exam 2: review g 201 statistics for political science 1
TRANSCRIPT
Exam 2: Review
G 201Statistics for Political Science
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Exam 2: Review
Exam 2: Review Topics
Chapter 3: Central Tendency1. Mode, Median, Mean (Definition, Formula for each)2. Skewed Distribution3. Systematical Distributions
Chapter 4: Variability1. Range (Definition, Formula)2. Deviation (Definition, Formula)3. Variance (Definition, Formula)4. Standard Deviation (Definition, Formula)
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Measures of central tendency:
Measures of central tendency: Measures of central tendency are numbers that describe what is average or
typical in a distribution
We will focus on three measures of central tendency:– The Mode– The Median– The Mean (average)
Our choice of an appropriate measure of central tendency depends on three factors: (a) the level of measurement, (b) the shape of the distribution, (c) the purpose of the research.
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The Mode
The Mode: The mode is the most frequent, most typical or most common value or category
in a distribution.
Example: There are more protestants in the US than people of any other religion.
The mode is always a category or score, not a frequency.
The mode is not necessarily the category with the majority (that is, 50% or more) of cases. It is simply the category in which the largest number (or proportion) of cases falls.
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Language Number of SpeakersSpanish 17,339,000
French 1,702,000
German 1,547,000
Italian 1,309,000
Chinese 1,249,000
Tagalog 843,000
Polish 723,000
Korean 626,000
Vietnamese 507,000
Portuguese 430,000
Ten Most Common Foreign Languages Spoken in the United States, 1990.
Source: U.S. Bureau of the Census, Statistical Abstract of the United States, 2000, Table 51.
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Is the mode 17,339,000?
NO!
Recall: The mode is the category or score, not the frequency!!
Thus, the mode is Spanish.
A Review of Mode
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The Mode
Some additional points to consider about modes:Some distributions have two modes where two response categories have the
highest frequencies.
Such distributions are said to be bimodal.
NOTE: When two scores or categories have the highest frequencies that are quite close, but not identical, in frequency, the distribution is still “essentially” bimodal. In these instances report both the “true” mode and the highest frequency categories.
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Example of a Bimodal Frequency Distribution
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The Median
The Median:The median is the score that divides the distribution into two equal parts so
that half of the cases are above it and half are below it.
The median can be calculated for both ordinal and interval levels of measurement, but not for nominal data.
It must be emphasized that the median is the exact middle of a distribution.
So, now let’s look at ways we can find the median in sorted data:
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In some cases, we can find the median by simple inspection.
Let’s look at the responses (A) to the question: “Think about the economy, how would you rate economic conditions in the country today?”
First, we sort the responses (B) in order from lowest to highest (or highest to lowest).
Since we have an odd number of cases, let’s find the middle case.
Poor Jim
Good Sue
Only Fair Bob
Poor Jorge
Excellent Karen
Total (N) 5
Poor Jim
Poor Jorge
Only Fair Bob
Good Sue
Excellent Karen
Total (N) 5
A
B
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Calculating the median:
Jim Poor
Jorge Poor
Bob Only Fair
Sue Good
Karen Excellent
We can find the median through visual inspection and through calculation.
We can also find the middle case when N is odd by adding 1 to N and dividing by 2:
(N + 1) ÷2.
Since N is 5, you calculate (5 + 1) ÷ 2 = 3. The middle case is, thus, the third case (Bob), the median
response is “Only Fair.”
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Calculating the median:
State Number
California 1831
Florida 93
Virginia 105
New Jersey 694
New York 853
Ohio 265
Pennsylvania 168
Texas 333
North Carolina 42
TOTAL N = 9
Another example:The following is a list of the number of hate crimes reported in the nine
largest U.S. states for 1997.
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Calculating the median:
Finding the Median State for Hate Crimes
1. Order the cases from lowest to highest.
2. In this situation, we need the 5th case:
(9 + 1) ÷ 2 = 5
Which is Ohio
Remember: (N + 1) ÷2.
State Number
North Carolina 42
Florida 93
Virginia 105
Pennsylvania 168
Ohio 265
Texas 333
New Jersey 694
New York 853
California 1831
N = 9
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Finding the Median Number of Hate Crimes out of Eight States
Order the cases from lowest to highest.
