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Calculates the geometric mean, which is a measure of central tendency that calculates an average of the data using multiplication instead of addition. For a set of n numbers, the geometric mean is the nth root of the product of those numbers. For example, the geometric mean of the numbers 2, 3, and 14 equals (2 * 3 * 14)1/3 = (84)1/3 = 4.37952.
GMEAN(number)
For number, specify the column number. All values must be greater than 0.
| Column | Calculator expression | Result |
|---|---|---|
| C1 contains 6, 3, 15 | GMEAN (C1) | 6.4633040701 |
Use the geometric mean, not the arithmetic mean, when you need to determine the average of the factors in a product. For example, to determine the average rate of a return for an investment that earns 8% the first year and 52% the second year, calculate the geometric mean (1.08 * 1.52)1/2 ≈ 1.28 (an average return of 28%).
In statistics, the geometric mean (weighted) is used to determine the composite desirability in response optimization and the sample variance for Bartlett's test statistic for normal distributions.
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