# How can I estimate the shape and scale of a gamma dist. with a particular mean and a 95% quantile?

Is there any way, in R, to calculate the scale and shape of a gamma distribution, given a particular value of mean (or median) and a particular quantile (the 95% quantile)?

So for example I have a mean = 130

and a 95% quantile = 300

with an offset of the distribution at 80

is there any way to obtain the scale and shape of a gamma that meet these criteria?

-

Here is one approach:

``````myfun <- function(shape) {
scale <- 130/shape
pgamma(300, shape, scale=scale) - 0.95
}

tmp <- uniroot( myfun, lower=2, upper=10 )

myshape <- tmp\$root
myscale <- 130/tmp\$root

qgamma(0.95, shape=myshape, scale=myscale)
integrate( function(x) x*dgamma(x,shape=myshape,scale=myscale),
lower=0, upper=Inf )
``````

I am not sure what you mean by offset of 80, if that is just where the gamma becomes non-zero then subtract 80 from 130 and 300 and do the same as above.

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thank you, it seems though that for some combinations of numbers (for example: mean =8, quartile 95% = 32) this isnt working, it gives an error such as: Error in uniroot(myfun, lower = 2, upper = 10) : f() values at end points not of opposite sign – user18441 Jan 11 '13 at 22:54
@user18441, you need to give it starting values that bracket the answer, meaning one of them returns a postive value from `myfun` and the other a negative. Try a few values and see what you get, then choose 2 for the starting values. See `?uniroot` for more detail. – Greg Snow Jan 12 '13 at 18:47