1 Answer

Dale Spiteri · Answer 1 · 2020-10-07T14:40:03+0000

Answer:
$0.12< \sigma<0.42$

Explanation:

Confidence interval for standard deviation is given by :-

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

Given : Confidence level :
$1-\alpha=0.95$

⇒
$\alpha=0.05$

Sample size : n= 7

Degree of freedom = 6 (df= n-1)

sample standard deviation : s= 0.19

Critical values by using chi-square distribution table :

$\chi^2_(\alpha/2, df)}=\chi^2_(0.025, 6)}=14.4494\\\\\chi^2_(1-\alpha/2, df)}=\chi^2_(0.975, 6)}=1.2373$

Confidence interval for standard deviation of the weights of the packages prepared by the machine is given by :-

$\sqrt{( 0.19^2(6))/(14.4494)}< \sigma<\sqrt{( 0.19^2(6))/(1.2373)}$

$\Rightarrow0.12243< \sigma<0.418400$

$\approx0.12< \sigma<0.42$

Hence, the 95% confidence interval to estimate the standard deviation of the weights of the packages prepared by the machine. :

$0.12< \sigma<0.42$

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