The manager of a pizza chain in Albuquerque, New Mexico, wants to determine the

Question

The manager of a pizza chain in Albuquerque, New Mexico, wants to determine the average size of their advertised 13-inch pizzas. She takes a random sample of 30 pizzas and records their mean and standard deviation as 13.50 and 2.10 inches, respectively. She subsequently computes a 95% confidence interval of the mean size of all pizzas as [12.75, 14.25]. However, she finds this interval to be too broad to implement quality control and decides to reestimate the mean based on a bigger sample. Using the standard deviation estimate of 2.10 from her earlier analysis, how large a sample must she take if she wants the margin of error to be under 0.5 inch? Use Table 1. (Round intermediate calculations to 4 decimal places and "z" value to 2 decimal places. Round up your answer to the nearest whole number.)

  Sample size

#27

Explanation / Answer

the formula for margin of error = zscore*standard deviation/sqrt(n)

we need to find the n

the margin of error = 2.10

the z value = 1.96

therefore according to question

0.5 = 1.96*2.10/sqrt(n)

squaring both sides

n =( 1.96*2.10/0.5)^2

= 68

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