From a point P inside the triangle ABC, perpendicular PQ, PR and PS are respectively drawn to sides BC, CA and AB.
Prove that `AS^(2)+BQ^(2)+CR^(2)=BS^(2)+CQ^(2)+AR^(2)`

From a point O inside a triangle ABC, perpendiculars OD, OE and OF are drawn to the sides BC, CA and AB, respectively. Prove that the perpendiculars from A, B and C to the sides EF, FD and DE are concurrent

From a point O inside a triangle ABC , perpendiculars OD,OE and Of are drawn to rthe sides BC,CA and AB, respecrtively. Prove that the perpendiculars from A,B, and C to the sides EF, FD and DE are concurrent.

In a ABC,/_ABC=135o. Prove that AC^(2)=AB^(2)+BC^(2)+4ar(ABC)

P and Q are points on the sides CA and CB respectively of ABC, right angled at C. Prove that AQ^(2)+BP^(2)=AB^(2)+PQ^(2)

If G be the centroid of the Delta ABC, then prove that AB^(2)+BC^(2)+CA^(2)=3(GA^(2)+GB^(2)+GC^(2))

If G be the centroid of a triangle ABC,prove that,AB^(2)+BC^(2)+CA^(2)=3(GA^(2)+GB^(2)+GC^(2))

In triangle ABC,/_BAC=90^(@) and AB=AC. Seg AP is perpendicular to side BC.D is any point on side BC.Prove that 2(AD)^(2)=(BD)^(2)+(CD)^(2)

D and E are points on the sides CA and CB respectively of a triangle ABC right angled at C.Prove that AE^(2)+BD^(2)=AB^(2)+DE^(2)

The perpendicular drawn from A on sides BC of a Delta ABC intersects BC at D such that DB = 3CD .Prove that 2AB^(2)=2AC^(2)+BC^(2) .