There are five ways to prove that triangles are congruent. They are: SSS, SAS, ASA, AAS, HL

There are five ways to prove that triangles are congruent. They are: SSS, SAS, ASA, AAS, HL We are going to look at the first three today.

SSS Postulate – If three sides of one triangle are congruent to three sides of another triangle, then the triangles are congruent. S – Side S – Side S - Side D S: AB @ FD S: BC @ DE S: AC @ FE B DABC @ DFDE because of SSS A E C F

What SSS Looks Like… B R F C A E S: AB @ ED S: BC @ EF S: AC @ FD D P S Q PRQ  SRQ S: PR @ SR S: PQ @ SQ S: RQ @ RQ ABC  DEF

SAS Postulate – If two sides and the included angle of one triangle are congruent to two sides and the included angle of another triangle, then the triangles are congruent. S – Side A – Angle S - Side D S: AB @ FD A: ÐB @ÐD S: BC @ DE B DCAB @ DEFD A E C F because of SAS

What SAS Looks Like… Y T S: WT @ YZ A: ÐW @ÐZ S: WV @ ZX X Z W V YZX  TWV M L S: MN @ PN A: ÐLNM @ÐQNP S: LN @ QN LMN  QPN N P Q

What SAS Does NOT Look Like… Y T X Z W V The angle pair that is marked congruent MUST be in between the two congruent sides to use SAS! There is NOT enough information to determine whether these triangles are congruent.

ASA Postulate – If two angles and the included side of one triangle are congruent to two angles and the included side of another triangle, then the triangles are congruent. A – Angle S – Side A - Angle A: ÐB @ÐD S: AB @ FD A: ÐA @ÐF D B DACB @ DFED because of ASA A E C F

What ASA Looks Like… D H A: ÐN @ÐR S: MN @ PR A: ÐM @ÐP Q MNL  PRQ F G J L FDG  JHG A: ÐD @ÐH S: DG @ HG A: ÐDGF @ÐHGJ P R M N

What ASA Does NOT Look Like… L Q M P N R The pair of sides pair that are marked congruent MUST be in between the two congruent angles to use ASA!

There are five ways to prove that triangles are congruent. They are: SSS, SAS, ASA, AAS, HL