Geometry 201 unit 4.3
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This document discusses triangle congruence using the ASA, AAS, and Hypotenuse-Leg (HL) theorems. It provides examples of applying these theorems to determine if triangles are congruent and to prove triangles congruent. The examples include real world applications involving directions and distances between locations. Key terms like included side are also defined. Practice problems are included for students to determine if a triangle congruence theorem can be used or additional information is needed.
Geometry 201 unit 4.3
- 1. UNIT 4.3 TRIANGLEUNIT 4.3 TRIANGLE CONGRUENCE BY ASA ANDCONGRUENCE BY ASA AND AASAAS
- 2. Warm Up 1. What are sides AC and BC called? Side AB? 2. Which side is in between ∠A and ∠C? 3. Given ∆DEF and ∆GHI, if ∠D ≅ ∠G and ∠E ≅ ∠H, why is ∠F ≅ ∠I? legs; hypotenuse AC Third ∠s Thm.
- 3. Apply ASA, AAS, and HL to construct triangles and to solve problems. Prove triangles congruent by using ASA, AAS, and HL. Objectives
- 5. Participants in an orienteering race use a map and a compass to find their way to checkpoints along an unfamiliar course. Directions are given by bearings, which are based on compass headings. For example, to travel along the bearing S 43° E, you face south and then turn 43° to the east.
- 6. An included side is the common side of two consecutive angles in a polygon. The following postulate uses the idea of an included side.
- 8. Example 1: Problem Solving Application A mailman has to collect mail from mailboxes at A and B and drop it off at the post office at C. Does the table give enough information to determine the location of the mailboxes and the post office?
- 9. The answer is whether the information in the table can be used to find the position of points A, B, and C. List the important information: The bearing from A to B is N 65° E. From B to C is N 24° W, and from C to A is S 20° W. The distance from A to B is 8 mi. 11 Understand the Problem
- 10. Draw the mailman’s route using vertical lines to show north-south directions. Then use these parallel lines and the alternate interior angles to help find angle measures of ∆ABC. 22 Make a Plan
- 11. m∠CAB = 65° – 20° = 45° m∠CAB = 180° – (24° + 65°) = 91° You know the measures of m∠CAB and m∠CBA and the length of the included side AB. Therefore by ASA, a unique triangle ABC is determined. Solve33
- 12. One and only one triangle can be made using the information in the table, so the table does give enough information to determine the location of the mailboxes and the post office. Look Back44
- 13. Check It Out! Example 1 What if……? If 7.6km is the distance from B to C, is there enough information to determine the location of all the checkpoints? Explain. 7.6km Yes; the ∆ is uniquely determined by AAS.
- 14. Example 2: Applying ASA Congruence Determine if you can use ASA to prove the triangles congruent. Explain. Two congruent angle pairs are give, but the included sides are not given as congruent. Therefore ASA cannot be used to prove the triangles congruent.
- 15. Check It Out! Example 2 Determine if you can use ASA to prove ∆NKL ≅ ∆LMN. Explain. By the Alternate Interior Angles Theorem. ∠KLN ≅ ∠MNL. NL ≅ LN by the Reflexive Property. No other congruence relationships can be determined, so ASA cannot be applied.
- 16. You can use the Third Angles Theorem to prove another congruence relationship based on ASA. This theorem is Angle-Angle-Side (AAS).
- 18. Example 3: Using AAS to Prove Triangles Congruent Use AAS to prove the triangles congruent. Given: ∠X ≅ ∠V, ∠YZW ≅ ∠YWZ, XY ≅ VY Prove: ∆ XYZ ≅ ∆VYW
- 20. Check It Out! Example 3 Use AAS to prove the triangles congruent. Given: JL bisects ∠KLM, ∠K ≅ ∠M Prove: ∆JKL ≅ ∆JML
- 23. Example 4A: Applying HL Congruence Determine if you can use the HL Congruence Theorem to prove the triangles congruent. If not, tell what else you need to know. According to the diagram, the triangles are right triangles that share one leg. It is given that the hypotenuses are congruent, therefore the triangles are congruent by HL.
- 24. Example 4B: Applying HL Congruence This conclusion cannot be proved by HL. According to the diagram, the triangles are right triangles and one pair of legs is congruent. You do not know that one hypotenuse is congruent to the other.
- 25. Check It Out! Example 4 Determine if you can use the HL Congruence Theorem to prove ∆ABC ≅ ∆DCB. If not, tell what else you need to know. Yes; it is given that AC ≅ DB. BC ≅ CB by the Reflexive Property of Congruence. Since ∠ABC and ∠DCB are right angles, ∆ABC and ∆DCB are right triangles. ∆ABC ≅ DCB by HL.
- 26. Lesson Quiz: Part I Identify the postulate or theorem that proves the triangles congruent. ASA HL SAS or SSS
- 27. Lesson Quiz: Part II 4. Given: ∠FAB ≅ ∠GED, ∠ABC ≅ ∠ DCE, AC ≅ EC Prove: ∆ABC ≅ ∆EDC
- 28. Lesson Quiz: Part II Continued 5. ASA Steps 3,45. ∆ABC ≅ ∆EDC 4. Given4. ∠ACB ≅ ∠DCE; AC ≅ EC 3. ≅ Supp. Thm.3. ∠BAC ≅ ∠DEC 2. Def. of supp. ∠s 2. ∠BAC is a supp. of ∠FAB; ∠DEC is a supp. of ∠GED. 1. Given1. ∠FAB ≅ ∠GED ReasonsStatements
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