Confidence interval is written in the form,
(point estimate +/- margin of error)
The given scenario involves population proportion
The formula for the point estimate is
p' = x/n
where
p' = estimated proportion of success. p' is a point estimate for p which is the true proportion
x represents the number of success
n represents the number of samples
From the information given,
n = 74
x = 22
p' = 22/74 = 0.297
The formula for finding margin of error is expressed as
![\begin{gathered} \text{margin of error = z}_{(\alpha)/(2)}(\sqrt[]{(p^(\prime)q^(\prime))/(n)} \\ q^(\prime)\text{ = 1 - p'} \\ q^(\prime)\text{ = 1 - 0.297 = 0.703} \end{gathered}](https://img.qammunity.org/2023/formulas/mathematics/college/s5iz8idmjg3d7ype7og6168y3321a68u89.png)
A) The point estimate is 0.297
B) margin of error = +/-3.1% = 3.1/100 = +/- 0.031
Thus,
the lower limit would be 0.297 - 0.031 = 0.266
Expressing in percentage, it is 0.266 x 100 = 26.6%
the upper limit would be 0.297 + 0.031 = 0.328
Expressing in percentage, it is 0.328 x 100 = 32.8%
Thus, the confidence interval is between 26.6% and 32.8%