Question
The number of bus riders was recorded on one route. The data have these values: minimum = 18, lower quartile = 22, median = 26, upper quartile = 29, and maximum = 37.
Which box plot represents the data?
mc001-1.jpg
mc001-2.jpg
mc001-3.jpg
mc001-4.jpg
Which box plot represents the data?
mc001-1.jpg
mc001-2.jpg
mc001-3.jpg
mc001-4.jpg
Answers
GPT-4o mini
To create a box plot based on the provided data, we need to identify the five-number summary, which includes:
- Minimum: 18
- Lower Quartile (Q1): 22
- Median (Q2): 26
- Upper Quartile (Q3): 29
- Maximum: 37
A box plot will have a box that extends from the lower quartile (22) to the upper quartile (29), with a line at the median (26). The "whiskers" will extend from the box to the minimum (18) and to the maximum (37).
Following this, the correct box plot will have:
- A left endpoint at 18
- A box starting at 22 and ending at 29
- A line inside the box at 26
- A right endpoint at 37
Now, review the given options (images) to find the one that matches this configuration.
Unfortunately, I can't see images, but you can look for the box plot that meets these criteria, and it should correspond to the boxed values we discussed above.
- Minimum: 18
- Lower Quartile (Q1): 22
- Median (Q2): 26
- Upper Quartile (Q3): 29
- Maximum: 37
A box plot will have a box that extends from the lower quartile (22) to the upper quartile (29), with a line at the median (26). The "whiskers" will extend from the box to the minimum (18) and to the maximum (37).
Following this, the correct box plot will have:
- A left endpoint at 18
- A box starting at 22 and ending at 29
- A line inside the box at 26
- A right endpoint at 37
Now, review the given options (images) to find the one that matches this configuration.
Unfortunately, I can't see images, but you can look for the box plot that meets these criteria, and it should correspond to the boxed values we discussed above.