![]() ![]() Those are the Angle-Side-Angle (ASA) and Angle-Angle-Side (AAS) postulates. The first two postulates, Side-Angle-Side (SAS) and the Side-Side-Side (SSS), focus predominately on the side aspects, whereas the next lesson discusses two additional postulates which focus more on the angles. Figure 3.5.2 Proof of theorem 1 SMSG included the ASA and SSS results among their axioms. So we need to learn how to identify congruent corresponding parts correctly and how to use them to prove two triangles congruent. Thankfully we don’t need to prove all six corresponding parts are congruent… we just need three!īecause if we can show specific sides and/or angles to be congruent between a pair of triangles, then the remaining sides and angles are also equal.īut there is a warning we must be careful about identifying the accurate side and angle relationships!Īs Math is Fun accurately states, there only five different congruence postulates that will work for proving triangles congruent. This means that the pair of triangles have the same three sides and the same three angles (i.e., a total of six corresponding congruent parts). So we already know, two triangles are congruent if they have the same size and shape. In addition, you’ll see how to write the associated two column proof. You’ll quickly learn how to prove triangles are congruent using these methods. ![]() In today’s geometry lesson, we’re going to tackle two of them, the Side-Side-Side and Side-Angle-Side postulates. Jenn, Founder Calcworkshop ®, 15+ Years Experience (Licensed & Certified Teacher) ![]()
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