Consider the diagram.

Triangles B A E and C A D are connected at point A. Angle B A E is a right angle. Sides B A and A C are congruent. Sides B E and C D are congruent.

The congruence theorem that can be used to prove △BAE ≅ △CAD is
SSS.
ASA.
SAS.
HL.

The HL congruence theorem states that, if the hypotenuse and one leg of a right triangle is congruent to the hypotenuse and a corresponding leg of another right triangle, then they are congruent triangles.

△BAE and △CAD have:

Congruent hypotenuses: BE ≅ CD.

Congruent legs: BA ≅ CA

Therefore, the congruence theorem that proves they are congruent is: HL.

Learn more about the HL congruence theorem on:

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viven619 viven619 · Answer 2 · 2022-08-06T02:32:45+02:00

viven619 viven619

06-08-2022

Answer: Option 4 or D. HL

Step-by-step explanation:

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Consider the diagram. Triangles B A E and C A D are connected at point A. Angle B A E is a right angle. Sides B A and A C are congruent. Sides B E and C D are congruent. The congruence theorem that can be used to prove △BAE ≅ △CAD is SSS. ASA. SAS. HL.

Respuesta :

What is the HL Congruence Theorem?

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Consider the diagram.

Triangles B A E and C A D are connected at point A. Angle B A E is a right angle. Sides B A and A C are congruent. Sides B E and C D are congruent.

The congruence theorem that can be used to prove △BAE ≅ △CAD is
SSS.
ASA.
SAS.
HL.