Confidence interval using binofit

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Javier
Javier on 12 Sep 2012
Hello all,
I was doing a test using binofit to calculate the confidence interval for a binomial distribution. I found that the confidence interval corresponds to the desired confidence level only when p is not very small. When p is small the obtained confidence level is higher than desired.
For a 95% I tried:
N=1000;
g=zeros(N,1);
Nb = 1000;
p = 1/5;
for n=1:N
x=binornd(Nb,p);
[phat,pci]=binofit(x,Nb);
g(n)= (p>pci(1)) && (p<pci(2));
end
sum(g)/N
ans =
0.9570
However, if p is decreased by a factor of 100:
N=1000;
g=zeros(N,1);
Nb = 1000;
p = 1/500;
for n=1:N
x=binornd(Nb,p);
[phat,pci]=binofit(x,Nb);
g(n)= (p>pci(1)) && (p<pci(2));
end
sum(g)/N
ans =
0.9900
Any idea of why this happens? Is there a better way to calculate the confidence interval in this case?
Thanks in advance

Accepted Answer

Tom Lane
Tom Lane on 12 Sep 2012
The binofit function computes confidence intervals using the Clopper-Pearson method.
I believe what you're seeing is because the distribution is very coarse for N*p values on the order of 1. With N=1000 and p=1/500,
>> binocdf(4:5,1000,1/500)
ans =
0.9475 0.9835
So in order for the confidence interval to have at least a 95% chance of including p=1/500, the intervals based on x=4 and x=5 would both have to include p. So the coverage probability will be over 98%.
Try increasing to N=100000 in your example and see if the results match.

More Answers (1)

Javier
Javier on 14 Sep 2012
Thanks!

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