Stem & Leaf Plots (Leaving Cert Mathematics): Revision Notes

Stem & Leaf Plots

What is a Stem and Leaf Diagram?

A stem and leaf diagram is simply a method of presenting data in a way that breaks each number into two parts:

The stem (the leading digit or digits of the number).

The leaf (the final digit of the number).

It's a form of data presentation that groups similar numbers together, making it easier to summarise data compared to a long, unorganised list.

Constructing a Stem and Leaf Diagram

Finding the Median and Interquartile Range from a Stem and Leaf Diagram

(a) Finding the Median

The median is the middle number in an ordered list of data. If there is an even number of data points, the median will be the average of the two middle numbers.

Step-by-Step Process to Find the Median:

1. Count the total number of data points
2. Find the middle position
3. Calculate the median

4. Count the total number of data points: In this example, we have $24$ data points.

5. Find the middle position: Since $24$ is an even number, the median will be the average of the $12th$ and $13th$ numbers.

In the stem and leaf diagram, the $12th$ and $13th$ numbers are $26$ and $27$ (the leaves are $5$ and $9$ from the $20$ stem).

6. Calculate the median:

Thus, the median time it takes Mr Barton to wake up is $26.5$ $minutes$.

(b) Finding the Interquartile Range ($IQR$)

The interquartile range ($IQR$) is a measure of the spread of the middle $50\%$ of the data. The $IQR$ is calculated as the difference between the upper quartile ($Q3$) and the lower quartile ($Q1$).

Step-by-Step Process to Find the $IQR$:

1. Find the Lower Quartile ($Q1$)
2. Find the Upper Quartile ($Q3$)
3. Calculate the $IQR$

4. Find the Lower Quartile ($Q1$): $Q1$ is the median of the lower half of the data (the first $12$ values).

The middle of the lower half ($6th$ and $7th$ numbers) is $13$ and $13$ (from the $10$ stem).

5. Find the Upper Quartile ($Q3$): Q3 is the median of the upper half of the data (the last $12$ values).

The middle of the upper half ($18th$ and $19th$ numbers) is $40$ and $40$ (from the $30$ and $40$ stems).

6. Calculate the $IQR$: The interquartile range is the difference between the upper quartile and the lower quartile:

Thus, the $IQR$ for Mr Barton's wake-up times is $27$ $minutes$.

Advantages of Stem and Leaf Diagrams

• Keeps original data: Unlike bar charts and histograms, no data is lost. Every piece of data is shown in its original form.
• Easily ordered: It provides an effective way of ordering and displaying relatively small sets of data, which helps in identifying patterns or calculating statistics like the median or mode.

Disadvantages of Stem and Leaf Diagrams

• Time-consuming for large data sets: While stem and leaf diagrams are practical for small sets, they become impractical for very large data sets (e.g., hundreds of data points). Sorting and organising large amounts of data in this format can be complex and time-consuming.
• Difficult to interpret with many data points: If you have too many leaves, the diagram can become cluttered and hard to interpret.