For an even number of cases, there will be two middle cases.
In this instance, the median falls halfway between both cases (216.5).
However, the circumstances being explained should determine if you use the two middle cases or the point halfway between both cases for your explanation.
State Number
North Carolina 42
Florida 93
Virginia 105
Pennsylvania 168
Ohio 265
Texas 333
New Jersey 694
New York 853
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Finding the Median Number of Hate Crimes out of Eight States
1.In this instance, the median falls halfway between both cases (216.5).
(8 + 1) ÷ 2 = 4.5
State Number
North Carolina 42
Florida 93
Virginia 105
Pennsylvania 168
Ohio 265
Texas 333
New Jersey 694
New York 853
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4.5 (216.5)4.5 (216.5)
The MedianThe Median (Mdn) : Examples
Odd Number of Cases: Median exactly in the middle12, 17, 13, 11, 16, 25, 20 (not ordered)
11, 12, 13, 16, 17, 20, 25 (ordered: Lowest to Highest)N = 7(N + 1) ÷ 2 = (7 + 1) ÷ 2 = 4
11, 12, 13, 16, 17, 20, 25, 26 (ordered)1 2 3 4 Mdn = 16
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The MedianThe Median (Mdn): Examples
Even Number of Cases: Median is the point above and below which 50% of the cases fall: 17, 12, 16, 13, 11, 25, 20, 26
11, 12, 13, 16, 17, 20, 25, 26 (ordered) N = 8 (N + 1) ÷ 2 = (8 + 1) ÷ 2 = 4.5
11, 12, 13, 16, 17, 20, 25, 261 2 3 4 4.5Mdn = 16.5
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The MeanThe Mean: The mean is what most people call the average. It find the mean of any distribution
simply add up all the scores and divide by the total number of scores.
Here is formula for calculating the mean
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Finding the MeanCommunicable Diseases -> Tuberculosis (as of 22 March 2007)
2005
Bangladesh 37
Bhutan 44
Democratic People's Republic of Korea 103
India 58
Indonesia 47
Maldives 76
Myanmar 119
Nepal 64
Sri Lanka 71
Thailand 61
Timor-Leste 71
n (cases) = 11 751
© World Health Organization, 2008. All rights reserved 19
Finding the Mean:To identify the number of new tuberculosis cases found in 2006 by the WHO
in this region,
– Add up the cases for all of the countries in the region and– Divide the sum by the total number of cases.
Thus, the mean rate is (751 ÷ 11) = 68.273.
Finding the Mean
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Using a formula to calculate the mean:The Usefulness of Formulas: The mean introduces the usefulness of a formula, which may be defined as a
is a shorthand way to explain what operations we need to follow to obtain a certain result.
Again, the formula that defines the mean is:
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Deviation:
Deviation:The deviation indicates the distance and direction of any raw score from the
mean.
To find the deviation of a particular score, we simply subtract the mean from the score:
Where X = any raw score in the distribution
ondistributitheofmeanX
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So what does this tell us?
The mode is the peak of the curve.
The mean is found closest to the tail, where the relatively few extreme cases will be found.
The median is found between the mode and mean or is aligned with them in a normal distribution.
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Did you know?
The shape or form of a distribution can influence the researcher’s choice of a measure of tendency.
Why is that? Well, let’s see…
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Measures of Variability
Chapter 4: Measures of Variability
Measures of Variability
Measures of variability tell us:
• The extent to which the scores differ from each other or how spread out the scores are.
• How accurately the measure of central tendency describes the distribution.
• The shape of the distribution.
Measures of Variability
Just what is variability?Variability is the spread or dispersion of scores.
Measuring VariabilityThere are a few ways to measure variability and they include:
1) The Range2) The Deviation3) The Standard Deviation4) The Variance
Variability
Measures of Variability
Range: The range is a measure of the distance between highest and lowest.
R= H – L
Temperature Example: Range:
Honolulu: 89° – 65° 24°Phoenix: 106° – 41° 65°
Okay, so now you tell me the range…
This table indicates the number of metropolitan areas, as defined by the Census Bureau, in six states.
What is the range in the number metropolitan areas in these six states?
