In `/_\ACB,/_C=90^@` and `CDbotAB`. Prove that `(BC^2)/(AC^2)=(BD)/(AD)`.

In DeltaACB, angleC=90^(@) and CD_|_AB Prove that (BC^(2))/(AC^(2))=(BD)/(AD) .

In triangle ACB , angle C = 90^@ and CD bot AB . Prove that BC^2/AC^2 = BD/AD .

ABD is a Triangle right angle at A and AC bot BD . Show that (i) AB^2=BC.BD (ii) AD^2=BD.CD (iii) AC^2=BC.DC

In Delta ABC , angle A = 90^(@) and AD is an altitude . Complete the relation (BD)/(DA) = (AB)/(…..)

ABD is a triangle right angled at A and ACbotBD .Showthat i) AB^2=BC*BD ii) AC^2=BC*DC iii) AD^2=BD*CD

In the given fig. if AD bot BC , prove that AB^2 + CD^2 = BD^2 + AC^2 .

In the given figure below, If AD bot BC , prove that AB^2+ CD^2 = AC^2 + BD^2 .

In the given figure, ABC is a Triangle right angled at B.D and E are points on BC trisect it. Prove that 8AE^2=3AC^2+5AD^2 .

In the Parallelogram ABCD, bar(AC)^(2)-bar(BD)^(2) =