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I have a normal distribution with given mean 10 and variance 40. Now I want to know the probability that a number from this distribution is smaller than 0. Is it correct to use the following one-liner in MATLAB (in order to get the exact probability)?

normcdf(0,10,sqrt(40))
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1  
See for yourself, Monte Carlo style: mean(10+randn(1,1e7)*sqrt(40)<0) – Luis Mendo Jan 10 '14 at 0:06
    
@downvoters: I don't see a reason to downvote this. It may not be the deepest question ever, but as far as I can see it fulfills all the criteria for a question on SO. – A. Donda Jan 10 '14 at 21:47
up vote 2 down vote accepted

Yes, it is. Alternatively, you could write

normcdf(-10 / sqrt(40))

which gives the same result of 0.0569231490033291.

To double-check whether Matlab's implementation is correct, you can also look up the CDF at -10 / sqrt(40) = -1.58113883008419 in a normal distribution table. Wikipedia's table gives a CDF value of 0.9429 at z = 1.58; its complement is 0.0571 – a match given the limited precision.

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+1 Or, if you don't have the Stats toolbox: erfc(10/sqrt(40) / sqrt(2)) / 2 – Luis Mendo Jan 10 '14 at 0:10
    
Right, even better. – A. Donda Jan 10 '14 at 21:44

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