What is the difference between a bar chart and a pie chart?

A bar chart uses rectangular bars to compare quantities across categories, while a pie chart uses slices of a circle to show how parts make up a whole (usually as percentages).

How do you find the value of a bar on a bar chart?

Look at the top of the bar and draw a horizontal line to the vertical axis (y-axis). The number where it meets the axis is the value for that category.

How do you calculate the angle of a pie chart slice?

Divide the category value by the total, then multiply by 360 degrees. For example, if a category is 25% of the total, its angle is 0.25 x 360 = 90 degrees.

When should you use a bar chart instead of a pie chart?

Use a bar chart when you want to compare exact values across categories. Use a pie chart when you want to show how parts relate to a whole, especially with fewer than 6 categories.

How to Read and Interpret Bar Charts and Pie Charts

Grade: 6-7 | Topic: Statistics

What You Will Learn

After this lesson you will be able to read values from bar charts and pie charts, compare categories, calculate totals and percentages from chart data, and decide when each type of chart is the better choice. These skills are essential for interpreting data in math class and in everyday life.

Theory

What Is a Bar Chart?

A bar chart (also called a bar graph) displays data using rectangular bars. Each bar represents a category, and the length or height of the bar shows the value for that category.

Key parts of a bar chart:

Title — tells you what the chart is about
Horizontal axis (x-axis) — labels the categories
Vertical axis (y-axis) — shows the scale of values
Bars — the height corresponds to each category's value
Scale — the evenly spaced numbers on the y-axis

How to read a bar chart:

Identify the category you need (read the x-axis label).
Find the top of that category's bar.
Draw a horizontal line from the top of the bar to the y-axis.
Read the value where it meets the y-axis.

To compare categories, simply compare bar heights — the taller bar has the larger value.

What Is a Pie Chart?

A pie chart (also called a circle graph) shows data as slices of a circle. The entire circle represents the whole (100% or the total), and each slice represents a part of that whole.

Key parts of a pie chart:

Title — what the data represents
Slices — each represents a category
Labels — show the category name and its percentage (or value)
Legend — color-coded key matching colors to categories

Important relationships:

$\text{Percentage of a slice} = \frac{\text{Category value}}{\text{Total}} \times 100\%$

$\text{Angle of a slice} = \frac{\text{Category value}}{\text{Total}} \times 360°$

Since a full circle is $360°$ and the total is $100\%$ , each $1\%$ of data corresponds to $3.6°$ of the circle.

Bar Chart vs Pie Chart — When to Use Each

Feature	Bar Chart	Pie Chart
Best for	Comparing values across categories	Showing parts of a whole
Number of categories	Any number	Works best with 2-6 categories
Exact comparisons	Easy (read axis)	Harder (angles are difficult to compare)
Shows totals	Not directly	Yes — the whole circle is the total
Multiple data sets	Can use grouped or stacked bars	Not suitable

Reading Double (Grouped) Bar Charts

A double bar chart uses two bars side by side for each category to compare two groups (for example, boys vs girls, or 2024 vs 2025). Always check the legend to know which color represents which group.

Worked Examples

Example 1: Reading a Bar Chart (Easy)

Problem: A bar chart shows the number of books read by students in one month:

Student	Books Read
Ana	5
Ben	8
Cara	3
Dan	6
Eva	8

Who read the most books? How many more books did Ben read than Cara?

Step 1: Identify the tallest bar. Both Ben and Eva have the highest value at 8 books.

Step 2: Find the difference:

$8 - 3 = 5$

Answer: Ben and Eva tied for most books read (8 each). Ben read 5 more books than Cara.

Example 2: Calculating the Total from a Bar Chart (Easy)

Problem: Using the data above, find the total number of books read by all five students and the mean.

Step 1: Add all values:

$5 + 8 + 3 + 6 + 8 = 30$

Step 2: Calculate the mean:

$\text{Mean} = \frac{30}{5} = 6$

Answer: Total books $= 30$ . Mean $= 6$ books per student.

Example 3: Reading a Pie Chart with Percentages (Medium)

Problem: A pie chart shows how 200 students travel to school:

Transport	Percentage
Bus	40%
Walk	25%
Car	20%
Bicycle	15%

How many students take the bus? What is the angle of the "Walk" slice?

Step 1: Find the number who take the bus:

$\text{Bus students} = 40\% \times 200 = 0.40 \times 200 = 80$

Step 2: Find the angle for "Walk":

$\text{Angle} = 25\% \times 360° = 0.25 \times 360° = 90°$

Answer: 80 students take the bus. The "Walk" slice has an angle of 90 degrees.

Example 4: Finding a Missing Percentage in a Pie Chart (Medium)

Problem: A pie chart shows favorite sports. Football is 35%, basketball is 28%, tennis is 22%, and the remaining slice is "Other." What percentage is "Other," and if 400 students were surveyed, how many chose "Other"?

