[size=150]The following activity explores the possibility of AAS Triangle Congruence.[br][list][*][math]\angle A'[/math] is fixed to be congruent to [math]\angle BAC[/math].[/*][*][math]\angle B'[/math] is fixed to be congruent to [math]\angle ABC[/math][/*][*]Segment B'C' will always be congruent to segment BC. [br][/*][*]The blue points on triangle ABC will alter the side and angle measurements of the triangle.[/*][*]The red points allow you to manipulate certain sides lengths and angle measurements of triangle A'B'C'.[/*][/list][br][list=1][*]Manipulate the red points of A'B'C to become a triangle congruent to triangle ABC. Was it possible? Why or why not?[/*][*]Can you find a way to manipulate the red points of A'B'C become a triangle different than triangle ABC? If so, what does this mean about AAS Congruence? If not, why not?[br][/*][/list][/size]