Given: ∠ABC i a right angle, ∠DBC i a traight angle
Prove: ∠ABC ≅ ∠ABD

A horizontal line ha point D, B, C. A line extend vertically from point B to point A. Angle A B C i a right angle. Definition of angle biector
egment addition property
definition of congruent angle
tranitive property


Sagot :

To prove <ABC is congruent to <ABD

What is the meaning of incongruent?

congruent figures are those that match in terms of size and shape or are the same size and shape. The geometry of congruent angles

What does congruent mean Example?

Congruent refers to something that is "exactly equal" in terms of size and shape. The shapes hold true regardless of how we rotate, flip, or turn them. Draw two circles with the same radius, for instance, cut them out, and stack them on top of one another.

According to the question

Both the triangles are right-angled

From RHS criterion

∠ABC ≅ ∠ABD

Definition of angle bisector segment addition property

The line or line segment that splits an angle into two equal pieces is known as the internal angle bisector (internal angle bisector)

definition of congruent angle transitive property

According to the transitive property of congruence, all shapes are congruent to one another if two shapes are congruent to a third shape.

To learn more about triangles click the following link:-

https://brainly.com/question/17335144

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