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Transcript of Chapter 5 Summarizing Bivariate Data. Suppose we found the age and weight for each person in a...
Chapter 5
Summarizing Bivariate Data
Suppose we found the age and weight for each person in a sample of 10 adults. Is there any relationship between the age and weight of these adults?
Create a scatterplot of the data below.
Do you think there is a relationship? If so,
what kind? If not, why not?
Age 24 30 41 28 50 46 49 35 20 39
Wt 256 124 320 185 158 129 103 196 110 130
Age
Weig
ht
There does not appear to
be a relations
hip between age and
weight in adults.
Suppose we found the height and weight for each person in a sample of 10 adults. Is there any relationship between the height and weight of these adults?
Create a scatterplot of the data below.
Ht 74 65 77 72 68 60 62 73 61 64
Wt 256 124 320 185 158 129 103 196 110 130
Is it positive or negative? Weak or strong?
Do you think there is a relationship? If so,
what kind? If not, why not?
Height
Weig
ht
Correlation
•The relationship between bivariate numerical variables
– May be positive or negative
– May be weak or strongWhat does it mean if
the relationship is positive?Negative?
What feature(s) of the graph would indicate a weak or strong relationship?
Identify the strength and direction of the following data sets.
Set A Set B Set C
Set A shows a strong, positive linear relationship.
Set B shows little or no relationship.
Set C shows a weaker (moderate), negative linear
relationship.
Set D Set D shows a strong, positive curved
relationship.
Identify as having a positivepositive relationship, a negativenegative relationship, or nono relationship.1. Heights of mothers and heights of
their adult daughters++
2. Age of a car in years and its current value3. Weight of a person and calories consumed4. Height of a person and the person’s birth month
5. Number of hours spent in safety training and the number of accidents that occur
--++nnoo
--
Correlation Coefficient (r)-• A quantitativequantitative assessment of the
strength and direction of the linear relationship in bivariate, quantitative data
• Pearson’s sample correlation is used the most
• Population correlation coefficient - (rho)• statistic correlation coefficient – r
• Equation:
y
i
x
i
s
yy
s
xx
nr
1
1
What are these values
called?
These are the z-scores for x and y.
Example 5.1
For the six primarily undergraduate universities in California with enrollments between 10,000 and 20,000, six-year graduation rates (y) and student-related expenditures per full-time students (x) for 2003 were reported as follows:
Create a scatterplot and calculate r.
Expenditures
8011
7323 8735 7548 7071 8248
Graduation rates
64.6 53.0 46.3 42.5 38.5 33.9
Example 5.1 ContinuedExpenditures
8011
7323 8735 7548 7071 8248
Graduation rates
64.6 53.0 46.3 42.5 38.5 33.9
Expenditures
Gra
du
ati
on
Rate
s r = 0.05
In order to interpret what this number tells us, let’s investigate the
properties of the correlation coefficient
Moderate CorrelationStrong correlation
Properties of r(correlation coefficient)
1) legitimate values are -1 < r < 1
0 .5 .8 1-1 -.8 -.5
No Correlation
Weak correlation
2) value of r is not changed by any linearlinear transformationtransformation
Suppose that the graduation rates were changed from percents to decimals (divide by 100).Transform the graduation rates and calculate r.
Do the following transformations and
calculate r1) x’ = 5(x + 14)2) y’ = (y + 30) ÷ 4
Expenditures
8011
7323 8735 7548 7071 8248
Graduation rates
64.6 53.0 46.3 42.5 38.5 33.9
r = 0.05 It is the same!Why?
3) value of r does not depend on whichwhich of the two variables is labeled x
Suppose we wanted to estimate the expenditures per student for given graduation rates.Switch x and y, then calculate r.
Expenditures
8011
7323 8735 7548 7071 8248
Graduation rates
64.6 53.0 46.3 42.5 38.5 33.9
r = 0.05 It is the same!
4) value of r is affected affected by extreme values.
Plot a revised scatterplot and find r.
