Lesson 15

• Calculate the range and interquartile range (IQR) of a data set and interpret (orally and in writing) what they tell us about the situation.
• Comprehend that “interquartile range (IQR)” is another measure of variability that describes the span of the middle half of the data.
• Identify and interpret (in writing) the numbers in the five-number summary for a data set, i.e., the minimum, first quartile (Q1), median (Q2), third quartile (Q3), and maximum.

Addressing

• 6.SP.B.5.c
• 6.SP.B.5.d

Building Towards

• 6.SP.B.4

• interquartile range (IQR)

  The interquartile range is one way to measure how spread out a data set is. We sometimes call this the IQR. To find the interquartile range we subtract the first quartile from the third quartile.

  For example, the IQR of this data set is 20 because \(50-30=20\).

  22	29	30	31	32	43	44	45	50	50	59
  		Q1			Q2			Q3

• quartile

  Quartiles are the numbers that divide a data set into four sections that each have the same number of values.

  For example, in this data set the first quartile is 30. The second quartile is the same thing as the median, which is 43. The third quartile is 50.

  22	29	30	31	32	43	44	45	50	50	59
  		Q1			Q2			Q3

• range

  The range is the distance between the smallest and largest values in a data set. For example, for the data set 3, 5, 6, 8, 11, 12, the range is 9, because \(12-3=9\).