The distance vs. time graph of an object moving at a constant speed would be a straight line with a positive slope. This is because the distance covered by the object would increase uniformly with time as the object moves at a constant speed.
The distance-time graph for an object moving with a constant speed is a straight line with a positive slope. This indicates that the object is covering equal distances in equal intervals of time.
If the line formed by the graph is straight, the speed is constant. A horizontal line would show the object as stationary.
constant
On a distance-time graph, a constant speed is represented by a straight, diagonal line with a constant slope. This slope indicates that the object is covering the same distance for each unit of time, meaning its speed is consistent throughout the motion.
It means that the speed of the object is constant.
The distance-time graph for uniform motion of an object is a straight line with a constant slope. This indicates that the object is covering equal distances in equal time intervals, showing a constant speed.
The graph of distance versus time for an object moving at a constant speed is a straight line, not a curve. This is because distance is directly proportional to time when an object is moving at a constant speed.
A straight line with a constant slope
It is 1 unit of distance per 1 unit of time.
Yes. The slope, or rate, is constant. The rate being represented is speed. If the slope is a negative constant, the object is losing distance (going towards) from the orgin at at a constant speed.
If constant motion means constant velocity then, total distance / total time = avg velocity => avg speed constant velocity => avg velocity = velocity