(D) The coefficient of variation $(CV)$ is a statistical measure of the dispersion of data points in a data series around the mean. It is defined as t

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$\frac{\sigma}{\bar{x}} \times 100$

(D) The coefficient of variation $(CV)$ is a statistical measure of the dispersion of data points in a data series around the mean. It is defined as the ratio of the standard deviation $\sigma$ to the mean $\bar{x}$,expressed as a percentage. The formula is given by: $CV = \frac{\sigma}{\bar{x}} \times 100$ where $\bar{x} \neq 0$. Thus,option $D$ is correct.

Class 11 Mathematics Statistics Variance and Standard Deviation

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What is the formula for finding the coefficient of variation,given $\sigma = \text{standard deviation}$ and $\bar{x} = \text{mean} \neq 0$?

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A
$\frac{\bar{x}}{\sigma} \times 100$
B
$\frac{\bar{x}}{\sigma}$
C
$\frac{\sigma}{\bar{x}}$
D
$\frac{\sigma}{\bar{x}} \times 100$

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What is the formula for finding the coefficient of variation,given $\sigma = \text{standard deviation}$ and $\bar{x} = \text{mean} \neq 0$?

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The mean of $5$ observations is $15$ and variance is $9$. If two observations having values $-5$ and $13$ are combined with these observations,then what will be the new variance?

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