Answer:
1. Option C is correct.
2. Option D is correct.
3. Option A is correct.
4. Option A is correct.
Step-by-step explanation:
Starting and end point of box plot represent the minimum and maximum value respectively. Box starts from the first quartile to the third quartile. A vertical line goes through the box at the median.
From the given box plot we can conclude that
For Team A:
[tex]Minimum = 80,Q_1=87, median=91, Q_3=95,Maximum=110[/tex]
For Team B:
[tex]Minimum = 79,Q_1=82, median=87, Q_3=91,Maximum=103[/tex]
Formula for interquartile range.
[tex]IQR=Q_3-Q_1[/tex]
1.
IQR of Team A.
[tex]IQR_{A}=95-87=8[/tex]
Option C is correct.
2.
IQR of Team B.
[tex]IQR_{B}=91-82=9[/tex]
Option D is correct.
3.
Difference of the medians of team A and team B is
[tex]91-87=4[/tex]
Option A is correct.
4.
We know that 4 is about half of 8 and 9.
It means 4 is about half the interquartile range of either data set.
Option A is correct.
