1. Presentation of Data
Module 6
Basic Statistics
SRSTHS
Ms. Pegollo

2. Presentation of Data
Objectives: At the end of the
lesson, the students should be able to:
1. Prepare a stem-and-leaf plot
2. Describe data in textual form
3. Construct frequency distribution table
4. Create graphs
5. Read and interpret graphs and tables
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3. Ungrouped vs. Grouped Data
Data can be classified as grouped or
ungrouped.
Ungrouped data are data that are not
organized, or if arranged, could only be
from highest to lowest or lowest to
highest.
Grouped data are data that are
organized and arranged into different
classes or categories.
MCPegollo/Basic Statistics/SRSTHS

4. Presentation of Data
Textual Tabular Graphical
Method Method Method
• Rearrangem • Frequency • Bar Chart
ent from distribution • Histogram
lowest to table (FDT) • Frequency
highest • Relative Polygon
• Stem-and- FDT • Pie Chart
leaf plot • Cumulative • Less
FDT than, greater
• Contingency than Ogive
Table
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5. Textual Presentation of Data
Data can be presented using
paragraphs or sentences. It involves
enumerating important
characteristics, emphasizing
significant figures and identifying
important features of data.
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6. Textual Presentation of Data
Example. You are asked to present the
performance of your section in the
Statistics test. The following are the
test scores of your class:
34 42 20 50 17 9 34 43
50 18 35 43 50 23 23 35
37 38 38 39 39 38 38 39
24 29 25 26 28 27 44 44
49 48 46 45 45 46 45 46
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7. Solution
First, arrange the data in order for you to
identify the important characteristics. This
can be done in two ways: rearranging from
lowest to highest or using the stem-and-leaf
plot.
Below is the rearrangement of data from lowest
to highest:
9 23 28 35 38 43 45 48
17 24 29 37 39 43 45 49
18 25 34 38 39 44 46 50
20 26 34 38 39 44 46 50
23 27 35 38 42 45 46 50
MCPegollo/Basic Statistics/SRSTHS

8. With the rearranged data, pertinent data
worth mentioning can be easily
recognized. The following is one way
of presenting data in textual form.
In the Statistics class of 40
students, 3 obtained the perfect score
of 50. Sixteen students got a score of
40 and above, while only 3 got 19 and
below. Generally, the students
performed well in the test with 23 or
70% getting a passing score of 38 and
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9. Another way of rearranging data is by
making use of the stem-and-leaf plot.
What is a stem-and-leaf plot?
Stem-and-leaf Plot is a table which
sorts data according to a certain pattern. It
involves separating a number into two parts.
In a two-digit number, the stem consists of
the first digit, and the leaf consists of the
second digit. While in a three-digit
number, the stem consists of the first two
digits, and the leaf consists of the last digit.
In a one-digit number, the stem is zero.
MCPegollo/Basic Statistics/SRSTHS

10. Below is the stem-and-leaf plot of the
ungrouped data given in the example.
Stem Leaves
0 9
1 7,8
2 0,3,3,4,5,6,7,8,9
3 4,4,5,5,7,8,8,8,8,9,9,9
4 2,3,3,4,4,5,5,5,6,6,6,8,9
5 0,0,0
Utilizing the stem-and-leaf plot, we can readily see the
order of the data. Thus, we can say that the top ten
got scores 50, 50, 50, 49, 48, 46, 46, 46,45, and 45
and the ten lowest scores are 9, 17, 18, 20,
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23,23,24,25,26, and 27.

11. Exercise:
Prepare a stem-and-leaf plot and
present in textual form.
The ages Leaf teachers in a public
Stem of 40
school
2 3,6,7,8,8,9
23 27 28 36 35 38 39 40
32 42 0,1,2,4,4,5,5,5,6,6,6,6,8,8,8,8,9,9
3 44 54 56 48 55 48
30 31 35 36 47 48 43 38
4 0,0,0,2,3,4,4,5,5,7,8,8,8
34 26 28 29 45 34 45 44
5 4,5,6
36 38 39 38 36 35 40 40
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12. Tabular Presentation of Data
Below is a sample of a table with all of its parts
indicated:
Table Number
Table Title
Column Header
Row Classifier
Body
Source Note
http://www.sws.org.ph/youth.htm
MCPegollo/Basic Statistics/SRSTHS

13. Frequency Distribution Table
A frequency distribution table is a table
which shows the data arranged into
different classes(or categories) and
the number of cases(or frequencies)
which fall into each class.
The following is an illustration of a
frequency distribution table for
ungrouped data:
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14. Sample of a Frequency Distribution
Table for Ungrouped Data
Table 1.1
Frequency Distribution for the Ages of 50
Students Enrolled in Statistics
Age Frequency
12 2
13 13
14 27
15 4
16 3
17 1
N = 50
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15. Sample of a Frequency
Distribution Table for Grouped
Data Table 1.2
Frequency Distribution Table for the Quiz Scores of
50 Students in Geometry
Scores Frequency
0-2 1
3-5 2
6-8 13
9 - 11 15
12 - 14 19
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16. Lower Class Limits
are the smallest numbers that can actually belong
to different classes
Rating Frequency
0-2 1
3-5 2
6-8 13
9 - 11 15
12 - 14 19

17. Lower Class Limits
are the smallest numbers that can
actually belong to different classes
Rating Frequency
0-2 1
Lower Class 3-5 2
Limits 6-8 13
9 - 11 15
12 - 14 19

18. Upper Class Limits
are the largest numbers that can actually
belong to different classes
Rating Frequency
0-2 1
3-5 2
6-8 13
9 - 11 15
12 - 14 19