Expenditures
8011
7323 8735 7548 7071 8248
Graduation rates
64.6 53.0 46.3 42.5 38.5 33.9
Suppose the 33.9 was REALLY 63.9. What do you think would happen to the
value of the correlation coefficient?
63.9
Extreme values affect the correlation coefficientExpenditures
Gra
du
ati
on
Rate
s
Expenditures
Gra
du
ati
on
Rate
s
r = 0.42
Find the correlation for these points:x -3 -1 1 3 5 7 9Y 40 20 8 4 8 20 40
Compute the correlation coefficient?
Sketch the scatterplot
5) value of r is a measure of the extent to which x and y are linearlylinearly related
r = 0
x
yr = 0, but the data set has a
definitedefinite relationship!
Does this mean that there is NO relationship between
these points?
Recap the Properties of r:
1. legitimate values of r are -1 < r < 12. value of r is not changed by any
transformationtransformation3. value of r does not depend on whichwhich
of the two variables is labeled x4. value of r is affected by extreme affected by extreme
valuesvalues5. value of r is a measure of the extent
to which x and y are linearlylinearly related
Example 5.1 ContinuedExpenditures
8011
7323 8735 7548 7071 8248
Graduation rates
64.6 53.0 46.3 42.5 38.5 33.9
Expenditures
Gra
du
ati
on
Rate
s Interpret r = 0.05
In order to interpret r, recall the definition of the
correlation coefficient.
A quantitativequantitative assessment of the strength and direction of the linear relationship between bivariate, quantitative data
There is a weak, positive, linear relationship between expenditures and graduation rates.
Does a value of r close to 1 or -1 mean that a change in one variable cause a change in the other variable?Consider the following examples:• The relationship between the number of
cavities in a child’s teeth and the size of his or her vocabulary is strong and positive.
• Consumption of hot chocolate is negatively correlated with crime rate.
These variables are both strongly related to the age of
the child
Both are responses to cold weather
Causality can only be shown by carefully controlling values of all variables that might be related to
the ones under study. In other words, with a well-controlled,
well-designed experiment.So does this mean I should feed children more candy to increase
their vocabulary?
Should we all drink more hot chocolate to lower the crime
rate?
Correlation does not imply causation
Correlation does not imply causation
Correlation does Correlation does not imply not imply causationcausation
What is the objective of regression analysis?
•x – variable: is the independent or explanatory variable
•y- variable: is the dependent or response variable
•We will use values of x to predict values of y.
Suppose that we have two variables:
x = the amount spent on advertisingy = the amount of sales for the product
during a given period
What question might I want to answer using this data?
The objective of regression analysis is to use information about one
variable, x, to draw some sort of a conclusion about a second variable,
y.
b – is the slope– it is the approximate amount by
which y increases when x increases by 1 unit
a – is the y-intercept– it is the approximate height of the
line when x = 0– in some situations, the y-intercept has
no meaning
The LSRL is bxay ˆ
y - (y-hat) means the predicted y
Be sure to put the hat on the y
Scatterplots frequently exhibit a linear pattern. When this is the case, it makes sense to summarize the
relationship between the variables by finding a line that is as close as possible to the plots in the plot.
This is done by calculating the line of best fit or Least Square Regression
Line (LSRL).
The LSRL is the line that minimizesminimizes the sum of the squares
of the deviations from the line
The slope of the LSRL is
2
xx
yyxxb
The intercept of the LSRL is xbya
Let’s explore
what this means . .
.
(3,10)
(6,2)
Sum of the squares = 61.25
45.ˆ xy
-4
4.5
-5
y =.5(0) + 4 = 4
0 – 4 = -4
(0,0)
y =.5(3) + 4 = 5.5
10 – 5.5 = 4.5
y =.5(6) + 4 = 7
2 – 7 = -5
Suppose we have a data set that consists of the observations (0,0), (3,10) and 6,2).
Let’s just fit a line to the
data by drawing a
line through what appears
to be the middle of the
points.
Now find the vertical
distance from each point to
the line.
Find the sum of the squares
of these deviations.
