Exactly.
The slope of the speed-vs-time graph is the magnitude of acceleration.
A straight slanted slope on a velocity-time graph indicates that the object is moving with a constant acceleration.
The graph is a straight line whose slope is the acceleration of gravity.
The slope of the speed/time graph is the magnitude of acceleration. (It's very difficult to draw a graph of velocity, unless the direction is constant.)
Since distance is 1/2 at^2 where a is acceleration, it represents one half of the acceleration
exactly
Yes, acceleration is the slope of a velocity versus time graph.
The slope of a velocity-time graph represents acceleration.
The slope of a velocity-time graph represents acceleration.
The slope of a velocity-time graph represents acceleration.
The slope of the speed-vs-time graph is the magnitude of acceleration.
If your graph shows velocity on the vertical axis and time on the horizontal axis, then the slope of the graph represents the acceleration. More specifically, the slope of the graph at a specific point represents the acceleration at that instantaneous point in time. So if the slope of the graph doesn't change (i.e. the graph is a straight line), then the acceleration is constant and doesn't change over time. In calculus, this is represented as the derivative: The derivative of velocity with respect to time equals the acceleration.
Acceleration.
A graph that shows speed versus time is not an acceleration graph.The slope of the graph at any point is the acceleration at that time.A straight line shows that the acceleration is constant.
The Slope (which represents acceleration) of a constant velocity graph is Zero.
If the graph is a straight line, then the slope of the line is the average acceleration of the ball.
A straight slanted slope on a velocity-time graph indicates that the object is moving with a constant acceleration.