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I have fitted the Weibull, lognormal and Gamma distributions to my claim amount data using the fitdistr in R. I want to choose which one fits my sample data the best using the AIC in R. How do I proceed?

closed as too broad by joran, Thomas, JasonMArcher, James A Mohler, WrightsCS Feb 27 '14 at 18:58

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  • Please include the code that you've tried so far. What is not working for you? In the event that you're completely unsure of how to proceed, Googling for R fitdistr AIC returned several promising results. – dg99 Feb 21 '14 at 19:32
5

You can use the AIC function:

set.seed(1)
x <- rlnorm(100) # random values from a log-normal distribution

# fit distributions
library(MASS)
weibull <- fitdistr(x, "weibull")
lognormal <- fitdistr(x, "lognormal")
gamma <- fitdistr(x, "gamma")

# compare AICs
AIC(weibull)
# [1] 300.9519
AIC(lognormal)
# [1] 287.0875
AIC(gamma)
# [1] 297.1818

Not surprisingly, the log-normal fit has the lowest AIC. This is the best fit.

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