Answer:
Option: box plot titled ACT Score with a minimum of 19, quartile 1 of 21, median of 25, quartile 3 of 29, and maximum of 30
Step-by-step explanation:
The statement guides us to the maximum number of dots. Based on the equation, the maximum number of dots must be 30. In addition, the set must lie in the quartile of 1 of 21. Furthermore, the ACT scores would have a minimum of 19 ad there are some students who have more than 1 dot who are 19.
The box plot titled ACT Score with a minimum of 19, quartile 1 of 21, median of 25, quartile 3 of 29, and maximum of 30.
Given :
Dot plot titled ACT Scores with Score on the x axis and Number of Students on the y axis with,
1 dot => 19
3 dots => 20, 20, 20
4 dots => 21, 21, 21, 21
3 dots => 25, 25, 25
4 dots => 27, 27, 27, 27
3 dots => 29, 29, 29
3 dots => 30, 30, 30
Solution :
Quickly, we can ascertain 3 values from these data points of which we can use to find out which box plot represents the dot plot data.
The minimum score = 19
The maximum score = 30
The median score is the 10th value, which is the middle value of the data point = 25
Therefore, we can conclude that the correct option is B) box plot titled ACT Score with a minimum of 19, quartile 1 of 21, median of 25, quartile 3 of 29, and maximum of 30.
For more information, refer the link given below
https://brainly.com/question/12588980
