In the following figure, AD=??
None of these
ΔABC is isosceles,
So, ∠ACB=∠ABC−(I)
∠CBE+∠ABC=180∘ [linear pair]
⇒∠CBE=180∘−∠ABC−(II)
Similarly, ∠DCA+∠ACB=180∘ (Linear pair)
∴∠ACD=180∘−∠ACB−(III)
From (I),(II),(III), we get
∠ACD=∠CBE.
In ΔACD and ΔEBC,
AC =EB (Given)
∠ACD=∠EBC (Proved above)
CD =BC (Given)
So,by SAS congnency, ΔACD≅ΔEBC
Hence, AD =EC [C.P.C.T.C]