In a right-angled triangle `ABC, angleABC=90^(@)` and D is mid-point of AC. Prove that `BD=(1)/(2)AC`.

In the given figure, triangle ABC is a right triangle with angleB=90^(@) and D is mid-point of side BC. Prove that : AC^(2)=AD^(2)+3CD^(2)

In right-angled triangle A B C in which /_C=90^@ , if D is the mid-point of B C , prove that A B^2=4\ A D^2-3\ A C^2 .

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

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

In Fig. 3, ABC is a right triangle, right angled at C and D is the mid-point of BC. Prove that AB^2 = 4AD^2 - 3AC^2 .

In triangle ABC, AB=AC and BD is perpendicular to AC. Prove that : BD^(2)-CD^(2)=2CDxxAD

ABC is a right angled triangle with angleABC=90^(@) , D is any point on AB and DE is perpendicular to AC. Prove that : (i) DeltaADE~DeltaACB .

In an isosceles triangle ABC, AB = AC and D is a point on BC produced. Prove that : AD^(2)=AC^(2)+BD.CD

ABC is a right angled triangle with angleABC=90^(@) , D is any point on AB and DE is perpendicular to AC. (ii) If AC = 13 cm, BC = 5 cm and AE = 4 cm. Find DE and AD.

ABC is a right angled triangle with angleABC=90^(@) , D is any point on AB and DE is perpendicular to AC. Prove that : (iii) Find area of Delta ADE : area of quadrilateral BCED.If AC = 13 cm, BC = 5 cm and AE = 4 cm.