c hapter 4: m ore on t wo v ariable d ata sec. 4.2 – cautions about correlation and regression
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CAUTIONS ABOUT CORRELATION AND REGRESSION
Recall from chapter 3: That correlation and regression describe only
linear relationships
That correlation and the LSRL are not resistant One influential point or incorrectly entered data point
can completely change the data.
Always plot your data before interpreting regression or correlation
EXTRAPOLATION
Extrapolation is the use of a regression line far outside the domain of values of the explanatory variable x that you used to obtain the line or curve. Such predictions are not accurate
Example Suppose that you have data on a child’s growth
between the years 3 and 8. You find a strong linear relationship between age x and height y. If you fit a regression line to these data and use it to predict the child’s height at 25 years old you would predict them to be 8 feet tall
Don’t stray far from the domain of x that actually appears in your data
LURKING VARIABLES
Sometimes the relationship between two variables is influenced by other variables that we did not measure or even think about
A lurking variable is a variable that is not among the explanatory or response variables in study and yet may influence the interpretation of relationships among those variables.
The relationship between two variables can be strongly influenced by lurking variables. A lurking variable can falsely suggest a strong
relationship between x and y or it can hide a relationship that is really there.
Because lurking variables are often unrecognized and unmeasured, detecting their effect is a challenge
Many lurking variables change systematically over time. One method of detecting if time has an influence
is to plot residuals and response variables against the time order if available.
LURKING VARIABLES
THE QUESTION OF CAUSATION
In many studies of the relationship between two variables, the goal is to establish that changes in the explanatory variable cause changes in the response variable.
Even when a strong association is present, the conclusion that this association is due to a causal linking in the variables is often elusive.
Strong Associations can generally be explained by one of three relationships.
1. Causation2. Common Response3. Confounding
Variable x and y show a strong association (dashed line). This association may be the result of any of several causal relationships (solid arrow).
EXPLAINING ASSOCIATION
EXPLAINING ASSOCIATION
Confounding: x may cause y, but y may instead be caused by a confounding variable z
Common Response: x and y are reacting to a lurking variable z
Causation:x causes y
CAUSATION
Causation is not easily established.
The best evidence for causation comes from experiments that change x while holding all other factors fixed.
Even a very strong association between two variables is not by itself good evidence that there is a cause-and-effect link between the variables.
EXAMPLES OF DIRECT CAUSATION
The following relationships are examples of direct causation, but “causation” is not a simple idea. Refer to p.233 for explanations
1. x = mother’s BMI y = daughter’s BMI
2. x = amount of saccharin in a rat’s diet y = count of tumors in the rat’s bladder
Beware of lurking variables when thinking about an association between two variables.
The observed association between the variables x and y is explained by a lurking variable z. Both x and y change to changes in z. This common response creates an association
even though there may be no direct causal link between x and y.
COMMON RESPONSE
EXAMPLES OF COMMON RESPONSE
The following relationships are examples of how common response can create an association. Refer to p.233 for explanations
3. x = a high school senior’s SAT score y = the student’s first-year college GPA
4. x = monthly flow of money into stock mutual funds
y = monthly rate of return for the stock market
Two variables are confounded when their effects on a response variable cannot be distinguished from each other. The confounded variables may be either explanatory variables or lurking variables.
Confounding of several variables often prevents us from drawing conclusions about causation.
CONFOUNDING
EXAMPLES OF CONFOUNDING
The following relationships are examples of confounding Refer to p.234 for explanations
5. x = whether a person regularly attends religious services
y = how long the person lives
6. x = the number of years of education a worker has
y = the worker’s income
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