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jcperry1952Lv1
14 Dec 2022
The graph below represents the relationship between the distance traveled, and the time elapsed from an object in motion, which of the following can be inferred from the graph
![](data:image/jpeg;base64,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)
Which of the following can be inferred from the graph?
A The object is experiencing acceleration
B The object is moving along a curved path.
C The object has a negative acceleration.
D The object moves at a constant speed
The graph below represents the relationship between the distance traveled, and the time elapsed from an object in motion, which of the following can be inferred from the graph
Which of the following can be inferred from the graph?
A The object is experiencing acceleration
B The object is moving along a curved path.
C The object has a negative acceleration.
D The object moves at a constant speed
marcusnicole284Lv10
2 Jul 2023
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aakankshaenLv4
15 Dec 2022
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