Problem:
In the adjoining figure triangle ABC is inscribed in a circle. Point D lies on AC with DC=30β, and point G lies on BA with BG>GA. Side AB and side AC each has length equal to the length of chord DG and β CAB=30β. Chord DG intersects sides AC and AB at E and F, respectively. The ratio of the area of β³AFE to the area of β³ABC is
Answer Choices:
A. 32β3ββ
B. 323ββ3β
C. 73ββ12
D. 33ββ5
E. 39β53ββ
Solution:
In the adjoining figure, line segment DC is drawn. Since AC=150β,AD=ACβDC=150ββ30β=120β. Hence β ACD=60β. Since AC=DG, GA=GDβAD=ACβ120β=30β. Therefore, CG=180β and β³CDG=90β. Thus β³DEC is a 30ββ60ββ90β right triangle.
Since we are looking for the ratio of the areas, let us assume without loss of generality that AC=AB=DG=1.
Let AE=x=DE. Then CE=1βx=3βxββ 2. Solving for x yields AE=x=23ββ3. Let FH be the altitude of β³AFE on AE. Now EH=2AEβ=223ββ3β and FH=(223ββ3β)33ββ.
The area of β³AFE=(EH)(FH)=(223ββ3β)233ββ=473ββ12β. Also, area β³ABC=21β(AB)(AC)sin30β=21ββ (1)β (1)β 21β=41β. Hence
