Three distinct points A, B and C are given in the 2–dimensional coordinate plane such that the ratio of the distance of any one of them from the point (1, 0) to the distance from the point (–1, 0) is equal to `1/3`.Then the circumcentre of the triangle ABC is at the point :

Three distinct points A, B and C are given in the 2aedimensional coordinate plane such that the ratio of the distance of any one of them from the point (1, 0) to the distance from the point (–1, 0) is equal to 1/3 .Then the circumcentre of the triangle ABC is at the point :

Three distinct points A, B and C are given in the 2-dimensional coordinate plane such that the ratio of the distance of any one of them from the point (1, 0) to the distance from the point (-1, 0) is equal to 1:3. Then the circumcentre of the triangle ABC is at the point

Three distinct point A, B and C are given in the 2-dimensional coordinates plane such that the ratio of the distance of any one of them from the point (1, 0) to the distance from the point (-1, 0) is equal to (1)/(3) . Then, the circumcentre of the triangle ABC is at the point

Three distinct point A, B and C are given in the 2-dimensional coordinates plane such that the ratio of the distance of any one of them from the point (1, 0) to the distance from the point (-1, 0) is equal to (1)/(3) . Then, the circumcentre of the triangle ABC is at the point

Three distinct point A, B and C are given in the 2-dimensional coordinates plane such that the ratio of the distance of any one of them from the point (1, 0) to the distance from the point (-1, 0) is equal to (1)/(3) . Then, the circumcentre of the triangle ABC is at the point

Three distinct points A, B and C are given in the 2-dimensional coordinate plane such that the ratio of the distance of any one of them from the point (1, 0) to the distance from the point (-1, 0) is equal to 1:3. Then the circumcentre of the triangle ABC is at the point (1) (0,0) (2) (5/4,0) (c) (5/2,0) (d) (5/3,0)