Prove the any three points on a circle cannot be collinear .

By using the concept of equation of a line, prove that the three points (3,0) and and are collinear.

In figure, AOB is a diameter of the circle and C, D, E are any three points on the semi-circle. Find the value of angleACD+ angleBED .

Prove that the points (6,4) (4,5) and (2,6) are collinear.

Through three collinear points a circle can be draw.

The common tangents AB and CD to two circles with centres O and O' intersect at E between the centres.Prove that the points O,E and O' are collinear.

In a figure the common tangents, AB and CD to two circles with centers O and O' intersect at E. Prove that the points O, E and O' are collinear.

Prove that the points (-2,5),(0,1) and (2,-3) are collinear.

There are 20 points in a plane. How different triangles can be formed with these points? (no three points are collinear).

There are n points in a plane, No three being collinear except m of them which are collinear. The number of triangles that can be drawn with their vertices at three of the given points is