Are three points sometimes collinear

Anonymous

∙ 13y ago

Updated: 8/20/2019

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.

Wiki User

∙ 13y ago

What else can I help you with?

Three points are sometimes never or always collinear?

sometimes

Is every set of three points a collinear?

no,three points can be non collinear

What is the difference between collinear and non collinear point?

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.

Are 3 points collinear?

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 exactly one?

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.

When you say three points collinear?

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.

Are two points collinear?

sometimes

If the points are on the same line then the points are collinear?

Three or more points that lie on the same straight line are called Collinear.

What defines a collinear point?

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.

Two or more points are if they lie on the same line?

collinear

What is the inverse of the statement if three points lie on a line then they are collinear?

The inverse of the statement "If three points lie on a line, then they are collinear" is "If three points are not collinear, then they do not lie on a line." This flips both the hypothesis and the conclusion, negating each. In essence, it asserts that if points do not meet the criteria of being collinear, they cannot be positioned on the same line.

The greatest number of planes that can pass through three collinear points?

You can have an infinite number of planes passing through three collinear points.

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