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4-3

4-3. Congruent Triangles. Holt Geometry. Warm Up. Lesson Presentation. Lesson Quiz. FG , GH , FH ,  F ,  G ,  H. Let’s Get It Started . . . 1. Name all sides and angles of ∆ FGH . 2. What is true about  K and  L ? Why? 3. What does it mean for two segments to be congruent?.

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4-3

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  1. 4-3 Congruent Triangles Holt Geometry Warm Up Lesson Presentation Lesson Quiz

  2. FG, GH, FH, F, G, H Let’s Get It Started . . . 1.Name all sides and angles of ∆FGH. 2. What is true about K and L? Why? 3.What does it mean for two segments to be congruent?  ;Third s Thm. They have the same length.

  3. Objectives Use properties of congruent triangles. Prove triangles congruent by using the definition of congruence.

  4. Vocabulary corresponding angles corresponding sides congruent polygons

  5. Geometric figures are congruent if they are the same size and shape. Corresponding angles and corresponding sides are in the same position in polygons with an equal number of sides. Two polygons are congruent polygons if and only if their corresponding sides are congruent. Thus triangles that are the same size and shape are congruent.

  6. Helpful Hint Two vertices that are the endpoints of a side are called consecutive vertices. For example, P and Q are consecutive vertices.

  7. To name a polygon, write the vertices in consecutive order. For example, you can name polygon PQRS as QRSP or SRQP, but not as PRQS. In a congruence statement, the order of the vertices indicates the corresponding parts.

  8. Naming Polygons Start at any vertex and list the vertices consecutively in a clockwise or counterclockwise direction. D DIANE IANED ANEDI NEDIA EDIAN DENAI ENAID NAIDE AIDEN IDENA E I A N

  9. Helpful Hint When you write a statement such as ABCDEF, you are also stating which parts are congruent.

  10. Sides: PQ ST, QR  TW, PR  SW Example 1: Naming Congruent Corresponding Parts Given: ∆PQR ∆STW Identify all pairs of corresponding congruent parts. Angles: P  S, Q  T, R  W

  11. Sides: LM EF, MN  FG, NP  GH, LP  EH Example 2 If polygon LMNP polygon EFGH, identify all pairs of corresponding congruent parts. Angles: L  E, M  F, N  G, P  H

  12. Example 3: Using Corresponding Parts of Congruent Triangles Given: ∆ABC ∆DBC. Find the value of x. mBCA = mBCD (2x – 16)° = 90° 2x = 106 x = 53

  13. Example 4: Using Corresponding Parts of Congruent Triangles Given: ∆ABC ∆DBC. Find mDBC. mDBC  40.7°

  14. Example 5 Given: ∆ABC  ∆DEF Find the value of x. x = 4

  15. Example 6 Given: ∆ABC  ∆DEF Find mF. mF = 37°

  16. Given:YWXandYWZ are right angles. YW bisects XYZ. W is the midpoint of XZ. XY  YZ. Prove: ∆XYW  ∆ZYW Example 7: Proving Triangles Congruent

  17. 3.W is mdpt. of XZ 7.XW ZW 8.YW YW 4.XY YZ 1.YWX and YWZ are rt. s. 1. Given 2.YW bisects XYZ 2.Given 3.Given 4.Given 5.Rt.   Thm. 5.YWX  YWZ 6.XYW  ZYW 6.Def. of bisector 7.Def. of mdpt. 8.Reflex. Prop. of  9.X  Z 9.Third s Thm. 10.∆XYW  ∆ZYW 10. Def. of  ∆

  18. Example 8 Given:ADbisectsBE. BEbisectsAD. ABDE, A D Prove:∆ABC  ∆DEC

  19. 4.ABDE 5.ADbisectsBE, 6.BC EC, AC DC BE bisects AD 1.A D 1. Given 2.BCA  DCE 2. Vertical s are . 3.ABC DEC 3. Third s Thm. 4. Given 5. Given 6. Def. of bisector 7.∆ABC  ∆DEC 7. Def. of  ∆s

  20. Example 9: Engineering Application The diagonal bars across a gate give it support. Since the angle measures and the lengths of the corresponding sides are the same, the triangles are congruent. Given: PR and QT bisect each other. PQS  RTS, QP  RT Prove: ∆QPS∆TRS

  21. 1.QP RT 3.PR and QT bisect each other. 4.QS TS, PS  RS 1. Given 2.PQS  RTS 2. Given 3. Given 4. Def. of bisector 5.QSP  TSR 5. Vert. s Thm. 6.QSP  TRS 6. Third s Thm. 7.∆QPS  ∆TRS 7. Def. of  ∆s

  22. Given: MK bisects JL. JL bisects MK. JK ML.JK|| ML. Example 10 Use the diagram to prove the following. Prove: ∆JKN∆LMN

  23. 2.JK|| ML 1.JK ML 4.JL and MK bisect each other. 5.JN LN, MN  KN Check It Out! Example 4 Continued 1. Given 2. Given 3.JKN  NML 3. Alt int. s are . 4. Given 5. Def. of bisector 6.KNJ  MNL 6. Vert. s Thm. 7.KJN  MLN 7. Third s Thm. 8.∆JKN ∆LMN 8. Def. of  ∆s

  24. RS Lesson Quiz 1. ∆ABC  ∆JKL and AB = 2x + 12. JK = 4x – 50. Find x and AB. Given that polygon MNOP polygon QRST, identify the congruent corresponding part. 2. NO  ____ 3. T  ____ 4. Given: C is the midpoint of BD and AE. A  E, AB  ED Prove: ∆ABC  ∆EDC 31, 74 P

  25. Statements Reasons 1. A  E 1. Given 2. C is mdpt. of BD and AE 2. Given 3. AC EC; BC  DC 3. Def. of mdpt. 4. AB ED 4. Given 5. ACB  ECD 5. Vert. s Thm. 6. B  D 6. Third s Thm. 7. ABC  EDC 7. Def. of  ∆s Lesson Quiz 4.

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