No, but the slope of the graph does.
No. Slope of position/time graph is speed, or magnitude of velocity.Slope of speed/time graph is magnitude of acceleration.
A position time graph can show you velocity. As time changes, so does position, and the velocity of the object can be determined. For a speed time graph, you can derive acceleration. As time changes, so does velocity, and the acceleration of the object can be determined.If you are plotting velocity (speed) versus time, the slope is the acceleration.
The slope of the tangent line in a position vs. time graph is the velocity of an object. Velocity is the rate of change of position, and on a graph, slope is the rate of change of the function. We can use the slope to determine the velocity at any point on the graph. This works best with calculus. Take the derivative of the position function with respect to time. You can then plug in any value for x, and get the velocity of the object.
Slope of time Vs distance graph gives the inverse of velocity.
The distance versus time graph shows the position of the object. The slope of the line shows the velocity of the object. The velocity is the direction and speed of an object. If your slope has a positive slant that means you are going in a positive direction. If the slope has a negative slant your object is going in a negative direction. If your slope is zero (a horizontal line) that means your object has stopped and is about to change directions. In case you didnt know a positive slant looks like this on a graph.... / a negative slant looks like this on a graph.... \ postive is like sloping up a hill negative is like falling down the hill
No. Slope of position/time graph is speed, or magnitude of velocity.Slope of speed/time graph is magnitude of acceleration.
The gradient of a distance-time graph gives the object's speed.
The slope of the speed/time graph is the magnitude (size) of the object's acceleration.
A straight line with a positive slope on a position-time graph is the graph of an object that's moving in a straight line with constant speed.
A position time graph can show you velocity. As time changes, so does position, and the velocity of the object can be determined. For a speed time graph, you can derive acceleration. As time changes, so does velocity, and the acceleration of the object can be determined.If you are plotting velocity (speed) versus time, the slope is the acceleration.
speed graph
The slope of the tangent line in a position vs. time graph is the velocity of an object. Velocity is the rate of change of position, and on a graph, slope is the rate of change of the function. We can use the slope to determine the velocity at any point on the graph. This works best with calculus. Take the derivative of the position function with respect to time. You can then plug in any value for x, and get the velocity of the object.
With great difficulty since the question does not specify what aspect of the object's instantaneous. Speed, position, acceleration?
Speed can be shown on a graph of position versus time, and acceleration can be shown on a graph of speed versus time.
Slope of time Vs distance graph gives the inverse of velocity.
If acceleration is negative the graph looks like a upside U and decreases in value as time continues If acceleration is constant the graph is a straight line (linear) at 0 or whatever the velocity is
A position time graph is usually 2-dimensional and measures an object's position as a distance from some fixed point (the origin) in one direction only. As a result, it records changes in position towards or away from this origin but there is no information on movement in a circular path around the origin. The speed in the radial direction - that is, in the direction towards or away from the origin - is given by the slope of the line. The speed in a tangential direction cannot be deduced.