Answer: (0.143, 0.257)
Step-by-step explanation:
Given : Level of significance : [tex]1-\alpha:0.99[/tex]
Then , significance level : [tex]\alpha: 1-0.99=0.01[/tex]
Since , sample size : [tex]n=300[/tex] .
Critical value : [tex]z_{\alpha/2}=2.576[/tex]
Also, the proportion of people said that they were fans of the visiting team :-
[tex]\hat{p}=\dfrac{ 60}{300}\approx0.2[/tex]
The confidence interval for population proportion is given by :-
[tex]\hat{p}\pm z_{\alpha/2}\sqrt{\dfrac{\hat{p}(1-\hat{p})}{n}}[/tex]
[tex]0.2\pm(2.576)\sqrt{\dfrac{0.2(1-0.2)}{329}}\\\\\approx0.2\pm0.057\\\\=(0.2-0.057, 0.2+0.056=(0.143,\ 0.257) [/tex]
Hence, the confidence interval for the population proportion with a 99% confidence level= (0.143, 0.257)
Answer:
.141, .259
p′=60300=0.2.
The standard error of the sampling distribution of the sample proportion is
σp′=p^(1−p′)n−−−−−−−−√=0.2(1−0.2)300−−−−−−−−−−√≈0.023.
With zα2=2.576 for a confidence level of 99%, the margin of error is thus
marginof error=(zα2)σp′≈(2.576)(0.023)≈0.059.
With point estimate p′=0.2=0.200 and a margin of error of 0.059, the confidence interval is
(0.200−0.059,0.200+0.059)(0.141,0.259).
We estimate with 99% confidence that the true population proportion of people who rent their home is between 0.141 and 0.259.
