2021 AMC 12B Fall Problem 22

Below is the professionally curated solution for Problem 22 of the 2021 AMC 12B Fall, from LIVE by Po-Shen Loh. You can also try the full timed exam, view all 2021 AMC 12B Fall solutions, or check the answer key.

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Concepts:coordinate geometrytangent linedistance formula

Difficulty rating: 2490

22.

Right triangle ABCABC has side lengths BC=6,BC = 6, AC=8,AC = 8, and AB=10.AB = 10. A circle centered at OO is tangent to line BCBC at BB and passes through A.A. A circle centered at PP is tangent to line ACAC at AA and passes through B.B. What is OP?OP?

238\dfrac{23}{8}

2910\dfrac{29}{10}

3512\dfrac{35}{12}

7325\dfrac{73}{25}

33

Solution:

Place C=(0,0),C = (0, 0), B=(6,0),B = (6, 0), and A=(0,8),A = (0, 8), so the right angle is at C.C.

Circle OO is tangent to line BCBC (the xx-axis) at B,B, so O=(6,k).O = (6, k). Setting OA=OBOA = OB gives 36+(k8)2=k2,36 + (k - 8)^2 = k^2, so k=254k = \tfrac{25}{4} and O=(6,254).O = \left(6, \tfrac{25}{4}\right).

Circle PP is tangent to line ACAC (the yy-axis) at A,A, so P=(h,8).P = (h, 8). Setting PB=PAPB = PA gives (h6)2+64=h2,(h - 6)^2 + 64 = h^2, so h=253h = \tfrac{25}{3} and P=(253,8).P = \left(\tfrac{25}{3}, 8\right).

Then OP=(73)2+(74)2=725144=3512.OP = \sqrt{\left(\tfrac73\right)^2 + \left(\tfrac74\right)^2} = 7\sqrt{\tfrac{25}{144}} = \dfrac{35}{12}.

Thus, the correct answer is C.

Problem 22 in Other Years