Dreapta paralela cu bisectoarea

[Claudiu Mindrila]

\( \left|\begin{array}{c}
\triangle ABC,\ M\in\left(AB\right),\ N\in\left(AC\right)\\
BM=CN\\
Q\in\left(MN\right),\ R,\ X\in BC\\
MQ=QN,\ \angle BAX=\angle CAX,\ BR=RC\end{array}\right|\Longrightarrow QR\parallel AX \)

[Marius Mainea]

Folosim proprietatea \( \overline{QR}=\frac{1}{2}\(\overline{MB}+\overline{NC}\) \).

De aici rezulta totul, deoarece \( \overline{MB} \) si \( \overline{NC} \) avand acelasi modul rezultanta lor are directia bisectoarei aceestora.

[Mateescu Constantin]

Solutie sintetica:

Fie \( MM^{\prime}\ \parallel\ AX\ \parallel\ NN^{\prime},\ M^{\prime},\ N^{\prime}\in[BC] \) .

\( \Longrightarrow\ \left\|\begin{array}{cc} \frac{BM^{\prime}}{BX} & = & \frac{BM}{BA} & (\sim) & \Longleftrightarrow & \frac{AB}{BX} & = & \frac{BM}{BM^{\prime}} \\\\\\\\
\frac{CN^{\prime}}{CX} & = & \frac{CN}{CA} & (\sim) & \Longleftrightarrow & \frac{AC}{CX} & = & \frac{CN}{CN^{\prime}}
\end{array}\ \right\|\ \ \wedge\ \frac{AB}{BX} = \frac{AC}{CX}\ (\mbox{T.Bis.})\ \Longrightarrow^{\small BM=CN}\ BM^{\prime}=CN^{\prime} \)

Deci \( RM^{\prime}=RN^{\prime} \) si cum \( MQ=QN \) rezulta ca \( [RQ] \) este linie mijlocie in trapezul \( MM^{\prime}N^{\prime}N \).

\( \Longrightarrow\ RQ\ \parallel\ MM^{\prime}\ \parallel\ AX \).

[maxim bogdan]

Este cunoscuta teorema a bisectoarei glisate.