Problem:
The equiangular convex hexagon ABCDEF has AB=1,BC=4,CD=2, and DE=4. The area of the hexagon is
Answer Choices:
A. 215β3β
B. 93β
C. 16
D. 439β3β
E. 443β3β
Solution:
Extend FA and CB to meet at X,BC and ED to meet at Y, and DE and AF to meet at Z. The interior angles of the hexagon are 120β. Thus the triangles XYZ,ABX,CDY, and EFZ are equilateral. Since AB=1,BX=1. Since CD=2,CY=2. Thus XY=7 and YZ=7. Since YD=2 and DE=4,EZ=1. The area of the hexagon can be found by subtracting the areas of the three small triangles from the area of the large triangle:
