Respuesta :
Answer:
95% Confidence interval for the variance:
[tex]3.6511\leq \sigma^2\leq 34.5972[/tex]
95% Confidence interval for the standard deviation:
[tex]1.9108\leq \sigma \leq 5.8819[/tex]
Step-by-step explanation:
We have to calculate a 95% confidence interval for the standard deviation σ and the variance σ².
The sample, of size n=8, has a standard deviation of s=2.89 miles.
Then, the variance of the sample is
[tex]s^2=2.89^2=8.3521[/tex]
The confidence interval for the variance is:
[tex]\dfrac{ (n - 1) s^2}{ \chi_{\alpha/2}^2} \leq \sigma^2 \leq \dfrac{ (n - 1) s^2}{\chi_{1-\alpha/2}^2}[/tex]
The critical values for the Chi-square distribution for a 95% confidence (α=0.05) interval are:
[tex]\chi_{0.025}=1.6899\\\\\chi_{0.975}=16.0128[/tex]
Then, the confidence interval can be calculated as:
[tex]\dfrac{ (8 - 1) 8.3521}{ 16.0128} \leq \sigma^2 \leq \dfrac{ (8 - 1) 8.3521}{1.6899}\\\\\\3.6511\leq \sigma^2\leq 34.5972[/tex]
If we calculate the square root for each bound we will have the confidence interval for the standard deviation:
[tex]\sqrt{3.6511}\leq \sigma\leq \sqrt{34.5972}\\\\\\1.9108\leq \sigma \leq 5.8819[/tex]
