This document discusses different types of data and which statistical tests are appropriate for each. It defines nominal, categorical, ordinal, interval, and ratio data, explaining the key properties and differences between each. The document concludes that it is important to understand the level of measurement of your data in order to select the correct parametric or non-parametric statistical test to use. Non-parametric tests make fewer assumptions than parametric tests but can be less powerful.
Unit 3 Emotional Intelligence and Spiritual Intelligence.pdf
Interval data
1. Exploring data Dr Janelle Yorke University of Salford & Professor Carol Haigh Manchester Metropolitan University
2. Background & Aims Based upon our joint reviewing experience Differing degrees of irritation regarding application of statistical tests. Seemed to be much confusion about test to be used Was it just us?
4. Nominal Data A set of data is said to be nominal if the values / observations belonging to it can be assigned a code in the form of a number where the numbers are simply labels. You can count but not order or measure nominal data. For example - In this example yes could be coded as 1, No as 2
5. Categorical data A categorical variable is for mutual exclusive, but not ordered, categories. For example, A Likert scale; You can code the five categories with numbers if you want, but the order is arbitrary and any calculations (for example, computing an average) would be meaningless.
6. Ordinal data A ordinal variable, is one where the order matters but not the difference between values. For example, Pain Scales Patients are asked to express the amount of pain they are feeling on a scale of 1 to 10. A score of 7 means more pain that a score of 5, and that is more than a score of 3. But the difference between the 7 and the 5 may not be the same as that between 5 and 3. The values simply express an order
7. Interval data A interval variable is a measurement where the difference between two values is meaningful. The difference between a temperature of 100 degrees and 90 degrees is the same difference as between 90 degrees and 80 degrees
8. Ratio Data A ratio variable, has all the properties of an interval variable, and also has a clear definition of 0.0. When the variable equals 0.0, there is none of that variable
11. Non-parametric tests Nonparametric tests are often when certain assumptions about the underlying population are questionable. For example, when comparing two independent sample non-parametric tests do not assume that the difference between the samples is normally distributed whereas parametric tests do Nonparametric tests may be more powerful in detecting population differences when certain assumptions are not satisfied. All tests involving ranked data, i.e. data that can be put in order, are nonparametric.
12. Parametric tests Parametric statistics allow you to assume the data come from a type of probability distribution and make inferences about the parameters of the distribution. Generally speaking parametric methods make more assumptions than non-parametric methods. If those extra assumptions are correct, parametric methods can produce more accurate and precise estimates. They are said to have more statistical power.