Respuesta :
Answer:
The confidence interval for the difference of proportions of the population p2003-p2008 is [tex]0.31\leq\Delta \pi \leq 0.37[/tex].
Step-by-step explanation:
In this question we have to construct a 90% confidence interval (CI) for a difference of proportions.
The proportion for 2003 is [tex]p_1=1085/1508=0.72[/tex].
The proportion for 2008 is [tex]p_2=570/1508=0.38[/tex].
The difference in proportions is [tex]\Delta p=p_1-p_2=0.72-0.38=0.34[/tex].
The standard deviation of the difference of proportions can be estimated as:
[tex]s=\sqrt{\frac{p_1(1-p_1)}{n_1}+\frac{p_2(1-p_2)}{n_2} }=\sqrt{\frac{0.72(1-0.72)}{1508}+\frac{0.38(1-0.38)}{1508} }=\sqrt{0.00029} =0.017[/tex]
For a 90% CI, the z-value is 1.64.
Then we can construct the CI as
[tex]\Delta p-z\sigma\leq\Delta \pi \leq\Delta p+z\sigma\\\\0.34-1.64*0.017\leq\Delta \pi \leq0.34+1.64*0.017\\\\ 0.34-0.03\leq\Delta \pi \leq0.34+0.03\\\\0.31\leq\Delta \pi \leq 0.37[/tex]
