6. There are three different basketball teams that have played five games each. Liz wants to join the team that is scoring the most points per game so far. Team 1 Team 2 Team 3 Game 1 65 89 33 Game 2 82 82 100 Game 3 53 41 62 Game 4 90 86 83 Game 5 70 40 56 If she ranks each team by its mean score, which team would she join? @ She would join Team 1, because its mean score is 72. © She would join Team 1, because its mean score is 90. © She would join Team 2, because its mean score is 67.6. O She would join Team 3, because its mean score is 100.
6. There are three different basketball teams that have played five games each. Liz wants to join the team that is scoring the most points per game so far. Team 1 Team 2 Team 3 Game 1 65 89 33 Game 2 82 82 100 Game 3 53 41 62 Game 4 90 86 83 Game 5 70 40 56 If she ranks each team by its mean score, which team would she join? @ She would join Team 1, because its mean score is 72. © She would join Team 1, because its mean score is 90. © She would join Team 2, because its mean score is 67.6. O She would join Team 3, because its mean score is 100.
Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
Problem 1RQ
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Transcribed Image Text:6.
There are three different basketball teams that have played five games
each. Liz wants to join the team that is scoring the most points per
game so far.
Team 1 Team 2 Team 3
Game 1
65
89
33
Game 2
82
82
100
Game 3
53
41
62
Game 4
90
86
83
Game 5
70
40
56
If she ranks each team by its mean score, which team would she
join?
@ She would join Team 1, because its mean score is 72.
® She would join Team 1, because its mean score is 90.
© She would join Team 2, because its mean score is 67.6.
O She would join Team 3, because its mean score is 100.
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