Question

prove that any three point on a circle cannot be collinear

Answer 1

if three point will be collinear then all points must be at one line. points in one line can not make a circle. Two points in collinear can make circle.

Answer 2

Answer:

Three point on a circle cannot be collinear

Step-by-step explanation:

we have to prove any three point on a circle cannot be collinear.

Collinear points are the points which are on the straight line.

We can make a circle with 2 collinear points

But three collinear points cannot make a circle .

Hence it is proved that any three on a circle cannot be collinear. we also prove this by construction of circle.

The first condition to construct a circle join up the points to form two lines. i.e the points which are taken is non-collinear i.e not on the straight line.

Hence, three point on a circle cannot be collinear