In the exploration below, segments A'B' and B'C' are fixed to match the lengths of their corresponding objects, and angle A'B'C' is fixed to be congruent to angle ABC, but you are able to manipulate the other sides and angles. Experiment by moving the points around in order to test the theory that Side-Angle-Side is a criteria for triangle congruence. Is it possible to make the second triangle different than the first, or are they always congruent?