(vi) The point of intersection of the three medians of any triangle is called-

(v) The point of intersection of the bisectors of the angles of any triangle is called-

The position vectors of the three vertices of a triangle are (-hati-3hatj+2hatk), (5hati+7hatj-5hatk) and (2hati+5hatj+6hatk) , then the position vector of the point of intersection of the medians of the triangle is -

The point of intersection of the medians of a triangle with vertices (8, 4), (5, 7) and (-1, -2) is

Find the coordinates of the point of intersection of the medians of the triangle formed by joining the points (-1,-2),(8,4) and (5,7).

Consider a triangular pyramid ABCD the position vectors of whose agular points are A(3,0,1),B(-1,4,1),C(5,3, 2) and D(0,-5,4) Let G be the point of intersection of the medians of the triangle BCD. The length of the vector bar(AG) is

Consider a triangular pyramid ABCD the position vectors of whose agular points are A(3,0,1),B(-1,4,1),C(5,3, 2) and D(0,-5,4) Let G be the point of intersection of the medians of the triangle BCD. The length of the vector bar(AG) is

Consider a triangular pyramid ABCD the position vectors of whose agular points are A(3,0,1),B(-1,4,1),C(5,3, 2) and D(0,-5,4) Let G be the point of intersection of the medians of the triangle BCD. The length of the vector bar(AG) is

Find the vector from the origin to the intersection of the medians of the triangle whose vertices are A(-1, -3), B(5, 7) and C(2, 5).

Let's find in how many points do the three medians of a triangle meet.