(0,0)
(3,10)
(6,2)
Sum of the squares = 54
33
1ˆ xy
Use a calculator to find the line of
best fit
Find the vertical deviations from the line
-3
6
-3
What is the sum of the
deviations from the line?
Will it always be zero?
The line that minimizesminimizes the sum of the squares of the deviations from the
line is the LSRLLSRL.
Find the sum of the squares of the
deviations from the line
Researchers are studying pomegranate's antioxidants properties to see if it might be helpful in the treatment of cancer. In one study, mice were injected with cancer cells and randomly assigned to one of three groups, plain water, water supplemented with .1% pomegranate fruit extract (PFE), and water supplemented with .2% PFE. The average tumor volume for mice in each group was recorded for several points in time. (x = number of days after injection of cancer cells in mice assigned to plain water and y = average tumor volume (in mm3)
x 11 15 19 23 27
y 150 270 450 580 740
Sketch a scatterplot for this data set.
Pomegranate study continued
x = number of days after injection of cancer cells in mice assigned to plain water and y = average tumor volume
x 11 15 19 23 27
y 150 270 450 580 740
Calculate the LSRL and the correlation coefficient.
Interpret the slope and the correlation coefficient in context.
998.025.3775.269ˆ rxy
The average volume of the tumor increases by approximately 37.25 mm3 for each day increase in the
number of days after injection.
Remember that an interpretation is
stating the definition in context.
There is a strong, positive, linear relationship between the average
tumor volume and the number of days since injection.
Does the intercept have meaning in this context? Why or why not?
Pomegranate study continued
x = number of days after injection of cancer cells in mice assigned to plain water and y = average tumor volume
x 11 15 19 23 27
y 150 270 450 580 740
Predict the average volume of the tumor for 20 days after injection.
Predict the average volume of the tumor for 5 days after injection.
xy 25.3775.269ˆ
3mm25.475)20(25.3775.269ˆ y
3mm5.83)5(25.3775.269ˆ y
Can volume be negative?
This is the danger of extrapolation. The least-squares line should not be used to make predictions
for y using x-values outside the range in the
data set.Why?
It is unknown whether the pattern observed in the scatterplot continues outside the range of x-values.
Pomegranate study continued
x = number of days after injection of cancer cells in mice assigned to plain water and y = average tumor volume
x 11 15 19 23 27
y 150 270 450 580 740
Suppose we want to know how many days after injection of cancer cells would the average tumor size be 500 mm3?
xy 25.3775.269ˆ
Is this the appropriate regression line to
answer this question?
No, the slope of the line for predicting x is
not
and the intercepts are almost always different.
Here is the appropriate regression line:
y
x
s
sr
x
y
s
sr
yx 027.277.7ˆ The regression line of y on x should not be
used to predict x, because it is not the line that minimizes the sum of the
squared deviations in the x direction.
Pomegranate study continued
x = number of days after injection of cancer cells in mice assigned to plain water and y = average tumor volume
x 11 15 19 23 27
y 150 270 450 580 740
Find the mean of the x-values (x) and the mean of the y-values (y).
Plot the point of averages (x,y) on the scatterplot.
x = 19 and y = 438+
Will the point of averages always be on the regression
line?
Let’s investigate how the LSRL and correlation coefficient change when different points are added to the data setSuppose we have the following data set.
x 4 5 6 7 8y 2 5 4 6 9
Sketch a scatterplot. Calculate the LSRL and the correlation coefficient.
916.0
5.18.3ˆ
r
xy
Let’s investigate how the LSRL and correlation coefficient change when different points are added to the data setSuppose we have the following data set.
x 4 5 6 7 8y 2 5 4 6 9
Suppose we add the point (5,8) to the data set. What happens to the regression line and the correlation coefficient?
916.0
5.18.3ˆ
r
xy
5
8
667.0
17.115.1ˆ
r
xy
What happened?
Let’s investigate how the LSRL and correlation coefficient change when different points are added to the data setSuppose we have the following data set.
x 4 5 6 7 8y 2 5 4 6 9
Suppose we add the point (12,12) to the data set. What happens to the regression line and the correlation coefficient?
