Quadratic mean diameter

Last updated January 15, 2021

In forestry, quadratic mean diameter or QMD is a measure of central tendency which is considered more appropriate than arithmetic mean for characterizing the group of trees which have been measured. For n trees, QMD is calculated using the quadratic mean formula:

${\sqrt {\frac {\sum {D_{i}}^{2}}{n}}}$

where ${D_{i}}$ is the diameter at breast height of the i^th tree. Compared to the arithmetic mean, QMD assigns greater weight to larger trees – QMD is always greater than or equal to arithmetic mean for a given set of trees. QMD can be used in timber cruises to estimate the standing volume of timber in a forest, because it has the practical advantage of being directly related to basal area, which in turn is directly related to volume.^[1] QMD can also be calculated as:

${\sqrt {\frac {BA}{k*n}}}$

where BA is stand basal area, n is the number of trees, and k is a constant based on measurement units - for BA in ft² and DBH in inches, k=0.005454; for BA in m² and DBH in cm, k=0.0000785.

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References

↑ Curtis, Robert O.; Marshall, David D. (2000), "Why quadratic mean diameter?" (PDF), Western Journal of Applied Forestry, 15 (3): 137–139, retrieved 2012-06-13

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[1] Curtis, Robert O.; Marshall, David D. (2000), "Why quadratic mean diameter?" (PDF), Western Journal of Applied Forestry, 15 (3): 137–139, retrieved 2012-06-13

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