In the figure, AD = BC and BD = CA. Prove that `angleADB = angleBCA and angleDAB = angleCBA`.

In the given figure, AB = AC and AD = AE. Prove that: BD = CE

In Figure,AD=BC and BD=CA. Prove that backslash/_ADB=backslash/_BCA and backslash/_DAB=backslash/_CBA

In the given figure of AD = CB then prove that AC = BD

In the following figure, if AD = DE . Prove that : AB+BC gt CE

In Figure DE|BC and CD|EF. Prove that AD^(2)=ABxAF.

In the given figure, ABCD is a quadrilateral in which AD = BC and angleDAB=angleCBA. Prove that (i) DeltaABD~=DeltaBAC, (ii) BD = AC, (iii) angleABD=angleBAC.

In theadjoining figure, angleDAB=angleABC and AD = BC prove that BD = AC .

In the given figure,AD = AE and AD^(2)=BD xx EC prove that: triangles ABD and CAE are similar.

In the figure,AD is the bisector of angle BAC. Prove that AB>BD.

In Figure,/_BCD=/_ADC and /_ACB=/_BDA. Prove that AD=BC and /_A=/_B