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38 votes
38 votes
On a test that has a normal distribution, a score of 19 falls one standard deviation below the mean, and a score of 40 falls two standard deviations above the mean. Determine the mean of this test.

User Amir Molaa
by
2.8k points

1 Answer

12 votes
12 votes

Hi there!

We can use the following equation:


\large\boxed{z = (x-\mu)/(\sigma)}

z = amount of standard deviations away a value is from the mean (z-score)

σ = standard deviation

x = value

μ = mean

Plug in the knowns for both and rearrange to solve for the mean:


-1 = (19-\mu)/(\sigma)\\\\-\sigma = 19 - \mu\\\\ \sigma = -19 + \mu

Other given:


2 = (40-\mu)/(\sigma)\\\\2\sigma = 40- \mu\\\\ \sigma = 20 - (\mu)/(2)

Set both equal to each other and solve:


-19 + \mu = 20 - (\mu)/(2)\\\\(3\mu)/(2) = 39 \\\\3\mu = 78 \\\\\boxed{\mu = 26 }

User Sujiz
by
3.2k points
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