Ta có \(G\) là trọng tâm \(\triangle A B C \Rightarrow \overset{\rightarrow}{G A} + \overset{\rightarrow}{G B} + \overset{\rightarrow}{G C} = \overset{\rightarrow}{0}\) (1).
Và \(G\) là trọng tâm \(\Delta A E F \Rightarrow \overset{\rightarrow}{G A} + \overset{\rightarrow}{G E} + \overset{\rightarrow}{G F} = \overset{\rightarrow}{0} \left(\right. 2 \left.\right)\).
Từ (1) và \(\left(\right. 2 \left.\right)\) :
\(\Rightarrow \overset{\rightarrow}{G A} + \overset{\rightarrow}{G B} + \overset{\rightarrow}{G C} = \overset{\rightarrow}{G A} + \overset{\rightarrow}{G E} + \overset{\rightarrow}{G F} \Leftrightarrow \overset{\rightarrow}{G B} + \overset{\rightarrow}{G C} = \overset{\rightarrow}{G E} + \overset{\rightarrow}{G F} \Leftrightarrow \overset{\rightarrow}{G C} - \overset{\rightarrow}{G F} = \overset{\rightarrow}{G E} - \overset{\rightarrow}{G B} \Leftrightarrow \overset{\rightarrow}{F C} = \overset{\rightarrow}{B E}\)

Ta có \(G\) là trọng tâm \(\triangle A B C \Rightarrow \overset{\rightarrow}{G A} + \overset{\rightarrow}{G B} + \overset{\rightarrow}{G C} = \overset{\rightarrow}{0}\) (1).
Và \(G\) là trọng tâm \(\Delta A E F \Rightarrow \overset{\rightarrow}{G A} + \overset{\rightarrow}{G E} + \overset{\rightarrow}{G F} = \overset{\rightarrow}{0} \left(\right. 2 \left.\right)\).
Từ (1) và \(\left(\right. 2 \left.\right)\) :
\(\Rightarrow \overset{\rightarrow}{G A} + \overset{\rightarrow}{G B} + \overset{\rightarrow}{G C} = \overset{\rightarrow}{G A} + \overset{\rightarrow}{G E} + \overset{\rightarrow}{G F} \Leftrightarrow \overset{\rightarrow}{G B} + \overset{\rightarrow}{G C} = \overset{\rightarrow}{G E} + \overset{\rightarrow}{G F} \Leftrightarrow \overset{\rightarrow}{G C} - \overset{\rightarrow}{G F} = \overset{\rightarrow}{G E} - \overset{\rightarrow}{G B} \Leftrightarrow \overset{\rightarrow}{F C} = \overset{\rightarrow}{B E}\)

Ta có \(G\) là trọng tâm \(\triangle A B C \Rightarrow \overset{\rightarrow}{G A} + \overset{\rightarrow}{G B} + \overset{\rightarrow}{G C} = \overset{\rightarrow}{0}\) (1).
Và \(G\) là trọng tâm \(\Delta A E F \Rightarrow \overset{\rightarrow}{G A} + \overset{\rightarrow}{G E} + \overset{\rightarrow}{G F} = \overset{\rightarrow}{0} \left(\right. 2 \left.\right)\).
Từ (1) và \(\left(\right. 2 \left.\right)\) :
\(\Rightarrow \overset{\rightarrow}{G A} + \overset{\rightarrow}{G B} + \overset{\rightarrow}{G C} = \overset{\rightarrow}{G A} + \overset{\rightarrow}{G E} + \overset{\rightarrow}{G F} \Leftrightarrow \overset{\rightarrow}{G B} + \overset{\rightarrow}{G C} = \overset{\rightarrow}{G E} + \overset{\rightarrow}{G F} \Leftrightarrow \overset{\rightarrow}{G C} - \overset{\rightarrow}{G F} = \overset{\rightarrow}{G E} - \overset{\rightarrow}{G B} \Leftrightarrow \overset{\rightarrow}{F C} = \overset{\rightarrow}{B E}\)

