Respuesta :
Answer:
[tex](0.13-0.1) - 2.58 \sqrt{\frac{0.13(1-0.13)}{165} +\frac{0.10(1-0.10)}{140}}=-0.0664[/tex]
[tex](0.13-0.1) + 2.58 \sqrt{\frac{0.13(1-0.13)}{165} +\frac{0.10(1-0.10)}{140}}=0.124[/tex]
We are confident at 99% that the difference between the two proportions is between [tex]-0.0664 \leq p_1 -p_2 \leq 0.124[/tex] . And since the confidence interval cotains the value 0 we don't have enough evidence to conclude that we have significant differences between the to proportions in these two cities
Step-by-step explanation:
[tex]p_1[/tex] represent the real population proportion for 1
[tex]\hat p_1 =\frac{22}{165}=0.13[/tex] represent the estimated proportion for 1
[tex]n_1=165[/tex] is the sample size required for 1
[tex]p_2[/tex] represent the real population proportion for 2
[tex]\hat p_2 =\frac{14}{140}=0.10[/tex] represent the estimated proportion for 2
[tex]n_2=140[/tex] is the sample size required for 2
[tex]z[/tex] represent the critical value for the margin of error
The confidence interval for the difference of two proportions would be given by this formula
[tex](\hat p_1 -\hat p_2) \pm z_{\alpha/2} \sqrt{\frac{\hat p_1(1-\hat p_1)}{n_1} +\frac{\hat p_2 (1-\hat p_2)}{n_2}}[/tex]
For the 99% confidence interval the significance is [tex]\alpha=1-0.99=0.01[/tex] and [tex]\alpha/2=0.005[/tex], and the critical value using the normal standard distribution.
[tex]z_{\alpha/2}=2.58[/tex]
Replacing we got:
[tex](0.13-0.1) - 2.58 \sqrt{\frac{0.13(1-0.13)}{165} +\frac{0.10(1-0.10)}{140}}=-0.0664[/tex]
[tex](0.13-0.1) + 2.58 \sqrt{\frac{0.13(1-0.13)}{165} +\frac{0.10(1-0.10)}{140}}=0.124[/tex]
We are confident at 99% that the difference between the two proportions is between [tex]-0.0664 \leq p_1 -p_2 \leq 0.124[/tex] . And since the confidence interval cotains the value 0 we don't have enough evidence to conclude that we have significant differences between the to proportions in these two cities
