Problem: Located inside equilateral triangle ABC is point P such that PA=6,PB=8, and PC=10. To the nearest integer the area of triangle ABC is:
Answer Choices:
A. 159
B. 131
C. 95
D. 79
E. 50
Solution:
Rotate CP through 60β to position CPβ². Draw BPβ². This is equivalent to rotating β³CAP into position CBPβ². In a similar manner rotate β³ABP into position ACPβ²β² and β³BCP into position BAP"'.
On the one hand hexagon APβ²β²BPβ²CPβ²β² consists of β³ABC and β³CBPβ²,ACP ", BAPβ²β²β². Letting K represent area, we have, from the congruence relations, K(ABC)=K(CBPβ²)+K(ACPβ²β²)+K(BAPβ²β²β²)β΄K(ABC)=21βK (hexagon).
On the other hand the hexagon consists of three quadrilaterals PCPβ²B, PBPβ²β²β²A, and PAPβ²β²C, each of which consists of the 6β8β10 right triangle and an equilateral triangle. β΄K (hexagon) =3(21ββ 6β 8)+41ββ 1023β+41ββ 823β+41ββ 623β=72+503ββ΄K(ABC)=36+253ββ79.
OR
Applying the Law of Cosines to β³APB wherein β APB=150β, we have s2=62+82β2β 6β 8cos150β=100+483β. Therefore, K(ABC)=4s23ββ=253β+36β79.
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