The median and interquartile range for the cleverites are : 25 and 20 respectively.
The slowest club on average is the Braineys
From https://brainly.com/question/14724605?referrer=searchResults :
The median value for the cleverites :
The Median is the time at the midpoint of the frequency curve :
Median frequency = Cummulative frequency / 2
Median frequency = 80 /2 = 40
Tracing to the intersection point on the curve and reading the x - value at the point of intersection ;
- Median for the Cleverites is 25
The interquartile range = (upper quartile - lower quartile)
Upper quartile = 3/4(Cummulative frequency) = 3/4(80) = 60
Upper quartile = 35 minutes
Lower quartile = 1/4(80) = 20
Lower quartile = 15 minutes
Interquartile range = (35 - 15) = 20 minutes
To obtain the slowest club on average, we could use the median :
Median for Cleverites = 25
Median for Braineys :
1/2(80) = 40
Time on the x axis corresponding to y = 40 is 32
Comparing the median values :
32 > 25
Braineys > Cleverites ;
The slowest on average at competing is Braineys as they have a higher completion time.
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