In `Delta ABC`, `CD _|_ AB`, `CA = 2 AD` and `BD = 3 AD`. Prove that `/_ BCA = 90^(@)`

In Delta ABC , BD : CD = 3 : 1 and AD _|_ BC . Prove that 2(AB^(2) - AC^(2)) = BC^(2) .

In Delta ABC , DE || BC and CD || EF . Prove that AD^(2) = AF xx AB

In Delta ABC , AD bot BC and AD^(2)= BD xx CD . Prove that AB^(2) + AC^(2) = (BD + CD)^(2)

In Delta ABC , AD is the median and PQ || BC . Prove that PE = EQ

In Delta ABC = 90^(@) , BD _|_ AC . If BD = 8 cm and AD = 4 cm , find CD.

In an equilateral triangle ABC, AD _|_ BC . Prove that : AB^(2) + CD^(2) = 5/4 AC^(2)

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

In the trapezium ABCD, AB || DC and Delta ARD - Delta BEC . Then Prove that AD = BC.

In Delta ABC , AB = 6 cm and DE || BC such that AE = 1/4 AC , then what is AD ?

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