Standard deviation
Standard deviation is the square root of the variance. It measures how widely values in a dataset spread around their mean and is expressed in the same units as the original data, so it is directly interpretable.
Also known asSD · std dev
See it move
A bell-shaped frequency distribution plots monthly sales in €'000 on the horizontal axis, with the mean at €70,000 and a sample standard deviation of approximately €7,900. The region spanning one standard deviation either side of the mean — roughly €62,100 to €77,900 — covers about 68% of stores. Because the standard deviation is expressed in the same currency units as the original data, it can be read alongside the mean directly, without further conversion.
The formula
Variables
- Sample standard deviation
- i-th observation
- Sample mean
- Number of observations in the sample
Denominator n − 1 (not n) corrects for using the sample mean as a stand-in for the unknown population mean.
Variables
- Population standard deviation
- Population mean
- Population size
Population formula. Denominator is N because the true mean μ is known.
Check yourself
Two investment portfolios each report a mean monthly return of 2%. Portfolio A has a standard deviation of 0.5% and Portfolio B has a standard deviation of 3.2%. What does this tell an investor about the two portfolios?