In your own words, what is a nonparametric test? What is a parametric test?
In your own words, identify an advantage of using rank correlation instead of linear correlation.
Which of the following terms is sometimes used instead of nonparametric test: normality test, abnormality test, distribution-free test, last testament, test of patience? Why is this term better than nonparametric test?
Parametric tests assume that the data follows a specific distribution, typically a normal distribution. These tests rely on parameters like mean and standard deviation to make inferences about the population. Examples of parametric tests include t-tests, ANOVA, and regression analysis.
Nonparametric tests do not make assumptions about the underlying distribution of the data. They are often used when the data is not normally distributed or when the data are ordinal or nominal. Examples of nonparametric tests include the Mann-Whitney U test, Kruskal-Wallis test, and Spearman’s rank correlation coefficient.
Advantage of Rank Correlation over Linear Correlation
Rank correlation is a nonparametric alternative to linear correlation. It measures the relationship between two variables based on their ranks, rather than their raw values. This makes it less sensitive to outliers and can be used with ordinal or interval data.
Alternative Term for Nonparametric Test
The term distribution-free test is often used interchangeably with nonparametric test. This term accurately reflects the fact that these tests do not rely on assumptions about the underlying distribution of the data.
Why “distribution-free test” is better than “nonparametric test”:
In conclusion, parametric tests assume a specific distribution, while nonparametric tests are more flexible and can be used with a wider range of data types. Rank correlation is a useful nonparametric alternative to linear correlation, especially when dealing with outliers or ordinal data. The term “distribution-free test” is a more accurate and descriptive term for nonparametric tests.