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1 Slide
Descriptive Statistics: Numerical Measures
Exploratory Data Analysis
Chapter 3BA 201
2 Slide
EXPLORATORY ANALYSIS
3 Slide
Five-Number Summary
1 Smallest Value
First Quartile Median Third Quartile Largest Value
2345
4 Slide
Five-Number Summary
425 430 430 435 435 435 435 435 440 440440 440 440 445 445 445 445 445 450 450450 450 450 450 450 460 460 460 465 465465 470 470 472 475 475 475 480 480 480480 485 490 490 490 500 500 500 500 510510 515 525 525 525 535 549 550 570 570575 575 580 590 600 600 600 600 615 615
Lowest Value = 425 First Quartile = 445Median = 475
Third Quartile = 525Largest Value = 615
Apartment Rents
5 Slide
Box Plot
A box plot is a graphical summary of data that is based on a five-number summary.
A key to the development of a box plot is the computation of the median and the quartiles Q1 and Q3.
Box plots provide another way to identify outliers.
6 Slide
400
425
450
475
500
525
550
575
600
625
• A box is drawn with its ends located at the first and third quartiles.
Box Plot
• A vertical line is drawn in the box at the location of the median (second quartile).
Q1 = 445 Q3 = 525Q2 = 475
Apartment Rents
7 Slide
Box Plot Limits are located (not drawn) using the
interquartile range (IQR). Data outside these limits are considered
outliers. The locations of each outlier is shown with the symbol * .
8 Slide
Box Plot
Lower Limit: Q1 - 1.5(IQR) = 445 - 1.5(80) = 325
Upper Limit: Q3 + 1.5(IQR) = 525 + 1.5(80) = 645
• The lower limit is located 1.5(IQR) below Q1.
• The upper limit is located 1.5(IQR) above Q3.
• There are no outliers (values less than 325 or greater than 645) in the apartment rent data.
Apartment Rents
9 Slide
Box Plot
• Whiskers (dashed lines) are drawn from the ends
of the box to the smallest and largest data values
inside the limits.
400
425
450
475
500
525
550
575
600
625
Smallest valueinside limits = 425
Largest valueinside limits = 615
Apartment Rents
10 Slide
Box Plot
400
425
450
475
500
525
550
575
600
625
Apartment Rents
11 Slide
Box Plot
An excellent graphical technique for making
comparisons among two or more groups.
12 Slide
PRACTICEEXPLORATORY DATA ANALYSIS
13 Slide
Practice – Draw a Box Plot for this Data
716113
2318
ix
14 Slide
Practice – Box Plot
Minimum MaximumMedian
ix
15 Slide
Practice – Box Plot
Minimum MaximumMedian1st Quartile 3rd Quartile
3 7 11 16 18 23ix
16 Slide
Practice – Box Plot3 7 11 16 18 23ix
Minimum MaximumMedian1st Quartile 3rd Quartile
0 5 10 15 20 25
17 Slide
Practice – Box Plot1st Quartile 3rd Quartile
0 5 10 15 20 25
Lower Limit Upper Limit
18 Slide
COVARIANCE AND CORRELATION COEFFICIENT
19 Slide
Measures of Association Between Two Variables
Thus far we have examined numerical methods used to summarize the data for one variable at a time.
Often a manager or decision maker is interested in the relationship between two variables.
Two descriptive measures of the relationship between two variables are covariance and correlation coefficient.
20 Slide
Covariance
Positive values indicate a positive relationship.
Negative values indicate a negative relationship.
The covariance is a measure of the linear association between two variables.
21 Slide
Covariance
The covariance is computed as follows:
forsamples
forpopulations
s x x y ynxy
i i
( )( )
1
xyi x i yx y
N
( )( )
22 Slide
Correlation Coefficient
Just because two variables are highly correlated, it does not mean that one variable is the cause of the other.
Correlation is a measure of linear association and not necessarily causation.
23 Slide
The correlation coefficient is computed as follows:
forsamples
forpopulations
rss sxyxy
x y
xyxy
x y
Correlation Coefficient
24 Slide
Correlation Coefficient
Values near +1 indicate a strong positive linear relationship.
Values near -1 indicate a strong negative linear relationship.
The coefficient can take on values between -1 and +1.
The closer the correlation is to zero, the weaker the relationship.
25 Slide
A golfer is interested in investigating the relationship, if any, between driving distance and 18-hole score.
277.6259.5269.1267.0255.6272.9
697170707169
Average DrivingDistance (yds.)
Average18-Hole Score
Covariance and Correlation Coefficient
Golfing Study
26 Slide
Covariance and Correlation Coefficient
Golfing Study
x277.6 10.65 113.42259.5 -7.45 55.50269.1 2.15 4.62267.0 0.05 0.00255.6 -11.35 128.82272.9 5.95 35.40
Sum 1602 337.78Mean 266.95
Variance 67.56Std. Dev. 8.22
xxi 2)( xxi
27 Slide
Covariance and Correlation Coefficient
Golfing Study
y69 -1.00 1.0071 1.00 1.0070 0.00 0.0070 0.00 0.0071 1.00 1.0069 -1.00 1.00
Sum 420 4.00Mean 70.00
Variance 0.80Std. Dev. 0.89
yyi 2)( yyi
28 Slide
Covariance and Correlation Coefficient
Golfing Study
10.65 -1.00 -10.65-7.45 1.00 -7.452.15 0.00 0.000.05 0.00 0.00
-11.35 1.00 -11.355.95 -1.00 -5.95
Total -35.40
yyi xxi ))(( yyxx ii
29 Slide
• Sample Covariance
• Sample Correlation Coefficient
Covariance and Correlation Coefficient
7.08 -.9631(8.2192)(.8944)xy
xyx y
sr
s s
( )( ) 35.40 7.081 6 1i i
xyx x y y
sn
Golfing Study
30 Slide
Clarification (Day Class)
If x and y are positively correlated• x and y move in the same direction.• As x increases, y increases.
