Instructions for your Geogebra project can be found here.
Select one of the following topics and comment here with your selection to claim your topic. Check to make sure nobody else has chosen your topic.
- The theorem of Menelaus (Venema Chapter 9)
- Simpson’s theorem (Venema 11.6)
- Ptolemy’s theorem (Venema 11.7)
- Napoleon’s theorem and the Napoleon point (Venema 12.1)
- Morley’s theorem (Venema 12.6)
- Circumscribed circle and circumcenter (Venema 4.1)
- Extended law of sines (Venema 4.1)
- Angle bisector concurrence theorem (Venema 4.2)
- The medial triangle (Venema Exercises 5.1.1 to 5.1.4)
- Desargue’s theorem (Venema 11.2)
My topic for the project will be Angle bisector concurrence theorem
My project’s topic is “The medial triangle”
My topic for the next presentation will be “Circumscribed circle and circumcenter”
my topic will be extended law of sines
\begins {Angle bisector Concurrence Theorem If Triangle ABC is any Triangle , the tree bisectors of the interior angles of Triangle ABC are Concurrent . The point of concurrency is equidistant from the sides of the triangle.\end { theorem}
https://ggbm.at/AXeEBvPV
This is my link to my project#2
https://ggbm.at/AXeEBvPV
\begins{if Triangle ABC is any Triangle the three bisector of the interior angles of the triangle ABC are Concurrent the point of concurrency is equidistant from the sides of the triangles} [Angle bisector concurrence theorem ]./ end theorem