I've written a monte carlo program to calculate ln(2). I generate random x in the range 1-2 and random y in the range 0-1. If y<1/x I add 1 to my count. My estimate of ln(2) is count/n (i.e. frac from above). I'm trying to find the error in my estimate so that I can end the program once my estimate is accurate to 2dp. I am not sure how to compute the standard deviation in a meaningful way. Help?
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How would you like to calculate the error?– dlaskNov 2, 2015 at 21:05
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1Try to describe more clearly how this program should actually work, from beginning to end. As it is, it is a complete mystery how you are attempting to do any computation.– David KNov 2, 2015 at 21:52
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FYI, in general, problems like this are better answered at Cross Validated. This is not a programming question.– Chris A.Nov 2, 2015 at 22:34
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@ChrisA. Okay thanks I'll bare that in mind! I've only recently started programming so I'm still learning where's best to get help when I get stuck on different problems.– GoodsNov 2, 2015 at 23:27
1 Answer
I believe the answer you want is related to the binomial random variance.
For a binomial variable you would have a number of counts related to the times when it was under the curve, U
, and a number of times it was above the curve, A
. Let N = U + A
be the total number of samples.
A reasonable estimate of your standard deviation of U
would be sigma = sqrt(U/N * A/N * N)
. This is because U
is a binomial random variable and your best estimate of p
, the probability of it being under the curve on a single trial, is well estimated by U/N
. Note also that 1-p
is well estimated by A/N
.
But the thing you're estimating is U/N
so a reasonable estimate of your standard deviation of your estimate of ln(2)
is going to be sigma / N
.
This will provide you a reasonable stopping criterion (when sigma / N
is sufficiently small for your needs.)