Respuesta :
Answer:(33.922, 36.078)
Interpretation : We are 90% confident that the true average distance that commuting students travel to the campus lies between 33.922 and 36.078.
Step-by-step explanation:
Formula to find the confidence interval for population mean (when population standard deviation is unknown):-
[tex]\overline{x}\pm t_{\alpha/2}\dfrac{s}{\sqrt{n}}[/tex]
, where n = sample size.
[tex]\overline{x}[/tex] = sample mean.
[tex]s [/tex] = sample standard deviation.
[tex]t_{\alpha/2}[/tex] = two tailed t-value respected to the given confidence level (or significance level) and degree of freedom.
Let x represents the distance that commuting students travel to the campus .
[tex]\overline{x}\pm t_{\alpha/2}\dfrac{s}{\sqrt{n}}[/tex] n= 60
Degree of freedom(df) = 59 [df= n-1]
[tex]\overline{x}=35[/tex]
[tex]s=5 [/tex]
here, population standard deviation is not given , so we use t-test.
Confidence level : 90%
Significance level : [tex]\alpha=1-0.90=0.10[/tex]
Critical value for Significance level of 0.10 and degree of freedom 63 :-
[tex]t_{{df, \alpha/2}}=t_{(63,0.05)}=1.6694[/tex]
Then , the 90% confidence interval for the average distance that commuting students travel to the campus :-
[tex]35\pm (1.6694)\dfrac{5}{\sqrt{60}}\\\\ 35\pm 1.078\\\\=(35- 1.078,\ 35+ 1.078)\\\\=(33.922,\ 36.078)[/tex]
Thus , the 90% confidence interval for the average distance that commuting students travel to the campus : (33.922, 36.078)
Interpretation : We are 90% confident that the true average distance that commuting students travel to the campus lies between 33.922 and 36.078.
