I am trying to calculate upper and lower confidence levels for a parameter, but i can't get it straight (in this case sigma^2): the reference variable: R_(sigma^2):=(n-1_(s^2))/(sigma^2)~chi^2(n-1) where s^2=1/(n-1)sum_(i=1)^n(x_i-bar(x))^2

jatericrimson8b

jatericrimson8b

Answered question

2022-09-05

I am trying to calculate upper and lower confidence levels for a parameter, but i can't get it straight (in this case σ 2 ):
the reference variable: R σ 2 := n 1 s 2 σ 2 χ 2 ( n 1 )
where s 2 = 1 n 1 i = 1 n ( x i x ¯ ) 2

Answer & Explanation

Krista Leon

Krista Leon

Beginner2022-09-06Added 12 answers

Step 1
α = P ( R σ 2 > χ α , n 1 2 ) = P ( ( n 1 ) s 2 σ 2 > χ α , n 1 2 ) = P ( σ 2 ( n 1 ) s 2 > 1 χ 1 α , n 1 2 )
= P ( σ 2 > ( n 1 ) s 2 χ 1 α , n 1 2 ) σ 2 ¯ = ( n 1 ) s 2 χ 1 α , n 1 2 .
A good way to check your answer is that you know when α becomes small, χ α , n 1 2 becomes large and χ α , n 1 2 becomes small for any value of n > 1 . This means that 1 χ 1 α , n 1 2 becomes increasingly large as α 0 , , so you know that 1 χ 1 α , n 1 2 is the upper confidence level.

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