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I am aware of many probabilistic functions builted-in python, with the random module.

I'd like to know if, given a list of floats, would be possible to find the distribution equation that best fits the list?

I don't know if numpy does it, but this function could be compared (not equal, but similar) with the Excel's "Trend" function.

How would I do that?

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A distribution isn't a best fit curve. It has a max of 1 and a min of 0, and an integral from -inf to inf which equals 1. What are you trying to do with this curve? –  Blender Apr 23 '11 at 5:51
    
@Blender I have, for example, 10 types of operations (work with a vessel). And a history of 10 years of work with this types of operations. I'm trying to simulate the next year of opearations, based on the history, but applying random generators for each type of operation. This random generator will be applied to the duration of each request, the date when each request occurs and how many requests will happen. And I'm not interested on user enter this data. Because of that I'm looking for a way to automatically entry these random distributions. –  Gabriel L. Oliveira Apr 23 '11 at 21:58

1 Answer 1

up vote 5 down vote accepted

Look at numpy.polyfit

numpy.polyfit(x, y, deg, rcond=None, full=False)¶
Least squares polynomial fit.

Fit a polynomial p(x) = p[0] * x**deg + ... + p[deg] of degree deg to points (x, y).
Returns a vector of coefficients p that minimises the squared error.
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Could you look at my comment to see if you have another tip? –  Gabriel L. Oliveira Apr 25 '11 at 3:52
    
Looking closer, this fits my needs. Thank you. –  Gabriel L. Oliveira Apr 25 '11 at 7:24

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