## ASA

### ASA stands for “Angle-Side-Angle” and refers to a common method used to prove that two triangles are congruent

ASA stands for “Angle-Side-Angle” and refers to a common method used to prove that two triangles are congruent. Congruent triangles are triangles that have exactly the same shape and size.

To prove that two triangles are congruent using the ASA postulate, you need to show that two corresponding angles and the included side between those angles are equal in both triangles. The ASA postulate states that if two angles and the included side of one triangle are congruent to two angles and the included side of another triangle, then the two triangles are congruent.

Here is a step-by-step guide on how to use the ASA postulate to prove triangle congruence:

Step 1: Identify the two pairs of congruent angles that you want to use in your proof. Make sure that these angles are located in the same position in both triangles. For example, if you have angle A in triangle ABC and angle D in triangle DEF, they should be corresponding angles.

Step 2: Identify the included side between the two congruent angles in both triangles. The included side is the side that lies between the two angles you selected in Step 1.

Step 3: Show that the two pairs of congruent angles are equal. Use information given in the problem or apply previously proven theorems to prove the congruence of the angles.

Step 4: Show that the included side is congruent in both triangles. You can use information given in the problem or apply previously proven theorems to prove that the included side is equal in length in both triangles.

Step 5: Conclude that the two triangles are congruent by stating that the corresponding angles and the included side are congruent for both triangles based on the ASA postulate.

Step 6: Write a formal proof using the steps you have taken to show the congruence of the triangles.

It is important to remember that when using the ASA postulate to prove triangle congruence, you need to ensure that the order of the information matches. That is, the corresponding angles and the included side must be in the same order in both triangles.

Overall, the ASA postulate is a handy tool to prove congruence between triangles when you have enough information about angles and sides.

## More Answers:

Mastering Triangle Congruence: Exploring Methods to Prove Congruence in Math GeometryUnderstanding Congruent Triangles: Exploring the SSS Criterion for Triangle Congruence

Understanding the SAS Criterion: Proving Triangle Congruence with Side, Angle, and Side