A marketing team conducts a survey for the number of customers per hour for two supermarkets. The number of customers for 12 randomly selected hours are provided in the accompany table. How do the median and interquartile ranges from Supermarket 1 compare to Supermarket 2? Use Desmos to help you calculate these then compare.

Question

A marketing team conducts a survey for the number of customers per hour for two supermarkets. The number of customers for 12 randomly selected hours are provided in the accompany table. How do the median and interquartile ranges from Supermarket 1 compare to Supermarket 2? Use Desmos to help you calculate these then compare.

(1 point)
Responses

The median for Supermarket 2 is 122, which is greater than the median for Supermarket 1, 120. The interquartile range for Supermarket 2 is 50, which is greater than the interquartile range for Supermarket 1 which is 22.
The median for Supermarket 2 is 122, which is greater than the median for Supermarket 1, 120. The interquartile range for Supermarket 2 is 50, which is greater than the interquartile range for Supermarket 1 which is 22.

The median for Supermarket 1 is 115, which is greater than the median for Supermarket 2, 107. The interquartile range for Supermarket 2 is 60, which is greater than the interquartile range for Supermarket 1 which is 25.
The median for Supermarket 1 is 115, which is greater than the median for Supermarket 2, 107. The interquartile range for Supermarket 2 is 60, which is greater than the interquartile range for Supermarket 1 which is 25.

The median for Supermarket 1 is 115.75, which is greater than the median for Supermarket 1, 112.33. The interquartile range for Supermarket 2 is 70, which is greater than the interquartile range for Supermarket 1 which is 28.
The median for Supermarket 1 is 115.75, which is greater than the median for Supermarket 1, 112.33. The interquartile range for Supermarket 2 is 70, which is greater than the interquartile range for Supermarket 1 which is 28.

The median for Supermarket 1 is 117.5, which is greater than the median for Supermarket 1, 114.5. The interquartile range for Supermarket 2 is 60, which is greater than the interquartile range for Supermarket 1 which is 25.

Answer 1

The correct response is:

The median for Supermarket 1 is 117.5, which is greater than the median for Supermarket 2, 114.5. The interquartile range for Supermarket 2 is 60, which is greater than the interquartile range for Supermarket 1 which is 25.

To calculate these values, you can input the data into Desmos and use the functions median() and IQR() to find the median and interquartile range for each supermarket.