Yes, but here's the thing. When you have two pts that dictate a line, then you add another pt, that plane they dictate has that line for one of its borders. So as large or small you want to make it, that line is the only place in that plane where all three pts are colinnear.
sometimes
Three coplanar points are always collinear if they lie on a single straight line. However, if they do not lie on the same straight line, they are not collinear. Thus, coplanar points can be either collinear or non-collinear, but they cannot be sometimes collinear; the relationship is definitive based on their arrangement.
no,three points can be non collinear
Collinear points are three or more points lying on the same line.Non-collinear point are when less than three (not including three) points lie on a line.
A set of 3 points will always be coplanar, but will only sometimes be collinear. Collinear points are always coplanar as well.
When you have three collinear points there is one gradient. I'm not sure what your question is specifically but when points are collinear they have the same gradient.
Three or more points are collinear if they lie on the same straight line.Three or more points are collinear if they lie on the same straight line.Three or more points are collinear if they lie on the same straight line.Three or more points are collinear if they lie on the same straight line.
sometimes
Three or more points that lie on the same straight line are called Collinear.
Collinear points are defined as three or more points that can be connected by a straight line. You can learn more about collinear points from the Math World website.
collinear
Three points can lie in more than one plane if they are not collinear. If the three points are non-collinear, they define a unique plane, but if they are collinear, they can lie on infinitely many planes that contain that line. Additionally, if you consider different orientations or positions of planes that intersect the line formed by the collinear points, these also contribute to the existence of multiple planes. Therefore, the arrangement and relationship of the points determine how many planes can contain them.