In an isosceles triangle AB = AC and BA is produced to D, such that AB = AD. What is the value of ∠BCD?
90∘
Given, AB = AC and AD = AB
Now, as we know that angles opposite to equal sides are equal. Thus, ∠ABC=∠ACB…(i)
and, ∠ADC=∠ACD…(ii)
Adding (i) and (ii), we get
∠ABC+∠ADC=∠ACB+∠ACD⇒∠BCD=∠ABC+∠ADC—————(iii)
In ΔBCD
∠BCD+∠DBC+∠BDC=180∘ ————— (iv) [Angle sum property]
From (iii) and (iv), we get
2∠BCD=180∘
⇒∠BCD=180∘2=90∘