The question seems a bit ambiguous, but on a time versus distance graph, the slope indicates velocity (speed).
So for instance, if you plot time on the X axis and distance on the Y axis, a steeper slope means greater velocity (more distance covered in less time).
The slope of velocity is the acceleration of the object and indirectly the force of the object given the its mass.
The slope of a position vs time graph gives the velocity of the object moving.
If by position, you mean distance, then the slope or gradient of the line of distance vs. time represents speed.
No movement occurs, if the line is going left and right.
If the line is going up and down, it means that the object has moved an infinite distance in zero time.
It means that the velocity is negative, for example a car travelling backwards or some other direction that is negative.
average velocity
Speed.
Many sets of data do not form into straight lines. If by "What if" you mean how to plot a line onto this graph. Then simply draw a curved line of best fit.
Change in elevation; how steep the slopes of the terrain are.
Any curved line will indicate a change in acceleration. Straight lines with slope indicate a steady velocity and straight lines with zero slope indicate a lack of motion.If the X axis (left to right) is for time and the Y axis (up and down) is for speed, it would curve up.
These lines in maps represent altitude thresholds. This means that everything colored the same within a closed line is within a set altitude range (e.g. 1500-1550 meters above sea level). Therefore, terrains with gentle slopes have wider lines than those with steeper slopes because, the number of lines needed to show the variations in altitude is smaller.
An isoline is a contour line that portays elevation in terms of slopes, pits, and peaks. A contour map, such as a topographic map, shows hills, valleys, and the steepness of various slopes.
By straight lines having different slopes.
of mutually perpendicular lines.
A line graph.
If they are straight lines, then one solution.
Same slopes and different intercepts
Constant speed is shown on a graph using straight lines. The straight line indicates that there are no fluctuations with the speed.
Well, if you use the point on the graph that the two lines intersect the slopes would be defined by the y intercepts. This doesn't really help or answer your question, I'm just thinking out loud.
Because acceleration is the derivative of velocity, you can determine what an acceleration vs. ... t graph are straight and horizontal, i.e. the object moves at a constant velocity, the slopes of those lines are 0 , and so the a vs. t graph should show a straight, horizontal line at y=0 (along the x -axis).
If the lines are perpendicular, their slopes are negative reciprocals.If the lines are perpendicular, their slopes are negative reciprocals.If the lines are perpendicular, their slopes are negative reciprocals.If the lines are perpendicular, their slopes are negative reciprocals.
Distance-time graph will show a straight line with a positive slope. Speed-time graph will show a horizontal line at the uniform speed. Acceleration-time graph will show a horizontal line at a = 0.
negative reciprocal slopes ---> the lines are perpendicular equal slopes ---> the lines are parallel
If the lines are straight and have the same slope they are parallel, no matter what the y intercept is