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Why is the slope between any two points on the straight line always to same?
The slope between any two points on a straight line is constant because a straight line represents a linear relationship between the two variables. This means that the rate of change remains consistent regardless of which two points you choose on the line. Mathematically, the slope is calculated as the change in the vertical direction (rise) over the change in the horizontal direction (run), and for a straight line, this ratio does not vary. Therefore, the slope remains the same for all pairs of points on that line.
The slope of a curved line differs from that of a straight line in that?
Slope of a straight line is the same at all points on the line, whereas for a curved line it changes.
Why can you use any two points on a line to find its slope?
You can use any two points on a line to find its slope because the slope represents the rate of change between two points. By selecting two distinct points, you can measure the vertical change (rise) and the horizontal change (run) between them. The slope is calculated as the rise divided by the run, which remains constant for any two points on a straight line. This characteristic defines the linear relationship represented by the line.
What is the slope of points -6 3 and points 2 9?
Points do not have a slope but a straight line joining them does: (9-3)/(2- -6) = 6/8 = 3/4 or 0.75
What is the slope of -5 3 and 3 3?
Two points don't have a slope. But the line between them does. The line between the points (-5, 3) and (3, 3) has a slope of zero.
Why is the slope between any two points on the straight line always to same?
The slope between any two points on a straight line is constant because a straight line represents a linear relationship between the two variables. This means that the rate of change remains consistent regardless of which two points you choose on the line. Mathematically, the slope is calculated as the change in the vertical direction (rise) over the change in the horizontal direction (run), and for a straight line, this ratio does not vary. Therefore, the slope remains the same for all pairs of points on that line.
Find the slope of the line containing the points 6 4 and 6 8?
The slope for these two points is undefined, or straight up.
The slope of a curved line differs from that of a straight line in that?
Slope of a straight line is the same at all points on the line, whereas for a curved line it changes.
Why can you use any two points on a line to find its slope?
You can use any two points on a line to find its slope because the slope represents the rate of change between two points. By selecting two distinct points, you can measure the vertical change (rise) and the horizontal change (run) between them. The slope is calculated as the rise divided by the run, which remains constant for any two points on a straight line. This characteristic defines the linear relationship represented by the line.
What is the slope of points -6 3 and points 2 9?
Points do not have a slope but a straight line joining them does: (9-3)/(2- -6) = 6/8 = 3/4 or 0.75
Same value of the slope between any two points?
Questioning also is a good skill. It must be clear and precise to get the apt answer which will be useful to each and every one. With the nine words put in that way I guess that you mean the slope remains the same every where at all points in between two given points. Is that right? Then the curve in between the two points will be a straight line.
What is the slope of -5 3 and 3 3?
Two points don't have a slope. But the line between them does. The line between the points (-5, 3) and (3, 3) has a slope of zero.
How do you get the slope for 4 5 6 8?
To find the slope between two points: slope = change_in_y/change_in_x Thus for the points (4, 5) and (6, 8), the slope between them is given by: slope = (8-5)/(6-4) = 3/2 = 1½ = 1.5
What is the slope of the line that contains the points (83) and (87)?
Points: (8, 3) and (8, 7) Slope: 0 It will be a straight vertical line parallel to the y axis
What is the slope of a line that contains the points (8-6) and (82)?
Points: (8, -6) and (8, 2) Slope: 0 It is a straight line parallel to the y axis.
The relationships between average speed and the slope of a position time graph?
-- If the position/time graph is a straight line, then the speed is constant, and the slope of the line is the average speed, as well as the instantaneous speed at any moment. -- If the position/time graph is not a straight line, then the average speed between two moments in time is the slope of a straight line drawn between those two points on the graph.
How does the slope differ from average rate of change?
They are the same for a straight line but for any curve, the slope will change from point to point whereas the average rate of change (between two points) will remain the same.
