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The average height of females in the freshman class of a certain college has historically been 162.5 centimeters with a standard deviation of 6.9 centimeters. is there reason to believe that there has been a change in the average height if a random sample of 50 females in the present freshman class has an average height of 165.2 centimeters? use a p-value in your conclusion. assume the standard deviation remains the same.

Respuesta :

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To check whether there is a reason to believe that the average height has been changed, we can check one right-tailed test and establish null and alternate hypotheses.

H₀ (null hypothesis): μ = 162.5
H₁ (alternate hypothesis): μ > 162.5

Since we have two samples to compare, we can use the formula below to compute for the z-score.

[tex] Z = \frac{(\chi - \mu)}{ \sigma / \sqrt{n}} [/tex]

where Z is the z-score, Χ is the new mean of the sample, μ is the expected average value, δ is the standard deviation, and n is the sample size. Given the values we have, 

[tex] Z = \frac{(165.2 - 162.5)}{6.9 / \sqrt{50}} [/tex]
[tex] Z \approx 2.77 [/tex]

Assuming that the significance level, α, is 0.05. Now that we have a z-score of 2.77, we can use the z-table to find its p-value. Thus, we have P(Z > 2.77) = .0028. Thus since our p-value is less than α, H₀ is rejected. That means that the average height of the female freshman students has changed.
 

Answer:

Step-by-step explanation:

Let X be the average height of females in the freshman class.

X is N(162.5, 6.9)

Sample mean = 165.2

Sample size = 50

Since population std deviation is known and n >30 we can use z statistic

Z = (x bar-mu)/Sigma/sqrt n

i.e. Z =[tex]\frac{165.2-162.5}{6.9/\sqrt{50} }[/tex]

=2.766

Let alpha be 5%

Z critical value for 95% is 1.96

Our test statistic >1.96

p value = 0.001<0.05(our alpha)

Hence reject null hypothesis

The sample mean > the population mean

Alternate hypothesis is true.

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