Math, asked by arham8497, 7 months ago

Three non-collinear points determine a plane.​
true or false

Answers

Answered by harishjanadri
13

Answer:

False

Step-by-step explanation:

The points which do not lie on the same line are known as Non-collinear points.

The points which do not lie on the same line are known as Non-collinear points.If we plot two points, it determines the equation of a line.

The points which do not lie on the same line are known as Non-collinear points.If we plot two points, it determines the equation of a line.Since, at-least two points determine a line.

The points which do not lie on the same line are known as Non-collinear points.If we plot two points, it determines the equation of a line.Since, at-least two points determine a line.If we add one more point, it will become a plane.

The points which do not lie on the same line are known as Non-collinear points.If we plot two points, it determines the equation of a line.Since, at-least two points determine a line.If we add one more point, it will become a plane. Thus, at-least three points are required to determine a plane.

I HOPE THIS HELPS U

Answered by sakshigutte
7

Answer:

false

Three non collinear points determine a triangle

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