Math, asked by adityapatilgenius, 1 year ago

prove that any 3 points on circle cannot be collinear

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Answered by TDA1

Any 3 point on circle cannot be collinear , because 3 points collinear are seated in line or straight line ,if they are not seated in line . They are not collinear so we can say that any 3 point on circle cannot be collinear.

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