Problem:
In β³ABC points D and E lie on BC and AC, respectively. If AD and BE intersect at T so that AT/DT=3 and BT/ET=4, what is CD/BD?
Answer Choices:
A. 81β
B. 92β
C. 103β
D. 114β
E. 125β
Solution:
Let F be a point on AC such that DF is parallel to BE. Let BT=4x and ET=x.
Because β³ATE and β³ADF are similar, we have
xDFβ=ATADβ=34β, and DF=34xβ
Also, β³BEC and β³DFC are similar, so
BCCDβ=BEDFβ=5x4x/3β=154β
Thus
BDCDβ=1β(CD/BC)CD/BCβ=1β4/154/15β=(D)114ββ.β
OR
Let s=Area(β³ABC). Then
Area(β³TBC)=41βs and Area(β³ATC)=51βs
so
Area(β³ATB)=Area(β³ABC)βArea(β³TBC)βArea(β³ATC)=2011βs
Hence
BDCDβ=Area(β³ABD)Area(β³ADC)β=Area(β³ATB)Area(β³ATC)β=11s/20s/5β=114β
Answer: Dβ.
The problems on this page are the property of the MAA's American Mathematics Competitions