19. Upper Class Limits
are the largest numbers that can actually
belong to different classes
Rating Frequency
Upper Class 0-2 1
Limits 3-5 2
6-8 13
9 - 11 15
12 - 14 19

20. Class Boundaries
are the numbers used to separate
classes, but without the gaps created by class
limits

21. Class Boundaries
number separating classes
Rating Frequency
- 0.5
0-2 20
2.5
3-5 14
5.5
6-8 15
8.5
9 - 11 2
11.5
12 - 14 1
14.5

22. Class Boundaries
number separating classes
Rating Frequency
- 0.5
0-2 20
2.5
Class 3-5 14
5.5
Boundaries 6-8 15
8.5
9 - 11 2
11.5
12 - 14 1
14.5

23. Class Midpoints
The Class Mark or Class Midpoint is the
respective average of each class limits

24. Class Midpoints
midpoints of the classes
Rating Frequency
0- 1 2 20
Class
3- 4 5 14
Midpoints
6- 7 8 15
9 - 10 11 2
12 - 13 14 1

25. Class Width
is the difference between two consecutive lower class
limits or two consecutive class boundaries
Rating Frequency
0-2 20
3-5 14
6-8 15
9 - 11 2
12 - 14 1

26. Class Width
is the difference between two consecutive lower class
limits or two consecutive class boundaries
Rating Frequency
3 0-2 20
3 3-5 14
Class Width 3 6-8 15
3 9 - 11 2
3 12 - 14 1

27. Guidelines For Frequency Tables
1. Be sure that the classes are mutually exclusive.
2. Include all classes, even if the frequency is zero.
3. Try to use the same width for all classes.
4. Select convenient numbers for class limits.
5. Use between 5 and 20 classes.
6. The sum of the class frequencies must equal the
number of original data values.

28. Constructing A Frequency Table
1. Decide on the number of classes .
2. Determine the class width by dividing the range by the number of
classes (range = highest score - lowest score) and round
up. range
class width  round up of
number of classes
3. Select for the first lower limit either the lowest score or a
convenient value slightly less than the lowest score.
4. Add the class width to the starting point to get the second lower
class limit, add the width to the second lower limit to get the
third, and so on.
5. List the lower class limits in a vertical column and enter the
upper class limits.
6. Represent each score by a tally mark in the appropriate class.
Total tally marks to find the total frequency for each class.

29. Homework
Gather data on the ages of your
classmates’ fathers, include your own.
Construct a frequency distribution table for
the data gathered using grouped and
ungrouped data.
What are the advantages and
disadvantages of using ungrouped
frequency distribution table?
What are the advantages and
disadvantages of using grouped
frequency distribution table?
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30. Relative Frequency Table
class frequency
relative frequency =
sum of all frequencies

31. Relative Frequency Table
Relative
Rating Frequency Rating Frequency
0-2 20 0-2 38.5% 20/52 = 38.5%
3-5 14 3-5 26.9%
14/52 = 26.9%
6-8 15 6-8 28.8%
9 - 11 2 9 - 11 3.8% etc.
12 - 14 1 12 - 14 1.9%
Total frequency = 52
Table 2-5

32. Cumulative Frequency Table
Rating Frequency <cf >cf
0-2 20 20 52
3–5 14 34 32
Cumulative
6–8 15 49 18
Frequencies
9 – 11 2 51 3
12 – 14 1 52 1
Table 2-6

33. Frequency Tables
Relative Cumulative
Rating Frequency Rating Frequency Rating Frequency
0-2 20 0-2 38.5% 0–2 20
3-5 14 3-5 26.9% 3–5 34
6-8 15 6-8 28.8% 6–8 49
9 - 11 2 9 - 11 3.8% 9 – 11 51
12 - 14 1 12 - 14 1.9% 12 – 14 52
Table 2-3 Table 2-5 Table 2-6

34. Complete FDT
A complete FDT has class mark or
midpoint (x), class boundaries (c.b),
relative frequency or percentage
frequency, and the less than
cumulative frequency (<cf) and the
greater than cumulative frequency
(>cf).
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35. Complete Frequency Table
Table 2-6
Grouped Frequency Distribution for the Test
Scores of 52 Students in Statistics
Class Class Relative
Frequency Class
Intervals Boundary Frequency <cf >cf
(f) Mark (x)
(ci) (cb) (rf)
0-2 20 1 -0.5 – 2.5 38.5% 20 52
3–5 14 4 2.5 – 5.5 26.9% 34 32
6–8 15 7 5.5 – 8.5 28.8% 49 18
9 – 11 2 10 8.5 – 11.5 3.8% 51 3
12 – 14 1 13 11.5 – 14.5 1.9% 52 1

36. Exercise:
For each of the following class intervals, give
the class width(i), class mark (x), and class
boundary (cb)
Class interval (ci) Class Width Class Mark Class
Boundary
a. 4 – 8
b. 35 – 44
c. 17 – 21
d. 53 – 57
e. 8 – 11
f. 108 – 119
g. 10 – 19
h. 2.5 – 2. 9
i. 1. 75 – 2. 25
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37. Construct a complete FDT with 7
classes
The following are the IQ scores of 60
student applicants in a certain high
school 106
128 96 94 85 75
113 103 96 91 94 70
109 113 109 100 81 81
103 113 91 88 78 75
106 103 100 88 81 81
113 106 100 96 88 78
96 109 94 96 88 70
103 102 88 78 95 90
99 89 87 96 95 104
89 99 101 105 103 125
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