Respuesta :
Answer:
The 95% confidence interval for difference between population proportion is (-0.0194, -0.0006).
Step-by-step explanation:
The confidence interval for difference in population proportion formula is,
[tex](\hat p_{2}-\hat p_{2})\pm z_{\alpha/2}\times \sqrt{\frac{\hat p_{1}(1-\hat p_{1})}{n_{1}}+\frac{\hat p_{2}(1-\hat p_{2})}{n_{2}}}[/tex]
The given information is:
n₁ = 11508
X₁ = 921
n₂ = 4967
X₂ = 452.
Compute the sample proportion values as follows:
[tex]\hat p_{1}=\frac{X_{1}}{n_{1}}=\frac{921}{11508}=0.08\\\\\hat p_{2}=\frac{X_{2}}{n_{2}}=\frac{452}{4967}=0.09\\[/tex]
The critical value of z for 95% confidence interval is:
[tex]z_{\alpha/2}=z_{0.05/2}=z_{0.025}=1.96[/tex]
*Use the standard normal table.
Compute the 95% confidence interval for difference between proportions as follows:
[tex]CI=(\hat p_{2}-\hat p_{2})\pm z_{\alpha/2}\times \sqrt{\frac{\hat p_{1}(1-\hat p_{1})}{n_{1}}+\frac{\hat p_{2}(1-\hat p_{2})}{n_{2}}}\\=(0.08-0.09)\pm1.96\times \sqrt{\frac{0.08(1-0.08)}{11508}+\frac{0.09(1-0.09)}{4967}}\\=-0.01\pm0.0094\\=(-0.0194, -0.0006)[/tex]
Thus, the 95% confidence interval for difference between population proportion is (-0.0194, -0.0006).