Step 1: All slices must add to 100%:

$\text{Other} = 100\% - 35\% - 28\% - 22\% = 15\%$

Step 2: Find the number of students:

$15\% \times 400 = 0.15 \times 400 = 60$

Answer: "Other" is 15%, representing 60 students.

Example 5: Comparing Data Between Two Charts (Challenging)

Problem: In January, a store sold 120 items: Electronics 50%, Clothing 30%, Food 20%. In February, they sold 150 items: Electronics 40%, Clothing 35%, Food 25%. Did clothing sales increase from January to February?

Step 1: Calculate January clothing sales:

$30\% \times 120 = 0.30 \times 120 = 36 \text{ items}$

Step 2: Calculate February clothing sales:

$35\% \times 150 = 0.35 \times 150 = 52.5 \approx 53 \text{ items}$

Step 3: Compare:

$53 - 36 = 17 \text{ more items}$

Answer: Yes, clothing sales increased by about 17 items. Notice that even though you must convert percentages to actual numbers before comparing — a higher percentage in a different total does not automatically mean more.

Common Mistakes

Mistake 1: Comparing pie chart slices across different totals

Survey A (100 people): Sports = 40%. Survey B (500 people): Sports = 30%.

❌ "Survey A has more sports fans because 40% > 30%."

✅ Survey A: $40 \times 1 = 40$ fans. Survey B: $0.30 \times 500 = 150$ fans. Survey B has more sports fans.

Why this matters: Percentages only describe proportions. You must multiply by the total to compare actual quantities between different data sets.

Mistake 2: Misreading the scale on a bar chart

A y-axis goes 0, 10, 20, 30... and a bar ends halfway between 20 and 30.

❌ Reading the value as 20.

✅ The correct value is 25 (halfway between 20 and 30).

Why this matters: Always check the scale intervals. Bars often land between gridlines, requiring you to estimate proportionally.

Mistake 3: Assuming pie chart slices must add to exactly 100%

❌ Rounding each slice individually then getting a total of 99% or 101% and panicking.

✅ Small rounding differences are normal. Percentages should add to approximately 100%. If they are far off (like 90%), a category is probably missing.

Why this matters: Rounding to the nearest whole percent can cause the total to be off by 1-2%. This is expected, not an error.

Practice Problems

Try these on your own before checking the answers:

A bar chart shows test scores: Math = 85, Science = 72, English = 90, History = 68. What is the range of scores? Which subject has the highest score?
A pie chart represents 300 people's favorite fruit: Apples = 30%, Bananas = 25%, Oranges = 20%, Grapes = 15%, Other = 10%. How many people chose Bananas? What angle does the "Oranges" slice have?
A pie chart has three slices: A = 45%, B = 30%, C = ?. Find C and its angle in degrees.
A double bar chart shows January and February sales. In January, Store X sold 50 units and Store Y sold 70 units. In February, Store X sold 80 units and Store Y sold 65 units. Which store had the bigger increase from January to February?
A pie chart shows that 120 out of 400 students walk to school. What percentage is this and what angle should the slice be?

Click to see answers

Range $= 90 - 68 = 22$ . English has the highest score at 90.
Bananas: $0.25 \times 300 = 75$ people. Oranges angle: $0.20 \times 360° = 72°$ .
$C = 100\% - 45\% - 30\% = 25\%$ . Angle $= 0.25 \times 360° = 90°$ .
Store X increase: $80 - 50 = 30$ units. Store Y increase: $65 - 70 = -5$ units (a decrease). Store X had the bigger increase.
Percentage: $\frac{120}{400} \times 100\% = 30\%$ . Angle: $0.30 \times 360° = 108°$ .

Summary

Bar charts use bars to compare values across categories — read values by matching bar heights to the y-axis scale.
Pie charts show parts of a whole — each slice's percentage times the total gives the actual count.
To find a pie chart angle: $\frac{\text{value}}{\text{total}} \times 360°$ .
Always convert percentages to actual numbers before comparing across different totals.
Choose a bar chart for exact comparisons and a pie chart for showing proportions with fewer categories.

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What You Will Learn​

Theory​

What Is a Bar Chart?​

What Is a Pie Chart?​

Bar Chart vs Pie Chart — When to Use Each​

Reading Double (Grouped) Bar Charts​

Worked Examples​

Example 1: Reading a Bar Chart (Easy)​

Example 2: Calculating the Total from a Bar Chart (Easy)​

Example 3: Reading a Pie Chart with Percentages (Medium)​

Example 4: Finding a Missing Percentage in a Pie Chart (Medium)​

Example 5: Comparing Data Between Two Charts (Challenging)​

Common Mistakes​

Practice Problems​

Summary​

Related Topics​