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Standard deviation

Updated: Wikipedia source

Standard deviation

In statistics, the standard deviation is a measure of the amount of variation of the values of a variable about its mean. A low standard deviation indicates that the values tend to be close to the mean (also called the expected value) of the set, while a high standard deviation indicates that the values are spread out over a wider range. Standard deviation may be abbreviated SD or std dev, and is most commonly represented in mathematical texts and equations by the lowercase Greek letter σ (sigma), for the population standard deviation, or the Latin letter s, for the sample standard deviation. The standard deviation of a random variable, sample, statistical population, data set, or probability distribution is the square root of its variance. (For a finite population, variance is the average of the squared deviations from the mean.) A useful property of the standard deviation is that, unlike the variance, it is expressed in the same unit as the data. Standard deviation can also be used to calculate standard error for a finite sample, and to determine statistical significance. When only a sample of data from a population is available, the term standard deviation of the sample or sample standard deviation can refer to either the above-mentioned quantity as applied to those data, or to a modified quantity that is an unbiased estimate of the population standard deviation (the standard deviation of the entire population).

Tables

· Interpretation and application › Chebyshev's inequality
2 σ {\displaystyle {\sqrt {2}}\,\sigma }
2 σ {\displaystyle {\sqrt {2}}\,\sigma }
Distance from mean
2 σ {\displaystyle {\sqrt {2}}\,\sigma }
Minimum population
50%
2 σ {\displaystyle 2\sigma }
2 σ {\displaystyle 2\sigma }
Distance from mean
2 σ {\displaystyle 2\sigma }
Minimum population
75%
3 σ {\displaystyle 3\sigma }
3 σ {\displaystyle 3\sigma }
Distance from mean
3 σ {\displaystyle 3\sigma }
Minimum population
89%
4 σ {\displaystyle 4\sigma }
4 σ {\displaystyle 4\sigma }
Distance from mean
4 σ {\displaystyle 4\sigma }
Minimum population
94%
5 σ {\displaystyle 5\sigma }
5 σ {\displaystyle 5\sigma }
Distance from mean
5 σ {\displaystyle 5\sigma }
Minimum population
96%
6 σ {\displaystyle 6\sigma }
6 σ {\displaystyle 6\sigma }
Distance from mean
6 σ {\displaystyle 6\sigma }
Minimum population
97%
k σ {\displaystyle k\sigma }
k σ {\displaystyle k\sigma }
Distance from mean
k σ {\displaystyle k\sigma }
Minimum population
1 − 1 k 2 {\displaystyle 1-{\frac {1}{k^{2}}}}
1 1 − ℓ σ {\displaystyle {\frac {1}{\sqrt {1-\ell }}}\,\sigma }
1 1 − ℓ σ {\displaystyle {\frac {1}{\sqrt {1-\ell }}}\,\sigma }
Distance from mean
1 1 − ℓ σ {\displaystyle {\frac {1}{\sqrt {1-\ell }}}\,\sigma }
Minimum population
ℓ {\displaystyle \ell }
Distance from mean
Minimum population
2 σ {\displaystyle {\sqrt {2}}\,\sigma }
50%
2 σ {\displaystyle 2\sigma }
75%
3 σ {\displaystyle 3\sigma }
89%
4 σ {\displaystyle 4\sigma }
94%
5 σ {\displaystyle 5\sigma }
96%
6 σ {\displaystyle 6\sigma }
97%
k σ {\displaystyle k\sigma }
1 − 1 {k^{2}}}}
1 1 − ℓ σ {\displaystyle {\frac {1}{\sqrt {1-\ell }}}\,\sigma }
ℓ {\displaystyle \ell }
· Interpretation and application › Rules for normally distributed data
Percentage
Percentage
Confidence interval
Percentage
Proportion within
Percentage
Proportion without
Fraction
0.318639σ
0.318639σ
Confidence interval
0.318639σ
Proportion within
25%
Proportion without
75%
Proportion without
3 / 4
0.674490σ
0.674490σ
Confidence interval
0.674490σ
Proportion within
50%
Proportion without
50%
Proportion without
1 / 2
0.977925σ
0.977925σ
Confidence interval
0.977925σ
Proportion within
66.6667%
Proportion without
33.3333%
Proportion without
1 / 3
0.994458σ
0.994458σ
Confidence interval
0.994458σ
Proportion within
68%
Proportion without
32%
Proportion without
1 / 3.125
Confidence interval
Proportion within
68.2689492%
Proportion without
31.7310508%
Proportion without
1 / 3.1514872
1.281552σ
1.281552σ
Confidence interval
1.281552σ
Proportion within
80%
Proportion without
20%
Proportion without
1 / 5
1.644854σ
1.644854σ
Confidence interval
1.644854σ
Proportion within
90%
Proportion without
10%
Proportion without
1 / 10
1.959964σ
1.959964σ
Confidence interval
1.959964σ
Proportion within
95%
Proportion without
5%
