Scale of Measurement: Nominal, Ordinal, Interval & Ratio Explained

Scales of measurement allow us to assign labels, categories and numbers to data collected in a meaningful way. In statistics, the scales of measurement describe the nature and different categories of information collected in a study. To understand the numbers given to people, things, and events, and qualitative categories used to sort data one must have a basic understanding of measurement scales.

What is the Scale of Measurement?

Scale of measurement describes the relationship between the values that are allocated to variables. The scales of measurement depend upon the nature of the data collected in the study. The scale of measurement depends upon the characteristics of our data and how it can be used for analysis.

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Example: if we have qualitative data at our hands, like the flavor of drinks people like or the type of motorbike they wish to buy we make use of nominal scale where the different flavors of the drinks and the different types of cars would be one of our scales of measurement whereas if we are dealing with quantitative data like height and weight of the people we use a ratio scale measurement.

Scale of Measurement Scale of measurement refers to the ways variables or data are classified and quantified. There are four main levels—Nominal, Ordinal, Interval, and Ratio—each with increasing levels of precision and mathematical usefulness.

1. Nominal Scale
2. Ordinal Scale
3. Interval Scale
4. Ratio Scale

A nominal scale of measurement is utilized for variables that are not numeric or have no numerical value. As its name suggests, a nominal scale only categorizes data without structure or order. For example, male/female, pass/fail, and presence/absence come under nominal scales.

Characteristics of nominal scales

• The only purpose of using numbers in nominal scales is to identify and categorize objects as labels or tags.
• The numbers and the items strictly correspond one to one when used for identification.
• The percentage of the quality that each object holds is not represented by the numbers.
• Based on frequency counts, only a few statistics are allowed, including percentages and mode.
• The only allowed action on the numbers in a nominal scale is counting.

Ordinal Scale of Measurement

Data that is arranged in a particular order is known as an ordinal scale. It is also known as the rank scale. Although each value is measured, there is no information describing what separates the categories from one another. Therefore, these numbers cannot be increased or decreased. Ordinal scales are a higher degree of measurement since they provide more information than nominal scales provide. For example, percentile ranks, grades at school, ranks in a race, and Mohs’ scale of hardness (which exhibits unequal distances).

Characteristics of ordinal scales

• It is a ranking scale where items are ranked according to the degree to which they each contain a particular characteristic.
• It can identify whether an object possesses a particular character more or less than another, but not by how much.
• Any set of numbers that maintains the objects’ ordered relationships may be assigned.
• Besides the counting operation permitted for data on a nominal scale, ordinal scales allow using statistics based on centiles, such as percentile, quartile, and median.

Interval Scale of Measurement

Interval scales are numerical scales in which the order and the specific difference between the numbers are known. The interval scale has nominal and ordered data characteristics but also allows for calculating the differences between data points. The variables are displayed in this form of data together with their precise differences. They can be combined or split but not multiplied or subtracted from one another.

The temperature in degrees Celsius is a prime example of an interval scale since there is a constant difference between each value. For instance, the difference between 40 and 30 degrees is measurable at 10 degrees, as is the difference between 90 and 80 degrees. Another effective interval scale with known, measurable increments is time.

Characteristics of interval scale

• Equal distances on the scale correspond to equal values of the characteristic being measured numerically.
• It enables the comparison of object differences.
• There is no definite location for the zero point. The zero point and the measuring units are both arbitrary.
• The features of the scale are maintained by any positive linear transformation of the form .
• Taking scale ratios of values has significance.
• All statistical methods applied to nominal and ordinal data and the arithmetic, mean, standard deviation, and other statistics frequently used in marketing research may be used.

Ratio Scale of Measurement

The scale of measurement with the greatest amount of information is the ratio scale. It is an interval scale with the added characteristic that the lack of the amount being measured is indicated by the scale’s zero point.

A ratio scale can be thought of as the three previous scales combined. It gives each thing a name or category, similar to a nominal scale (the numbers serve as labels). The objects are arranged like an ordinal scale. The same difference at two different points on the scale, much like an interval scale, has the same meaning. Additionally, the same ratio has the same purpose at both places on the scale.

Characteristics of ratio scale

• The ratio scale has all the characteristics of the nominal, ordinal, and interval scales.
• It has a zero-absolute point.
• It makes sense to compute scale value ratios.
• Solely allowed proportional transformations are those of the type, where b is a positive constant.
• Ratio data can be used with any statistical method.

Characteristics of Scale of Measurement

Below are some essential characteristics of the scale of measurement, which make us understand this context easily.

1. On the measurement scale, every value has a piece of detailed information.
2. The values on the measurement scale are related to one another in an organized manner. That is, specific values are greater than others, and vice versa.
3. Scale units are equivalent to one another along the scale. As an illustration, the difference between 30 and 40 is the same as between 35 and 36.
4. The scale has a real zero point below which no values are present.

Applications of Scale of Measurement

The scale of measurement plays a crucial role in research, statistics, and data analysis by defining the nature and properties of data. Each scale—nominal, ordinal, interval, and ratio—supports specific types of statistical techniques and determines how data can be interpreted and compared.

1. Nominal Scale Applications

• Market Research: Categorizing customers by gender, region, or brand preference.

• Medical Studies: Classifying patients by blood type or diagnosis.

• Voting and Elections: Recording party affiliation or yes/no responses.

2. Ordinal Scale Applications

• Customer Feedback Surveys: Ranking satisfaction as poor, average, good.

• Education: Assigning letter grades (A, B, C).

• Performance Evaluation: Employee appraisal scales like excellent, good, fair.

3. Interval Scale Applications

• Psychological Testing: IQ scores and other standardized tests.

• Weather Analysis: Temperature comparison in Celsius or Fahrenheit.

• Educational Research: Measuring attitudes using Likert scales.

4. Ratio Scale Applications

• Scientific Research: Measuring time, weight, length, or volume.

• Economics & Finance: Income levels, expenditure, market prices.

• Health & Fitness: Tracking body weight, heart rate, or exercise duration.

Scales of Measurement Examples

Example 1: Students of higher secondary are considered and organized based on their grades A+ = Excellent, A = Good, B = Average, C= Needs improvement, D = Fail. Write which scale of measurement is utilized here.

Solution: Here, we are classifying students based on their grades. There is no quantitative score given. Thus, the given example is of an ordinal scale.

Example 2: Assume that your family is gone for dinner in a restaurant. You ordered a thali of various dishes like 2 pulses, 3 sabzis, 4 chapatis,1 pickle, and 2 desserts. Now determine the number of calories this thali contains. Determine which scale of measurement is used here.

Solution: Here, the number of calories is a quantitative score i.e. a numerical value. Therefore, this example is of the ratio scale of measurement.

Example 3: Let us assume that there are 40 students in the class. Now, we have to classify them concerning their gender. They can either be male or female. Determine which scale of measurement is used here.

Solution: As we can see, there is no numerical data but the data is categorized. Therefore, this is an example of a nominal scale.

If you are checking Scale of Measurement article, check related maths articles:
Percent to Fraction	Decimal to Percentage
Loss Percentage Formula	Percentage Bar Graph
Percentage Increase and Decrease	Difference between Percentage and Percentile

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