. An **angle bisector** is a line segment, ray, or line that divides an **angle** into two congruent adjacent **angles**. Line segment OC bisects **angle** AOB above. So, ∠AOC = ∠BOC which means ∠AOC and ∠BOC are congruent **angles**. Example: In the diagram below, TV bisects ∠UTS. Given that ∠STV=60°, we can find ∠UTS.. An **angle** **bisector** is a line that cuts an **angle** in half. Example 1: If B D → is an **angle** **bisector**, find ∠ A D B & ∠ A D C. Since the **angle** **bisector** cuts the **angle** in half, the other half must also measure 55°. ∠ A D B = 55 ∘ Add both of these **angles** together to get the whole **angle**. ∠ A D B + ∠ B D C = ∠ A D C 55 ∘ + 55 ∘ = 11 0 ∘ ∠ A D C = 11 0 ∘. An **angle** **bisector** of a triangle divides the opposite side into two segments that are proportional to the other two sides of the triangle. When the **angle** of a triangle is bisected either internally or externally with a straight line that cuts the opposite side in the same ratio at any particular angular point. Conversely,. An **angle** **bisector** is a line or ray that divides an **angle** into two congruent **angles**. The **bisector** of an **angle** consists of all points that are equidistant from the sides of the **angle**. The three **angle** **bisectors** of a triangle are concurrent and intersect at a point called the incenter. Read, more elaboration about it is given here.. An **angle** **bisector** is a ray or line which divides the given **angle** into two congruent **angles**. The properties of an **angle** **bisector** are given below: 1. Any point on the **bisector** of an **angle** is equidistant from the sides of the **angle**. 2. In a triangle, the **angle** **bisector** divides the opposite side in the ratio of the adjacent sides. An **angle** **bisector** of a triangle divides the interior **angle's** opposite side into two segments that are proportional to the other two sides of the triangle. **Angle** **bisector** A D cuts side a into two line segments, C D and D B. C D and D B relate to sides b (C A) and c (B A) in the same proportion as C A and B A relate to each other.

## ls

An **angle** **bisector** is a line or ray that divides an **angle** into two congruent **angles**. The **bisector** of an **angle** consists of all points that are equidistant from the sides of the **angle**. The three **angle** **bisectors** of a triangle are concurrent and intersect at a point called the incenter. Read, more elaboration about it is given here.. **What Is an Angle Bisector? Definition** of **Angle Bisector** The **angle bisector** is a ray that divides an **angle** into two congruent **angles**. Constructing an **Angle Bisector** (Interactively!) For any **angle**, follow these steps. (Use the interactive math tool below for an interactive construction.) Step 1. Draw a circle with center at the vertex of the **angle**.

In geometry, the **angle** **bisector** theorem shows that when a straight line bisects one of a triangle's **angles** into two equal parts, the opposite sides will include two segments that are. In Geometry, a “ **Bisector** ” is a line that divides the line into two different or equal parts. It is applied to the line segments and **angles**. A line that passes through the midpoint of the line segment is known as the line segment **bisector**, whereas the line that passes through the apex of an **angle** is known as the **angle bisector**.

### dw

Noun [ edit] **angle bisector** ( plural **angle** bisectors ) ( geometry) A ray that divides an **angle** into two equal parts. Translations [ edit] ± show ray that divides an **angle** into two equal parts This page was last edited on 7 March 2018, at 18:11.

Oct 31, 2020 · The **angle bisector definition** tell us that this is when a line divides an **angle** into two congruent **angles**. The **angle** **bisector** theorem tells us that if a point is on an **angle** **bisector**, it is then equidistant from the sides of the **angle**. How many **bisectors** can an **angle** have? one **bisector** An **angle** **bisector** divides the **angle** into two **angles** with ....