The manager of a computer retails store is concerned that his suppliers have been giving him laptop computers with lower than average quality. His research shows that replacement times for the model laptop of concern are normally distributed with a mean of 3.7 years and a standard deviation of 0.5 years. He then randomly selects records on 35 laptops sold in the past and finds that the mean replacement time is 3.5 years.
Assuming that the laptop replacment times have a mean of 3.7 years and a standard deviation of 0.5 years, find the probability that 35 randomly selected laptops will have a mean replacment time of 3.5 years or less.
P(x-bar < 3.5 years) =
Enter your answer as a number accurate to 4 decimal places.
Based on the result above, does it appear that the computer store has been given laptops of lower than average quality? (Use the criteria that "unusual" events have a probability of less than 5%.)
Assuming that the laptop replacment times have a mean of 3.7 years and a standard deviation of 0.5 years, find the probability that 35 randomly selected laptops will have a mean replacment time of 3.5 years or less.
P(x-bar < 3.5 years) =
Enter your answer as a number accurate to 4 decimal places.
Based on the result above, does it appear that the computer store has been given laptops of lower than average quality? (Use the criteria that "unusual" events have a probability of less than 5%.)