The point of concurrence of the medians of a triangle is called …….

If Q is the point of intersection of the medians of a triangle ABC, prove that vec(QA)+vec(QB)+vec(QC)=vec0 .

Find the point of intersection of the medians of the triangle with vertices at (- 1, 0), (5,- 2) and (8, 2).

Consider a triangular pyramid ABCD the position vectors of whone 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 BCT. The length of the vector bar(AG) is

Consider a triangular pyramid ABCD the position vectors of whone 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 AG is

Consider a triangular pyramid ABCD the position vectors of whose angular points are A(3, 0, 1), B(-1, 4, 1), C(5, 2, 3) and D(0, -5, 4) . Let G be the point of intersection of the medians of triangle BCD. Q. Area of triangle ABC in sq. units is

Consider a triangulat pyramid ABCD the position vector of whose angular points are A(3, 0, 1), B(-1, 4, 1), C(5, 2, 3) and D(0, -5, 4) . Let G be the point of intersection of the medians of the triangle(BCD) . Q. Area of the triangle(ABC) (in sq. units) is

The median of a triangle divides it into two

How many medians can a triangle have?