Stemplots
A stemplot (aka, stem and leaf plot) is a type of chart that shows how individual values are distributed within a
set of data.
View Video Lesson
Stemplots
A stemplot is used to display quantitative data, generally from
small data sets (50 or fewer observations). The stemplot below
shows IQ scores for 30 sixth graders.
Stems
15
14
13
12
11
10
9
8
Key: 11

Leaves
1
2 6
4 5 7 9
1 2 2 2 5 7 9 9
0 2 3 4 4 5 7 8 9 9
1 1 4 7 8
7 represents an IQ score of 117

In a stemplot, the entries on the left are called stems; and the entries
on the right are called leaves. In the example above, the stems are
tens (8 represents 80, 9 represents 90, 10 represents 100, and so on); and the
leaves are ones. However, the stems and leaves could
be other units  millions, thousands, ones, tenths, etc.
Some stemplots include a key to help the user interpret the display correctly.
The key in the stemplot above indicates that a stem of 11 with a leaf of
7 represents an IQ score of 117.
Looking at the example above, you should be able to quickly describe the
distribution of IQ scores. Most of the scores are clustered between
90 and 109, with the center falling in the neighborhood of 100. The
scores range from a low of 81 (two students have an IQ of 81) to a
high of 151. The high score of 151 might be classified as an
outlier.
Note: In the example above, the stems and leaves are explicitly labeled for
educational purposes. In the real world, however, stemplots usually do not
include explicit labels for the stems and leaves.
Test Your Understanding
Problem 1
The stemplot below shows the number of hot dogs eaten by contestants in
a recent hot dog eating contest. Assume that the stems represents tens and
the leaves represent ones.
8
7
6
5
4
3
2
1

1
4 7
2 2 6
0 2 5 7 9 9
5 7 9
7 9
1

Which of the following statements is true?
I. The range is 70.
II. The median is 46.
(A) I only
(B) II only
(C) I and II
(D) Neither is true.
(E) There is insufficient information to answer this question.
Solution
The correct answer is (C). The
range
is equal to the biggest value minus the smallest value. The
biggest value is 81, and the smallest value is 11; so the
range is equal to 81 11 or 70. Since the data set has an even number
of values, the median
is the average of the middle two values  45 and 47.
That is, the median is (45 + 47)/2 or 46.