Proportion without
1 / 20
Confidence interval
Proportion within
95.4499736%
Proportion without
4.5500264%
Proportion without
1 / 21.977895
2.575829σ
2.575829σ
Confidence interval
2.575829σ
Proportion within
99%
Proportion without
1%
Proportion without
1 / 100
Confidence interval
Proportion within
99.7300204%
Proportion without
0.2699796%
Proportion without
1 / 370.398
3.290527σ
3.290527σ
Confidence interval
3.290527σ
Proportion within
99.9%
Proportion without
0.1%
Proportion without
1 / 1000
3.890592σ
3.890592σ
Confidence interval
3.890592σ
Proportion within
99.99%
Proportion without
0.01%
Proportion without
1 / 10000
Confidence interval
Proportion within
99.993666%
Proportion without
0.006334%
Proportion without
1 / 15787
4.417173σ
4.417173σ
Confidence interval
4.417173σ
Proportion within
99.999%
Proportion without
0.001%
Proportion without
1 / 100000
4.5σ
4.5σ
Confidence interval
4.5σ
Proportion within
99.9993204653751%
Proportion without
0.0006795346249%
Proportion without
1 / 147159.53586.8 / 1000000
4.891638σ
4.891638σ
Confidence interval
4.891638σ
Proportion within
99.9999%
Proportion without
0.0001%
Proportion without
1 / 1000000
Confidence interval
Proportion within
99.9999426697%
Proportion without
0.0000573303%
Proportion without
1 / 1744278
5.326724σ
5.326724σ
Confidence interval
5.326724σ
Proportion within
99.99999%
Proportion without
0.00001%
Proportion without
1 / 10000000
5.730729σ
5.730729σ
Confidence interval
5.730729σ
Proportion within
99.999999%
Proportion without
0.000001%
Proportion without
1 / 100000000
Confidence interval
Proportion within
99.9999998027%
Proportion without
0.0000001973%
Proportion without
1 / 506797346
6.109410σ
6.109410σ
Confidence interval
6.109410σ
Proportion within
99.9999999%
Proportion without
0.0000001%
Proportion without
1 / 1000000000
6.466951σ
6.466951σ
Confidence interval
6.466951σ
Proportion within
99.99999999%
Proportion without
0.00000001%
Proportion without
1 / 10000000000
6.806502σ
6.806502σ
Confidence interval
6.806502σ
Proportion within
99.999999999%
Proportion without
0.000000001%
Proportion without
1 / 100000000000
Confidence interval
Proportion within
99.9999999997440%
Proportion without
0.000000000256%
Proportion without
1 / 390682215445
Confidence interval
Proportion within
Proportion without
Percentage
Percentage
Fraction
0.318639σ
25%
75%
3 / 4
0.674490σ
50%
50%
1 / 2
0.977925σ
66.6667%
33.3333%
1 / 3
0.994458σ
68%
32%
1 / 3.125
68.2689492%
31.7310508%
1 / 3.1514872
1.281552σ
80%
20%
1 / 5
1.644854σ
90%
10%
1 / 10
1.959964σ
95%
5%
1 / 20
95.4499736%
4.5500264%
1 / 21.977895
2.575829σ
99%
1%
1 / 100
99.7300204%
0.2699796%
1 / 370.398
3.290527σ
99.9%
0.1%
1 / 1000
3.890592σ
99.99%
0.01%
1 / 10000
99.993666%
0.006334%
1 / 15787
4.417173σ
99.999%
0.001%
1 / 100000
4.5σ
99.9993204653751%
0.0006795346249%
1 / 147159.53586.8 / 1000000
4.891638σ
99.9999%
0.0001%
1 / 1000000
99.9999426697%
0.0000573303%
1 / 1744278
5.326724σ
99.99999%
0.00001%
1 / 10000000
5.730729σ
99.999999%
0.000001%
1 / 100000000
99.9999998027%
0.0000001973%
1 / 506797346
6.109410σ
99.9999999%
0.0000001%
1 / 1000000000
6.466951σ
99.99999999%
0.00000001%
1 / 10000000000
6.806502σ
99.999999999%
0.000000001%
1 / 100000000000
99.9999999997440%
0.000000000256%
1 / 390682215445

References

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    https://www.ncbi.nlm.nih.gov/pmc/articles/PMC2351401
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    https://mathworld.wolfram.com/StandardDeviation.html
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    https://www.statlect.com/glossary/consistent-estimator
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    https://doi.org/10.2307%2F2682923
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    https://purecalculators.com/standard-deviation-calculator
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    https://arxiv.org/abs/1602.03837
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    http://www.edupristine.com/blog/what-is-standard-deviation
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    https://archive.org/details/fundamentalsprob00ghah_271
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    https://arxiv.org/abs/1512.00809
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    https://archive.org/details/oxforddictionary0000unse
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