Bell ringer 1. Which 2 points of concurrency are always inside the triangle? 2. Which point of concurrency is equidistant from the vertices of a triangle?

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Presentation transcript:

Bell ringer 1. Which 2 points of concurrency are always inside the triangle? 2. Which point of concurrency is equidistant from the vertices of a triangle? What auxiliary lines intersect at that point? 3. Which point of concurrency is equidistant from the sides of a triangle? What auxiliary lines intersect at that point?

Real world use of Points of Concurrency Friday, November 7, 2014

The problem: A developer plans to build an amusement park but wants to locate it within easy access of the three largest towns in the area as shown on the map below. The developer has to decide on the best location and is working with the ABC Construction Company to minimize costs wherever possible. No matter where the amusement park is located, roads will have to be built for access directly to the towns or to the existing highways.

Explain your thinking.

(2) Let’s figure this out.. Investigate the problem by constructing the following as best you can using a ruler: a) all 3 medians of the triangle b) all 3 altitudes of the triangle c) all 3 angle bisectors of the triangle d) all 3 perpendicular bisectors of the triangle Medians top left. Altitudes top right. Angle bisectors bottom left. Perpendicular bisectors bottom right.

Explain why you chose this point.

(4) Compare… How close is your answer in #1 to your answer in #2? (5) Give a reasonable guess at to why the specific names were given to each point of concurrency. (6) What is the name of the point of concurrency that you will recommend for the location of the park?

(7) The President of the company building the park is concerned about the cost of building roads from the towns to the park. What recommendation would you give him? Write a memo to the president explaining your recommendation.