coplanar points
Coplanar points are points that lie on the same plane
Coplanar points are points that lie on the same plane. A plane is a flat, two-dimensional surface that extends infinitely in all directions. In other words, if you can draw a straight line through any two points, then all the points on that line are coplanar.
To understand coplanar points better, let’s consider an example. Take three points on a sheet of paper: A, B, and C. If you draw a straight line from A to B and extend it, and then draw another straight line from B to C and extend it, you will notice that these lines eventually intersect or coincide.
Now, if you pick any other point, let’s say D, on the sheet of paper and draw a straight line from A to D, you will see that this line will also intersect or coincide with the previous lines. This suggests that all these points (A, B, C, and D) lie on the same plane, and hence they are coplanar.
It is important to note that any three non-collinear points will always be coplanar. Collinear points are points that lie on the same line, and they are always coplanar because a line can be thought of as a flat plane with infinite width and zero height.
In summary, coplanar points refer to points that lie on the same plane. They can be visualized as points that can be connected by straight lines and will either intersect or coincide with each other. Understanding the concept of coplanar points is important in various areas of mathematics, such as geometry and analytical geometry.
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