Answer:
The population proportion is estimated to be with 99% confidence within the interval (0.1238, 0.2012).
Step-by-step explanation:
The formula for estimating the population proportion by a confidence interval is given by:
[tex]\hat{p}\pm z_{\alpha /2}\times\sqrt{\frac{\hat{p}\times(1-\hat{p})}{n}}[/tex]
Where:
[tex]\hat{p}[/tex] is the sample's proportion of success, which in this case is the people that regularly lie during surveys,
[tex]z_{\alpha /2}[/tex] is the critical value needed to find the tails of distribution related to the confidence level,
[tex]n[/tex] is the sample's size.
First we compute the [tex]\hat{p}[/tex] value:
[tex]\hat{p}=\frac{successes}{n}=\frac{98}{603}=0.1625[/tex]
Next we find the z-score at any z-distribution table or app (in this case i've used StatKey):
[tex]z_{\alpha /2}=2.576[/tex]
Now we can replace in the formula with the obtained values to compute the confidence interval:
[tex]\hat{p}\pm z_{\alpha /2}\times\sqrt{\frac{\hat{p}\times(1-\hat{p})}{n}}=0.1625\pm 2.576\times\sqrt{\frac{0.1625\times(1-0.1625)}{603}}=(0.1238, 0.2012)[/tex]
