Introduction to Statistics for learning purpose

Introduction to Statistics
Introduction to Statistics
Measures of Central Tendency
and Dispersion

• The phrase “descriptive statistics” is used
generically in place of measures of central
tendency and dispersion for inferential
statistics.
• These statistics describe or summarize the
qualities of data.
• Another name is “summary statistics”, which
are univariate:
– Mean, Median, Mode, Range, Standard Deviation,
Variance, Min, Max, etc.

• These measures tap into the average
distribution of a set of scores or values in
the data.
– Mean
– Median
– Mode

What do you “Mean”?
What do you “Mean”?
The “mean” of some data is the average
score or value, such as the average
age of an MPA student or average
weight of professors that like to eat
donuts.
Inferential mean of a sample: X=(X)/n
Mean of a population: =(X)/N

Problem of being “mean”
Problem of being “mean”
• The main problem associated with the
mean value of some data is that it is
sensitive to outliers.
• Example, the average weight of political
science professors might be affected if
there was one in the department that
weighed 600 pounds.

Donut-Eating Professors
Donut-Eating Professors
Professor Weight Weight
Schmuggles 165 165
Bopsey 213 213
Pallitto 189 410
Homer 187 610
Schnickerson 165 165
Levin 148 148
Honkey-Doorey 251 251
Zingers 308 308
Boehmer 151 151
Queenie 132 132
Googles-Boop 199 199
Calzone 227 227
194.6 248.3

The Median
The Median (not the cement in the middle
(not the cement in the middle
of the road)
of the road)
• Because the mean average can be
sensitive to extreme values, the median
is sometimes useful and more
accurate.
• The median is simply the middle value
among some scores of a variable. (no
standard formula for its computation)

What is the Median?
Professor Weight
Schmuggles 165
Bopsey 213
Pallitto 189
Homer 187
Schnickerson 165
Levin 148
Honkey-Doorey 251
Zingers 308
Boehmer 151
Queenie 132
Googles-Boop 199
Calzone 227
194.6
Weight
132
148
151
165
165
187
189
199
213
227
251
308
Rank order
and choose
middle value.
If even then
average
between two
in the middle

Percentiles
Percentiles
• If we know the median, then we can go up
or down and rank the data as being above
or below certain thresholds.
• You may be familiar with standardized
tests. 90th
percentile, your score was
higher than 90% of the rest of the sample.

The Mode
The Mode (hold the pie and the ala)
(hold the pie and the ala)
(What does ‘ala’ taste like anyway??)
(What does ‘ala’ taste like anyway??)
• The most frequent response or value
for a variable.
• Multiple modes are possible: bimodal
or multimodal.

Figuring the Mode
Professor Weight
Schmuggles 165
Bopsey 213
Pallitto 189
Homer 187
Schnickerson 165
Levin 148
Honkey-Doorey 251
Zingers 308
Boehmer 151
Queenie 132
Googles-Boop 199
Calzone 227
What is the mode?
Answer: 165
Important descriptive
information that may help
inform your research and
diagnose problems like lack
of variability.

Measures of Dispersion
Measures of Dispersion (not something
you cast…)
• Measures of dispersion tell us about
variability in the data. Also univariate.
• Basic question: how much do values differ
for a variable from the min to max, and
distance among scores in between. We
use:
– Range
– Standard Deviation
– Variance (standard deviation squared)

• To glean information from data, i.e. to
make an inference, we need to see
variability in our variables.
• Measures of dispersion give us
information about how much our
variables vary from the mean, because if
they don’t it makes it difficult infer
anything from the data. Dispersion is
also known as the spread or range of
variability.

The Range
The Range (no Buffalo roaming!!)
• r = h – l
– Where h is high and l is low
• In other words, the range gives us the
value between the minimum and maximum
values of a variable.
• Understanding this statistic is important in
understanding your data, especially for
management and diagnostic purposes.

The Normal Curve
The Normal Curve
• Bell-shaped distribution or curve
• Perfectly symmetrical about the mean.
Mean = median = mode
• Tails are asymptotic: closer and closer to
horizontal axis but never reach it.

