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I'm new to R. Having a set of samples along with the target, I want to fit a numeric function to solve the target of new samples. My sample is time in seconds indicating the duration of a user's staying at this place:

>b <- c(101,25711,13451,19442,26,3083,133,184,4403,9713,6918,10056,12201,10624,14984,5241,

Firstly, I convert them to hours dividing by 3600, and I want to fit a function as pdf of the duration:

> b <- b/3600
> hist(c,xlim=c(0,13),prob=T,breaks=seq(0,24,by=0.5))
> lines(density(x), col=red)

enter image description here

I want to fit the red line on the figure, and interpolate new values to find the probability of the specific duration on this place say p(duration = 1.5hours).

Thanks for your attention!

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Try MASS:fitdistr or optim if you know the likelihood function of your distribution. –  Roman Luštrik Mar 23 '13 at 8:06
...and note that the probability density at a single point is zero, you have to define a region, i.e. p(duration < 1.6 and duration > 1.4). –  Paul Hiemstra Mar 23 '13 at 8:11
Why not to use the density.. something like dd <- density(b);sum(dd$y[dd$x <1.5])/sum(dd$y) –  agstudy Mar 23 '13 at 10:04

1 Answer 1

up vote 2 down vote accepted

As suggested above, you can fit a distribution with fitdistr in MASS package. If you use a continuous distribution you will have the probability that the time is within an interval. If you use a discrete distribution, you may compute the probability of a certain time (in hours).

For the continuous case, you can use a Gamma distribution: fitdistr(b, "Gamma") will give you the parameter estimates, and then you can use pgamma with those estimates and an interval.

For the discrete case, you can use a Poisson distribution: fitdistr(b, "Poisson") and then the dpois function with the estimate and the value you want.

To decide which one to use, I'd just plot the pdf with the histogram and take a look.

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I think we should be more careful here... Why are you choosing a gamma distribution? His density can be anything. Without further knowledge, I'd suggest a non-parametric density estimator, using kernels or maybe just the histogram. –  Ferdinand.kraft Mar 23 '13 at 21:40
Yeah. I just said gamma by looking at the histogram he provided. Of course that is something to consider, but I guess it's up to him to decide what is sufficiently correct. –  Julián Urbano Mar 23 '13 at 21:51

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