Angle Bisector

Jul 25, 2014

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Angle Bisector. Section 1.6c. An angle bisector is a ray that divides an angle into two congruent angles. JK bisects  LJM ; thus  LJK   KJM . . KM bisects  JKL , m  JKM = (4 x + 6)°, and m  MKL = (7 x – 12)°. Find m  JKM .

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Angle Bisector

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Angle Bisector Section 1.6c
An angle bisector is a ray that divides an angle into two congruent angles. JK bisects LJM; thus LJKKJM.
KM bisects JKL, mJKM= (4x + 6)°, and mMKL= (7x – 12)°. Find mJKM.
JK bisects LJM, mLJK= (-10x + 3)°, and mKJM= (–x + 21)°. Find mLJM. Find the measure of each angle.
BD bisects ABC, mABD = , and mDBC = (y + 4)°. Find mABC. Lesson Quiz

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Presentation Transcript

Properties of Perpendicular Bisector &amp; Circumcenter Properties of Angle Bisectors &amp; Incenter

1-5 angle bisector

Warm Up Construct each of the following. 1. A perpendicular bisector. 2. An angle bisector.

Angle Bisector theorem

Median, Angle bisector, Perpendicular bisector or Altitude

Objectives: Use Side-splitter Theorem and the Triangle-Angle-Bisector Theorem

Geo CP Day 23 &gt; SWBAT state the midpoint and angle bisector theorem.

Geo CP Day 24 &gt; SWBAT state the midpoint and angle bisector theorem.

definition of a midpoint definition of an angle bisector

5.1 Perpendicular Bisector

Geometry Bisector of Triangles

CONGRUENT ANGLES &amp; BISECTOR OF AN ANGLE

1. Construct the bisector of an angle.

Warm Up Construct each of the following. 1. A perpendicular bisector. 2. An angle bisector.

Perpendicular bisector and angle bisector

Geometry Bisector of Triangles

Warm Up 1. Draw a triangle and construct the bisector of one angle.

Construct a Perpendicular Bisector

Angle Bisector

AOX BOX by the definition of an angle bisector.

Sec 3.3 Angle Addition Postulate &amp; Angle Bisector

Warm Up 1. Draw a triangle and construct the bisector of one angle.

Properties of Perpendicular Bisector & Circumcenter Properties of Angle Bisectors & Incenter

Geo CP Day 23 > SWBAT state the midpoint and angle bisector theorem.

Geo CP Day 24 > SWBAT state the midpoint and angle bisector theorem.

CONGRUENT ANGLES & BISECTOR OF AN ANGLE

Sec 3.3 Angle Addition Postulate & Angle Bisector