Coordinates: (-4, 1) and (6, 3)
Slope of line: 1/5
Two coordinates are needed to work out the slope of the line.
If you mean points of: (5, 0) and (6, 2) then the slope works out as 2
Two sets of points are needed to determine the slope of a line
To find the slope of a line, you take two points on the line, then use their X and Y coordinates in the following formula: slope = ( Y2 -Y1 ) / ( X2 - X1) By simplifying the answer, you will get your slope.
The slope of a line passing through two points with given x y coordinates can be found by dividing the (signed) difference between the two y coordinates by the (signed) difference between the two x coordinates, being careful to take the coordinates in the same order for each subtraction. In this instance, the slope is (-4 - 4)/(-1 - 3) = -8/-4 = 2.
Two coordinates are needed to work out the slope of the line.
If you mean points of: (5, 0) and (6, 2) then the slope works out as 2
Two or more coordinates are needed to determine the slope of a line
To ascertain the slope of a line two sets of coordinates are required or other information that enables the slope to be determined. Without this extra information an answer to this question cannot be provided.
No.
"14" is not a point; you need two coordinates to specify a point.
Two sets of points are needed to determine the slope of a line
To find the slope of a line, you take two points on the line, then use their X and Y coordinates in the following formula: slope = ( Y2 -Y1 ) / ( X2 - X1) By simplifying the answer, you will get your slope.
The slope of a line passing through two points with given x y coordinates can be found by dividing the (signed) difference between the two y coordinates by the (signed) difference between the two x coordinates, being careful to take the coordinates in the same order for each subtraction. In this instance, the slope is (-4 - 4)/(-1 - 3) = -8/-4 = 2.
You need two coordinates, not one, to specify a point. To calculate the slope, simply calculate (difference in y-coordinates) / (difference in x-coordinates).
Two coordinates are needed to determine the slope of a straight line equation.
Slope of the line and the coordinates of a point on the line [for example (-3,2)]