(Also, as x decreases, y decreases.) If x and y are negatively correlated
• x and y move in opposite directions.• As x increases, y decreases.
(Also, ax x decreases, y increases.)
31 Slide
PRACTICECOVARIANCE AND CORRELATION COEFFICIENT
32 Slide
Practice - Covariance andCorrelation Coefficient
x y65 14271 16154 12867 14994 20693 194
Do the following:1. Compute the mean and
standard deviation for x and y.
2. Compute the Covariance and Correlation Coefficient.
33 Slide
Practice - Covariance andCorrelation Coefficient
x657154679493
MeanStd. Dev.
xxi 2)( xxi
34 Slide
Practice - Covariance andCorrelation Coefficient
y142161128149206194
MeanStd. Dev.
yyi 2)( yyi
35 Slide
Practice - Covariance andCorrelation Coefficient
-9.00 -21.33-3.00 -2.33
-20.00 -35.33-7.00 -14.3320.00 42.6719.00 30.67
Total
))(( yyxx ii yyi xxi
36 Slide
Practice - Covariance andCorrelation Coefficient
Covariance
1))((
n
yyxxs iixy
Correlation Coefficient
yx
xyxy ss
sr
37 Slide
WEIGHTED MEAN AND GROUPED DATA
38 Slide
The Weighted Mean andWorking with Grouped Data
Weighted Mean Mean for Grouped Data Variance for Grouped Data Standard Deviation for Grouped Data
39 Slide
Weighted Mean When the mean is computed by giving each data value a weight that reflects its importance, it is referred to as a weighted mean. In the computation of a grade point average (GPA), the weights are the number of credit hours earned for each grade. When data values vary in importance, the analyst must choose the weight that best reflects the importance of each value.
40 Slide
Weighted Mean
i i
i
wxx
w
where:
xi = value of observation i wi = weight for observation i
41 Slide
PRACTICEWEIGHTED MEAN
42 Slide
Practice – Weighted Mean
CourseHoursW
PointsX
HxPWxX
Botany 4 4
Astrology 3 2
Calculus 5 3
Geeimatree 4 1
Advanced Comic Books 6 3
Weighted Mean
43 Slide
Grouped Data The weighted mean computation can be used to obtain approximations of the mean, variance, and standard deviation for the grouped data. To compute the weighted mean, we treat the midpoint of each class as though it were the mean of all items in the class. We compute a weighted mean of the class midpoints using the class frequencies as weights. Similarly, in computing the variance and standard deviation, the class frequencies are used as weights.
44 Slide
Mean for Grouped Data
i if Mx
n
NMf ii
where: fi = frequency of class i Mi = midpoint of class i
Sample Data
Population Data
45 Slide
The previously presented sample of apartment rents is shown here as grouped data in the form ofa frequency distribution.
Sample Mean for Grouped Data
Rent ($) Frequency420-439 8440-459 17460-479 12480-499 8500-519 7520-539 4540-559 2560-579 4580-599 2600-619 6
Apartment Rents
46 Slide
Sample Mean for Grouped Data
This approximationdiffers by $2.41 fromthe actual samplemean of $490.80.
34,525 493.2170x
Rent ($) f i
420-439 8440-459 17460-479 12480-499 8500-519 7520-539 4540-559 2560-579 4580-599 2600-619 6
Total 70
M i
429.5449.5469.5489.5509.5529.5549.5569.5589.5609.5
f iM i
3436.07641.55634.03916.03566.52118.01099.02278.01179.03657.034525.0
Apartment Rents
47 Slide
Variance for Grouped Data
s f M xn
i i22
1
( )
22
f MN
i i( )
For sample data
For population data
48 Slide
Sample Variance for Grouped Data
continued
Rent ($) f i
420-439 8440-459 17460-479 12480-499 8500-519 7520-539 4540-559 2560-579 4580-599 2600-619 6
Total 70
M i
429.5449.5469.5489.5509.5529.5549.5569.5589.5609.5
M i - x-63.7-43.7-23.7-3.716.336.356.376.396.3116.3
(M i - x )2
4058.961910.56562.1613.76
265.361316.963168.565820.169271.76
13523.36
f i(M i - x )2
32471.7132479.596745.97110.11
1857.555267.866337.13
23280.6618543.5381140.18
208234.29
Apartment Rents
49 Slide
3,017.89 54.94s
s2 = 208,234.29/(70 – 1) = 3,017.89
This approximation differs by only $.20 from the actual standard deviation of $54.74.
• Sample Variance
• Sample Standard Deviation
Apartment Rents
Sample Variance for Grouped Data
50 Slide