<img src="https://d5nxst8fruw4z.cloudfront.net/atrk.gif?account=iA1Pi1a8Dy00ym" style="display:none" height="1" width="1" alt="" />

Angle Bisectors in Triangles

Construction and properties of bisectors, which cut angles in half.

Levels are CK-12's student achievement levels.
Basic Students matched to this level have a partial mastery of prerequisite knowledge and skills fundamental for proficient work.
At Grade (Proficient) Students matched to this level have demonstrated competency over challenging subject matter, including subject matter knowledge, application of such knowledge to real-world situations, and analytical skills appropriate to subject matter.
Advanced Students matched to this level are ready for material that requires superior performance and mastery.
• PLIX

Angle Bisectors in Triangles

Angle Bisectors in Triangles Interactive

0
• Video

Angle Bisectors Principles

This video gives more detail about the mathematical principles presented in Angle Bisectors.

0
• Video

Angle Bisectors Examples

This video shows how to work step-by-step through one or more of the examples in Angle Bisectors.

0
• Practice
0%

Angle Bisectors in Triangles Practice

0
• Critical Thinking

Angle Bisectors in Triangles Discussion Questions

A list of student-submitted discussion questions for Angle Bisectors in Triangles.

0

Angle Bisectors in Triangles Pre Read

To activate prior knowledge, make personal connections, reflect on key concepts, encourage critical thinking, and assess student knowledge on the topic prior to reading using a Quickwrite.

0

Angle Bisectors in Triangles Post Read

To stress understanding of a concept by summarizing the main idea and applying that understanding to create visual aids and generate questions and comments using a Concept Matrix.

0

Angle Bisectors in Triangles Four Square Concept Matrix

Summarize the main idea of a reading, create visual aids, and come up with new questions using a Four Square Concept Matrix.

0
• Real World Application

Perpendicular Bisectors

You need to find the best place to meet up with our friends so that everyone travels and equal distance. How do you use angle bisectors to do this?

0
• Study Guide