1 Answer

Bluesmoon · Answer 1 · 2021-05-24T18:35:10+0000

Answer:

The 95% confidence interval is
$0.6428 < \sigma < 1.0954$

Explanation:

From the question we are told that

The sample size is n = 29

The sample standard deviation is
s = 0.81

Generally the 95% confidence interval to estimate the true standard deviation is mathematically represented as

$\sqrt{((n- 1)s^2 )/( X^2_( (\alpha )/(2 ) , n-1)) } < \sigma < \sqrt{((n- 1)s^2 )/( X^2_(1- (\alpha )/(2 ) , n-1)) }$

Generally from the chi -distribution table the critical value of
$(\alpha )/(2)$ at a degree of freedom of
df = 29 - 1 = 28 is

$X^2 _{(\alpha )/(2) , 28 } =44.46079184$

Generally from the chi -distribution table the critical value of
$1 - (\alpha )/(2)$ at a degree of freedom of
df = 29 - 1 = 28 is

$X^2 _{(1 - (\alpha )/(2)) , 28 } = 15.30786055$

So

$\sqrt{((29- 1)0.81^2 )/( 44.46079184 ) } < \sigma < \sqrt{((29- 1)0.81^2 )/(15.315.307860551 )$

=>
$0.6428 < \sigma < 1.0954$

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