Answer :
Answer:
a) 0.4770
b) 3.9945
c) z-statistics seem a large value
Step-by-step explanation:
a. Find the standard deviation of the sample proportion based on the null hypothesis
Based on the null hypothesis:
[tex]p_{0}[/tex]: 0.35
and the standard deviation σ = [tex]\sqrt{p_{0} *(1-p_{0}) }[/tex] =[tex]\sqrt{0.35 *0.65 }[/tex] ≈0.4770
b. Find the z statistic
z-statistic is calculated as follows:
z=[tex]\frac{X-p_{o} }{\frac{s}{\sqrt{N} } }[/tex] where
- X is the proportion of employees in the survey who take advantage of the Credit Union ([tex]\frac{138}{300}=0.46[/tex])
- [tex]p_{0}[/tex] is the proportion in null hypothesis (0.35)
- s is the standard deviation (0.4770)
- N is the sample size (300)
putting the numbers in the formula:
z=[tex]\frac{0.46-0.35} }{\frac{0.4770}{\sqrt{300} } }[/tex] = 3.9945
c. Does the z statistic seem like a particularly large or small value?
z-statistics seem a large value, which will cause us to reject the null hypothesis.