916.0
5.18.3ˆ
r
xy
12
12
959.0
225.124.2ˆ
r
xy
What happened?
Let’s investigate how the LSRL and correlation coefficient change when different points are added to the data setSuppose we have the following data set.
x 4 5 6 7 8y 2 5 4 6 9
Suppose we add the point (12,0) to the data set. What happens to the regression line and the correlation coefficient?
916.0
5.18.3ˆ
r
xy
12
0
248.0
275.026.6ˆ
r
xy
What happened?
The correlation coefficient and the LSRL are both measures that are affected by extreme
values.
Pomegranate study revisited
x = number of days after injection of cancer cells in mice assigned to plain water and y = average tumor volume
x 11 15 19 23 27
y 150 270 450 580 740
Minitab, a statistical software package, was used to fit the least-squares regression line. Part of the resulting output is shown below.The regression equation is
Predicted volume = -269.75 + 37.25 days
Predictor Coef SE Coef T P
Constant -269.75 23.421412 -11.51724 0.0014
Days 37.25 1.181454 31.52895 0.000
interceptslope
We will discuss what these numbers mean in the Chapter
13.
Assessing the fit of the LSRL
Important questions are:1. Is the line an appropriate way to
summarize the relationship between x and y.
2. Are there any unusual aspects of the data set that we need to consider before proceeding to use the line to make predictions?
3. If we decide to use the line as a basis for prediction, how accurate can we expect predictions based on the line to be?
Once the LSRL is obtained, the next step is to examine how effectively
the line summarizes the relationship between x and y.
We will look at
graphical and
numerical methods to answer
these questions.
In a study, researchers were interested in how the distance a deer mouse will travel for food (y) is related to the distance from the food to the nearest pile of fine woody debris (x). Distances were measured in meters.x 6.94 5.23 5.21 7.10 8.16 5.50 9.19 9.05 9.36
y 0 6.13 11.29
14.35
12.03
22.72
20.11
26.16
30.65
Predictor Coef SE Coef T P
Constant -7.69 13.33 -0.58 0.582
Distance to debris 3.234 1.782 1.82 0.112
S=8.67071 R-Sq = 32.0% R-Sq(adj) = 22.3%
Minitab was used to fit the least-squares regression line. From the partial output,
identify the regression line.
xy 234.369.7ˆ
Plot the data, including the
regression line.
In a study, researchers were interested in how the distance a deer mouse will travel for food (y) is related to the distance from the food to the nearest pile of fine woody debris (x). Distances were measured in meters.x 6.94 5.23 5.21 7.10 8.16 5.50 9.19 9.05 9.36
y 0 6.13 11.29
14.35
12.03
22.72
20.11
26.16
30.65
Dis
tance
tra
vele
d
Distance to debris
The vertical deviation between the point and the LSRL is called the
residual.
If the point is above the line, the
residual will be positive.
If the point is below the line the
residual will be negative.
Residuals are calculated by subtracting the predicted y
from the observed y.
yy ˆresidual
In a study, researchers were interested in how the distance a deer mouse will travel for food (y) is related to the distance from the food to the nearest pile of fine woody debris (x). Distances were measured in meters.
Use the LSRL to calculate the predicted distance
traveled.
Subtract to find the residuals.
Distance from debris
Distance traveled (y)
Predicted distance traveled
Residual
6.94 0.00
5.23 6.13
5.21 11.29
7.10 14.35
8.16 12.03
5.50 22.72
9.19 20.11
9.05 26.16
9.36 30.65
)ˆ(y )ˆ( yy
14.76
9.23
9.16
15.28
18.70
10.10
22.04
21.58
22.59
-14.76
-3.10
2.13
-0.93
-6.67
12.62
-1.93
4.58
8.06
What does the sum of
the residuals equal?
Will the sum of the residuals always equal zero?
What does this remind you of?
Residual plotsResidual plots
• Is a scatterplot of the (x, residual) pairs.• Residuals can also be graphed against
the predicted y-values• The purpose is to determine if a linear
model is the best way to describe the relationship between the x & y variables
• If no pattern exists between the points in the residual plot, then the linear model is appropriate.
