# Geometric Mean: is there a built-in?

i tried to find a built-in for geometric mean but couldn't.

(Obviously a built-in isn't going to save me any time while working in the shell, nor do i suspect there's any difference in accuracy; for scripts i try to use built-ins as often as possible, where the (cumulative) performance gain is often noticeable.

In case there isn't one (which i doubt is the case) here's mine.

``````gm_mean = function(a){prod(a)^(1/length(a))}
``````
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Careful about negative numbers and overflows. prod(a) will under or overflow very quickly. I tried to time this using a big list and quickly got Inf using your method vs 1.4 with exp(mean(log(x))); the rounding problem can be quite severe. –  Tristan Apr 8 '10 at 22:12
i just wrote the function above quickly because i was sure that 5 min after posting this Q, someone would tell me R's built-in for gm. So no built-in so it's certain worth taking the time to re-code in light of your remarks. + 1 from me. –  doug Apr 8 '10 at 23:12

No, but there are a few people who have written one, such as here.

Another possibility is to use this:

``````exp(mean(log(x)))
``````
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I use exactly what Mark says. This way, even with tapply, you can use the built-in `mean` function, no need to define yours! For example, to compute per-group geometric means of data\$value:

``````exp(tapply(log(data\$value), data\$group, mean))
``````
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you can use `psych` package and call `geometric.mean` function in that.

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The

``````exp(mean(log(x)))
``````

will work unless there is a 0 in x. If so, the log will produce -Inf (-Infinite) which always results in a geometric mean of 0.

One solution is to remove the -Inf value before calculating the mean:

``````geo_mean <- function(data) {
log_data <- log(data)
gm <- exp(mean(log_data[is.finite(log_data)]))
return(gm)
}
``````

You can use a one-liner to do this but it means calculating the log twice which is inefficient.

``````exp(mean(log(i[is.finite(log(i))])))
``````
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