A certain brand of apple juice is supposed to have 64 ounces of juice. The filling machine is not precise, and the exact amount of juice varies from bottle to bottle. Because the penalty for under filling is severe, the quality control manager wishes to verify the mean amount of juice in each bottle. She takes a random sample of 25 bottles, finding a mean of 63.6 ounces and a standard deviation of 0.8 ounces. The data from the 25 bottles appears unimodal and symmetric.
What sample size would allow her to construct a 95% confidence interval for the true mean number of ounces of apple juice that is filled, with margin of error of only 0.1 ounces?
Due to rounding, select the best possible answer.
Group of answer choices
A 188
B 82
C 246
D 96
Sample size = (Z/2 * / E)2
= ( 1.96 * 0.8 / 0.1)2
= 245.86
Sample size = 246 (Rounded up to nearest integer)
A certain brand of apple juice is supposed to have 64 ounces of juice. The filling...
A certain brand of apple juice is supposed to have 64 ounces of juice. The filling machine is not precise, and the exact amount of juice varies from bottle to bottle. Because the penalty for under filling is severe, the quality control manager wishes to verify the mean amount of juice in each bottle. She takes a random sample of 25 bottles, finding a mean of 63.6 ounces and a standard deviation of 0.8 ounces. The data from the 25...
Problems 9-12: A bottle of Sunny Day orange juice is supposed to contain 64 ounces of juice. A random sample of 25 bottles of orange juice had a mean of 63.8 oz. with a standard deviation of 0.35 oz. Use a 0.05 significance level to test the claim that the mean amount of juice in all bottles is different from 64 ounces. State the appropriate null and alternative hypotheses. B 1 A 9 A ve G a + E =...