Residuals
x
Residuals
x
This residual shows no pattern so it indicates that the linear model is appropriate.
This residual shows a curved pattern so it indicates that the linear model is not appropriate.
In a study, researchers were interested in how the distance a deer mouse will travel for food (y) is related to the distance from the food to the nearest pile of fine woody debris (x). Distances were measured in meters.
Distance from debris
Distance traveled (y)
Predicted distance traveled
Residual
6.94 0.00
5.23 6.13
5.21 11.29
7.10 14.35
8.16 12.03
5.50 22.72
9.19 20.11
9.05 26.16
9.36 30.65
)ˆ(y )ˆ( yy
14.76
9.23
9.16
15.28
18.70
10.10
22.04
21.58
22.59
-14.76
-3.10
2.13
-0.93
-6.67
12.62
-1.93
4.58
8.06
Use the values in
this table to create a
residual plot for this data
set. Is a linear model appropriate
for describing
the relationship between the
distance from debris
and the distance a
deer mouse will travel for food?Plot the residuals against the distance from debris
(x)
Since the residual plot displays no pattern, a linear model is appropriate for describing the relationship between the distance from debris and the distance a deer mouse will travel for food.
-15
-10
-5
5
10
15
5 6 7 8 9Distance f rom debris
Res
idua
ls
Now plot the residuals against the predicted distance from food.
-15
-10
-5
5
10
15
10 15 20 25 9
Predicted Distance traveled
Resi
dual
s
What do you notice about the general scatter of
points on this residual plot versus the
residual plot using the x-
values?
-15
-10
-5
5
10
15
5 6 7 8 9Distance f rom debris
Resid
uals
Residual plots can be plotted against either the x-values or the predicted y-values.
Let’s examine the following data set:The following data is for 12 black bears from the Boreal Forest.
x = age (in years) and y = weight (in kg)
Sketch a scatterplot with the fitted regression line.
x 10.5 6.5
28.5 10.5
6.5 7.5 6.5 5.5
7.5 11.5
9.5 5.5
Y 54 40 62 51 55 56 62 42 40 59 51 50
Do you notice anything unusual about this data set?
Influential observation
What would happen to the regression line if this point is
removed?
This point is considered an influential point because it affects the
placement of the least-squares regression line.
5 10 15 20 25 30
Predicted Distance traveled
45
40
50
55
60
Wei
ght
Age 5 10 15 20 25 30
Predicted Distance traveled
45
40
50
55
60
Wei
ght
Age
Let’s examine the following data set:The following data is for 12 black bears from the Boreal Forest.
x = age (in years) and y = weight (in kg)
x 10.5 6.5
28.5 10.5
6.5 7.5 6.5 5.5
7.5 11.5
9.5 5.5
Y 54 40 62 51 55 56 62 42 40 59 51 50
5 10 15 20 25 30
Predicted Distance traveled
45
40
50
55
60
Wei
ght
Age
Notice that this observation has a large residual.
An observation is an outlier if it
has a large residual.
Coefficient of Coefficient of determination-determination-• Denoted by r2
• gives the proportion of variationvariation in yy that can be attributed to an approximate linear relationship between x & y
Suppose you didn’t know any x-values. What distance would you expect deer mice to travel?
938.15y
Let’s explore the meaning of r2 by revisiting the deer mouse data set.
x = the distance from the food to the nearest pile of fine woody debris
y = distance a deer mouse will travel for foodx 6.94 5.23 5.21 7.10 8.16 5.50 9.19 9.05 9.36
y 0 6.13 11.29
14.35
12.03
22.72
20.11
26.16
30.65
What is total amount of variation in the distance traveled (y-values)? Hint: Find the sum of the squared deviations.
2SSTo yy
Total amount of variation in the distance traveled is 773.95 m2.
Why do we square the deviations?
5
10
15
20
25
30
5 6 7 8 9
Distance to DebrisD
ista
nce
tra
vele
d
SS stands for “sum of squares”
So this is the total sum of squares.