– R=H-L– R=9-3– R=6
DelawareDelaware 33
IdahoIdaho 44
NebraskaNebraska 44
KansasKansas 55
IowaIowa 44
MontanaMontana 33
CaliforniaCalifornia 99
The Variance
Remember that the deviation is the distance of any given score from its mean.
The variance takes into account every score.
But if we were to simply add them up, the plus and minus (positive and negative) scores would cancel each other out because the sum of actual deviations is always zero!
)( XX
0)( XX
So, what we should we do?
We square the actual deviations and then add them together.
– Remember: When you square a negative number it becomes positive!
SO,
S2 = sum of squared deviations divided by the number of scores.
The variance provides information about the relative variability.
The Variance
Variance: Weeks on Unemployment:
X(weeks)
Deviation:
(raw score from the mean, squared)
9 8 6 4 2 1
9-5= 48-5=36-5=14-5=-12-5=-31-5=-4
42 = 1632 = 912 = 1-12 = 1-32 = 9-42 = 16
ΣX=30 χ= 30=5 6
Step 1: Calculatethe Mean
Step 3: CalculateSum of square Dev
Step 2: CalculateDeviation
The mean of the squared deviations is the same as the variance, and can be symbolized by s2
scoresofnumbertotal
meanthefromdeviationssquaredtheofsum
variancewhere
N
XX
s2
2
)(
The Variance
Variance: Weeks on Unemployment:
X(weeks)
Deviation:
(raw score from the mean, squared)
Variance:
9 8 6 4 2 1
9-5= 48-5=36-5=14-5=-12-5=-31-5=-4
42 = 1632 = 912 = 1-12 = 1-32 = 9-42 = 16
(weeks squared)
ΣX=30 χ= 30=5 6
Step 1: Calculatethe Mean
Step 3: CalculateSum of square Dev
Step 2: CalculateDeviation
Step 4: Calculatethe Mean of squared dev.
Standard Deviation:
It is the typical (standard) difference (deviation) of an observation from the mean.
Think of it as the average distance a data point is from the mean, although this is not strictly true.
What is a standard deviation?
Standard Deviation:
The standard deviation is calculated by taking the square root of the variance.
What is a standard deviation?
Variance: Weeks on Unemployment:
X(weeks)
Deviation:
(raw score from the mean, squared)
Variance: Standard Deviation:
(square root of the variance)
9 8 6 4 2 1
9-5= 48-5=36-5=14-5=-12-5=-31-5=-4
42 = 1632 = 912 = 1-12 = 1-32 = 9-42 = 16
(weeks squared)
ΣX=30 χ= 30=5 6
s = 2.94
Step 1: Calculatethe Mean
Step 3: CalculateSum of square Dev
Step 2: CalculateDeviation
Step 4: Calculatethe Mean of squared dev.
Step 5: Calculate the Square root of the Var.
Raw Score Calculations
Here is how you calculate variance using raw scores:
Here is how you calculate standard deviation using raw scores:
S =
Variance: Weeks on Unemployment:
X(weeks)
X
9 8 6 4 2 1
92 = 8182 = 6462 = 3642 = 1622 = 412 = 1
202 – 25 = 6
33.67 – 25 =
____ √ 8.67
ΣX=30 χ= 30=5 6X =25
ΣX = 202 S = 8.67 s = 2.94
Step 1: Calculatethe Mean
Step 3: CalculateVariance
Step 2: CalculateSquare raw scores
Step 4: Calculatethe Standard Deviation.
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2
2_
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Standard Deviation
Standard Deviation: ApplicationsStandard deviation also allows us to:
1) Measure the baseline of a frequency polygon.2) Find the distance between raw scores and the mean – a standardized method that permits comparisons between raw scores in the distribution – as well as between different distributions.
Standard Deviation
Standard Deviation: Baseline of a Frequency Polygon.The baseline of a frequency polygon can be measured in units of standard deviation.
Example: = 80s = 5
Thus, the raw score 85 liesone Standard Deviation above the mean (+1s).
Standard Deviation
Standard Deviation: The Normal RangeUnless highly skewed, approximately two-thirds of scores within a
distribution will fall within the one standard deviation above and below the mean.
Example: Reading LevelsWords per minute.
= 120s = 25
Norm
al Ran
ge