Question

Look at δabc. which triangle is congruent to δabc by the asa criterion? triangle 1 sides denoted by 3 dash on left arm, 2 on right arm and 1 on the top arm. triangle 2 has 2 dashes on the left and 3 on the lower arm. triangle 3 has 3 dashes on the lower arm and 1 dash on the left. triangle 4 has 2 dashes on the top arm. a. triangle 1 b. triangle 2 c. triangle 3 d. triangle 4

Answer 1

None of the given triangles are congruent to ΔABC by the ASA criterion.

Step-by-step explanation:

To determine which triangle is congruent to ΔABC by the ASA (Angle-Side-Angle) criterion, we need to compare the angles and sides of each triangle to ΔABC.

Triangle 1 has angles and sides that do not match ΔABC, so it is not congruent.

Triangle 2 has the same side lengths as ΔABC, but its angles do not match, so it is not congruent.

Triangle 3 has one matching angle and side length but does not have the second matching angle, so it is not congruent.

Triangle 4 has one matching side length but does not have the matching angles, so it is not congruent.

Therefore, none of the given triangles are congruent to ΔABC by the ASA criterion.