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Folks,i have been trying to obtain a Gaussian fit for some data sets which somehow look like a distorted normal distribution.I have been using software to do that. I wonder if i can apply an iterative algorithm to convert these data sets to a Gaussian fitted curve,the standard deviation and mean of the original curve being the inputs.? Any ideas?

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You will probably get more informative answers at :) – huon Jun 8 '12 at 14:29
  1. Calculate the mean of the data: mu = 1/N Sum(xi)
  2. Calculate the dispersion of the data: sigma = sqrt(1/(N-1) Sum(xi-mu))
  3. Fill in the parameters: gauss = 1/(sigma*sqrt(2pi)))*exp(-1/2*((x-mu)/sigma)^2)

I don't see any need for fitting the beast with the easy math involved.

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This sure works in the majority of situations, but not all. For example, if the input data are integers and the distribution is very narrow, the estimator for the dispersion should be different. – ev-br Jun 8 '12 at 14:40
I believe the correct estimator for the dispersion is sqrt(1/(N-1) Sum(xi-mu)). The sample variance (the one you propose) has a slight bias.… – Mathias Jun 8 '12 at 16:12
@Mathias "correct" is a misleading word here, but I guess you're right. It's certainly "better" in non-theoretical contexts. – rubenvb Jun 8 '12 at 18:14
@rubenvb thanks a lot..The algorithm seems to produce neat results.But I just want to know if i get into the case which Zhenya pointed out.My guess is that it should work fairly fine. – user1425322 Jun 11 '12 at 6:06

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