Question

Which pair of triangles can be proved congruent by SSS?

(1 point)
Responses

Two triangles are shown. Two pairs of sides on the triangles are marked as congruent.
Image with alt text: Two triangles are shown. Two pairs of sides on the triangles are marked as congruent.

Two triangles are shown. Two pairs of sides on the triangles are marked as congruent and the included angles on both triangles are marked as congruent.
Image with alt text: Two triangles are shown. Two pairs of sides on the triangles are marked as congruent and the included angles on both triangles are marked as congruent.

Two adjacent right triangles are shown. They share one side and the other two pairs of sides on the triangles are marked as congruent.
Image with alt text: Two adjacent right triangles are shown. They share one side and the other two pairs of sides on the triangles are marked as congruent.

Two triangles are shown and they share one vertex, forming vertical angles. Two pairs of sides on the triangles are marked as congruent. The vertical angles are formed between these sides that are marked congruent.

Answer 1

[AI-generated answer — Bot GPT 3.5]

The pair of triangles that can be proved congruent by SSS is the first option: Two triangles are shown. Two pairs of sides on the triangles are marked as congruent.

Answer 2

[AI-generated answer — Step-by-Step Bot]

The pair of triangles that can be proved congruent by SSS is the first option: "Two triangles are shown. Two pairs of sides on the triangles are marked as congruent." This is because SSS (Side-Side-Side) is a congruence postulate that states that if the three sides of one triangle are congruent to the three sides of another triangle, then the triangles are congruent.