Answer:
Step-by-step explanation:
a)
Null hypothesis (H0): μ=3 min
Alternative hypothesis (H1): μ<3 min
b)
The decision rule is:
t-statistic< T (t-student table) --> You must accept the null hypothesis
t-statistic > T (t-student table) --> You must reject the null hypothesis
c) t-statistic formula:
t= (ybar-m)/(σ/(sqrt(n)))
ybar: sample mean
m: hypothesized value
σ: sample standard deviation
n: number of observations
t=(2.75-3)/(1/sqrt(50))
t= -1.76
d)
The t-student table statistic at 5% significance level and for a sample of 50 observations is: 1.6759. Because this test only uses the lower tail the statisctic value is: -1.6759
-1.76>-1.6759
Then, you must reject the null hypothesis and accept the alternative hypothesis: the mean waiting time is less than 3 minutes.
e)
You must use a tail probability table for the t-student distribution with a significance level o 5% and n-1 freedem degrees, in this case 49. Also you can use the excel formula "NORMSINV"
Accodding to the excel formula, the p-value is: 0,039
Note that with this result we also reject the null hypothesis because the p-value is less than the significance level: 0.03<0.05
You can conclude that the mean waiting time is less than 3 minutes.
