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
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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.
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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