2022 AMC 10A Problem 13

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Concepts:angle bisector theoremsimilarityisosceles triangle

Difficulty rating: 1540

13.

Let ABC\triangle ABC be a scalene triangle. Point PP lies on BC\overline{BC} so that AP\overline{AP} bisects BAC.\angle BAC. The line through BB perpendicular to AP\overline{AP} intersects the line through AA parallel to BC\overline{BC} at point D.D. Suppose BP=2BP = 2 and PC=3.PC = 3. What is AD?AD?

88

99

1010

1111

1212

Solution:

Consider the following diagram:

By the Angle Bisector Theorem, we can label ABAB as 2x2x and AYAY as 3x.3x.

We also get that ABY\triangle ABY is isosceles since APBY.AP \perp BY. Therefore, AY=AB=2x.AY = AB = 2x.

Since ADAD and BCBC are parallel, we know that BYCDYA.\triangle BYC \sim \triangle DYA.

YC=ACAY=3x2x=x,YC = AC - AY = 3x - 2x = x, so AY=2YC.AY = 2YC.

Using similar triangles, we get that AD=2BC=10.AD = 2BC = 10.

Thus, C is the correct answer.

Problem 13 in Other Years