`color{red} ✍️` In earlier sections, we have studied about some types of measures of dispersion.

`color{red} ✍️` The mean deviation and the standard deviation have the same units in which the data are given. Whenever we want to compare the variability of two series with same mean, which are measured in different units, we do not merely calculate the measures of dispersion but we require such measures which are independent of the units.

`color{red} ✍️` The measure of variability which is independent of units is `color(blue)("called coefficient of variation")` (denoted as `color(red)(C.V.))`

`color(green)("The coefficient of variation is defined as")`

`color{purple}(C.V. = sigma/(barx) xx 100 , \ \ barx ≠ 0 ,)`

where `color{purple}(σ)` and `color(blue)(barx)` are `color{purple}("the standard deviation")` and `color{blue}("mean of the data.")`

For comparing the variability or dispersion of two series, we calculate the coefficient of variance for each series.

The series having greater `C.V.` is said to be more variable than the other.

The series having lesser `C.V. ` is said to be more consistent than the other.

Let `color{purple}(barx_1)` and `color{purple}(σ_1)` be the mean and standard deviation of the first distribution, and `color{purple}(barx_2)` and `color{purple}(σ_2)` be the mean and standard deviation of the second distribution.

Then `color{purple}(\ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ C.V. ("1st distribution") = (sigma_1)/(barx_1) xx100)`

and `color{purple}(\ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ C.V. ("2nd distribution") = (sigma_1)/(barx_1) xx100)`

Given `color{purple}(barx_1 = barx_2 = barx)` (say)

Therefore `color{purple}(\ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ C.V. ("1st distribution") = (sigma_1)/(barx_1) xx100)` ...........................................`(1)`

and `color{purple}(\ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ C.V. ("2nd distribution") = (sigma_1)/(barx_1) xx100)` ...........................................`(2)`

It is clear from (1) and (2) that the two C.Vs. can be compared on the basis of values of `color{purple}(σ_1)` and `color{purple}(σ_2)` only.

Thus, we say that for two series with equal means, the series with greater standard deviation (or variance) is called more variable or dispersed than the other.

Also, the series with lesser value of standard deviation (or variance) is said to be more consistent than the other.