Prove that a point in triangle is the centroid

AI Thread Summary
In the discussion about proving that a point M inside triangle ABC is the centroid when the areas of triangles ABM, BCM, and ACM are equal, participants explore various approaches. One method involves considering the centroid Q and demonstrating that the areas of triangles ABQ, BCQ, and CAQ are equal. However, the challenge lies in proving that M must be the centroid, as there may be other points with the same area property. A suggestion is made to show that all points X, where triangles ABX and ACX have equal areas, lie on a line connecting A to the midpoint of BC. The conversation emphasizes the need for a rigorous proof to establish that the centroid is the unique point satisfying the area condition.
Purplesquiggles
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You are given an arbitrary triangle ABC. Inside ABC there is a point M such that Area(ABM) = Area(BCM) = Area(ACM) . Prove that M is the centroid of triangle ABC.

I have had very little progress with this question. I've tried connecting a line from M which bisects BC, but I cannot prove that the two lines are collinear.

I've also tried continuing on AM until it intersects BC., but I cannot prove it bisects BC.

Does anyone have any ideas?
 
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Sometimes it helps trying to do it the other way. Say Q is the centroid. Can you prove that the areas ABQ BCQ and CAQ are the same?
 
I'd say don't even look at that, or you're going to write pages of algebra and not understand what's happening. :)
 
wabbit said:
Sometimes it helps trying to do it the other way. Say Q is the centroid. Can you prove that the areas ABQ BCQ and CAQ are the same?
I can prove what you said quite easily. The only problem is that the converse, which is my initial question, remains unproved. I don't know for certain that 3 triangles of equal area must meet at the centroid. Its possible there are other places where this can occur. I have to prove the centroid is the only one.
 
Aha. Indeed you do . What if there were two different points with the equal area property?
 
Can you show that all points X such that triangles ABX and ACX have the same area lie on a line? If so, this is the line that connects A to the midpoint of BC.
 

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