According to the June 2004 Readers\' Digest article \"Only in America,\" the ave
ID: 3395815 • Letter: A
Question
According to the June 2004 Readers' Digest article "Only in America," the average amount that a 17-year-old spends on his or her high school prom is $640 Assume that the amounts spent are normally distributed with a standard deviation of $185. (Give your answers correct to four decimal places.)
(a) Find the probability that the mean cost to attend a high school prom for 26 randomly selected high school 17-year-olds is between $548 and $704.
(b) Find the probability that the mean cost to attend a high school prom for 26 randomly selected high school 17-year-olds is greater than $749.
Explanation / Answer
Let X be the random variable that the amounts spent on a 17-year-old spends on his or her high school prom.
X ~ Normal ( µ = $640, = $185)
(a) Find the probability that the mean cost to attend a high school prom for 26 randomly selected high school 17-year-olds is between $548 and $704.
n = 26
We have to find the P(548 < Xbar < 704)
where Xbar is sample mean.
First we have to convert Xbar into standard normal distribution.
We know than Xbar ~ Normal(mean = µ, sd = /sqrt(n) )
sd = /sqrt(n) = 185 / sqrt(26) = 36.2815
Z-score for Xbar = 548 is,
Z-score = (Xbar - mean) / sd
Z-score = (548-640) / 36.2815 = -2.5357
Z-score for Xbar = 704 is,
Z-score = (704 - 640) / 36.2815 = 1.7640
So we have to find P(-2.5357 < Z < 1.7640) = P(Z < 1.7640) - P(Z < -2.5357)
This probability we can find by using EXCEL.
syntax :
=NORMSDIST(z)
where, z is the test statistic value.
P(-2.5357 < Z < 1.7640) = 0.9611 - 0.0056 = 0.9555
(b) Find the probability that the mean cost to attend a high school prom for 26 randomly selected high school 17-year-olds is greater than $749.
Here we have to find P(Xbar > 749)
Convert Xbar into Z-score.
Z-score for Xbar = 749 is,
Z-score = (749 - 640) / 36.2815
Z-score = 3.0043
P(Z >= 3.0043) = 1 - P(Z < 3.0043)
P(Z >= 3.0043) = 1 - 0.9987 = 0.0013
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