Covariance
=> simplest way to look at whether two variables are associated is to look at whether they covary
when one variable deviates from its mean we would expect the other variable to deviate from its mean in a similar way
Positive covariance: one variable deviates from the mean and the other variable deviates in the same direction
Negative covariance: one variable deviates from the mean and the other variable deviates in the different direction
CAREFUL: covariance is not a standardized measure => we cannot compare covariance in an objective way
Correlation coefficient
r = cov / sx sy
standardized measure
Biserial and point-biserial correlations
used when one of the variables is dichotomous (only 2 categories)
discrete dichotomy (e.g. pregnancy) => point-biserial correlation
continuous dichotomy (e.g. passing or failing an exam) => biserial correlation
Partical correlation
=> a correlation between 2 variables in which the effects of the other variables are held constant is known as partial correlation
Causality
=> Correlation give no indication of the direction of causality
the third-variable problem
in any correlation, causality between 2 variables cannot be assumed because a third variable could affect the results
Direction of causality
Correlation coefficients say nothing about which variable causes the other to change
R^2 for interpretation
=> measure the amount of variability in one variable that is shared by the other
R^2 = 0.19
=> Exam anxiety shares 19% of the variability in exam performance
BUT NOT: The variance in exam anxiety is accounted for by performance ! (implies causality!)
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