prove that any three points on a circle cannot be collinear.
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We know that the perpendicular bisector of the chord of a circle passing through its centre. So, the perpendicular bisectors of the chords AB and BC must intersect at the centre of the circle. ... Thus, any three points on a circle cannot be collinear.
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We know that the perpendicular bisector of the chord of a circle passing through its centre. So, the perpendicular bisectors of the chords AB and BC must intersect at the centre of the circle. ... Thus, any three points on a circle cannot be collinear.
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