QUARTILES

Basic Concepts

Finding Positions

Computation

Box Plot & IQR

Interpretations

100

This measure divides a data set into four equal parts.

Quartiles

100

The formula used to find the position of Qk.

Q_k=k(n+1)/4

100

Find the median of the ordered data:
3, 5, 7, 9, 11

100

This graph visually displays quartiles.

box-and-whisker plot

100

Q2 divides the data set into these two equal groups.

lower half and upper half

200

This quartile is also called the median.

Q₂/ Quartile 2 / 2nd Quartile

200

For 11 data values, this is the position of the median.

6th position

200

Find Q1 of:
14, 2, 10, 6, 12, 4, 8

200

This is another name for the middle 50% of the data.

interquartile range

200

If your height is above Q3, you are taller than this percent of the group.

75%

300

This quartile marks the lowest 25% of the data.

Q₁ / Quartile 1 / 1st Quartile

300

If n = 15, this is the position of Q1.

4th position

300

Find Q3 of:
18, 6, 21, 3, 12, 15, 9

300

This part of the box plot shows Q1 to Q3

box

300

If Q1 = 60 and Q3 = 80, this is the IQR.

400

This quartile separates the top 25% of the data from the lower 75%.

Q₃ / Quartile 3 / 3rd Quartile

400

If n = 12, Q2 lies between these two positions.

6th and 7th position

400

Find the interquartile range of:
24, 8, 32, 16, 4, 36, 20, 12, 28

400

The five-number summary of a dataset:
Min = 19, Q1 = 35, Q2 = 50, Q3 = 83, Max = 100

What is IQR?

400

A smaller IQR means the data are more this.

consistent / less spread out

500

These five values make up the five-number summary.

Minimum, 1st Quartile, 2nd Quartile, 3rd Quartile and Maximum

500

For n = 19, this is the position of Q3.

15th position.

500

For the data set:
35, 10, 55, 25, 45, 15, 40, 5, 30, 50, 20

500

IQR of a dataset is 28. If Q₃ = 109, what is Q₁?

500

When Q1 and Q3 are far apart, the data show this characteristic.

High variability / large spread