1. Splash Screen

2. Five-Minute Check (over Lesson 4–3) NGSSS Then/Now New Vocabulary
Postulate 4.1: Side-Side-Side (SSS) Congruence
Example 1: Use SSS to Prove Triangles Congruent
Example 2: Standard Test Example
Postulate 4.2: Side-Angle-Side (SAS) Congruence
Example 3: Real-World Example: Use SAS to Prove Triangles are Congruent
Example 4: Use SAS or SSS in Proofs
Lesson Menu

3. A B C D Write a congruence statement for the triangles. A. ΔLMN  ΔRTS
B. ΔLMN  ΔSTR
C. ΔLMN  ΔRST
D. ΔLMN  ΔTRS A B C D
5-Minute Check 1

4. Name the corresponding congruent angles for the congruent triangles.
A. L  R, N  T, M  S
B. L  R, M  S, N  T
C. L  T, M  R, N  S
D. L  R, N  S, M  T A B C D
5-Minute Check 2

5. Name the corresponding congruent sides for the congruent triangles.
A. LM  RT, LN  RS, NM  ST
B. LM  RT, LN  LR, LM  LS
C. LM  ST, LN  RT, NM  RS
D. LM  LN, RT  RS, MN  ST
___ A B C D
5-Minute Check 3

6. A B C D Refer to the figure. Find x. A. 1 B. 2 C. 3 D. 4
5-Minute Check 4

7. A B C D Refer to the figure. Find m A. A. 30 B. 39 C. 59 D. 63
5-Minute Check 5

8. Given that ΔABC  ΔDEF, which of the following statements is true?
A. A  E
B. C  D
C. AB  DE
D. BC  FD
___ A B C D
5-Minute Check 6

9. MA.912.G.4.6 Prove that triangles are congruent or similar and use the concept of corresponding parts of congruent triangles.
MA.912.G.4.8 Use coordinate geometry to prove properties of congruent, regular, and similar triangles.
NGSSS

10. Use the SSS Postulate to test for triangle congruence.
You proved triangles congruent using the definition of congruence. (Lesson 4–3)
Use the SSS Postulate to test for triangle congruence.
Use the SAS Postulate to test for triangle congruence.
Then/Now

11. included angle
Vocabulary

12. Concept 1

13. Write a flow proof. ___ Given: QU  AD, QD  AU Prove: ΔQUD  ΔADU
Use SSS to Prove Triangles Congruent
Write a flow proof.
Given: QU  AD, QD  AU
___
Prove: ΔQUD  ΔADU
Example 1

14. Use SSS to Prove Triangles Congruent
Answer: Flow Proof:
Example 1

15. Which information is missing from the flowproof. Given:. AC  AB
Which information is missing from the flowproof? Given: AC  AB D is the midpoint of BC. Prove: ΔADC  ΔADB
___
A. AC  AC
B. AB  AB
C. AD  AD
D. CB  BC
___ A B C D
Example 1 CYP

16. EXTENDED RESPONSE Triangle DVW has vertices D(–5, –1), V(–1, –2), and W(–7, –4). Triangle LPM has vertices L(1, –5), P(2, –1), and M(4, –7). a. Graph both triangles on the same coordinate plane. b. Use your graph to make a conjecture as to whether the triangles are congruent. Explain your reasoning. c. Write a logical argument that uses coordinate geometry to support the conjecture you made in part b.
Example 2A

17. Read the Test Item You are asked to do three things in this problem
Read the Test Item You are asked to do three things in this problem. In part a, you are to graph ΔDVW and ΔLPM on the same coordinate plane. In part b, you should make a conjecture that ΔDVW  ΔLPM or ΔDVW  ΔLPM based on your graph. Finally, in part c, you are asked to prove your conjecture. /
Solve the Test Item a.
Example 2B

18. b. From the graph, it appears that the triangles have the same shapes, so we conjecture that they are congruent.
c. Use the Distance Formula to show all corresponding sides have the same measure.
Example 2C

19. Example 2C

20. Answer:. WD = ML, DV = LP, and VW = PM
Answer: WD = ML, DV = LP, and VW = PM. By definition of congruent segments, all corresponding segments are congruent. Therefore, ΔWDV  ΔMLP by SSS.
Example 2 ANS

21. Determine whether ΔABC  ΔDEF for A(–5, 5), B(0, 3), C(–4, 1), D(6, –3), E(1, –1), and F(5, 1).
A. yes
B. no
C. cannot be determined A B C
Example 2A

22. Concept 2

23. Use SAS to Prove Triangles are Congruent
ENTOMOLOGY The wings of one type of moth form two triangles. Write a two-column proof to prove that ΔFEG  ΔHIG if EI  HF, and G is the midpoint of both EI and HF.
Example 3

24. Given: EI  HF; G is the midpoint of both EI and HF.
Use SAS to Prove Triangles are Congruent
Given: EI  HF; G is the midpoint of both EI and HF.
Prove: ΔFEG  ΔHIG
1. Given
1. EI  HF; G is the midpoint of EI; G is the midpoint of HF.
Proof:
Reasons
Statements
2. Midpoint Theorem 2.
3. Vertical Angles Theorem
3. FGE  HGI
4. SAS
4. ΔFEG  ΔHIG
Example 3

25. A B C D 1. Reasons Proof: Statements 2. _________ 2. ? Property 3. SSS
1. Given A B C D
2. _________ 2.
? Property
3. SSS
3. ΔABG ΔCGB
A. Reflexive B. Symmetric
C. Transitive D. Substitution
Example 3

26. Write a paragraph proof.
Use SAS or SSS in Proofs
Write a paragraph proof.
Prove: Q  S
Example 4

27. Use SAS or SSS in Proofs
Answer:
Example 4

28. Choose the correct reason to complete the following flow proof.B C D
A. Segment Addition Postulate
B. Symmetric Property
C. Midpoint Theorem
D. Substitution
Example 4

29. End of the Lesson