Difference between revisions of "2000 AIME II Problems/Problem 10"

Revision as of 12:40, 28 January 2019

Problem

A circle is inscribed in quadrilateral $ABCD$ , tangent to $\overline{AB}$ at $P$ and to $\overline{CD}$ at $Q$ . Given that $AP=19$ , $PB=26$ , $CQ=37$ , and $QD=23$ , find the square of the radius of the circle.

Solution

Call the center of the circle $O$ . By drawing the lines from $O$ tangent to the sides and from $O$ to the vertices of the quadrilateral, four pairs of congruent right triangles are formed.

Thus, $\angle{AOP}+\angle{POB}+\angle{COQ}+\angle{QOD}=180$ , or $(\arctan(\tfrac{19}{r})+\arctan(\tfrac{26}{r}))+(\arctan(\tfrac{37}{r})+\arctan(\tfrac{23}{r}))=180$ .

Take the $\tan$ of both sides and use the identity for $\tan(A+B)$ to get $\tan(\arctan(\tfrac{19}{r})+\arctan(\tfrac{26}{r}))+\tan(\arctan(\tfrac{37}{r})+\arctan(\tfrac{23}{r}))=n\cdot0=0$ .

Use the identity for $\tan(A+B)$ again to get $\frac{\tfrac{45}{r}}{1-19\cdot\tfrac{26}{r^2}}+\frac{\tfrac{60}{r}}{1-37\cdot\tfrac{23}{r^2}}=0$ .

Solving gives $r^2=\boxed{647}$ .

Solution 2

Just use the area formula for tangential quadrilaterals. The numbers are really big. A terrible problem to work on. $A = \sqrt{(a+b+c+d)(abc+bcd+cda+dac)} = 105\sqrt{647}$ $r^2=\frac{A}{a+b+c+d} = \boxed{647}$ .

@@ Line 12: / Line 12: @@
 Solving gives <math>r^2=\boxed{647}</math>.
+== Solution 2==
+Just use the area formula for tangential quadrilaterals. The numbers are really big. A terrible problem to work on.
+<cmath>A = \sqrt{(a+b+c+d)(abc+bcd+cda+dac)} = 105\sqrt{647}</cmath>
+<math>r^2=\frac{A}{a+b+c+d} = \boxed{647}</math>.
 == See also ==

2000 AIME II (Problems • Answer Key • Resources)
Preceded by Problem 9	Followed by Problem 11
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Difference between revisions of "2000 AIME II Problems/Problem 10"

Revision as of 12:40, 28 January 2019

Contents

Problem

Solution

Solution 2

See also