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| Values have any meaningful order | Distance between values is defined | Mathematical operations make sense
(Values can be used to perform mathematical operations) |
There is a meaning ful zero-point | Values can be used to perform statistical computations | Example | ||||||||
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| Comparison operators | Addition and subtrac tion | Multiplica tion and division | "Counts", aka, "Fre quency of Distribu tion" | Mode | Median | Mean | Stn | ||||||
| Nominal | Values serve only as labels | class="mw-collapsible mw-collapsed wikitable" | |||||||||||
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Values don't have any meaningful order |
No distance between values is defined |
Values don't carry any mathematical meaning |
Values cannot be used to perform many statistical computations, such as mean and standard deviation | ||||||||||
|For an attribute "outlook" from weather data, potential values could be "sunny", "overcast", and "rainy". |- !Ordinal |Distinction between nominal and ordinal not always clear (e.g., attribute "outlook") | colspan="11" style="margin: 0; padding: 0;" |
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Values have a meaningful order |
No distance between values is defined |
Comparison operators make sense |
Mathematical operations such as addition, subtraction, multiplication, etc. do not make sense | |||||||
|An attribute "temperature" in weather data with potential values fo: "hot" > "warm" > "cool" |- !Interval | | colspan="11" style="margin: 0; padding: 0;" |
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Distance between values is defined. In other words, we can quantify the difference between each value |
Comparison operators make sense |
Addition, subtraction, make sense | Multiplication, and division do not make sense | Interval variables often do not have a meaningful zero-point. | (not sure) |
|An example of an interval variable would be temperature. We can correctly assume that the difference between 70 and 80 degrees is the same as the difference between 80 and 90 degrees. However, the mathematical operations of multiplication and division do not apply to interval variables. For instance, we cannot accurately say that 100 degrees is twice as hot as 50 degrees. Additionally, interval variables often do not have a meaningful zero-point. For example, a temperature of zero degrees (on Celsius and Fahrenheit scales) does not mean a complete absence of heat. |- !Ratio | | colspan="11" style="margin: 0; padding: 0;" |
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All arithmetic operations are possible on a ratio variable |
Ratio variables have a meaningful zero-point | |||||||||
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