Download Geometry A Unit 4 Day 5 HW Help In General, proofs in Unit 4 go

Survey
yes no Was this document useful for you?
   Thank you for your participation!

* Your assessment is very important for improving the workof artificial intelligence, which forms the content of this project

page
1
page
2
Document related concepts

Line (geometry) wikipedia , lookup

History of geometry wikipedia , lookup

Euler angles wikipedia , lookup

Technical drawing wikipedia , lookup

Pythagorean theorem wikipedia , lookup

Integer triangle wikipedia , lookup

History of trigonometry wikipedia , lookup

Euclidean geometry wikipedia , lookup

Transcript 
Geometry A Unit 4 Day 5 HW Help
In General, proofs in Unit 4 go like this…
1. Use given statements and known theorems to determine three sets of congruent corresponding parts in
the two triangles.
2. Use SSS, SAS, ASA, AAS or HL as the reason for saying two triangles are congruent.
3. If you are asked to prove that other corresponding parts are congruent, then once you’ve completed the
two steps above, you can use the reason CPCTC to do so.
p. 233 #14 Hint: Use the general plan above and the clues given to you in the text book.
p. 233 #15 Hint: The proof is done in 2 parts. We want to prove that  AFB   EFD, but getting
three sets of congruent corresponding parts is impossible unless we first show  AFC   EFC (Steps
1-4). Once we have that, we can take advantage of the fact that one pair of corresponding parts in
triangles  AFC   EFC (AF and EF) are also corresponding parts of the triangles we ultimately are
trying to prove are congruent.
17.
Statement
1. ___________________
Reason
1. __________________
2. ___________________ 2. ___________________
3.  T = 90o ;R = 90o
3. ___________________
4. __________________
4. Transitive
5. ___________________
5.
6. ___________________
6. _____________________
Alternate Interior Angles
7. ____________________ 7. ____________________
8. _____________________ 8. _____________________
See next page for help on #18
18.
1. _________________________ 1. __________________________
2. _________________________ 2. __________________________
3.  BDC =  ADB = 90o
3.
Lines form 4 = 90o angles
4. _________________________ 4. __________________________
5. _________________________
5. _________________________
6. _________________________ 6.
7. ___BAD
= ___BCD


SAS
7. ______________________
8.  ABD + BDA +  BAD = 180o 8. ______________________
9. ___________________________ 9. _____Substitution__________
10. ____________________________ 10. _________________________
11. ____________________________ 11. Definition of complementary
Related documents
Marking Congruent Triangles
Marking Congruent Triangles
4.5 Notes
4.5 Notes
Triangle Congruence Shortcuts Worksheet
Triangle Congruence Shortcuts Worksheet
chapter 4 TEST REVIEW_ congruent triangles
chapter 4 TEST REVIEW_ congruent triangles
Geometry Practice 4.1-4.3 Name __________________________________
Geometry Practice 4.1-4.3 Name __________________________________
Problem #522 Solution In the diagram below, AB = AC and BY = CZ
Problem #522 Solution In the diagram below, AB = AC and BY = CZ
Geometry – Unit 4 Test Topics You are responsible for all material
Geometry – Unit 4 Test Topics You are responsible for all material
Geometry Homework Lesson 4.2-4.3 Name _______________________________
Geometry Homework Lesson 4.2-4.3 Name _______________________________
4-4 Using Congruent Triangles: CPCTC
4-4 Using Congruent Triangles: CPCTC
Proofs - DanPrest
Proofs - DanPrest
Always-Sometimes-Never
Always-Sometimes-Never
Package `sjstats`
Package `sjstats`