Which congruence theorem can be used to prove △wxz ≅ △yzx? aas sas hl
the correct answer is AA
is AAS Step by step explanation: No need to thank me
AAS walkthrough:
the answer is AAS Step by Step Explanation: It is given that two of the angles are congruent and one side is shared between the two
Answer 6
The correct option is AAS. Step-by-step explanation: Consider the diagram below. Triangles △ WXZ and △ YZX share a side XZ. The angles ∠WXZ and ∠XZY are right angles. The angles ∠XWZ and ∠XYZ are congruent. If two angles are congruent, it implies that they are equal in degrees or radians. Thus, the angles ∠XWZ and ∠XYZ are equal. So, in the diagram below, one of the triangles has two angles equal to the corresponding angles in the other triangle, and the two triangles share one side. Thus, according to the Angle-Angle-Side (AAS) statement, the triangles △ WXZ and △ YZX are congruent. So the right option is AAS.
Answer 7
The congruence theorem which proves that these two triangles are congruent is AAS. This is because the two triangles have two congruent angles and the side comes from the side which can be proved congruent in the two triangles by the reflective property. I hope this helps you!! If there’s anything else I can help you with, let me know!
The figure indicates two congruent angles; if two pairs of angles are congruent, so is the third. Since XZ is in both triangles, it is congruent to itself. So we have angle, side, angle and congruent triangles