<meta http-equiv="refresh" content="1; url=/nojavascript/">
Skip Navigation

Applications of Box-and-Whisker Plots

Using statistics to understand story problem applications

Atoms Practice
Practice Applications of Box-and-Whisker Plots
Practice Now
Box and Whisker Plots
Teacher Contributed

Universities that Produce NBA players and Box-and-Whisker Plots


Universities that produce NBA Players and Box-and-Whisker Plots


  • Mean
  • Median
  • Mode
  • Range
  • Quartile

Student Exploration

Which universities produce the most NBA players? And how can you display that information in a way graph that is user-friendly?

Examine the table below of the Universities that produced four or more NBA players for the 2010-2011 NBA season.

Universities that were NBA Factories from the 2010-2011 Season.
University Number of NBA Players
U. of Florida 9
Villanova 4
Wake Forest 8
Maryland 4
U. of Connecticut 10
Oklahoma State 4
Ohio State 7
Georgetown 4
Stanford 5
U. of Kansas 12
Notre Dame 4
U. of North Carolina 10
George Tech 7
U. of Texas at Austin 10
Florida State 4
Xavier 4
U. of Washington 5
Duke 13
Alabama 4
Syracuse 6
Memphis 7
UC Berkeley 4
U. of Arizona 11
Michigan State 5
U. of Kentucky 13
Louisiana State U. 6

Use this data table to create a box-and-whisker plot to represent the number of NBA players that come from these Universities.

Extension Investigation

Examine the table above of the Universities that produced four or more NBA players for the 2010-2011 NBA season.

  1. Find the mean.
  2. Find the median.
  3. Find the mode.
  4. Find the range.
  5. Find the first and third quartiles. Do not include the median as part of either the lower or the upper half of the data.
    1. Q_1 =
    2. Q_3 =
    3. Find the difference between Q_3 and Q_1.
  6. If UCLA had 16 NBA players, will the median or mean change? Explain.
  7. If Ohio State had 10 NBA players, would the Q_1 and Q_3 change? And how would the graph change? Explain each.

Resources Cited


Connections to other CK-12 Subject Areas

  • Measures of Central Tendency and Dispersion
  • Mean
  • Median
  • Median of Large Sets of Data
  • Mode

Image Attributions


Please wait...
Please wait...

Original text