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Difference between revisions of "1985 IMO Problems/Problem 1"
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== Problem ==
 
== Problem ==
  
A circle has center on the side <math>\displaystyle AB</math> of the [[cyclic quadrilateral]] <math>\displaystyle ABCD</math>.  The other three sides are tangent to the circle.  Prove that <math>\displaystyle AD + BC = AB</math>.
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A [[circle]] has center on the side <math>\displaystyle AB</math> of the [[cyclic quadrilateral]] <math>\displaystyle ABCD</math>.  The other three sides are [[tangent]] to the circle.  Prove that <math>\displaystyle AD + BC = AB</math>.
  
 
== Solutions ==
 
== Solutions ==

Revision as of 15:12, 5 November 2006

Problem

A circle has center on the side $\displaystyle AB$ of the cyclic quadrilateral $\displaystyle ABCD$. The other three sides are tangent to the circle. Prove that $\displaystyle AD + BC = AB$.

Solutions

Solution 1

Let $\displaystyle O$ be the center of the circle mentioned in the problem. Let $\displaystyle T$ be the second intersection of the circumcircle of $\displaystyle CDO$ with $\displaystyle AB$. By measures of arcs, $\angle DTA = \angle CDO = \frac{\angle DCB}{2} = \frac{\pi}{2} - \frac{\angle DAB}{2}$. It follows that $\displaystyle AT = AD$. Likewise, $\displaystyle TB = BC$, so $\displaystyle AD + BC = AB$, as desired.

Solution 2

Let $\displaystyle T$ be the point on $\displaystyle AB$ such that $\displaystyle AT = AD$. Then $\displaystyle \angle DTA = \frac{ \pi - \angle DAB}{2} = \angle DCO$, so $\displaystyle DCOT$ is a cyclic quadrilateral and $\displaystyle T$ is in fact the $\displaystyle T$ of the previous solution. The conclusion follows.

Solution 3

Let the circle have center $\displaystyle O$ and radius $\displaystyle r$, and let its points of tangency with $\displaystyle BC, CD, DA$ be $\displaystyle E, F, G$, respectively. Since $\displaystyle OEFC$ is clearly a cyclic quadrilateral, the angle $\displaystyle COE$ is equal to half the angle $\displaystyle GAO$. Then

$\begin{matrix} {CE} & = & r \tan(COE) \\ & = & \displaystyle r \left( \frac{1 - \cos (GAO)}{\sin(GAO)} \right) \\ & = & AO - AG \\ \end{matrix}$

Likewise, $\displaystyle DG = OB - EB$. It follows that

$\displaystyle {EB} + CE + DG + GA = AO + OB$,

Q.E.D.

Solution 4

We use the notation of the previous solution. Let $\displaystyle X$ be the point on the ray $\displaystyle AD$ such that $\displaystyle AX = AO$. We note that $\displaystyle OF = OG = r$; $\angle OFC = \angle OGX = \frac{\pi}{2}$; and $\angle FCO = \angle GXO = \frac{\pi - \angle BAD}{2}$; hence the triangles $\displaystyle OFC, OGX$ are congruent; hence $\displaystyle GX = FC = CE$ and $\displaystyle AO = AG + GX = AG + CE$. Similarly, $\displaystyle OB = EB + GD$. Therefore $\displaystyle AO + OB = AG + GD + CE + EB$, Q.E.D.

Resources

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