Answer: (17.42, 20.78)
Step-by-step explanation:
As per given , we have
Sample size : n= 9
[tex]\overline{x}=19.1[/tex] years
Population standard deviation is not given , so it follows t-distribution.
Sample standard deviation : s= 1.5 years
Confidence level : 99% or 0.99
Significance level : [tex]\alpha= 1-0.99=0.01[/tex]
Degree of freedom : df= 8 (∵df =n-1)
Critical value : [tex]t_c=t_{(\alpha/2,\ df)}=t_{0.005,\ 8}= 3.355[/tex]
The 99% confidence interval for the population mean would be :-
[tex]\overline{x}\pm t_c\dfrac{s}{\sqrt{n}}[/tex]
[tex]19.1\pm (3.355)\dfrac{1.5}{\sqrt{ 9}}\\\\=19.1\pm1.6775\\\\=(19.1-1.6775,\ 19.1+1.6775)\\\\=(17.4225,\ 20.7775)\approx(17.42,\ 20.78)[/tex]
Hence, the 99% confidence interval for the population mean is (17.42, 20.78) .
