In which scale there is no absolute zero point?
|
On an scale, measurements are not only classified and ordered therefore having the properties of the two previous scales, but the distances between each interval on the scale are equal right along the scale from the low end to the high end. Show Two points next to each other on the scale, no matter whether they are high or low, are separated by the same distance, so when you measure temperature in centigrade the distance between 0 and 10°C is the same as between 90 and 100. What you must remember though is that for scales, a measurement of 100°C does not mean that the temperature is 10 times hotter than something measuring 10°C even though the value given on the scale is 10 times as large. That's because there is no absolute zero, the zero is arbitrary. On the centigrade temperature scale, the zero value is taken as the point at which water freezes and the 100°C value when water begins to boil and between these extreme values the scale is divided into a 100 equal divisions. Temperatures below 0°C are designated negative numbers. So the arbitrary 0°C does not mean 'no temperature'. But when expressed on the kelvin scale, a scale, a measure of 0K equivalent to -273°C does indeed mean no temperature! Calendar years are another example of an measurement. An arbitrary 0 (or 1 depending on your viewpoint) was assigned when Christ was born, and time before this is given the prefix BC. Other than these examples measurements are rare. CUSTOMER EXPERIENCE Improve Customer Satisfaction: Why surveys are pathways to identifying customer needs Free Download: Generate customer journey insights using our customer experience templates. Download There are four scales of measurement: Nominal, Ordinal, Interval, Ratio. These are considered under qualitative and quantitative data as under: Qualitative data:
In this scale, categories are nominated names (hence “nominal”). There is no inherent order between categories. Put simply, one cannot say that a particular category is superior/ better than another. Examples:
The various categories can be logically arranged in a meaningful order. However, the difference between the categories is not “meaningful”. Examples:
Quantitative data:
The values (not categories) can be ordered and have a meaningful difference, but doubling is not meaningful. This is because of the absence of an “absolute zero”. Example: The Celsius scale: The difference between 40 C and 50 C is the same as that between 20 C and 30 C (meaningful difference = equidistant). Besides, 50 C is hotter than 40 C (order). However, 20 C is not half as hot as 40 C and vice versa (doubling is not meaningful). Meaningful difference: In the Celsius scale, the difference between each unit is the same anywhere on the scale- the difference between 49 C and 50 C is the same as the difference between any two consecutive values on the scale ( 1 unit).[Thus, (2-1)= (23-22)= (40-39)=(99-98)= 1].
The values can be ordered, have a meaningful difference, and doubling is also meaningful. There is an “absolute zero”. Examples:
In addition, quantitative data may also be classified as being either Discrete or Continuous. Discrete: The values can be specific numbers only. Fractions are meaningless. In some situations, mathematical functions are not possible, too. Examples:
Continuous: Any numerical value (including fractions) is possible and meaningful. Examples:
Most of the numerical data we use is continuous. As you might have noticed by now, the Ratio scale often involves continuous data [Temperature is an exception, unless the Kelvin scale is being used]. In which scale absolute zero is absent?The Fahrenheit scale lacks an absolute zero.
In which scale does absolute zero exist?absolute zero, temperature at which a thermodynamic system has the lowest energy. It corresponds to −273.15 °C on the Celsius temperature scale and to −459.67 °F on the Fahrenheit temperature scale.
Does ordinal scale have absolute zero?The second level, called ordinal data, has magnitude only, and can be looked at as any set of data that can be placed in order from greatest to lowest but where there is no absolute zero and no equal intervals.
Does nominal scale has absolute zero?A nominal scale does not posses any of the mathematical attributes of magnitude, equal interval, or absolute zero point. It merely allows categorization of objects into mutually exclusive categories.
|
