The velocity of the object at time = 0
The starting speed.
Time, money, temperature, and numbers.
o(n^2)
they are both graphs.
simple graph is a graph without self loop and parallel edges
A velocity time graph is still a velocity time graph - no matter the degree of detail that you look at it.
take the slope of every change in the velocity time graph and plot it
Your acceleration vs. Time graph is the slope of your velocity vs. time graph
The Average Velocity on a position time graph or a velocity time graph.
The rate of change in velocity in given time. By Suraj Kumar
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.
Simply put, a velocity time graph is velocity (m/s) in the Y coordinate and time (s) in the X and a position time graph is distance (m) in the Y coordinate and time (s) in the X if you where to find the slope of a tangent on a distance time graph, it would give you the velocity whereas the slope on a velocity time graph would give you the acceleration.
The graph of velocity-time is the acceleration.
As, in the velocity-time graph, curves passes through zero means 'when time is zero velocity is zero'. Velocity is time derivative of displacement. So displacement is maximum or minimum when time is zero in position-time graph.
In a velocity-time graph it will be the time axis (where velocity = 0). On a distance-time graph it will be a line parallel to the time axis: distance = some constant (which may be 0).
If an x-t graph is a position-time graph, velocity is the slope of the line on the graph.
you can't....it's merely impossible! Assuming it is a graph of velocity vs time, it's not impossible, it's simple. Average velocity is total distance divided by total time. The total time is the difference between finish and start times, and the distance is the area under the graph between the graph and the time axis.