In `DeltaABC,` BE and CF are two medians . If BC = x cm, then EF =

Ther perimeters of DeltaABC and DeltaDEF are 30cm and 18cm respectively. DeltaABC~DeltaDEF , BC and EF are corresponding sides. If BC=9cm , the EF=? .

In the right-angled ABC, /_A =1 right angle. BE and CF are two medians of Delta ABC . Prove that 4 ( BE^(2) + CF^(2)) =5 BC^(2)

(ii) AD is median of the DeltaABC and the centroid of DeltaABC is O. If AO=10 cm, then the length of OD is

(iv) In Delta ABC, angle ABC=90^@ and if AB=6 cm and BC= 8 cm , then find circum-radius of DeltaABC .

AD, BE and CF are the medians of triangle ABC whose centroid is G. If the points A, F, G and E are concyclic, then prove that 2a^(2) = b^(2) + c^(2)

DeltaABC and DeltaBDE are two equilateral triangles. If D is the mid-point of BC , then the ratio of the areas of DeltaABC and DeltaBDE is

If in ABC,A is right angle and BP and CQ are two medians, then prove that 5 BC^2 = 4 (BP^2 + CQ^2) .

In DeltaABC , D and E are two such points on the sides AB and AC respectively that DE||BC . If AD=x+3 , BD=3x+19 , AE=x and CE=3x+4 , then the value of x=