Now suppose you DO know the x-values. Your best guess would be the predicted distance traveled (the point on the LSRL).
x = the distance from the food to the nearest pile of fine woody debris
y = distance a deer mouse will travel for foodx 6.94 5.23 5.21 7.10 8.16 5.50 9.19 9.05 9.36
y 0 6.13 11.29
14.35
12.03
22.72
20.11
26.16
30.65
2
ˆSSResid yy The points vary from the LSRL by 526.27 m2.
By how much do the observed points vary from the LSRL?Hint: Find the sum of the residuals squared.
Dis
tance
tra
vele
d
Distance to debris
x = the distance from the food to the nearest pile of fine woody debris
y = distance a deer mouse will travel for foodx 6.94 5.23 5.21 7.10 8.16 5.50 9.19 9.05 9.36
y 0 6.13 11.29
14.35
12.03
22.72
20.11
26.16
30.65
The points vary from the LSRL by 526.27 m2.
Total amount of variation in the distance traveled is 773.95 m2.
Approximately what percent of the variation in distance traveled can be explained by the regression line?
320.095.77327.526
1
SSToSSResid
1
2
2
r
r
Or approximatel
y 32%
Partial output from the regression analysis of deer mouse data:
Predictor Coef SE Coef T P
Constant -7.69 13.33 -0.58 0.582
Distance to debris
3.234 1.782 1.82 0.112
S = 8.67071 R-sq = 32.0% R-sq(adj) = 22.3%
The coefficient of determination (r2)Only 32% of the observed variability in the distance traveled for food can be explained
by the approximate linear relationship between the distance traveled for food and
the distance to the nearest debris pile.
What does this number
represent?
The standard deviation (s):This is the typical amount by which an
observation deviates from the least squares regression line. It’s found by:
2-nSSResid
es
Let’s review the values from this output and their meanings.
The y-intercept (a):This value has no meaning in context since it doesn't make sense to have a
negative distance.
The slope (b):The distance traveled to food increases by
approxiamtely 3.234 meters for an increase of 1 meter to the nearest debris
pile.
Let’s examine this data set:x = representative agey = average marathon finish time
Create a scatterplot for this data set.
Age 15 25 35 45 55 65
Time 302.38
193.63
185.46
198.49
224.30
288.71
10 20 30 40 50 60
200
250
300
Representative Age
Avera
ge F
inis
h
Tim
e
Because of the curved pattern, a straight line would not accurately
describe the relationship between
average finish time and age.
Since this curve resembles a parabola, a quadratic function can
be used to describe this relationship.
221ˆ xbxbay
Using Minitab:The least-squares quadratic
regression is 2179.02.14462ˆ xxy
This curve minimizes the
sum of the squares of the
residuals (similar to least-squares linear regression).
Let’s examine this data set:x = representative agey = average marathon finish time
Age 15 25 35 45 55 65
Time 302.38
193.63
185.46
198.49
224.30
288.71
10 20 30 40 50 60
200
250
300
Representative Age
Avera
ge F
inis
h
Tim
e
Notice the residuals from the quadratic regression.
10 20 30 40 50 60
-20
-10
10
20
AgeResi
duals
Here is the residual plot-Since there is no pattern in the
residual plot, the quadratic regression is an appropriate
model for this data set.
Let’s examine this data set:x = representative agey = average marathon finish time
Age 15 25 35 45 55 65
Time 302.38
193.63
185.46
198.49
224.30
288.71
10 20 30 40 50 60
200
250
300
Representative Age
Avera
ge F
inis
h
Tim
e
The measure R2 is useful for assessing the fit of the quadratic regression.
SSToSSResid
12 R
R2 = .921
92.1% of the variation in average marathon finish times can be explained by the approximate quadratic relationship between average finish time and age.
Depending on the data set, other regression models, such as cubic regression, may be used. Statistical software (like Minitab) is commonly used to calculate these regression models.
Another method for fitting regression models to non-linear data sets is to transform the data, making it linear. Then a least-squares regression line can be fit to the transformed data.
