BL and CM are medians of a triangle ABC right angled at A.
Prove that `4(BL^(2)+ CM^(2))=5BC^(2)`

ABC is an isosceles triangle right angled at C. Prove that AB^(2) = 2AC^(2) .

P and Q are the mid-points of the sides CA and CB respectively of a Delta ABC , right angled at C. Prove that 4(AQ^(2)+BP^(2))=5 AB^(2) .

In Delta ABC, angle BAC = 90^(@), seg BL and seg CM are medians of Delta ABC prove that 4(BL^(2) + CM^(2)) = 5 BC^(2)

ABC is a right triangle , right angled at A and D is the mid point of AB . Prove that BC^(2) =CD^2 +3BD^(2) .

In a triangle ABC if angle ABC=60^(@) , then ((AB-BC+CA)/(r ))^(2)=

In the adjacent figure, ABC is a right angled triangle with right angle at B and points D, E trisect BC. Prove that 8AE^(2)=3AC^(2)+5AD^(2).

In a triangle ABC, prove that b^(2) sin 2C+c^(2) sin 2B=2bc sin A .

Draw and locate the centroid of the triangle ABC where right angle at A, AB= 4 cm and AC = 3cm.

In triangle ABC, if a = 2 and bc = 9, then prove that R = 9//2Delta