2006 AMC 10B Problem 24

Below is the professionally curated solution for Problem 24 of the 2006 AMC 10B, from LIVE by Po-Shen Loh. You can also try the full timed exam, view all 2006 AMC 10B solutions, or check the answer key.

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Concepts:tangent circlestrapezoidright triangle

Difficulty rating: 2010

24.

Circles with centers at OO and PP have radii 22 and 4,4, respectively, and are externally tangent. Points AA and BB on the circle with center OO and points CC and DD on the circle with center PP are such that AD\overline{AD} and BC\overline{BC} are common external tangents to the circles. What is the area of the concave hexagon AOBCPD?AOBCPD?

18318\sqrt{3}

24224\sqrt{2}

3636

24324\sqrt{3}

32232\sqrt{2}

Solution:

The hexagon is symmetric about OP,\overline{OP}, so its area is twice that of trapezoid AOPD.AOPD.

Draw OFADOF\parallel AD with FF on PD.\overline{PD}. Then AOFDAOFD is a rectangle, so DF=OA=2DF=OA=2 and FP=PDDF=42=2.FP=PD-DF=4-2=2.

Since the circles are externally tangent, OP=2+4=6,OP=2+4=6, so in right triangle OFP,OFP, OF=364=42.OF=\sqrt{36-4}=4\sqrt2.

Trapezoid AOPDAOPD has parallel sides OA=2OA=2 and PD=4PD=4 with height OF=42,OF=4\sqrt2, giving area 12(2+4)(42)=122.\tfrac12(2+4)(4\sqrt2)=12\sqrt2. The hexagon area is 2122=242.2\cdot12\sqrt2=24\sqrt2.

Thus, the correct answer is B.

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