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Correlations
Is there a correlation between spending on athletics and wins? One would think so, but check out this outlier:
College Basketball Budgets (2007) – 339 DI Teams
1. Kentucky -- $9,204,755339. VMI -- $99,285
VMI won the game 111-103.
Up this weekend:112. Delaware State -- $1,796,416
Homework Assignment Note
If you are using the SPSS Student Edition you cannot open datasets with more than 50 variables.
Therefore, you need to use: NES2004A_Student.sav
Let me know which file you used on the homework.
Homework Assignment Note
The variable names are virtually the same:
Ideology Measure: v_140a is libcon7
Party ID: partyid3 is the same
2004 Vote: who_2004 is who04_2
Statistical Relationships
Andrew Martin
PS 372
University of Kentucky
Statistical Relationships
Generally speaking, a statistical relationship between two variables exists if the values of the
observations for one variable are associated with the observations for the other variable.
Statistical Relationships
Knowing two variables are related allows political scientists to make predictions.
Some Questions
How strong is the relationship?
What is the direction or shape of the relationship?Is it a causal one?
Does it change or disappear if other variables are considered?
Can we conclude the relationship holds for the population?
Some basics
The level of measurement.
The form of the relationship.
The strength of the relationship.
Numerical summaries of relationships.
Conditional relationships.
Levels of Measurement
Types of Relationships
General association. Exists when the values of one variable, X, tend to be associated with specific values of the other variable.
Monotonic Relationships
Positive monotonic correlation. High values of one variable (X) are associated with high values of another (Y), and conversely, low values (X) are
associated with low values (Y).
Negative monotonic correlation. High values of X are associated with low values of Y; low values of
X are associated with high values of Y.
Monotonic Relationships
In a positive monotonic relationship, the data curve never goes down once on its way up.
In a negative monotonic relationship, the data curve never goes up once on its way down.
Linear Relationships
● Positive linear correlation. This type of correlation is a particular type of monotonic relationship in which plotted X-Y values fall on (or at least close to) a straight line. The line slopes upward from left to right.
● Negative linear correlation. In this type of correlation, the plotted values of X and Y fall on a straight line that slopes downward from left to right.
Linear Relationships
● Perhaps you remember the following from high school algebra:
● Y = mX +b,
● Y = Y value● X= X value● m = slope ● b = intercept Note: The
textbook uses b for the slope coefficient instead of m, and a instead of b for the intercept.
Linear Relationships
● Relationships may have other forms, as when values of X and Y increase together until some threshold is met when they decline.
● These are known as curvilinear relationships, and will not be addresses in this class.
Strength of Relationship
● Strength of relationship is an indication of how consistently the values of a dependent variable are associated with the values of an independent variable.
Strength of Relationship
12-2a. The values of X and Y are tied together tightly. You could imagine a straight line passing through or very near most points.
`
Strength of Relationship
12-2b The values tend to be associated – as X increases, so does Y – but the connection is rather weak.
Measures of Association
Measures of association are statistics that summarize the relationships between two variables.
These measures are typically used to support theoretical or policy claims.
Measures of Association
However, a note of caution:
These coefficients
(1) assume a particular level of measurement – nominal, ordinal, interval and ratio
(2) rest on a specific conception of association
To interpret its numerical value one has to grasp the kind of association being measured.
Important Properties of Coefficients
(1) Null value: Zero typically indicates no association, but there are exceptions.
(Ex: Difference of the means)
(2) Maximum values: Some coefficients have a maximum values. Many are bounded, with the
typical lower bound being 0 and the upper bound being 1. (Ex: Correlation)
Important Properties of Coefficients
(3) Strength of the relationship. Subject to lower and upper boundaries, a coefficient's absolute numerical value increases with the strength of the association.
(Ex: Regression coefficient)
(4) Level of measurement. Nominal, ordinal and quantitative variables require their own type of
coefficient. (Ex: Stats for quantitative data)
Important Properties of Coefficients
(5) Symmetry. A symmetric measure keeps the same value no matter which variable is treated as
dependent or independent.
With an asymmetric measures. The coefficient calculated with Y as dependent variable may be
differ from the same indicator using X as the dependent variable.
(Ex: Correlations)
Important Properties of Coefficients
Standardized vs. Unstandardized
The measurement scale affects the numerical value of most coefficients of association.
Sometimes statisticians transform variables into standardized coefficients so that they all have
variances of 1.
(Ex: Standard errors)