Ta có \(G\) là trọng tâm \(\triangle A B C \Rightarrow \overset{\rightarrow}{G A} + \overset{\rightarrow}{G B} + \overset{\rightarrow}{G C} = \overset{\rightarrow}{0}\) (1).
Và \(G\) là trọng tâm \(\Delta A E F \Rightarrow \overset{\rightarrow}{G A} + \overset{\rightarrow}{G E} + \overset{\rightarrow}{G F} = \overset{\rightarrow}{0} \left(\right. 2 \left.\right)\).
Từ (1) và \(\left(\right. 2 \left.\right)\) :
\(\Rightarrow \overset{\rightarrow}{G A} + \overset{\rightarrow}{G B} + \overset{\rightarrow}{G C} = \overset{\rightarrow}{G A} + \overset{\rightarrow}{G E} + \overset{\rightarrow}{G F} \Leftrightarrow \overset{\rightarrow}{G B} + \overset{\rightarrow}{G C} = \overset{\rightarrow}{G E} + \overset{\rightarrow}{G F} \Leftrightarrow \overset{\rightarrow}{G C} - \overset{\rightarrow}{G F} = \overset{\rightarrow}{G E} - \overset{\rightarrow}{G B} \Leftrightarrow \overset{\rightarrow}{F C} = \overset{\rightarrow}{B E}\)

Ta có \(G\) là trọng tâm \(\triangle A B C \Rightarrow \overset{\rightarrow}{G A} + \overset{\rightarrow}{G B} + \overset{\rightarrow}{G C} = \overset{\rightarrow}{0}\) (1).
Và \(G\) là trọng tâm \(\Delta A E F \Rightarrow \overset{\rightarrow}{G A} + \overset{\rightarrow}{G E} + \overset{\rightarrow}{G F} = \overset{\rightarrow}{0} \left(\right. 2 \left.\right)\).
Từ (1) và \(\left(\right. 2 \left.\right)\) :
\(\Rightarrow \overset{\rightarrow}{G A} + \overset{\rightarrow}{G B} + \overset{\rightarrow}{G C} = \overset{\rightarrow}{G A} + \overset{\rightarrow}{G E} + \overset{\rightarrow}{G F} \Leftrightarrow \overset{\rightarrow}{G B} + \overset{\rightarrow}{G C} = \overset{\rightarrow}{G E} + \overset{\rightarrow}{G F} \Leftrightarrow \overset{\rightarrow}{G C} - \overset{\rightarrow}{G F} = \overset{\rightarrow}{G E} - \overset{\rightarrow}{G B} \Leftrightarrow \overset{\rightarrow}{F C} = \overset{\rightarrow}{B E}\)

Ta có \(G\) là trọng tâm \(\triangle A B C \Rightarrow \overset{\rightarrow}{G A} + \overset{\rightarrow}{G B} + \overset{\rightarrow}{G C} = \overset{\rightarrow}{0}\) (1).
Và \(G\) là trọng tâm \(\Delta A E F \Rightarrow \overset{\rightarrow}{G A} + \overset{\rightarrow}{G E} + \overset{\rightarrow}{G F} = \overset{\rightarrow}{0} \left(\right. 2 \left.\right)\).
Từ (1) và \(\left(\right. 2 \left.\right)\) :
\(\Rightarrow \overset{\rightarrow}{G A} + \overset{\rightarrow}{G B} + \overset{\rightarrow}{G C} = \overset{\rightarrow}{G A} + \overset{\rightarrow}{G E} + \overset{\rightarrow}{G F} \Leftrightarrow \overset{\rightarrow}{G B} + \overset{\rightarrow}{G C} = \overset{\rightarrow}{G E} + \overset{\rightarrow}{G F} \Leftrightarrow \overset{\rightarrow}{G C} - \overset{\rightarrow}{G F} = \overset{\rightarrow}{G E} - \overset{\rightarrow}{G B} \Leftrightarrow \overset{\rightarrow}{F C} = \overset{\rightarrow}{B E}\)

AB VÀ DC, BA VÀ CD, AD VÀ BC, DA VÀ CB, AO VÀ OC, CO VÀ OA, DO VÀ OB, BO VÀ OD.