In a triangle ABC, D is midpoint of side BC. If `ACgtAB and AE_|_BC`, then prove that `AB^(2)=AD^(2)-BC.ED+(1)/(4)BC^(2)`

In Delta ABC , D is the midpoint of BC and AE bot BC . If AC gtAB , show that AB^(2)=AD^(2)-BC*DE+(1)/(4)BC^(2)

In a triangle ABC,AC>AB,D is the mid- point of BC and AE perp BC .Prove that: (i) AB^(2)=AD^(2)-BCDE+(1)/(4)BC^(2)( (ii) AB^(2)+AC^(2)=2AD^(2)+(1)/(2)BC^(2)

In a triangle ABC,AC>AB,D is the mid- point of BC and AE perp BC .Prove that: (i) AC^(2)=AD^(2)+BCDE+(1)/(4)BC^(2)

In rectangle ABCD, E is the midpoint of side BC. Prove that, AE = DE.

In an equilateral triangle ABC,D is a point on side BC such that BD=(1)/(3)BC Prove that 9AD^(2)=7AB^(2)

In right-angled triangle ABC in which /_C=90^(@), if D is the mid-point of BC, prove that AB^(2)=4AD^(2)-3AC^(2)

If D is the mid-point of the side BC of a triangle ABC, prove that vec AB+vec AC=2vec AD .

In DeltaABC, D is any point on side BC. Prove that AB+BC+CA gt 2AD