Problem:
The solutions to the equation (z+6)8=81 are connected in the complex plane to form a convex regular polygon, three of whose vertices are labeled A,B, and C. What is the least possible area of β³ABC ?
Answer Choices:
A. 61β6β
B. 23β2ββ23β
C. 23ββ22β
D. 21β2β
E. 3ββ1 Solution:
The answer would be the same if the equation were z8=81, resulting from a horizontal translation of 6 units. The solutions to this equation are the 8 eighth roots of 81 , each of which is 834β=3β units from the origin. These 8 points form a regular octagon. The triangle of minimum area occurs when the vertices of the triangle are consecutive vertices of the octagon, so without loss of generality they have coordinates A(21β6β,21β6β),B(3β,0), and C(21β6β,β21β6β). This triangle has base AC=6β and height 3ββ21β6β, so its area is
The complex solutions form a regular octagon centered at z=β6. The distance from the center to any one of the vertices is 881β= 834β=3β. By the Law of Cosines, the side length s of the octagon satisfies
The least possible area of β³ABC occurs when two of the sides of β³ABC are adjacent sides of the octagon; the angle between these two sides is 135β. The sine formula for area gives