# Refer

Refer to the following frequency distribution for Questions 2, 3, 4, and 5. Show all work. Just the answer, without supporting work, will receive no credit.

A random sample of 25 customers was chosen in UMUC MiniMart between 3:00 and 4:00 PM on a Friday afternoon. The frequency distribution below shows the distribution for checkout time (in minutes).

Checkout Time (in minutes) Frequency Relative Frequency

Checkout Time (in minutes)

Frequency

Relative Frequency

1.0 - 1.9

6

2.0 - 2.9

8

3.0 - 3.9

4.0 - 5.9

5

Total

25

2. Complete the frequency table with frequency and relative frequency. (5 pts)

3. What percentage of the checkout times was less than 3 minutes? (5 pts)

4. In what class interval must the median lie? Explain your answer. (5 pts)

5. Assume that the largest observation in this dataset is 5.8. Suppose this observation were incorrectly recorded as 8.5 instead of 5.8. Will the mean increase, decrease, or remain

the same? Will the median increase, decrease or remain the same? Why? (5 pts)

A random sample of 25 customers was chosen in UMUC MiniMart between 3:00 and 4:00 PM on a Friday afternoon. The frequency distribution below shows the distribution for checkout time (in minutes).

Checkout Time (in minutes) Frequency Relative Frequency

Checkout Time (in minutes)

Frequency

Relative Frequency

1.0 - 1.9

6

2.0 - 2.9

8

3.0 - 3.9

4.0 - 5.9

5

Total

25

2. Complete the frequency table with frequency and relative frequency. (5 pts)

3. What percentage of the checkout times was less than 3 minutes? (5 pts)

4. In what class interval must the median lie? Explain your answer. (5 pts)

5. Assume that the largest observation in this dataset is 5.8. Suppose this observation were incorrectly recorded as 8.5 instead of 5.8. Will the mean increase, decrease, or remain

the same? Will the median increase, decrease or remain the same? Why? (5 pts)

You'll get a 23.0KB .XLS file.