Why standard deviation is considered the best measure of variation?

Why standard deviation is considered the best measure of variation?

The standard deviation is the standard or typical difference between each data point and the mean. Conveniently, the standard deviation uses the original units of the data, which makes interpretation easier. Consequently, the standard deviation is the most widely used measure of variability.

How do you compare measures of dispersion?

We use a relative measure of dispersion for comparing distributions of two or more data set and for unit free comparison. They are the coefficient of range, the coefficient of mean deviation, the coefficient of quartile deviation, the coefficient of variation, and the coefficient of standard deviation.

What are the properties of standard deviation as a measure of dispersion?

The best measure of dispersion is, usually, standard- deviation which does not possess the demerits of range and mean deviation. SD for a given set of observations is defined as the root mean square deviation when the deviations are taken from the AM of the observations.

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Why is standard deviation better measure of variation than mean deviation?

It is also used to gauge volatility in markets and financial instruments, but it is used less frequently than standard deviation. Generally, according to mathematicians, when a data set is of normal distribution — that is, there aren’t many outliers — standard deviation is the preferable gauge of variability.

Is standard deviation a measure of location?

This chapter presents several ways to summarize quantitative data by a typical value (a measure of location, such as the mean, median, or mode) and a measure of how well the typical value represents the list (a measure of spread, such as the range, inter-quartile range, or standard deviation).

What does standard deviation measure?

A standard deviation (or σ) is a measure of how dispersed the data is in relation to the mean. Low standard deviation means data are clustered around the mean, and high standard deviation indicates data are more spread out.

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Why standard deviation is superior among other measures of dispersion?

Standard deviation is superior to other measures because of its merits showing the variability which is important for statistical data. good measure of dispersion. In mean deviation we take the sum of deviations from actual mean after ignoring ± signs.

Can you compare standard deviations with different means?

In many experimental contexts, the finding of different standard deviations is as important as the finding of different means. If the standard deviations are different, then the populations are different regardless of what the t test concludes about differences between the means.