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Point G is the centroid of triangle ABC. The length of segment CG is 6 units greater than the length of segment DG. Right triangle A B C has centroid G. Lines are drawn from each point to the midpoint of the opposite side. What is CD? 6 units 12 units 18 units 24 units

Respuesta :

123151821

Answer:

C.18 units

Step-by-step explanation:

Just passed the test.

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The length of the segment CD of the triangle is; 18 units

How to calculate the centroid of a triangle?

From Centroid Theorem, we know that;

The centroid is located 1/3 of the distance from the midpoint of a side along the segment that connects the midpoint to the opposite vertex.

Now, in this question we see that the location of the centroid has a length of CG = 6.

This means that;

(1/3)Length of CD = CG

(1/3)Length of CD = CG

Length of CD = 3 * 6

Length of CD = 18 Units

Read more about triangle Centroid at; https://brainly.com/question/7644338

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