Problem:
In β³ABC,cos(2AβB)+sin(A+B)=2 and AB=4. What is BC ?
Answer Choices:
A. 2β
B. 3β
C. 2
D. 22β
E. 23β Solution:
The maximum value for cosx and sinx is 1 ; hence cos(2AβB)= 1 and sin(A+B)=1. Therefore 2AβB=0β and A+B=90β, and solving gives A=30β and B=60β. Hence β³ABC is a 30β60β90β right triangle and BC=2β.