Problem:
In β³ABC,AC=BC, and point D is on BC so that CD=3β BD. Let E be the midpoint of AD. Given that CE=7β and BE=3, the area of β³ABC can be expressed in the form mnβ, where m and n are positive integers and n is not divisible by the square of any prime. Find m+n.
Solution:
Let AB=2x, and AC=BC=y. Then cosβ BAC=cosβ ABC=yxβ. Applying the Law of Cosines to β³ABD yields
Because CE is a median in β³ADC, Stewart's Theorem shows that 4CE2=2CD2+2AC2βAD2, or 28=1618y2β+2y2β3x2β16y2β. Hence 1649βy2β3x2=28. Similarly, in β³ABD,4BE2=2BD2+2AB2βAD2=162y2β+8x2β3x2β16y2β. Hence 16y2β+5x2=36. Solving the system
1649βy2β3x2=2816y2β+5x2=36β
yields y2=16,x2=7. Thus the area of β³ABC is xy2βx2β=37β, and the requested sum is 3+7=10β.
