Answer: The z-scores for a woman 6 feet tall is 2.96 and the z-scores for a a man 5'10" tall is 0.25.
Step-by-step explanation:
Let x and y area the random variable that represents the heights of women and men.
Given : The heights of women aged 20 to 29 are approximately Normal with mean 64 inches and standard deviation 2.7 inches.
i.e. [tex]\mu_1 = 64[/tex] [tex]\sigma_1=2.7[/tex]
Since , [tex]z=\dfrac{x-\mu}{\sigma}[/tex]
Then, z-score corresponds to a woman 6 feet tall (i.e. x=72 inches).
[∵ 1 foot = 12 inches , 6 feet = 6(12)=72 inches]
[tex]z=\dfrac{72-64}{2.7}=2.96296296\approx2.96[/tex]
Men the same age have mean height 69.3 inches with standard deviation 2.8 inches.
i.e. [tex]\mu_2 = 69.3[/tex] [tex]\sigma_2=2.8[/tex]
Then, z-score corresponds to a man 5'10" tall (i.e. y =70 inches).
[∵ 1 foot = 12 inches , 5 feet 10 inches= 5(12)+10=70 inches]
[tex]z=\dfrac{70-69.3}{2.8}=0.25[/tex]
∴ The z-scores for a woman 6 feet tall is 2.96 and the z-scores for a a man 5'10" tall is 0.25.
