Difference between revisions of "2023 AIME II Problems/Problem 9"

Revision as of 14:08, 17 February 2023

Problem

Circles $\omega_1$ and $\omega_2$ intersect at two points $P$ and $Q,$ and their common tangent line closer to $P$ intersects $\omega_1$ and $\omega_2$ at points $A$ and $B,$ respectively. The line parallel to $AB$ that passes through $P$ intersects $\omega_1$ and $\omega_2$ for the second time at points $X$ and $Y,$ respectively. Suppose $PX=10,$ $PY=14,$ and $PQ=5.$ Then the area of trapezoid $XABY$ is $m\sqrt{n},$ where $m$ and $n$ are positive integers and $n$ is not divisible by the square of any prime. Find $m+n.$

Solution 1

Denote by $O_1$ and $O_2$ the centers of $\omega_1$ and $\omega_2$ , respectively. Let $XY$ and $AO_1$ intersect at point $C$ . Let $XY$ and $BO_2$ intersect at point $D$ .

Because $AB$ is tangent to circle $\omega_1$ , $O_1 A \perp AB$ . Because $XY \parallel AB$ , $O_1 A \perp XY$ . Because $X$ and $P$ are on $\omega_1$ , $O_1A$ is the perpendicular bisector of $XY$ . Thus, $PC = \frac{PX}{2} = 5$ .

Analogously, we can show that $PD = \frac{PY}{2} = 7$ .

Thus, $CD = CP + PD = 12$ . Because $O_1 A \perp CD$ , $O_1 A \perp AB$ , $O_2 B \perp CD$ , $O_2 B \perp AB$ , $ABDC$ is a rectangle. Hence, $AB = CD = 12$ .

Let $QP$ and $AB$ meet at point $M$ . Thus, $M$ is the midpoint of $AB$ . Thus, $AM = \frac{AB}{2} = 6$ .

In $\omega_1$ , for the tangent $MA$ and the secant $MPQ$ , following from the power of a point, we have $MA^2 = MP \cdot MQ$ . By solving this equation, we get $MP = 4$ .

We notice that $AMPC$ is a right trapezoid. Hence, $\begin{align*} AC & = \sqrt{MP^2 - \left( AM - CP \right)^2} \\ & = \sqrt{15} . \end{align*}$

Therefore, $\begin{align*} [XABY] & = \frac{1}{2} \left( AB + XY \right) AC \\ & = \frac{1}{2} \left( 12 + 24 \right) \sqrt{15} \\ & = 18 \sqrt{15}. \end{align*}$

Therefore, the answer is $18 + 15 = \boxed{\textbf{(033) }}$ .

~Steven Chen (Professor Chen Education Palace, www.professorchenedu.com)

Solution 2

Notice that line $overline{PQ}$ is the radical axis of circles $w1$ and $w2$ . By the radical axis theorem, we know that the tangents of any point on line $overline{PQ}$ to circles $w1$ and $w2$ are equal. Therefore, line $overline{PQ}$ must pass through the midpoint of $overline{AB}$ , call this point M. In addition, we know that $AM=MB=6$ by circle properties and midpoint definition.

Then, by Power of Point,

$\begin{align*} AP^2&=MP*MQ \\ 36&=MP(MP+5) \\ MP&=4 \\ \end{align*}$

Call the intersection point of line $overline{AW1}$ and $overline{XY}$ be C, and the intersection point of line $overline{BW2}$ and $overline{XY}$ be D. $ABCD$ is a rectangle with segment $MP=4$ drawn through it so that $AM=MB=6$ , $CP=5$ , and $PD=7$ . Dropping the altitude from $M$ to $overline{XY}$ , we get that the height of the rectangle is $\sqrt{15}$ . Therefore the area of trapezoid $XABY$ is $frac{1}{2}\cdot(12+24)\cdot(\sqrt{15})$

2023 AIME II (Problems • Answer Key • Resources)
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Difference between revisions of "2023 AIME II Problems/Problem 9"

Revision as of 14:08, 17 February 2023

Contents

Problem

Solution 1

Solution 2

See also

@@ Line 55: / Line 55: @@
 <cmath>
 \begin{align*}
-AP^2=MP*MQ \\
+AP^2&=MP*MQ \\
-=MP(MP+5) \\
+&=MP(MP+5) \\
-MP=4 \\
+MP&=4 \\
 \end{align*}
 </cmath>