It is believed that large doses of acetaminophen (the active ingredient in over the counter pain relievers like Tylenol) may cause damage to the liver. A researcher wants to conduct a study to estimate the proportion of acetaminophen users who have liver damage. If she wants to limit the margin of error of her 98% confidence interval to be no more than 3%, what is the minimum number of subjects that she needs to recruit? [Note: The researcher has no expectations about what the sample proportion should be ahead of time, so she – and you – should use p = 0.5 to get the most conservative estimate.]

Answer: 1509Step-by-step explanation: Given : A researcher wants to conduct a study to estimate the proportion of acetaminophen users who have liver damage. WithConfidence level = 98% Margin of error : E=0.03We know that the z-value for 98% confidence = [tex]z_c=2.33[/tex]  [using z-value table]Formula to find the sample size : [tex]n=p(1-p)(\dfrac{z_c}{E})^2\\\\[/tex] , where p is the prior estimate of population proportion.The researcher has no expectations about what the sample proportion should be ahead of time, so we should use p = 0.5 to get the most conservative estimate.Then , [tex]n=(0.5)(1-0.5)(\dfrac{2.33}{0.03})^2[/tex]Simplify , [tex]n=(0.5)(1-0.5)(\dfrac{2.33}{0.03})^2=1508.02777778\approx1509[/tex]The minimum number of subjects that she needs to recruit = 1509