In the adjoining figure, in `DeltaABC`, point D is on side BC such that, `angleBAC = angleADC`. Prove that, `CA^2 = CB xx CD`.

In the figure in DeltaABC, point D on side BC is such that /_BAC=/_ADC . Prove that CA^(2)=CBxxCD .

In the given figure , D is a point on the side BC of Delta ABC such that angle ADC=angle BAC . Prove that CA^(2)=CBxxCD .

In Delta ABC , D is a point on side BC such that angle ADC = angle BAC , If CA = 12 cm, CB = 8 cm then CD is equal to :

In the given figure, P is the mid-point of side BC of a parallelogram ABCD such that angleBAP=angleDAP. Prove that AD = 2CD.

In the adjoining figure AE||CD and BC||ED, then find Y.

In the given figure, DeltaABC is right angled at B such that angleBCA=2angleBAC. Show that hypotenuse AC = 2BC.

In the adjoining figure, DeltaABC is an isosceles triangle in which AB = AC and AD is the bisector of angleA . Prove that: BD = CD

In figure, P is the mid-point of side BC of a parallelogram ABCD such that angleBAP=angleDAP . Prove that AD = 2CD. ltBrgt

In the adjoining figure, X and Y are respectively two points on equal sides AB and AC of DeltaABC such that AX = AY. Prove that CX = BY.