Lesson 11

• Calculate the mean and mean absolute deviation for a data set, and interpret (orally) these measures.
• Compare and contrast (orally and in writing) populations represented on dot plots in terms of their shape, center, spread, and visual overlap.
• Justify (in writing) whether two populations are “very different” based on the difference in their means expressed as a multiple of the mean absolute deviation.

Addressing

• 7.SP.B
• 7.SP.B.3

• mean

  The mean is one way to measure the center of a data set. We can think of it as a balance point. For example, for the data set 7, 9, 12, 13, 14, the mean is 11.

  

  

  To find the mean, add up all the numbers in the data set. Then, divide by how many numbers there are. \(7+9+12+13+14=55\) and \(55 \div 5 = 11\).

• mean absolute deviation (MAD)

  The mean absolute deviation is one way to measure how spread out a data set is. Sometimes we call this the MAD. For example, for the data set 7, 9, 12, 13, 14, the MAD is 2.4. This tells us that these travel times are typically 2.4 minutes away from the mean, which is 11.

  

  

  To find the MAD, add up the distance between each data point and the mean. Then, divide by how many numbers there are.

  \(4+2+1+2+3=12\) and \(12 \div 5 = 2.4\)

• median

  The median is one way to measure the center of a data set. It is the middle number when the data set is listed in order.

  For the data set 7, 9, 12, 13, 14, the median is 12.

  For the data set 3, 5, 6, 8, 11, 12, there are two numbers in the middle. The median is the average of these two numbers. \(6+8=14\) and \(14 \div 2 = 7\).