# Probability transformation using R

I want to turn a continuous random variable `X` with `cdf` `F(x)` into a continuous random variable `Y` with `cdf` `F(y)` and am wondering how to implement it in R.

For example, perform a probability transformation on data following normal distribution (X) to make it conform to a desirable Weibull distribution (Y).

(x=0 has CDF F(x=0)=0.5, CDF F(y)=0.5 corresponds to y=5, then x=0 corresponds to y=5 etc.)

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Most people here would probably look more favorably on your question if your post demonstrated some prior effort at programming a solution. – Mark Miller Jun 27 '13 at 21:11
I think perhaps this should go on cross-validated rather than stack overflow? – TooTone Jun 27 '13 at 21:56

There are many built in distribution functions, those starting with a 'p' will transform to a uniform and those starting with a 'q' will transform from a uniform. So the transform in your example can be done by:

``````y <- qweibull( pnorm( x ), 2, 6.0056 )
``````

Then just change the functions and/or parameters for other cases.

The distr package may also be of interest for additional capabilities.

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In general, you can transform an observation x on X to an observation y on Y by

• getting the probability of X≤x, i.e. FX(x).
• then determining what observation y has the same probability,

I.e. you want the probability Y≤y = FY(y) to be the same as FX(x).

This gives FY(y) = FX(x).

Therefore y = FY-1(FX(x))

where FY-1 is better known as the quantile function, QY. The overall transformation from X to Y is summarized as: Y = QY(FX(X)).

In your particular example, from the R help, the distribution functions for the normal distribution is `pnorm` and the quantile function for the Weibull distribution is `qweibull`, so you want to first of all call `pnorm`, then `qweibull` on the result.

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