Problem: In β³ABC,E is the midpoint of side BC and D is on side AC. If the length of AC is 1 and β BAC=60β,β ABC=100β,β ACB=20β and β DEC=80β, then the area of β³ABC plus twice the area of β³CDE equals
Answer Choices:
A. 41βcos10β
B. 83ββ
C. 41βcos40β
D. 41βcos50β
E. 81β
Solution:
Let F be the point on the extension of side AB past B for which AF=1. Since AF=AC and β FAC=60β,β³ACF is equilateral. Let G be the point on line segment BF for which β BCG=20β. Then β³BCG is similar to β³DCE and BC=2(EC). Also β³FGC is congruent to β³ABC. Therefore,
Area β³ACF=( Area β³ABC+ Area β³GCF)+ Area β³BCG
β43ββ=2 Area β³ABC+4 Area β³CDE83ββ= Area β³ABC+2 Area β³CDEβ
