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read the proof that shows that the medians of an isosceles triangle meet at a point. link here complete the statement about how to prove that the medians of an isosceles triangle meet at a point. to prove that the medians of an isosceles triangle meet at a point, show that the of a side lies on the line containing the opposite and the point where the other two intersect.
In triangle - geometry, to prove the concurrency of medians, we use the property that the mid - point of a side lies on the line containing the opposite vertex and the intersection of the other two medians. This is based on the concept of the centroid (the point of intersection of medians) and the fact that medians connect a vertex to the mid - point of the opposite side.
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To prove that the medians of an isosceles triangle meet at a point, show that the mid - point of a side lies on the line containing the opposite vertex and the point where the other two medians intersect.