Answer:
So, the confidence interval is [34.08, 38.72].
Step-by-step explanation:
We know that a random sample of 18 fields of barley has a mean yield of 36.4 bushels per acre and standard deviation of 7.37 bushels per acre.
We have :
[tex]n=18\\\\\mu=36.4\\\\\sigma=7.37\\\\c=80\%[/tex]
We use the Appendix: Critical Values Tables, and we get that:
[tex]t_{\frac{\alpha}{2}}=1.333[/tex]
We calculate the margin of error:
[tex]E=t_{\frac{\alpha}{2}}\cdot \frac{\sigma}{\sqrt{n}}=1.333\cdot \frac{7.37}{\sqrt{18}}=2.32[/tex]
We get the boundaries of the confidence interval:
[tex]\mu-E=36.4-2.32=34.08\\\\\mu+E=36.4+2.32=38.72\\[/tex]
So, the confidence interval is [34.08, 38.72].
