d=displacement
v=initial velocity
t=time
a=acceleration
Our basic formula for displacement:
d=vt+.5at2
becomes:
t = (√(v2+2ad)-v)/a
curve
The object is accelerating or decelerating in the radial direction.
The curved line on a time vs. distance graph represents that the object is accelerating.
The distance from start at which a certain object is located at a certain time.
9.8m/s/s -BHS
You can derive it from accelerating an object to a certain speed. Assume constant acceleration (and therefore constant force), and calculate how much work (force x distance) you need to get the object to a specific speed.
curve
To calculate the acceleration of gravity, time (t) an object falling a certain distance (d) and the acceleration of gravity= d/t
Distance (to an object).
The velocity of the object.
The object is accelerating or decelerating in the radial direction.
Distance = time x speed
Speed-Versus-Time Graph and Distance-Versus-Time graph are the two types of graphs that can be used to analyze the motion of an accelerating object.
The object is accelerating or decelerating in the radial direction.
The curved line on a time vs. distance graph represents that the object is accelerating.
This is known as displacement, and is generally measured in meters :)
Either one of the following observations tells you that an object is accelerating: -- Three points in the object's path are not in a straight line. -- The distance the object travels in a period of time is not the same as the distance it travels in another period of the same duration.