In statistics, given a set of data,

X = { x₁, x₂, ..., x_n}

and corresponding weights,

W = { w₁, w₂, ..., w_n}

the weighted geometric mean is calculated as

$\backslash bar\{x\}\; =\; \backslash left(\backslash prod\_\{i=1\}^n\; x\_i^\{w\_i\}\backslash right)^\{1\; /\; \backslash sum\_\{i=1\}^n\; w\_i\}\; =\; \backslash quad\; \backslash exp\; \backslash left(\; \backslash frac\{1\}\{\backslash sum\_\{i=1\}^n\; w\_i\}\; \backslash ;\; \backslash sum\_\{i=1\}^n\; w\_i\; \backslash ln\; x\_i\; \backslash right)$

Note that if all the weights are equal, the weighted geometric mean is the same as the geometric mean.

Weighted versions of other means can also be calculated. Probably the best known weighted mean is the weighted arithmetic mean, usually simply called the weighted mean. Another example of a weighted mean is the weighted harmonic mean.

See also

• average
• central tendency
• summary statistics

Statistics | Mathematical analysis

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