6.2 AAS Triangle Congruence
Tear out pages 284-292 (6.2) and 296-301 (6.3) Angle-Angle-Side Congruence Theorem: if two angles and a non-included side of one triangle are congruent to the corresponding angles and non-included side of another triangle, then the triangles are congruent by AAS. Tear out pages 284-292 (6.2) and 296-301 (6.3)
Page 284-292
p. 290 1-14 & 21 p. 298 2-7; 9-13
Quiz Friday: Covers Modules 5 & 6 15 questions with 5 proofs and another proof as a bonus! You will have a word bank!!!
Page 290 Page 298 AAS Yes by HL No not enough info ASA Cannot be determined We did already <A = <E Any of the sides since the angles are both congruent <A=<E AB=DE or BC=DC <A=<D Reflexive Prop <ACB=<ACD <B=<D Given Alternate Interior Angles 21. A,B,D Yes by HL No not enough info Yes by either HL or SSS Yes by HL or SAS Given Reflexive Prop HL Def. of midpoint CPCTC X = 7 X=11 X=4.5 X=10