Time is on the x axis and distance is on the y axis. There will be a curve starting at zero (presumably) and going upwards towards the right. The slope of the line at any given x value equals the speed at that point in time. Thus the slope will decrease at the same rate that speed decreases.
speed is the gradient under the distance vs time graph which is change in distance /change in time
Slope of the graph will give you speed.
The speed is the slope of the curve in such a graph.
The slope of a distance-time graph represents speed.
The graph is a straight line. Its slope is the speed.
Acceleration is negative.
The graph of distance vs time increases exponentially as speed increases.
Distance you read off directly from the graph. Speed is the rate of increase of distance, so it is the slope (gradient) of the graph.
The variable plotted along the vertical axis is the distance in the first case, speed in the second. The gradient of (the tangent to) the distance-time graph is the speed while the area under the curve of the speed-time graph is the distance.
speed is the gradient under the distance vs time graph which is change in distance /change in time
That's not correct. If you have a graph of distance as a function of time, the speed is the slope of the graph.
Speed (in the radial direction) = slope of the graph.
Slope of the graph will give you speed.
we can say that tangential speed of the object is linearly proportional to the distance from the center. Increase in the distance results in the increase in the amount of speed. As we move to the center speed decreases, and at the center speed becomes zero.
The speed is the slope of the curve in such a graph.
The slope of a distance-time graph represents speed.
A speed graph measures the distance devided over time. Acceleration graph measures the change in speed over time.