If it is distance from a point versus time, with distance on the vertical axis and time on the horizontal axis, it would show a steep vertical climb on the graph. The steeper vertical change, the faster, but never completely vertical. Large "rise" (distance) over short "run" (time). With 0 acceleration, the graph is a straight line.
Im guessing that this is a distance over time graph. if so, the gradient of the line of best fit would have a low value. (not be very steep)
The slope of a distance-time graph gives the speed of an object. A steeper slope indicates a higher speed, while a flatter slope indicates a lower speed.
On a time graph, constant speed is represented by a straight line with a constant slope. The slope of the line indicates the speed of the object – the steeper the slope, the faster the speed, and the shallower the slope, the slower the speed.
No, the slope of a speed-versus-time graph represents the rate of change of speed, not acceleration. Acceleration is represented by the slope of a velocity-versus-time graph.
The slope of the motion graph represents the object's speed. A steeper slope indicates a faster speed, while a shallower slope indicates a slower speed. Specifically, the slope is calculated as the change in distance divided by the change in time, which gives you the speed of the object at any given point on the graph.
The angle of the graphed slope changes with changes in speed.
Im guessing that this is a distance over time graph. if so, the gradient of the line of best fit would have a low value. (not be very steep)
Im guessing that this is a distance over time graph. if so, the gradient of the line of best fit would have a low value. (not be very steep)
No, but the slope of the graph does.
A straight line with a steep slope on a distance-time graph indicates that the car is traveling at a high and constant speed. The steepness of the slope represents the rate of distance covered over time, showing that the car is moving quickly. Since the line is straight, it implies that the speed does not change over the observed period.
No. The slope on a speed vs time graph tells the acceleration.
The slope of the speed-vs-time graph is the magnitude of acceleration.
A graph requires two numerical variables before it can have a meaningful slope. A distance-graph has only one variable so it does ot have a slope in any meaningful way. For eaxmple, you could have a graph showing the distances of varoius places from, say London.
The slope of a distance-time graph gives the speed of an object. A steeper slope indicates a higher speed, while a flatter slope indicates a lower speed.
acceleration
If the slope is 'uphill' then the car is going faster
Acceleration is how fast you get up to speed.