Let ABC be a triangle, right-angled at B and D be the midpoint of AC. Show that DA = DB = DC.

In the figure given below ABC is a triangle right angled at A and AC bot CD . Show that AC^(2) = BC xx DC

In the figure given below ABC is a triangle right angled at A and AC bot BD . Show that AD^(2) = BD xx DC

In the given figure, ABD is a triangle right angled at A and AC bot BD . Show that AC^(2)= BC*DC

Let ABC be an acute-angled triangle and let D be the midpoint of BC. If AB = AD, then tan(B)/tan(C) equals

If ABC is a right triangle right-angled at B and M, N are the midpoints of AB and BC respectively. Then 4 (AN^2 + CM^2) =

In fig., ABD is a triangle right angled at A and AC bot BD. Show that:- AC^2 = BC.DC .

ABC is a right triangle with right angle at B, if P is a mid point of AC show that PB=PA=PC=(1)/(2)(AC)

In Fig , ABD is a triangle right angled at A and AC bot BD. show that AC^(2)=BC . DC

ABC is right angled triangle, right angled at C . D is the midpoint of BC. Then , (tan theta)/( tan phi) =

ABC is a triangle right angled at B.D is a point on AC such that /_ABD=45^(@) If AC=6 and AD=2 then AB=