Answer: (72.535, 76.665)
Step-by-step explanation:
The confidence interval for population mean is given by :-
[tex]\overline{x}\pm z^*\dfrac{\sigma}{\sqrt{n}}[/tex]
, where [tex]\sigma[/tex] = population standard deviation.
n= Sample size
[tex]\overline{x}[/tex] = sample mean.
[tex]z^*[/tex] = Critical z-value (two-tailed)
Given : [tex]\sigma=11.3[/tex]
n= 81
[tex]\overline{x}=74.6[/tex]
The critical values for 90% confidence interval : [tex]z^*=\pm1.645[/tex]
Now, the confidence interval for population mean would be :
[tex]74.6\pm (1.645)\dfrac{11.3}{\sqrt{81}}\\\\=74.6\pm(1.645)(\dfrac{11.3}{9})\approx74.6\pm2.065\\\\=(74.6-2.065,\ 74.6+2.065)\\\\=(72.535,\ 76.665)[/tex]
Hence, a 90 percent confidence interval estimatefor the average score of all students. : (72.535, 76.665)
