Answer:
(a) $200, 000, z-score= 3 and it is unusual.
(b) $55,000, z-score= -6.67 and it is unusual.
(c) $175,000, z-score= 1.33 and it is usual.
(d) $122,000, z-score= -2.2 and it is unusual
Explanation:
Given: Mean of sample= $155000
Standard deviation= $15000.
Now, calculating z-score of each given prices.
z-score= [tex]\frac{x-mean}{standard\ deviation}[/tex]
(a) Price= $200000
[tex]z-score = \frac{200000-155000}{15000}[/tex]
⇒[tex]z-score= \frac{\$45000}{\$ 15000} = 3[/tex]
It is unusual as score is very high.
b) $ 55000
[tex]z-score = \frac{55000-155000}{15000}[/tex]
⇒[tex]z-score = \frac{-100000}{15000}[/tex]
∴ [tex]z-score= -6.67[/tex]
It is unusual again as score it very low.
c) $ 175000
[tex]z-score = \frac{175000-155000}{15000}[/tex]
⇒ [tex]z-score = \frac{20000}{15000}= 1.33[/tex]
It is usual as score is in the top 0.30
d) $122000
[tex]z-score = \frac{122000-155000}{15000}[/tex]
⇒ [tex]z-score = \frac{33000}{15000}[/tex]
∴[tex]z-score= -2.2[/tex]
It is unusual as score is too low
