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Then you can go through the proof and show that the PDF of X and Y ~ N[0, 1]
 
Then you can go through the proof and show that the PDF of X and Y ~ N[0, 1]
 +
(The proof involves calculating the CDF of A and w, then the joint CDF of A and w to get the CDF of X or Y, then differentiat to get the PDF of X or Y)
  
 
so in c to produce a random variable with a gaussian distribution you simply do the following
 
so in c to produce a random variable with a gaussian distribution you simply do the following

Revision as of 17:03, 20 October 2008

We create variables :

A ~ exp(1/2)

w ~ unif[0, 2pi]

then let :

$ X = \sqrt(A)cos(w) $

$ Y = \sqrt(A)sin(w) $

Then you can go through the proof and show that the PDF of X and Y ~ N[0, 1] (The proof involves calculating the CDF of A and w, then the joint CDF of A and w to get the CDF of X or Y, then differentiat to get the PDF of X or Y)

so in c to produce a random variable with a gaussian distribution you simply do the following

$ \sqrt(A) cos(drand48()) $

where A is what you solved for from part b of problem 1

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