Title | 15 - Booty |
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Author | Anonymous User |
Course | Marketing Models |
Institution | University of Georgia |
Pages | 11 |
File Size | 774.6 KB |
File Type | |
Total Downloads | 63 |
Total Views | 144 |
Booty...
Examples
15.4PerpendicularBisectorsofTriangles
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Examples
15.4PerpendicularBisectorsofTriangles
1. How can you write an algebraic expression for the radius of the circumcircle of ABC? Complete the explanation. Note: The circumcircle is a triangle' ircumscribed circle, i.e., the unique ircle that passes through each of th riangle's three vertices. The center f the circumcircle is called the ircumcenter, and the circle's radius alled the circumradius.
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Examples
15.4PerpendicularBisectorsofTriangles
2. are the perpendicular bisectors of GHJ. Use that information to find the length of each segment. Note that the figure is not drawn to scale.
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Examples
15.4PerpendicularBisectorsofTriangles
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Pythagorean Theorem
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Examples
15.4PerpendicularBisectorsofTriangles
4. Graph the triangle with the given vertices and find the circumcenter of the triangle.
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Examples
15.4PerpendicularBisectorsofTriangles
5. Graph the triangle with the given vertices and find the circumcenter of the triangle.
circumcenter (2.5, 3)
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Examples
15.4PerpendicularBisectorsofTriangles
6. are the perpendicular bisectors of ABC. Use that information to find the length of each segment. Note that the figure is not drawn to scale.
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Examples
15.4PerpendicularBisectorsofTriangles
7. are the perpendicular bisectors of ABC. Use that information to find the length of each segment. Note that the figure is not drawn to scale.
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Examples
15.4PerpendicularBisectorsofTriangles
8. are the perpendicular bisectors of ABC. Use that information to find the length of each segment. Note that the figure is not drawn to scale.
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Examples
15.4PerpendicularBisectorsofTriangles
9.
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Examples
15.4PerpendicularBisectorsofTriangles
10. For the next Fourth of July, the towns of Ashton, Bradford, and Clearview will launch a fireworks display from a boat in the lake. Graph the perpendicular bisectors and enter the coordinates to show where the boat should be positioned so that it is the same distance from all three towns. Round to the nearest tenth. Complete the justification for your graph.
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