Answer:
The sample evidence suggest that the region has a higher proportion of traffic fatalities involving a positive BAC than the country.
Step-by-step explanation:
In this case we have to perform a hypothesis test on a proportion.
The null and alternative hypothesis are:
[tex]H_0:\pi\leq0.39\\\\H_1:\pi>0.39[/tex]
The level of significance is 0.1.
The standard deviation for the proportion can be calculated as:
[tex]\sigma=\sqrt{\frac{\pi(1-\pi)}{N} }= \sqrt{\frac{0.39(1-0.39)}{105} }=\sqrt{\frac{0.2379}{105} }= 0.0476[/tex]
The proportion of the sample is
[tex]p=\frac{54}{105}= 0.51[/tex]
The test statistic is
[tex]z=\frac{p-\pi-0.5/N}{\sigma} =\frac{0.51-0.39-0.5/105}{0.0476} =\frac{ 0.1152 }{0.0476}=2.421[/tex]
The one-tail P-value for z=2.421 is [tex]P(z>2.421)=0.00774[/tex].
The P-value is smaller than the significance level, so the effect is significant.
The null hypothesis is rejected: the sample evidence suggest that the region has a higher proportion of traffic fatalities involving a positive BAC than the country.
