Only one circle can be throught three collinear points .

Write True or False: Only one circle can be drawn through three collinear points.

Only one circle can be drawn through three non-colinear points.

Statement 1 : The differential equation of all circles in a plane must be of order 3. Statement 2 : There is only one circle passing through three non-collinear points.

Let's try and find the answers : (iii) How many line segments can be drawn through three non-collinear points.

if three points are collinear , how many circles can be drawn through these points? Now, try to draw a circle passing through these three points.

There are 10 points in a plane of which no three points are collinear and four points are concyclic. The number of different circles that can be drawn through at least three points of these points is (A) 116 (B) 120 (C) 117 (D) none of these

Statement 1: there exists a unique sphere which passes through the three non-collinear points and which has the least radius. Statement 2: The centre of such a sphere lies on the plane determined by the given three points.

Write True or False Only one circle can be drawn which touches the all sides or extended sides of a triangle.

Let's try and find the answers : (ii) How many strainght lines can be drawn throught two fixed points.

In two circles , one circle passes through the centre O of the other circle and they intersect each other at the points A and B . A straight line passing through A intersect the circle passing through O at the point P and the circle with centre at O at the point R . BY joining P , B and R , B prove that PR= PB.