For two triangles to be considered congruent under the Angle-Side-Angle (ASA) criterion, we must have two angles and the included side between those angles that are equal in both triangles.
Here is a brief overview of the triangle congruence criteria:
- ASA (Angle-Side-Angle): Two angles and the included side are congruent.
- AAS (Angle-Angle-Side): Two angles and a non-included side are congruent.
- SAS (Side-Angle-Side): Two sides and the included angle are congruent.
To determine if the triangles are ASA, we need to identify what information is given about the triangles. Since there isn't any specific information provided in your question, we cannot definitively determine the congruence criterion.
Given the options provided, if you have enough information to confirm that two angles and the included side are congruent, then the answer would be "Yes, it is ASA."
If you have different configurations (like two angles and a non-included side, for instance), then it might be AAS. If we have the congruence of two sides and the included angle, that would mean SAS. If there isn't enough information to determine congruence, then "Not Enough Info" could be correct.
In the absence of detailed information on the triangles in question, the best response is "Not Enough Info."