Answer:
The MAD of city 2 is less than the MAD for city 1, which means the average monthly temperature of city 2 vary less than the average monthly temperatures for City 1.
Step-by-step explanation:
For comparing the mean absolute deviations of both data sets we have to calculate the mean absolute deviation for both data sets first,
So for city 1:
[tex]Mean = x1 = \frac{20+24+40+63+76+89}{6}[/tex]
[tex]x1 = \frac{312}{6}[/tex]
[tex]x1 = 52[/tex]
Now to calculate the mean deviations mean will be subtracted from each data value. (Note: The minus sign is ignored as the deviation is the distance of value from the mean and it cannot be negative. For this purpose absolute is used)
[tex]20-52 = -32=32\\24-52=-28=28\\40-52=-12=12\\63-52=11\\76-52=24\\89-52=37[/tex]
The deviations will be added then.[tex]Mean Absolute Deviation = \frac{32+28+12+11+24+37}{6} \\=\frac{144}{6}\\=24[/tex]
So the mean absolute deviation for city 1 is 24 ..
For city 2:
[tex]Mean = x2 = \frac{41+50+58+62+72+83}{6}[/tex]
[tex]x2 = \frac{366}{6}[/tex]
[tex]x2 = 61[/tex]
Now to calculate the mean deviations mean will be subtracted from each data value. (Note: The minus sign is ignored)
[tex]41-61=-20=20\\50-61=-11=11\\58-61=-3=3\\62-61=1\\72-61=11\\83-61=22[/tex]
The deviations will be added then.[tex]Mean Absolute Deviation = \frac{20+11+3+1+11+22}{6} \\=\frac{68}{6}\\=11.33[/tex]
So the MAD for city 2 is 11.33 ..
So,
The MAD of city 2 is less than the MAD for city 1, which means the average monthly temperature of city 2 vary less than the average monthly temperatures for City 1.
Answer:
The MAD for City 2 is less than the MAD for City 1, which means the average monthly temperatures of City 2 vary less than the average monthly temperatures for City 1.
Step-by-step explanation:
The given data sets are
City 1 : {20, 24, 40, 63, 76, 89}
City 2 : {41, 50, 58, 62, 72, 83}
Formula for mean:
[tex]Mean=\frac{\sum x}{n}[/tex]
Mean of city 1 is
[tex]Mean=\frac{20+24+40+63+76+89}{6}=52[/tex]
Mean of city 2 is
[tex]Mean=\frac{41+50+58+62+72+83}{6}=61[/tex]
Formula for mean absolute deviation:
[tex]MAD=\dfrac{\sum |x-\mu|}{n}[/tex]
where, μ is the mean of data.
MAD for City 1:
[tex]MAD=\dfrac{|20-52|+|24-52|+|40-52|+|63-52|+|76-52|+|89-52|}{6}[/tex]
[tex]MAD=24[/tex]
MAD for City 2
[tex]MAD=\frac{\left|41-61\right|+\left|50-61\right|+\left|58-61\right|+\left|62-61\right|+\left|72-61\right|+\left|83-61\right|}{6}[/tex]
[tex]MAD=\approx 11.33[/tex]
From the above calculation we get 24 > 11.33 or MAD of city 1 > MAD of city 2.
The MAD for City 2 is less than the MAD for City 1, which means the average monthly temperatures of City 2 vary less than the average monthly temperatures for City 1.
