If the curve is horizontal, then the speed is constant.
If that horizontal graph lies on the x-axis, then the constant speed is zero,
and the object is stationary.
A stationary object on a distance-time graph will be represented by a horizontal line. This indicates that the object is not changing its position over time and remains at a constant distance from a reference point.
No you cannot.A displacement-time graph is concerned only with radial motion: displacement from a fixed point of reference. Any transverse motion is completely ignored. Thus, if you had a body going around in a circle about the point of reference, its speed would be recorded zero even though it is far from stationary.
A horizontal line means that the distance is not changing, therefore we can infer that the object in question is stationary - i.e. not moving.
The object is stationary as its velocity is zero. The velocity of an object is the gradient of its distance-time graph and as the graph is a horizontal straight line, its gradient is zero. The object is stationary also as its distance from the time axis is not increasing.
A line graph can be used to show the position of an object over time, with time on the x-axis and position on the y-axis. The resulting line can indicate whether the object is stationary, moving at a constant speed, accelerating, or decelerating based on the slope of the line. A horizontal line would indicate a stationary object, a straight diagonal line would show constant speed, and a curved line would suggest acceleration or deceleration.
Of course yes. An object is stationary when the graph is horizontal in a displacement-time graph.
Object will change distance time graph when speed is changing. Distance time graph don't changed indicate of the stationary.
A stationary object on a distance-time graph will be represented by a horizontal line. This indicates that the object is not changing its position over time and remains at a constant distance from a reference point.
No you cannot.A displacement-time graph is concerned only with radial motion: displacement from a fixed point of reference. Any transverse motion is completely ignored. Thus, if you had a body going around in a circle about the point of reference, its speed would be recorded zero even though it is far from stationary.
A horizontal line means that the distance is not changing, therefore we can infer that the object in question is stationary - i.e. not moving.
The answer will depend on whether the graph is a distance time graph or a speed time graph.The slope of a distance-time graph shows that speed of the object in the direction towards or away from the point of reference (usually the origin). It indicates absolutely nothing about its speed in any other direction. So, for example, an object could be rotating around the origin at the speed of light (the fastest possible) and the distance-time graph would show it being stationary bacause its distance from the origin is not changing!The slope of the speed-time graph indicated the acceleration of the object, again with the same qualification.
If the line formed by the graph is straight, the speed is constant. A horizontal line would show the object as stationary.
If the speed/time graph slops negatively, that's an indication that the speed is decreasing, i.e. the object is slowing down. The negative slop is also called negative acceleration, since acceleration is the rate of change of velocity.
The obect was stationary during the time period indicated by the end points of the horizontal section.
The object is stationary as its velocity is zero. The velocity of an object is the gradient of its distance-time graph and as the graph is a horizontal straight line, its gradient is zero. The object is stationary also as its distance from the time axis is not increasing.
Whether or not an object has moved.By how much it has moved.
A line graph can be used to show the position of an object over time, with time on the x-axis and position on the y-axis. The resulting line can indicate whether the object is stationary, moving at a constant speed, accelerating, or decelerating based on the slope of the line. A horizontal line would indicate a stationary object, a straight diagonal line would show constant speed, and a curved line would suggest acceleration or deceleration.