Digital Graphic Novel Lesson

The Case of the Crowded Data

Join the Histogram Heroes as they turn messy number tables into clear stories. Their mission: organize data into intervals, build frequency tables, read histograms, and describe what the data means.

Learning Target 1 I can display numerical data in a histogram and explain how this display is different from a dot plot.

Learning Target 2 I can describe data by looking at the shape and the most common interval.

Chapter 1: The 5K Mystery

Panel 1

A table full of runners

“Fifty middle school students ran a 5-kilometer race. We recorded each student’s pace: the time it took to run one kilometer. But this table is packed!”

Data question: What range of paces was most common?

Panel 2

The numbers are crowded

Look at the paces. It is hard to understand the story when every value is separate.

4.85.25.65.35.04.76.24.75.15.8 4.85.55.45.14.95.05.25.55.86.0 5.85.96.14.85.35.45.64.55.45.0 4.55.75.04.65.95.16.05.04.85.3 5.35.24.95.55.45.04.76.15.74.9

Scroll inside the box to see all 50 values.

Panel 3

Detective Data has a plan

“When a data set is large, we can group values into intervals. Each interval must be the same size and must not overlap.”

Data collected information or values

Interval a range used to group values

Frequency how many values are in a group

Histogram a graph that shows frequency by interval

Panel 4

Check the rule

Question: Which interval set is best for organizing these times?

Chapter 2: From Table to Histogram

Panel 5

The frequency table reveals the pattern

The heroes count how many runner paces fall into each equal interval.

Minutes to Run One Kilometer	Frequency	Plain-English Meaning
4.5–4.9	13	13 students ran one kilometer in this pace range.
5.0–5.4	20	20 students ran one kilometer in this pace range.
5.5–5.9	12	12 students ran one kilometer in this pace range.
6.0–6.4	5	5 students ran one kilometer in this pace range.

Panel 6

Build the histogram

A histogram uses bars to show how many data values are in each interval.

0 5 10 15 20

4.5–4.9

5.0–5.4

5.5–5.9

6.0–6.4

x-axis: pace intervals | y-axis: frequency

Panel 7

Why do the bars touch?

“In a histogram, bars touch because the intervals are continuous. One interval ends and the next interval begins right after it.”

Dot plot vs. histogram:

A dot plot shows individual values. A histogram groups many numerical values into intervals, which is useful for large data sets.

Bars touch because the data is grouped into connected intervals, not separate categories.

Panel 8

The tallest bar solves the mystery

“To find the most common range, look for the tallest bar. The tallest bar is 5.0–5.4 minutes, with 20 students.”

What does this mean in context?

The greatest number of students took between 5.0 and 5.4 minutes to run one kilometer.

Chapter 3: The Beanstalk Case

Panel 9

A science experiment appears

“Students planted beans and measured their plants after two weeks. Now we need to describe the plant-height data.”

Data range: Some plants are as short as 9 cm, and some are as tall as 18 cm.

Panel 10

Plant-height frequency table

Plant Heights (cm)	Frequency
9–10.9	3
11–12.9	4
13–14.9	10
15–16.9	5
17–18.9	3

The most common plant height is 13–14.9 cm, because that interval has the greatest frequency: 10.

Panel 11

The shape tells a story

The heroes sketch the histogram shape and notice the tallest bar is in the middle.

0 2.5 5 7.5 10

9–10.9

11–12.9

13–14.9

15–16.9

17–18.9

Plant heights in centimeters

Panel 12

Symmetry clue

⬅️ Left side: bars are shorter as you move away from the middle.

📊 Middle: the tallest bar is 13–14.9 cm.

➡️ Right side: bars are also shorter as you move away from the middle.

How can we describe the shape?

The display is symmetric because the number of data values on each side of the middle bar is about the same.

Chapter 4: Your Mission

Panel 13

Movie makers need advice

“A group of friends wants to make a movie. They researched movie running times and made a histogram. What should you recommend? Use the data, not a guess.”

I recommend a movie length between ___ and ___ because...

The histogram shows that the most common interval is...

This is a good recommendation because...

One detail from the graph that supports my thinking is...

Write your advice:

Panel 14

Exit Ticket

Answer both questions.

1. Why might a histogram be better than a dot plot for a large data set?

2. What does the tallest bar in a histogram tell you?

Final Panel

Hero Summary

Remember:

1. Group numerical data into equal, non-overlapping intervals.

2. Count each interval to make a frequency table.

3. Use a histogram to show the frequency distribution.

4. Look for the tallest bar to find the most common interval.

5. Describe the data in context.