The heights of American men aged 18 to 24 are normally distributed with a mean o

Question

The heights of American men aged 18 to 24 are normally distributed with a mean of 68 and a standard deviation of 2.5 inches. Answer the following questions.

Half of all young men are taller than ?

About 95% of all young men have heights between ?

What is the probability that a man selected at random will have a height above 72 inches? Use your standard score table.

Suppose you took a sample of 49 men, what is the probability that their mean height is greater than 67 inches? Use your standard score table.

Explanation / Answer

Mean = 68

Deviation = 2.5

a.

Half of all young men are taller than ) = Mean of the distribution = 68

So, 1/2 of young men are taller than 68

b.

About 95% of all young men have heights between +/-Z*SE

=68 +/- 1.96*2.5

= 63.1 to 72.9

c. P(X>72)

= P(Z> 72-68 / 2.5)

= P(Z>4/2.5)

= 1-.9452

= .0548

d.

n = 49

P(X>67)

= P(Z> (67 -68) / (2.5/sqrt(49))

= P(Z>-2.8)

= 1-.0026

= .9974

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