The mean preparation fee H&R Block charged retail customers in 2012 was $183 (The Wall Street Journal, March 7, 2012). Use this price as the population mean and assume the population standard deviation of preparation fees is $50. Use z-table here (link below). Round to four decimal places.
a. What is the probability that the mean price for a sample of 30 H&R Block retail customers is within $8 of the population mean?
b. What is the probability that the mean price for a sample of 50 H&R Block retail customers is within $8 of the population mean?
c. What is the probability that the mean price for a sample of 100 H&R Block retail customers is within $8 of the population mean?
d. Which, if any, of the sample sizes in parts (a), (b), and (c) would you recommend to have at least a 0.95 probability that the sample mean is within $8 of the population mean?

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dogacandu dogacandu · Answer 1 · 2019-11-21T19:32:24+01:00

Answer:

a)0.6192

b)0.7422

c)0.8904

d)at least 151 sample is needed for 95% probability that sample mean falls within 8$ of the population mean.

Step-by-step explanation:

Let z(p) be the z-statistic of the probability that the mean price for a sample is within the margin of error. Then

z(p)=[tex]\frac{ME*\sqrt{N}}{s }[/tex] where

a.

z(p)=[tex]\frac{8*\sqrt{30}}{50 }[/tex] ≈ 0.8764

by looking z-table corresponding p value is 1-0.3808=0.6192

b.

z(p)=[tex]\frac{8*\sqrt{50}}{50 }[/tex] ≈ 1.1314

by looking z-table corresponding p value is 1-0.2578=0.7422

c.

z(p)=[tex]\frac{8*\sqrt{100}}{50 }[/tex] ≈ 1.6

by looking z-table corresponding p value is 1-0.1096=0.8904

d.

Minimum required sample size for 0.95 probability is

N≥[tex](\frac{z*s}{ME} )^2[/tex] where

then N≥[tex](\frac{1.96*50}{8} )^2[/tex] ≈150.6

Thus at least 151 sample is needed for 95% probability that sample mean falls within 8$ of the population mean.