$Δ A B C$ is an isosceles triangle in which $A B = A C$ . Side $B A$ is produced to $D$ such that $A D = A B$ (see Fig.) . Show that $∠ B C D$ is a right angle.

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Solution

Showing that $∠ B C D$ is a right angle:
Given:
$A B = A C$ and $A D = A B$
In $∆ A B C,$
$\begin{array}{rcl} A B & = & A C \\ ∠ A C B & = & ∠ A B C — — — — — — - (i) [A n g l e s o p p o s i t e t o e q u a l s i d e s a r e e q u a l] \end{array}$
In $∆ A C D,$
$\begin{array}{rcl} A C & = & A D \\ ∠ A C D & = & ∠ A D C — — — — — — - (i i) [A n g l e s o p p o s i t e t o e q u a l s i d e s a r e e q u a l] \end{array}$
On adding equations $(i)$ and $(ii)$ we get
$\begin{array}{rcl} ∠ A C B + ∠ A C D & = & ∠ A B C + ∠ A D C \\ ∠ B C D & = & ∠ A B C + ∠ B D C \end{array}$
Adding $∠ BCD$ on both side
$\begin{array}{rcl} ∠ B C D + ∠ B C D & = & ∠ A B C + ∠ B D C + ∠ B C D \end{array}$
$\begin{array}{rcl} 2 ∠ B C D & = & 180 ° (B y a n g l e s u m p r o p e r t y) \\ \Rightarrow & ∠ B C D = \frac{180 °}{2} \\ \Rightarrow & ∠ B C D = 90 ° \end{array}$
Hence we proved that $∠ B C D$ is a right angle:

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