The scores on an exam are normally distributed, with a mean of 77 and a standard deviation of 10. What percentage of the scores are greater than 87? 34% 50% 84% 16%

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asked Aug 11, 2023 170k views

1 vote

The scores on an exam are normally distributed, with a mean of 77 and a standard deviation of 10. What percentage of the scores are greater than 87? 34% 50% 84% 16%

Mathematics
college

Prule asked

by Prule

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1 Answer

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Given

$\begin{gathered} \mu=77 \\ \sigma=10 \end{gathered}$

The z-score formula is

$z=(x-\mu)/(\sigma)$

In our case,

$\Rightarrow z=(87-77)/(10)=(10)/(10)=1$

Using a z-score table,

$\Rightarrow P(X<87)=0.8413$

Then,

$\begin{gathered} P(X>87)=1-P(X<87)=1-0.8413=0.1587=15.87\% \\ \Rightarrow P(X>87)\approx16\% \end{gathered}$

Thus, the answer is 16%

Kamil Kamili answered Aug 16, 2023

by Kamil Kamili

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Thus, the answer is 16%

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