Sample Distribution
• What does Andre do
to the sample
distribution?
• What is the probability
of finding someone
like Andre in the
population?
• Are you ready for
more inferential
statistics?

Normal curves and probability
Andre would be here
Dr. Boehmer would be here

The Standard Deviation
The Standard Deviation
• A standardized measure of distance from
the mean.
• In other words, it allows you to know how far
some cases are located from the mean.
How extreme our your data?
• 68% of cases fall within one standard
deviation from the mean, 97% for two
deviations.

=square root
=sum (sigma)
X=score for each point in data
_
X=mean of scores for the variable
n=sample size (number of
observations or cases
S =
Formula for Standard Deviation
Formula for Standard Deviation
1)
-
(n
2
)
( X
X 


We can see that the Standard Deviation equals 165.2
pounds. The weight of Zinger is still likely skewing this
calculation (indirectly through the mean).
X X- mean x-mean squared
Smuggle 165 -29.6 875.2
Bopsey 213 18.4 339.2
Pallitto 189 -5.6 31.2
Homer 187 -7.6 57.5
Schnickerson 165 -29.6 875.2
Levin 148 -46.6 2170.0
Honkey-Doorey 251 56.4 3182.8
Zingers 308 113.4 12863.3
Boehmer 151 -43.6 1899.5
Queeny 132 -62.6 3916.7
Googles-boop 199 4.4 19.5
Calzone 227 32.4 1050.8
Mean 194.6 2480.1 49.8

Std. Deviation practice
• What is the value of Democracy one std.
deviation above and below the mean?
Descriptive Statistics
319 -10.00 10.00 3.4859 6.71282
319
Democ
Valid N (listwise)
N Minimum Maximum Mean Std. Deviation
The answer is 10.20872 and -3.22692
What percentage of all the cases fall within 10.2 and -
3.2?
Roughly 68%

Descriptive Statistics
139 19.77 97.12 66.1166 17.74849
139
Urbanpop
Valid N (listwise)
N Minimum Maximum Mean Std. Deviation
What is the value of Urban population one std. deviation
above and below the mean?
The answer is 83.86509 and 48.36811
What percentage of all the cases fall within 83.86 and 48.36?
Roughly 68%

Goal of Graphing?
1. Presentation of Descriptive Statistics
2. Presentation of Evidence
3. Some people understand subject
matter better with visual aids
4. Provide a sense of the underlying
data generating process (scatter-
plots)

What is the Distribution?
• Gives us a picture of
the variability and
central tendency.
• Can also show the
amount of skewness
and Kurtosis.

Creating Frequencies
• We create frequencies by sorting data
by value or category and then
summing the cases that fall into those
values.
• How often do certain scores occur?
This is a basic descriptive data
question.

Ranking of Donut-eating Profs.
(most to least)
Zingers 308
Honkey-Doorey 251
Calzone 227
Bopsey 213
Googles-boop 199
Pallitto 189
Homer 187
Schnickerson 165
Smuggle 165
Boehmer 151
Levin 148
Queeny 132

Weight Class Intervals of Donut-Munching Professors
0
0.5
1
1.5
2
2.5
3
3.5
130-150 151-185 186-210 211-240 241-270 271-310 311+
Number
Here we have placed the Professors into
weight classes and depict with a histogram in
columns.

Weight Class Intervals of Donut-Munching Professors
0 0.5 1 1.5 2 2.5 3 3.5
130-150
151-185
186-210
211-240
241-270
271-310
311+
Number
Here it is another histogram depicted
as a bar graph.

Pie Charts:
Proportions of Donut-Eating Professors by Weight Class
130-150
151-185
186-210
211-240
241-270
271-310
311+

Actually, why not use a donut
graph. Duh!
Proportions of Donut-Eating Professors by Weight Class
130-150
151-185
186-210
211-240
241-270
271-310
311+
See Excel for other options!!!!

Line Graphs: A Time Series
0
10
20
30
40
50
60
70
80
90
100
Month
Approval
Approval
Economic approval

Scatter Plot (Two variable)
Presidential Approval and Unemployment
0
20
40
60
80
100
0 2 4 6 8 10 12
Unemployment
Approval
Approve

Introduction to Statistics for learning purpose

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