Respuesta :
Answer:
For city
Mean = 19.7
Median = 20
Mode = 19.4
For highway
Mean = 23.3
Median = 23.1
Mode = 23.8 and 23
Step-by-step explanation:
Given:
Data:
City: 20.3 20.8 20 18.5 17.3 19.4 20.9 20.1 20.2 19.4 19.3 19.4 20.3
Highway: 23.8 25 22.7 23 23.6 21.8 21.6 23 23.4 25.5 23.8 22.9 23.1
Now,
For city
Number of terms = 13
Mean = [tex]\frac{\textup{Sum of all the observations}}{\textup{Total number of observations}}[/tex]
Mean = [tex]\frac{20.3 + 20.8 + 20 + 18.5 + 17.3 + 19.4 + 20.9 + 20.1 + 20.2 + 19.4 + 19.3 + 19.4 + 20.3}{13}[/tex]
or
Mean = 19.68 ≈ 19.7
The median is the middle number in a sorted list of numbers in acceding order
17.3 18.5 19.3 19.4 19.4 19.4 20 20.1 20.2 20.3 20.3 20.8 20.9
Median = 20
Mode = The mode of a set of data is the value in the set that occurs most often
Mode = 19.4 [as it occurs 3 times]
for Highway
Number of observations = 13
Mean = [tex]\frac{23.8 + 25 + 22.7 + 23 + 23.6 + 21.8 + 21.6 + 23 + 23.4 + 25.5 + 23.8 + 22.9 + 23.1}{13}[/tex]
or
Mean = 23.32 ≈ 23.3
For median arranging the data in ascending order
21.6 21.8 22.7 22.9 23 23 23.1 23.4 23.6 23.8 23.8 25 25.5
Median = 23.1
Mode = Since both 23.8 and 23 occur 2 times, the modes are 23.8 and 23
