Question

state and prove why 3 points on circle cannot be collinear.​

Answer 1

Answer:

Step-by-step explanation:

The point where they intersect is the center of the circle. The perpendiculars of the line segments drawn by joining collinear points is always parallel whereas in circle any three point's perpendicular bisector will always intersect at the center. Hence, any three points on the circle cannot be collinear.

Answer 2

Answer:

Don't know

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