AoPS - Problem

Source: 2021 Israel National Olympiad P7

Tags: geometry, equal areas, rotation

Phorphyrion

16.12.2022 23:45

Triangle $ABC$ is given. The circle $\omega$ with center $I$ is tangent at points $D,E,F$ to segments $BC,AC,AB$ respectively. When $ABC$ is rotated $180$ degrees about point $I$, triangle $A'B'C'$ results. Lines $AD, B'C'$ meet at $U$, lines $BE, A'C'$ meet at $V$, and lines $CF, A'B'$ meet at $W$. Line $BC$ meets $A'C', A'B'$ at points $D_1, D_2$ respectively. Line $AC$ meets $A'B', B'C'$ at $E_1, E_2$ respectively. Line $AB$ meets $B'C', A'C'$ at $F_1,F_2$ respectively. Six (not necessarily convex) quadrilaterals were colored orange: \[AUIF_2 , C'FIF_2 , BVID_1 , A'DID_2 , CWIE_1 , B'EIE_2\]Six other quadrilaterals were colored green: \[AUIE_2 , C'FIF_1 , BVIF_2 , A'DID_1 , CWID_2 , B'EIE_1\]Prove that the sum of the green areas equals the sum of the orange areas.

Attachments:

Let $D'$ be the reflection of $D$ across $I$. Then $D'$ is the tangency point of $\omega$ with $B'C'$. Note that $CE_2C'D_1$ is a parallelogram, and $I$ is the midpoint of $CC'$, so $I$ must be the midpoint of $E_2D_1$. Similarly, $I$ is the midpoint of $F_1D_2$ and $E_1F_2$. Since $\omega$ is the $A$-excircle of $\triangle AF_1E_2$, we have $F_1U = D'E_2 = D_1D$ and $UE_2 = F_1D' = DD_2$. Similarly, $E_1E = D_1V$ and $EE_2 = VF_2$, $F_1F = E_1W$ and $FF_2 = WD_2$. Let $r$ be the radius of $\omega$ and $h_a, h_b, h_c$ be the lengths of the altitudes from $A$ to $F_1E_2$, $B$ to $D_1F_2$, and $C$ to $E_1D_2$ respectively. Thus, twice the sum of the green areas is $$(UE_2 + D_1D)(r + h_a) + (EE_1 + VF_2)(r + h_b) + (WD_2 + F_1F)(r + h_c)$$$$= D_1D_2(r + h_a) + E_1E_2(r + h_b) + F_1F_2(r + h_c)$$$$= (F_1U + DD_2)(r + h_a) + (D_1V + EE_2)(r + h_b) + (E_1W + FF_2)(r + h_c)$$which is twice the sum of the orange areas. $\Box$