Answer :
We need to reject the null hypothesis; there is sufficient evidence to support the claim that the mean speed is greater than 65 miles / hour.
What is normal distribution?
'Normal distribution is a continuous probability distribution wherein values lie in a symmetrical fashion mostly situated around the mean.'
According to the given problem,
Since the sample size is fairly large (n > 30), we use normal distribution.
The null hypothesis tested is
Mean speed of all cars ≤ 65 miles/hour. (µ ≤ 65)
The alternative hypothesis is
Mean speed of all cars > 65 miles/hour. (µ > 65)
Significance level = 0.05
The test statistic used is Z = [tex]\bar{x}[/tex] - µ/σ / √ n, where [tex]\bar{x}[/tex] = 68.4, n = 40, σ = 5.7
Therefore, Z = 68.4 - 65 / 5.7 /√40 = 3.77254177
If the calculated value of test statistic is greater than the critical value at the 0.05 significance level,
Upper critical value = 1.644853627
P-value = P (Z > 3.77254177) = 0.000080796
Hence, we can conclude that we should reject the null hypothesis since there is enough evidence to support the claim that the mean speed is greater than 65 miles / hour.
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