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For circle A, A F = AG, A F is perpendicular to CD, and AG is perpendicular to EB. What conclusion can be made? a circle with center A and chords CD and EB
a segment from A to chord CD intersects chord CD at F, and a segment from A to chord EB intersects chord EB at G segment CD is parallel to segment EB segment CD is congruent to segment EB segment A F is perpendicular to segment AG segment CF is congruent to segment A F

Sagot :

Answer:

segment CD is congruent to segment EB

Step-by-step explanation:

it was right on my test

The conclusion that should be made is that segment CD is congruent to segment EB.

What is congruent?

In terms of geometry, two figures or objects should be considered as the congruent in the case when they have the similar kind of shape and size, or if one has the similar kind of shape and size like the mirror image of the other.

Therefore, we can conclude that The conclusion that should be made is that segment CD is congruent to segment EB.

Learn more about congruent here: https://brainly.com/question/13863632

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