# R: empirical version of pnorm() and qnorm()?

I have a normalization method that uses the normal distribution functions pnorm() and qnorm(). I want to alter my logic so that I can use empirical distributions instead of assuming normality. I've used ecdf() to calculate the empirical cumulative distributions but then realized I was beginning to write a function that basically was the p and q versions of the empirical. Is there a simpler way to do this? Maybe a package with pecdf() and qecdf()? I hate reinventing the wheel.

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You can use the `quantile` and `ecdf` functions to get `qecdf` and `pecdf`, respectively:

``````x <- rnorm(20)
quantile(x, 0.3, type=1) #30th percentile
Fx <- ecdf(x)
Fx(0.1)  # cdf at 0.1
``````
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yes! Thank you. I kept thinking "this has to be pretty simple" but I was having trouble coming up with an answer. Thank you. –  JD Long Jun 23 '10 at 14:04

'emulating' pnorm for an empirical distribution with ecdf:

``````> set.seed(42)
> x <- ecdf(rnorm(1000))
> x(0)
[1] 0.515
> pnorm(0)
[1] 0.5
``````
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Isn't that exactly what bootstrap p-values do?

If so, keep a vector, sort, and read out at the appropriate position (i.e. 500 for 5% on 10k reptitions). There are some subtle issue with with positions to pick as e.g. `help(quantile)` discusses under 'Types'.

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I think you are right. I just could not think of what function would do this. Thanks for the fast response. I was able to ask a question and get 2 answers before I got off the train. Fantastic. –  JD Long Jun 23 '10 at 13:43