 = 144° - Men: 10 × 7.2 = 72° - Girls: 6 × 7.2 = 43.2° - Boys: 14 × 7.2 = 100.8°
b i) Method: find degrees per person (360 ÷ 50), then multiply by each group’s frequency.
b ii) Yes – the same method works for any number of squares, since you always divide 360° by the total number of people.
b iii) The best method is the degrees-per-person method because it is systematic, always works, and avoids estimation errors.

❓ EXERCISES

7. The waffle diagram shows the number of hot drinks sold in a café on one day.

Waffle diagram showing tea, coffee, and hot chocolate sold in a café

a. Copy the table and use the diagram to complete it.

Hot drink	Number of drinks	Percentage of total	Number of degrees
Tea	45	30%	108°
Coffee	90	60%	216°
Hot chocolate	15	10%	36°
Total	150	100%	360°

b. Sofia says: “Instead of working out the percentages and then the degrees, I think it is easier to work out the degrees straight away, like this: Tea = $\dfrac{45}{150} \times 360 = 108°$.” Do you agree with Sofia or would you rather work out the percentages and then the degrees? Explain why.

👀 Show answer

Both methods are valid:

Sofia’s method (direct to degrees) is quicker, because it goes straight from fraction to sector angle.
The percentage method is useful if you also want to compare proportions in percentage terms.

It depends on whether you need percentages as well as degrees. If not, Sofia’s method is simpler.

c. Draw a pie chart to show the information given in the waffle diagram.

👀 Show answer

Pie chart sectors should be drawn with:

Tea → 108°
Coffee → 216°
Hot chocolate → 36°

Label each sector clearly with the drink name.

8. The pie chart shows the results of a survey of students’ favourite subject. 180 students chose Maths. Show that 105 students chose ‘other’.

Pie chart showing students' favourite subject

👀 Show answer

Step 1: The Maths sector = 120°.

Step 2: If 120° corresponds to 180 students, then:

$\text{Scale} = 180 \div 120 = 1.5$ students per degree.

Step 3: The ‘other’ sector = 70° (since total = 360°, and $360 - (120 + 42 + 90 + 38) = 70$).

Step 4: Number of students for ‘other’ = $70 \times 1.5 = 105$.

✅ Therefore, 105 students chose ‘other’.

⚠️ Be careful!

Always use the total: compute fractions with $T=\text{sum of all categories}$; angles are $(\text{category}/T)\times 360^\circ$.
Angles must sum to $360^\circ$: due to rounding, adjust the last sector slightly so totals match exactly.
Label every sector: include category name and value (count or %) and add a clear title/legend.
Don’t read by arc length/area: compare central angles (or percentages), not just how long the edge looks.
Percent ↔ angle checks:$1\% = 3.6^\circ$, so $25\% = 90^\circ$, $50\% = 180^\circ$, $10\% = 36^\circ$.
From pie to counts: use $\text{count} = (\text{angle}/360^\circ)\times T$; don’t guess by eye.
Waffle diagrams: each square is equal; use $\%\!=\text{squares}/\text{total squares}\times 100\%$ and $\text{angle}=(\text{squares}/\text{total})\times 360^\circ$.
Count squares carefully: tick as you count, and be consistent about half-squares; totals must equal the full grid.
Use consistent units: don’t mix raw counts from waffles with percentages from pies without converting via the same total $T$.
Common slip: using $360/T$ incorrectly—compute “degrees per one” first ($\text{dp1}=360^\circ/T$), then multiply by each category.

📘 What we've learned — Pie Charts & Waffle Diagrams

Purpose: Both displays show proportions (how a whole is shared), not raw totals by themselves.
Pie chart basics: Circle split into sectors; all central angles add to 360°. Label every sector and include a key/title.
Convert counts → angles:
Fraction = category ÷ total
Percentage = fraction × 100%
Angle = fraction × 360° (or percentage × 3.6)
Fast route: Degrees-per-one = 360° ÷ total; sector angle = (degrees-per-one) × category.
From pie to counts: count = (sector angle ÷ 360°) × total; percentage = sector angle ÷ 3.6.
Waffle diagrams: Grid of equal squares (often 100). Each square represents the same amount.
Fraction = squares ÷ total squares; Percentage = that × 100%; Angle = that × 360°.
When to use which:
Pie → quick visual comparison of parts of a whole.
Waffle → easy counting/percent reading (especially with 100 squares).
Accuracy & checks: Angles sum to 360°, percentages to 100%, waffle squares to the full grid. If rounding, adjust the final sector slightly.
Common slips: Using the wrong total, unlabeled sectors, angles not summing to 360°, miscounting waffle squares.

Mini examples:

• Total 90 people ⇒ degrees-per-one = 360° ÷ 90 = 4°; if a category has 27 people → 27 × 4° = 108° (30%).
• Waffle 50 squares; 14 squares = vinegar → fraction 14/50 = 0.28 → 28% → angle 0.28 × 360° = 100.8°.

Pie charts & waffle diagrams

🎯 In this topic you will

🧠 Key Words

🧠 PROBLEM-SOLVING Strategy

Draw & Interpret Pie Charts and Waffle Diagrams

❓ EXERCISES

🧠 Think like a Mathematician

❓ EXERCISES

🧠 Think like a Mathematician

❓ EXERCISES

⚠️ Be careful!

📘 What we've learned — Pie Charts & Waffle Diagrams

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