MEAN ABSOLUTE DEVIATION
Dec 13, 2015
Two different groups of people were surveyed about their height. The
results are on the following slides
Step 1: convert everyone’s height to inches (12 inches = 1 foot)
Step 2: Find the MEAN of everyone’s height (the average)
Step 3: Write a sentence about the average height. (sentence starter…the average height in group one is…..this means…..)
For Group 1:
Step 1: convert everyone’s height to inches (12 inches = 1 foot)
Step 2: Find the MEAN of everyone’s height (the average)
Step 3: Write a sentence about the average height. (sentence starter…the average height in group one is…..this means…..)
For Group 2:
What did you notice about the average height in group 1 compared to the average height in group 2?
Now calculate the Mean Absolute Deviation for each group
Mean group 1 Each person height in
inches
Deviation from Mean
Mean of group 2
Each person height in
inches
Deviation from Mean
1. If the mean height for each group was the same, why was the MAD different for each group?
2. Which group would you prefer if you were forming a basketball team? Why?
3. Which group’s heights vary more from the mean?
You are the teacher for an 8th grade math class. It is time to enter your students final grades for the 6 weeks report card. Your principal has told you it is ok to round a students grade up or down depending on how much you feel that student understanding the material being taught.
Look the following 2 students and decide if you should adjust their grade or leave it the same
Mean Grade student 1
Each Grade of student 1
Deviation from Mean
Mean Grade student 2
Each Grade of student 2
Deviation from Mean
MAD student 1 = MAD student 2 =
1. What did you notice about the average grade for each student?
2. Why did the average come out the same, even though they earned different scores?
3. Did the MAD come out the same?
4. Which students has scores closer to the mean?
5. Do you think each student has earned this grade?
6. Would you round either students grade up to a 70?
Bowler #1 Scores
Bowler #1 Mean
Deviation from Mean
Bowler #2 Scores
Bowler #2 Mean
Deviation from Mean
150 200
50 200
250 200
75 200
300 75
MAD bowler #1 = MAD bowler #2=