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Proving Congruence: SSS and SAS
Lesson 4-4 Proving Congruence: SSS and SAS
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Standardized Test Practice:
Transparency 4-4 5-Minute Check on Lesson 4-3 Refer to the figure. 1. Identify the congruent triangles. 2. Name the corresponding congruent angles for the congruent triangles. 3. Name the corresponding congruent sides for the congruent triangles. 4. Find x. 5. Find mA. Find mP if OPQ WXY and mW = 80, mX = 70, mY = 30. Standardized Test Practice: A 30 B 70 C 80 D 100
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Standardized Test Practice:
Transparency 4-4 5-Minute Check on Lesson 4-3 Refer to the figure. 1. Identify the congruent triangles. LMN RTS 2. Name the corresponding congruent angles for the congruent triangles. L R, N S, M T 3. Name the corresponding congruent sides for the congruent triangles. LM RT, LN RS, NM ST 4. Find x. 3 5. Find mA. 63 Find mP if OPQ WXY and mW = 80, mX = 70, mY = 30. Standardized Test Practice: A 30 B 70 C 80 D 100
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Objectives Use the SSS Postulate to test for triangle congruence
Use the SAS Postulate to test for triangle congruence
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Vocabulary Included angle – the angle formed by two sides sharing a common end point (or vertex)
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Postulates Side-Side-Side (SSS) Postulate: If the sides of one triangle are congruent to the sides of a second triangle, then the triangles are congruent. Side-Angle-Side (SAS) Postulate: If two sides and the included angle of one triangle are congruent to two sides and the included angle of a second triangle, then the triangles are congruent.
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Side – Angle – Side (SAS)
Given: AC = CD BC = CE Prove: ABC = DEC BC = CE Given ACB DCE (included angle) AC = CD Given in problem Statements Reasons Vertical Angles Theorem ABC DEC SAS Postulate
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ENTOMOLOGY The wings of a moth form two triangles
ENTOMOLOGY The wings of a moth form two triangles. Write a two-column proof to prove that FEG HIG if EI FH, FE HI, and G is the midpoint of both EI and FH. Given: EI FH; FE HI; G is the midpoint of both EI and FH. Prove: FEG HIG 1. Given 1. Proof: Reasons Statements 2. Midpoint Theorem 2. 3. SSS 3. FEG HIG
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Write a two-column proof to prove that ABC GBC if
3. SSS 1. Given 2. Reflexive Proof: Reasons Statements 1. 2. 3. ABC GBC
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COORDINATE GEOMETRY Determine whether WDV MLP for D(–5, –1), V(–1, –2), W(–7, –4), L(1, –5), P(2, –1), and M(4, –7). Explain. Use the Distance Formula to show that the corresponding sides are congruent.
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Answer: By definition of congruent segments, all corresponding segments are congruent. Therefore, WDV MLP by SSS.
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Determine whether ABC DEF for A(5, 5), B(0, 3), C(–4, 1), D(6, –3), E(1, –1), and F(5, 1). Explain. Answer: By definition of congruent segments, all corresponding segments are congruent. Therefore, ABC DEF by SSS.
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Write a flow proof. Given: Prove: QRT STR Answer:
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Write a flow proof. Given: Prove: ABC ADC Proof:
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Determine which postulate can be used to prove that the triangles are congruent. If it is not possible to prove that they are congruent, write not possible. Two sides and the included angle of one triangle are congruent to two sides and the included angle of the other triangle. The triangles are congruent by SAS. Answer: SAS
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Determine which postulate can be used to prove that the triangles are congruent. If it is not possible to prove that they are congruent, write not possible. Each pair of corresponding sides are congruent. Two are given and the third is congruent by Reflexive Property. So the triangles are congruent by SSS. Answer: SSS
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Determine which postulate can be used to prove that the triangles are congruent. If it is not possible to prove that they are congruent, write not possible. a. Answer: SAS
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b. Answer: not possible
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Summary & Homework Summary: Homework:
If all of the corresponding sides of two triangles are congruent, then the triangles are congruent (SSS). If two corresponding sides of two triangles and the included angle are congruent, then the triangles are congruent (SAS). Homework: pg : 6-8, 17, 22-25, 33-34
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