Success Criteria LT: Today’s Agenda Proportions LT: I will use ratio language to describe the relationship between two quantities Do Now Hand back test Activity HW#6 Success Criteria Today’s Agenda I can use ratio language to describe the relationship between two quantities

Hand out Activity Today’s activity and accompanying worksheet will count as HW #36

Success Criteria LT: Today’s Agenda Similar Triangles LT: I will use the criteria of similarity to determine if two shapes are similar Do Now Lesson HW#7 Success Criteria Today’s Agenda I can use the criteria of similarity to determine if two shapes are similar

G.7 Proving Triangles Similar (AA~, SSS~, SAS~)

Similar Triangles Two triangles are similar if they are the same shape. That means the vertices can be paired up so the angles are congruent. Size does not matter.

AA Similarity (Angle-Angle or AA~) If 2 angles of one triangle are congruent to 2 angles of another triangle, then the triangles are similar. Given: and Conclusion: by AA~

SSS Similarity (Side-Side-Side or SSS~) If the lengths of the corresponding sides of 2 triangles are proportional, then the triangles are similar. Given: Conclusion: by SSS~

Example: SSS Similarity (Side-Side-Side) 5 11 22 8 16 10 Given: Conclusion: By SSS ~

SAS Similarity (Side-Angle-Side or SAS~) If the lengths of 2 sides of a triangle are proportional to the lengths of 2 corresponding sides of another triangle and the included angles are congruent, then the triangles are similar. Given: Conclusion: by SAS~

Example: SAS Similarity (Side-Angle-Side) 5 11 22 10 Given: Conclusion: By SAS ~

A 80 D E 80 B C ABC ~ ADE by AA ~ Postulate Slide from MVHS

C 6 10 D E 5 3 A B CDE~ CAB by SAS ~ Theorem Slide from MVHS

L 5 3 M 6 6 K N 6 10 O KLM~ KON by SSS ~ Theorem Slide from MVHS

A 20 D 30 24 16 B C 36 ACB~ DCA by SSS ~ Theorem Slide from MVHS

L 15 P A 25 9 N LNP~ ANL by SAS ~ Theorem Slide from MVHS

Similarity is reflexive, symmetric, and transitive. Proving Triangles Similar Similarity is reflexive, symmetric, and transitive. Steps for proving triangles similar: 1. Mark the Given. 2. Mark … Reflexive (shared) Angles or Vertical Angles 3. Choose a Method. (AA~, SSS~, SAS~) Think about what you need for the chosen method and be sure to include those parts in the proof.

AA Problem #1 Step 1: Mark the given … and what it implies Step 2: Mark the vertical angles AA Step 3: Choose a method: (AA,SSS,SAS) Step 4: List the Parts in the order of the method with reasons Step 5: Is there more? Statements Reasons C D E G F Given Alternate Interior <s Alternate Interior <s AA Similarity

SSS Problem #2 Step 1: Mark the given … and what it implies Step 2: Choose a method: (AA,SSS,SAS) Step 4: List the Parts in the order of the method with reasons Step 5: Is there more? Statements Reasons 1. IJ = 3LN ; JK = 3NP ; IK = 3LP Given Division Property Substitution SSS Similarity

SAS Problem #3 Step 1: Mark the given … and what it implies Step 2: Mark the reflexive angles SAS Step 3: Choose a method: (AA,SSS,SAS) Step 4: List the Parts in the order of the method with reasons Next Slide…………. Step 5: Is there more?

Statements Reasons G is the Midpoint of H is the Midpoint of Given 2. EG = DG and EH = HF Def. of Midpoint 3. ED = EG + GD and EF = EH + HF Segment Addition Post. 4. ED = 2 EG and EF = 2 EH Substitution Division Property Reflexive Property SAS Postulate

Similarity is reflexive, symmetric, and transitive.

Choose a Problem. Problem #1 AA Problem #2 SSS Problem #3 SAS End Slide Show Problem #1 AA Problem #2 SSS Problem #3 SAS

The End 1. Mark the Given. 2. Mark … Shared Angles or Vertical Angles 3. Choose a Method. (AA, SSS , SAS) **Think about what you need for the chosen method and be sure to include those parts in the proof.