Question

The manager of a grocery store has taken a random sample of 100 customers. The average length of time it took the customers in the sample to check out was 3.1 minutes. The population standard deviation is known to be 0.5 minute. We want to test to determine whether or not the mean waiting time of all customers is significantly more than 3 minutes. At a .05 level of significance, it can be concluded that the mean of the population is _____

Answer 1

Answer with explanation:

Let
`\mu` be the average length of time it took the customers in the sample to check out .

As per given , we have

`H_0 : \mu\leq3\\\\ H_a: \mu>3`

Since , the alternative hypothesis is right-tailed and population standard deviation is known , so we perform right-tailed t-test.

Also, we have n= 100

Sample mean =
`\overline{x}=3.1`

Population standard deviation= s= 0.5

Test statistic :
`z=\frac{\overline{x}-\mu}{(s)/(√(n))}`

`z=(3.1-3)/((0.5)/(√(100)))=2`

P-value : P(z>2)=1-P(z<2)=1-0.9772=0.0228

[using p-value table for z]

Decision : Since p-value (0.0228) < significance level (0.05), so we reject the null hypothesis .

Conclusion : We have enough evidence to accept that the mean waiting time of all customers is significantly more than 3 minutes.

i.e. At a .05 level of significance, it can be concluded that the mean of the population is more than 3 minutes.