ltHGNo7WqEPXtVsjCbu 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 />
1.It is upward and to the right.
2.It is straight to the right.
3.It is straight downward.
4.It is downward and to the left.
5.It is perpendicular to the plane of the picture and outward."
Question 2
What kinematic quantity is indicated by the speedometer of an automobile?
