# A Brief Description of Non-Parametric Tests

Topics: Non-parametric statistics, Measurement, Parametric statistics Pages: 2 (495 words) Published: December 2, 2013
﻿Non-Parametric Tests
In contrast to parametric tests, non-parametric tests do not require any assumptions about the parameters or about the nature of population. It is because of this that these methods are sometimes referred to as the distribution free methods. Most of these methods, however, are based upon the weaker assumptions that observations are independent and that the variable under study is continuous with approximately symmetrical distribution. In addition to this, these methods do not require measurements as strong as that required by parametric methods. Most of the non-parametric tests are applicable to data measured in an ordinal or nominal scale. As opposed to this, the parametric tests are based on data measured at least in an interval scale. The measurements obtained on interval and ratio scale are also known as high level measurements. Level of measurement

1. Nominal scale: This scale uses numbers or other symbols to identify the groups or classes to which various objects belong. These numbers or symbols constitute a nominal or classifying scale. For example, classification of individuals on the basis of sex (male, female) or on the basis of level of education (matric, senior secondary, graduate, post graduate), etc. This scale is the weakest of all the measurements. 2. Ordinal scale: This scale uses numbers to represent some kind of ordering or ranking of objects. However, the differences of numbers, used for ranking, don’t have any meaning. For example, the top 4 students of class can be ranked as 1, 2, 3, 4, according to their marks in an examination. 3. Interval scale: This scale also uses numbers such that these can be ordered and their differences have a meaningful interpretation. 4. Ratio scale: A scale possessing all the properties of an interval scale along with a true zero point is called a ratio scale. It may be pointed out that a zero point in an interval scale is arbitrary. For example, freezing point of water is defined at 0°...

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