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 />
Which people have the same average speed
during the time period shown?
1.none; they all have different average speeds
2.Amy and Brad
3.Amy and Cate
4.Brad and Cate
5.all three are the same"
Question 2Amy, Brad, and Cate are walking (or running) along a straight line as shown below.
