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If the amount of change a statistics student carries has a mean of $0.88 and a standard deviation of $0.30, suppose that we randomly pick 36 online statistics students. Find the probability the average of 36 students is between $.80 and $1. The Probability that an individual student has between $.80 and $1 is .9370.

User Maxim Eliseev
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1 Answer

6 votes
6 votes

We have the following:

We must calculate the value of z

a.


Z=(x-m)/(s)

x, is the value to evalute (0.8 - 1)

m, is the mean (0.88)

s, is the standard deviation (0.3)

n, is the sample size (36)


\begin{gathered} (0.8-0.88)/(0.3)Now,[tex]0.6554-0.3974=0.258

Therefore, the probability is 0.258 or 25.8%

b.


Z=\frac{x-m}{\frac{s}{\sqrt[]{n}}}

x, is the value to evalute (0.8 - 1)

m, is the mean (0.88)

s, is the standard deviation (0.3)

n, is the sample size (36)

replacing:


\begin{gathered} \frac{0.8-0.88}{\frac{0.3}{\sqrt[]{36}}}now,[tex]0.9918-0.0548=0.937

Therefore, the probability is 0.937 or 93.7%

If the amount of change a statistics student carries has a mean of $0.88 and a standard-example-1
If the amount of change a statistics student carries has a mean of $0.88 and a standard-example-2
User Smargh
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