Problem:
Let ABC be an equilateral triangle. Extend side AB beyond B to a point Bβ² so that BBβ²=3AB. Similarly, extend side BC beyond C to a point Cβ² so that CCβ²=3BC, and extend side CA beyond A to a point Aβ² so that AAβ²=3CA. What is the ratio of the area of β³Aβ²Bβ²Cβ² to the area of β³ABC ?
Answer Choices:
A. 9:1
B. 16:1
C. 25:1
D. 36:1
E. 37:1 Solution:
Draw segments CBβ²,ACβ², and BAβ². Let X be the area of β³ABC. Because β³BBβ²C has a base 3 times as long and the same altitude, its area is 3X. Similarly, the areas of β³AAβ²B and β³CCβ²A are also 3X. Furthermore, β³AAβ²Cβ² has 3 times the base and the same height as β³ACCβ², so its area is 9X. The areas of β³CCβ²Bβ² and β³BBβ²Aβ² are also 9X by the same reasoning. Therefore the area of β³Aβ²Bβ²Cβ² is X+3(3X)+3(9X)=37X, and the requested ratio is 37:1β. Note that nothing in this argument requires β³ABC to be equilateral.
OR
Let s=AB. Applying the Law of Cosines to β³Bβ²BCβ² gives
By symmetry, β³Aβ²Bβ²Cβ² is also equilateral and therefore is similar to β³ABC with similarity ratio 37β. Hence the ratio of their areas is 37:1β.
OR
Let s=AB. The areas of β³Bβ²BCβ²,β³Cβ²CAβ², and β³Aβ²ABβ² are all
