Answer: [tex](16.4,\ 16.6)[/tex]
Step-by-step explanation:
Given : Sample size : n= 3861
Significance level : [tex]\alpha=1-0.98=0.02[/tex]
Critical value for significance level of [tex]\alpha=0.02[/tex] : [tex]z_{\alpha/2}= 2.33[/tex]
Sample mean : [tex]\overline{x}=16.5[/tex]
Standard deviation : [tex]\sigma= 2.5[/tex]
The formula to find the confidence interval for population mean is given by :-
[tex]\overline{x}\pm z_{\alpha/2}\dfrac{\sigma}{\sqrt{n}}[/tex]
i.e [tex]16.5\pm (2.33)\dfrac{2.5}{\sqrt{3861}}[/tex]
[tex]=16.5\pm0.0937445500445\\\\\approx16.5\pm0.1=(16.5-0.1,\ 16.5+0.1)=(16.4,\ 16.6)[/tex]
Hence, the 98% confidence interval for the mean usage of electricity :
[tex](16.4,\ 16.6)[/tex]
