Statement I : If centroid and circumcentre of a triangle are known its orthocentre can be found
Statement II : Centroid, orthocentre and circumcentre of a triangle are collinear.

If a triangle has it's orthocenter at (1,1) and circumcentre (3/2,3/4) then centroid is:

If the orthocentre and centroid of a triangle are (-3, 5) and (3, 3) then its circumcentre is

The vertices of a triangle are (0, 3), (-3, 0) and (3, 0). The coordinates of its orthocentre are

Statement-I : A positive acceleration can be associated with a 'slowing down' of the body. Statement-II : The origin and the positive direction of an axis are a matter of choice.

Let ABC be a triangle whose centroid is G, orthocentre is H and circumcentre is the origin 'O'. If D is any point in the plane of the triangle such that no three of O,A,C and D are collinear satisfying the relation. AD+BD+CH+3HG= lamdaHD , then what is the value of the scalar lamda .

If centroid of a triangle be (1, 4) and the coordinates of its any two vertices are (4, -8) and (-9, 7), find the area of the triangle.

Find the third vertex of a triangle , if two of its vertices are at (-3,1) and (0,-2) and the centroid is at the origin.

Statement-I : A reactant that is entirely consumed when a reaction goes to completion is known as limiting reactant. Because Statement-II : The amount of reactant limits the amount of product formed.

The vertices of a triangle are (6, 0), (0, 6) and (6, 6). Then distance between its circumcentre and centroid, is

The vertices of a triangle are A(0, 0), B(0, 2) and C(2, 0). The distance between circumcentre and orthocentre is