2025 AMC 12A Problem 8

Below is the professionally curated solution for Problem 8 of the 2025 AMC 12A, from LIVE by Po-Shen Loh. You can also try the full timed exam, view all 2025 AMC 12A solutions, or check the answer key.

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Concepts:inscribed angleangle bisector theoremlaw of cosines

Difficulty rating: 1440

8.

Pentagon ABCDEABCDE is inscribed in a circle, and BEC=CED=30.\angle BEC = \angle CED = 30^\circ. Let ACAC and BDBD intersect at point F,F, and suppose that AB=9AB = 9 and AD=24.AD = 24. What is BF?BF?

5711\dfrac{57}{11}

5911\dfrac{59}{11}

6011\dfrac{60}{11}

6111\dfrac{61}{11}

6311\dfrac{63}{11}

Solution:

The inscribed angle BEC=30\angle BEC = 30^\circ subtends arc BC=60,BC = 60^\circ, so BAC,\angle BAC, which also subtends arc BC,BC, equals 30.30^\circ. Likewise CAD=30.\angle CAD = 30^\circ.

Thus ACAC bisects BAD=60.\angle BAD = 60^\circ. In ABD,\triangle ABD, BD2=92+2422(9)(24)cos60=657216=441,BD^2 = 9^2 + 24^2 - 2(9)(24)\cos 60^\circ = 657 - 216 = 441, so BD=21.BD = 21.

Since AFAF (along ACAC) bisects BAD,\angle BAD, the Angle Bisector Theorem gives BFFD=ABAD=924=38.\dfrac{BF}{FD} = \dfrac{AB}{AD} = \dfrac{9}{24} = \dfrac{3}{8}. Hence BF=31121=6311.BF = \dfrac{3}{11}\cdot 21 = \dfrac{63}{11}.

Thus, the correct answer is E.

Problem 8 in Other Years