In an isoscles `Delta ABC, AB= AC and D` is a point on BC. Prove that `AB^(2)-AD^(2)=BD*CD`.

In /_ABC,AB=AC and D is any point on BC , prove that AB^(2)-AD^(2)=BD.CD

In triangle ABC, AB gt AC and D is any point on BC. Prove that, AB gt AD.

ABC is a triangle in which AB=AC and D is any point in BC. Prove that AB^(2)-AD^(2)=BDCD

In Delta ABC, AB= AC . Side BC is produced to D. Prove that (AD^(2)-AC^(2))=BD*CD .

In DeltaABC, AB = AC and D is a point in BC so that BD=CD . Prove that AD bisects angleBAC .

ABC is an isosceles triangle with AB=AC and D is a pooint on AC such that BC^(2)=ACxCD .Prove that BD=BC

If ABC is an isosceles triangle and D is a point on BC such that AD perp BC, then AB^(2)-AD^(2)=BDdot DC( b) AB^(2)-AD^(2)=BD^(2)-DC^(2)(c)AB^(2)+AD^(2)=BDdot DC(d)AB^(2)+AD^(2)=BD^(2)-DC^(2)

In triangle ABC, angleA = 90^(@) , CA= AB and D is a point on AB porduced. Prove that : DC^(2) - BD^(2) = 2AB. AD

In a triangle ABC,B=90^(@) and D is the mid-oint of BC then prove that AC^(2)=AD^(2)+3CD^(2)