Problem:
In triangle ABC,AB=13,BC=14, and CA=15. Distinct points D,E, and F lie on segments BC,CA, and DE, respectively, such that ADβ₯BC, DEβ₯AC, and AFβ₯BF. The length of segment DF can be written as nmβ, where m and n are relatively prime positive integers. What is m+n ?
Answer Choices:
A. 18
B. 21
C. 24
D. 27
E. 30
Solution:
The Pythagorean Theorem applied to right triangles ABD and ACD gives AB2βBD2=AD2=AC2βCD2; that is, 132βBD2= 152β(14βBD)2, from which it follows that BD=5,CD=9, and AD=12. Because triangles AED and ADC are similar,
12AEβ=9DEβ=1512β
implying that ED=536β and AE=548β.
Because β AFB=β ADB=90β, it follows that ABDF is cyclic. Thus β ABD+ β AFD=180β from which β ABD=β AFE. Therefore right triangles ABD and AFE are similar. Hence
5FEβ=12548ββ
from which it follows that FE=4. Consequently DF=DEβFE=536ββ4= 516β.
The problems on this page are the property of the MAA's American Mathematics Competitions
