For large n, the sampling distribution of S=sqrt{1/(n=1) sum_{i=1}^{n}(X_i-X)^2} is sometime approximated with a normal distribution having the mean sigma and the variance (sigma^2)/(2n)

Randall Booker

Randall Booker

Answered question

2022-09-05

For large n, the sampling distribution of S = 1 n 1 i = 1 n ( X i X ) 2 is sometime approximated with a normal distribution having the mean σ and the variance σ 2 2 n . Show that this approximation leads to the following ( 1 α ) 100 % large-sample confidence interval for σ:
S 1 + Z α / 2 2 n < σ < S 1 Z α / 2 2 n
I'm just unclear what σ represents here. Am looking for a confidence interval where μ = σ? or looking for the confidence interval where σ = σ 2 / n ?? any hints on where to start this?

Answer & Explanation

Grace Moses

Grace Moses

Beginner2022-09-06Added 13 answers

Step 1
σ is the standard deviation of your initial sample X 1 , , X n , and S is the usual estimator of the standard deviation of a sample where also the mean is unknwon. What you're told is that
S N ( σ , σ 2 2 n )
Step 2
where means approximately distributed as. So yes, the mean of S is σ where σ is the standard deviation of X i . Note that the above implies that
S σ σ = S σ 1 N ( 0 , 1 2 n )
which enables you to arrive at that confidence interval.

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