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Answer the following questions based on what you know about the points of concurrency.

Part A

1. A company plans to build a distribution center that is convenient to three of its major clients. what point of concurrency should the planners look for?

Part B

2. Birdy McFly is designing a large triangular hand glider. She needs to locate the center of gravity for her glider. what point of concurrency does she need to locate?

Part C

3. The first-aid center of starved rock needs to be at point equidistant from the three bike paths that form a triangle. Locate this point so that in an emergency, medical personnel will be able to get any one of the bike paths by the shortest route possible. which point of concurrency is this?

Respuesta :

Part1:
The answer is "circumcenter".

One of a few centers the triangle can have, the circumcenter is where the perpendicular bisectors of a triangle converge or intersect. The circumcenter is additionally the focal or central point of the triangle's circumcircle - the circle that goes through each of the three of the triangle's vertices. 

Part2:
The answer is "centroid".

The centroid of a triangle refers to the intersection point of the three medians of the triangle (every median associating a vertex with the midpoint of the contrary side). It lies on the triangle's Euler line, which additionally experiences different other key focuses including the orthocenter and the circumcenter. 

Part3;
The answer is "incenter".

The incenter of a triangle refers to a triangle center, a point characterized for any triangle in a way that is free of the triangle's situation or scale. The incenter might be identically characterized as the point where the interior edge bisectors of the triangle cross, as the point equidistant from the triangle's sides, as the intersection purpose of the average pivot and deepest purpose of the grassfire change of the triangle, and as the inside purpose of the inscribed circle of the triangle.