Variance: Difference between revisions

Latest revision as of 00:35, 10 February 2025

Statistical measure of the dispersion of data points

Variance[edit]

Variance is a statistical measure that represents the degree of spread in a set of data points. It is calculated as the average of the squared differences from the mean, providing a measure of how much the data points differ from the mean value of the dataset.

Definition[edit]

Variance is denoted by \( \sigma^2 \) for a population and \( s^2 \) for a sample. The formula for the variance of a population is:

\[ \sigma^2 = \frac{1}{N} \sum_{i=1}^{N} (x_i - \mu)^2 \]

where \( N \) is the number of observations, \( x_i \) is each individual observation, and \( \mu \) is the mean of the population.

For a sample, the variance is calculated as:

\[ s^2 = \frac{1}{n-1} \sum_{i=1}^{n} (x_i - \bar{x})^2 \]

where \( n \) is the number of observations in the sample, \( x_i \) is each individual observation, and \( \bar{x} \) is the sample mean.

Properties[edit]

Variance is always non-negative because it is the average of squared deviations.
A variance of zero indicates that all the values are identical.
Variance is sensitive to outliers, as it involves squaring the deviations.

Applications[edit]

Variance is widely used in statistics and probability theory. It is a fundamental concept in fields such as finance, where it is used to measure the risk of an investment. In quality control, variance is used to assess the consistency of a process.

Relationship with Standard Deviation[edit]

The standard deviation is the square root of the variance. It provides a measure of dispersion in the same units as the data, making it more interpretable than variance.

Related Concepts[edit]

Related pages[edit]

References[edit]

Hogg, R. V., & Craig, A. T. (1995). Introduction to Mathematical Statistics. Prentice Hall.
Rice, J. A. (2006). Mathematical Statistics and Data Analysis. Duxbury Press.

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-'''Variance''' is a statistical measurement that describes the spread of data points in a data set. It measures how far each number in the set is from the mean (average) and thus from every other number in the set. Variance is often denoted by the symbol σ^2.
+{{Short description|Statistical measure of the dispersion of data points}}
+{{Use dmy dates|date=October 2023}}
+== Variance ==
+[[File:Comparison_standard_deviations.svg|thumb|right|Comparison of standard deviations and variance]]
+[[File:Variance_visualisation.svg|thumb|right|Visualisation of variance]]
+'''Variance''' is a statistical measure that represents the degree of spread in a set of data points. It is calculated as the average of the squared differences from the mean, providing a measure of how much the data points differ from the mean value of the dataset.
 == Definition ==
-The variance of a random variable, statistical population, data set, or probability distribution is the average of the squared differences from the mean. In other words, it measures how far a set of numbers is spread out from their average value.
+Variance is denoted by \( \sigma^2 \) for a population and \( s^2 \) for a sample. The formula for the variance of a population is:
+\[
+\sigma^2 = \frac{1}{N} \sum_{i=1}^{N} (x_i - \mu)^2
+\]
+where \( N \) is the number of observations, \( x_i \) is each individual observation, and \( \mu \) is the mean of the population.
-== Calculation ==
+For a sample, the variance is calculated as:
-The variance is calculated by taking the differences between each number in the data set and the mean, squaring the differences (to make them positive), and averaging the resulting squares.
-== Uses ==
+\[
-Variance is used in statistics for a range of purposes. It is a measure of how much values in the dataset differ from the mean. The variance is also used in finance, where it can help to determine the volatility of a financial instrument or portfolio.
+s^2 = \frac{1}{n-1} \sum_{i=1}^{n} (x_i - \bar{x})^2
+\]
-== See also ==
+where \( n \) is the number of observations in the sample, \( x_i \) is each individual observation, and \( \bar{x} \) is the sample mean.
+== Properties ==
+* Variance is always non-negative because it is the average of squared deviations.
+* A variance of zero indicates that all the values are identical.
+* Variance is sensitive to outliers, as it involves squaring the deviations.
+== Applications ==
+Variance is widely used in statistics and probability theory. It is a fundamental concept in fields such as finance, where it is used to measure the risk of an investment. In quality control, variance is used to assess the consistency of a process.
+== Relationship with Standard Deviation ==
+The standard deviation is the square root of the variance. It provides a measure of dispersion in the same units as the data, making it more interpretable than variance.
+== Related Concepts ==
 * [[Standard deviation]]
-* [[Mean]]
+* [[Covariance]]
-* [[Statistical dispersion]]
+* [[Chi-squared distribution]]
-* [[Expected value]]
+== Related pages ==
+* [[Standard deviation]]
+* [[Probability theory]]
+* [[Statistics]]
 == References ==
-<references />
+* Hogg, R. V., & Craig, A. T. (1995). ''Introduction to Mathematical Statistics''. Prentice Hall.
+* Rice, J. A. (2006). ''Mathematical Statistics and Data Analysis''. Duxbury Press.
-[[Category:Statistics]]
 [[Category:Statistical deviation and dispersion]]
-{{stub}}