prove that the area of a triangle is four times the area of the triangle formed by joining the mid-points of its sides.

Prove that the area of any triangle is equal to four times the area of the triangle formed by joining the mid points of its sides.

The vertices of a Delta ABC are A (-5,-1), B (3,-5) , C (5,2). Show that the area of the Delta ABC is four times the area of the triangle formed by joining the mid-points of the sides of the triangle ABC.

The vertices of a Delta ABC are A(-5,-1) B(3.-5) , C-(5.2).Show that the area of the DeltaABC is four times the area of the triangle formed by joining the mid-points of the sides of the triangle ABC.

Prove analytically that the area of a triangle is four times that of the triangle obtained by joining the mid - points of the sides of the given triangle .

Find the Area of the triangle formed by joining the mid points of the sides (0,-1) (2,1) and (0,3)

Prove that the centroid of any triangle is the same as the centroid of the triangle formed by joining the middle points of its sides

Prove that the centroid of any triangle is the same as the centroid of the triangle formed by joining the middle points of its sides

The sides of a triangle are 3cm,4cm and 5cm. The area (incm2) of the triangle formed by joining the mid-points of the sides of this triangle is (3)/(4) (b) (3)/(2) (c) 3 (d) 6

If Delta_(1) is the area of the triangle formed by the centroid and two vertices of a triangle Delta_(2) is the area of the triangle formed by the mid- point of the sides of the same triangle, then Delta_(1):Delta_(2) =

If Delta_(1) is the area of the triangle formed by the centroid and two vertices of a triangle Delta_(2) is the area of the triangle formed by the mid- point of the sides of the same triangle, then Delta_(1):Delta_(2) =