10 units
If you mean (4, 5) and (10, 13) then the distance is 10
If you mean points of (-3, 1) and (-7, 1) then using the distance formula it is 10 units
If you mean points of (4, 5) and (10, 13) then the distance works out as 10
18 - (-10) = 18 + 10 = 28 units.
10 units
This is a point on the cartesian coordinate plane... (10,13)
If you mean (4, 5) and (10, 13) then the distance is 10
In the 3-dimensional coordinate plane, it is sqrt(82) = 9.06 units long.
Given only the coordinates of that point, one can infer that the point is located 10 units to the right of the y-axis and 40 units above the x-axis, on the familiar 2-dimensional Cartesian space.
If you mean points of (5, 5) and (1, 5) then the distance is 4
If you mean points of (-3, 1) and (-7, 1) then using the distance formula it is 10 units
Contrapositive Cube Coordinate Geometry Coplanar Converse Convex set Coordinate Coordinate Plane Coordinatized line Corollary to a theorem Corresponding Angles Counterclockwise
If you mean points of (4, 5) and (10, 13) then the distance works out as 10
18 - (-10) = 18 + 10 = 28 units.
Using the distance formula the length of the line segment from (10, -3) to (1, -3) is 9 units which means that the line segment is partitioned by 2 units and 7 units. To find the coordinates of point R plot the above information on the Cartesian plane.
It is a set of data in which the position of the numbers matters. For example, the coordinate of a point in a Cartesian plane is an ordered pair. This is because the points (1, 10) and (10, 1) are quite different. The first is much further to the right while the second is higher up.