Commonly Used TransformationsTransformation Equation
No transformation
Square root of x
Log of x *
Reciprocal of x
Log of y *Exponential growth or decay
xbay 10logˆ
bxay ˆlog10
x
bay1ˆ
xbay ˆ
bxay ˆ
*Natural log may also be used
Pomegranate study revisited:
x = number of days after injection of cancer cells in mice assigned to .2% PFE and y = average tumor volume
Sketch a scatterplot for this data set.
x 11 15 19 23 27 31 35 39
y 40 75 90 210 230 330 450 600
100
200
300
400
500
600
10 15 20 25 30 35Number of days
Avera
ge t
um
or
volu
me
There appears to be a curve in the data points.
Let’s use a transformation to linearize
the data.
Since the data appears to be exponential growth, let’s try the “log of y”
transformation
Pomegranate study revisited:
x = number of days after injection of cancer cells in mice assigned to .2% PFE and y = average tumor volume
Sketch a scatterplot of the log(y) and x.
x 11 15 19 23 27 31 35 39
Log(y) 1.60
1.88
1.95 2.32 2.36 2.52 2.65 2.78
1
2
3
10
15 20
25 30 35
3510 3025
Number of daysLog o
f A
vera
ge t
um
or
volu
me
Notice that the
relationship now
appears linear. Let’s fit an LSRL
to the transformed
data.
10 25 30 35
The LSRL is
xy 041.0226.1ˆlog
Pomegranate study revisited:
x = number of days after injection of cancer cells in mice assigned to .2% PFE and y = average tumor volume
Sketch a scatterplot of the log(y) and x.
x 11 15 19 23 27 31 35 39
Log(y) 1.60
1.88
1.95 2.32 2.36 2.52 2.65 2.78
1
2
3
10
15 20
25 30 35
3510 3025
Number of days
Log o
f A
vera
ge
tum
or
volu
me
10 25 30 35
The LSRL isxy 041.0226.1ˆlog
What would the predicted average tumor size be 30
days after injection of cancer cells?
)30(041.0226.1ˆlog y456.2ˆlog y
3456.2 mm76.28510ˆ y
Another useful transformation is the power transformation. The power transformation ladder and the scatterplot (both below) can be used to help determine what type of transformation is appropriate.
Power Transformation Ladder
Power
Transformed Value
Name
3 (Original value)3 Cube
2 (Original value)2 Square
1 (Original value) No transformation
½ Square root
1/3 Cube root
0 Log(Original value)
Logarithm
-1 Reciprocal
value Original
3 value Original
value Original1
Suppose that the scatterplot looks like the curve labeled 1.
Then we would use a power that is up the ladder from the no transformation row for both the x and y
variables.
Suppose that the scatterplot looks like the curve labeled 2.
Then we would use a power that is up the ladder from the no transformation row
for the x variable and a power down the ladder for the y
variable.
Logistic Regression (Optional)• Can be used if the dependent variable is
categorical with just two possible values• Used to describe how the probability of
“success” changes as a numerical predictor variable, x, changes
• With p denoting the probability of success, the logistic regression equation is
bxa
bxa
e
ep
1Where a and b are constants
For any value of x, the value of p is always between 0 and 1.
The graph of this equation has an “S”
shape.
In a study on wolf spiders, researchers were interested in what variables might be related to a female wolf spider’s decision to kill and consume her partner during courtship or mating. Data was collected for 53 pairs of courting wolf spiders. (Data listed on page 287)
x = the difference in body width (female – male) y = cannibalism; coded 0 for no cannibalism and 1 for cannibalism
Minitab was used to construct a scatterplot and to fit a logistic regression to the data.
x
x
e
ep
06928.308904.3
06928.308904.3
1
Note that the plot was constructed so that if two plots fell in the exact same
location they would be offset a little bit so that all points would be visible (called
jittering).
This equation can be used to predict the probability of the
male spider being cannibalized based on the difference in size.
What is the probability of cannibalism if the male &
female spiders are the same width (difference of 0)?
044.01 )0(06928.308904.3
)0(06928.308904.3
e
ep