Centroid of a triangle divides its median in the ratio of 1:2 from the vertex.

A point taken on each median of a triangle divides the median in the ratio 1:3 reckoning from the vertex.Then the ratio of the area of the triangle with vertices at these points to that of the original triangle is:

A point taken on each median of a triangle divides the median in the ratio 1 : 3, reckoning from the vertex. Then the ratio of the area of the triangle with vertices at these points to that of the original triangle is

prove by using the principle of similar triangles that: the centroid of triangle divides a median in the ratio of 2:1 .

Centroid divides each median in ratio 2:1

The centroid divides each median in the ……………ratio.

Centroid divides the median from the vertex in the ratio_____

What do you observe? Justify that the point that divides each median in the ratio 2 : 1 is the centriod of a triangle.

The centroid of the tetrahedron ABCD divides the line joining the vertex A to the centroid of triangle BCD in the ratio