assume the average selling price for houses in a certain county is $295 comma 000 with a standard deviation of $56 comma 000. a) Determine the coefficient of variation. b) Caculate the z-score for a house that sells for $283 comma 000. c) Using the Empirical Rule, determine the range of prices that includes 95% of the homes around the mean. d) Using Chebychev's Theorem, determine the range of prices that includes at least 90% of the homes around the mean. a) Determine the coefficient of variation. CVequals 18.99% (Round to one decimal place as needed.) b) Calculate the z-score for a house that sells for $283 comma 000. zequals negative 0.21 (Round to two decimal places as needed.) c) Using the Empirical Rule, determine the range of prices that includes 95% of the homes around the mean. upper bound x equals $ nothing lower bound x equals $ nothing (Round to the nearest dollar as needed.) d) Using Chebychev's Theorem, determine the range of prices that includes at least 90% of the homes around the mean. upper bound x equals $ nothing lower bound x equals $ nothing (Round to the nearest dollar as needed.)

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ChiKesselman ChiKesselman · Answer 1 · 2020-02-18T10:27:44+01:00

Answer:

a) 18.98%

b) -0.2142

c) (183000,407000)

d) (127000,463000)

Step-by-step explanation:

We are given the following in the question:

Mean, μ = $295,000

Standard Deviation, σ = $56,000

a) Coefficient of variation

[tex]COV =\dfrac{\sigma}{\mu} = \dfrac{56000}{295000}\\\\=0.1898\\=18.98\%[/tex]

b) z-score

x = $283,000

Formula:

[tex]z_{score} = \displaystyle\frac{x-\mu}{\sigma}[/tex]

Putting the value, we get,

[tex]z_{score} = \displaystyle\frac{283000-295000}{56000} = -0.2142[/tex]

c) 95% interval

Empirical Rule:

According to this rule almost all the data lies within three standard deviation of mean for a normal distribution.
About 68% of data lies within one standard deviation of mean.
About 95% of data lies within two standard deviation of mean.

[tex]\mu \pm 2(\sigma)\\=295000 \pm 2(56000)\\=(183000,407000)[/tex]

Thus, the price of 95% of the homes lies between $183,000 and $407,000.

d) 90% interval

Chebyshev's Rule:

For a non normal data atleast [tex]1-\dfrac{1}{k^2}[/tex] percent of data lies within k standard deviation of mean.
For k = 3

[tex]1 - \dfrac{1}{(3)^2} = 88.89\% \approx 90\%[/tex]

Thus, 90% of prices will lies within three standard deviation of mean.

[tex]\mu \pm 3(\sigma)\\=295000 \pm 3(56000)\\=(127000,463000)[/tex]

According to Chebyshev's Theorem 90% of prices will lie between $127,000 and $463,000.