Math, asked by RiaShaliha, 2 months ago

prove that the medians of a triangle are concurrent.

Answers

Answered by srinuthiyagarajan

0

Step-by-step explanation:

In the triangle ABC draw medians BE, and CF, meeting at point G. Construct a line from A through G, such that it intersects BC at point D. We are required to prove that D bisects BC, therefore AD is a median, hence medians are concurrent at G (the centroid).

Answered by markcalhoun

0

Answer:

BELOW

Step-by-step explanation:

In the triangle ABC draw medians BE, and CF, meeting at point G. Construct a line from A through G, such that it intersects BC at point D. We are required to prove that D bisects BC, therefore AD is a median, hence medians are concurrent at G (the centroid).

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