Presentation is loading. Please wait.

Presentation is loading. Please wait.

Section 6.4 AA Similarity Review Triangle Angle Sum Theorem

Published byMaximilian Parks Modified over 6 years ago

Similar presentations

Presentation on theme: "Section 6.4 AA Similarity Review Triangle Angle Sum Theorem"— Presentation transcript:

1 Section 6.4 AA Similarity Review Triangle Angle Sum Theorem
Three angles in a triangle have a sum of ______ Similar Figures Angles are _________, sides are ______________

2 So… if two angles of a triangle are 90° and 40°, what is the measure of the third angle?
If two angles of another triangle are 90° and 40°, what is the measure of it’s third angle? What do you know about the two triangles?

3 They are SIMILAR triangles since all three angles are congruent.
Do you always need to know the measure of the third angle to know if the triangles are similar?

4 Angle Angle (AA) Similarity Theorem
If two angles of one triangle are congruent to two angles of another triangle, then the triangles are similar. You can then write a similarity statement for the two triangles.

5 EXAMPLE 1 Use the AA Similarity Postulate Determine whether the triangles are similar. If they are, write a similarity statement. Explain your reasoning.

6 EXAMPLE 2 Show that triangles are similar Show that the two triangles are similar. a. ∆ABE and ∆ACD b. ∆SVR and ∆UVT

7 GUIDED PRACTICE for Examples 1 and 2 Show that the triangles are similar. Write a similarity statement. 1. ∆FGH and ∆RQS In each triangle all three angles measure 60°, so by the AA similarity postulate, the triangles are similar ∆FGH ~ ∆QRS. ANSWER

8 GUIDED PRACTICE for Examples 1 and 2 Show that the triangles are similar. Write a similarity statement. 2. ∆CDF and ∆DEF Since m CDF = 58° by the Triangle Sum Theorem and m DFE = 90° by the Linear Pair Postulate the two triangles are similar by the AA Similarity Postulate; ∆CDF ~ ∆DEF. ANSWER

9 EXAMPLE 3 Standardized Test Practice

10 GUIDED PRACTICE for Example 3 4. A child who is 58 inches tall is standing next to the woman in Example 3. How long is the child’s shadow? (The woman is 5 feet four inches tall and her shadow is 40 inches long.) ANSWER 36.25 in.

11 GUIDED PRACTICE for Example 3 5. You are standing in your backyard, and you measure the lengths of the shadows cast by both you and a tree. Write a proportion showing how you could find the height of the tree. tree height your height = length of your shadow length of shadow SAMPLE ANSWER

Download ppt "Section 6.4 AA Similarity Review Triangle Angle Sum Theorem"

Similar presentations

Prove Triangles Similar by AA 6.4. Another Postulate All you need are any 2 congruent angles for 2 triangles to be congruent.

Prove Triangles Similar by AA 6.4. Another Postulate All you need are any 2 congruent angles for 2 triangles to be congruent.
4.2 Using Similar Shapes How can you use similar shapes to find unknown measures?

4.2 Using Similar Shapes How can you use similar shapes to find unknown measures?
3-5: Proportions and Similar Figures

3-5: Proportions and Similar Figures
Bellwork Solve Solve Solve for x Solve for x Two similar triangles have a scale factor of 2. The sum of the angles in the first triangle is 180 o. What.

Bellwork Solve Solve Solve for x Solve for x Two similar triangles have a scale factor of 2. The sum of the angles in the first triangle is 180 o. What.
Introduction Congruent triangles have corresponding parts with angle measures that are the same and side lengths that are the same. If two triangles are.

Introduction Congruent triangles have corresponding parts with angle measures that are the same and side lengths that are the same. If two triangles are.
EXAMPLE 3 Standardized Test Practice.

EXAMPLE 3 Standardized Test Practice.
EXAMPLE 3 Standardized Test Practice. EXAMPLE 3 Standardized Test Practice SOLUTION The flagpole and the woman form sides of two right triangles with.

EXAMPLE 3 Standardized Test Practice. EXAMPLE 3 Standardized Test Practice SOLUTION The flagpole and the woman form sides of two right triangles with.
7-3 Proving Triangles Similar. Triangle Similarity Angle-Angle Similarity Postulate: If two angles of one triangle are congruent to two angles of another.

7-3 Proving Triangles Similar. Triangle Similarity Angle-Angle Similarity Postulate: If two angles of one triangle are congruent to two angles of another.
7-3 Proving Triangles Similar

7-3 Proving Triangles Similar
8.3: Proving Triangles Similar

8.3: Proving Triangles Similar
EXAMPLE 1 Use the AA Similarity Postulate

EXAMPLE 1 Use the AA Similarity Postulate
Using Proportions to Solve Geometry Problems Section 6.3.

Using Proportions to Solve Geometry Problems Section 6.3.
Assignment P. 384-387: 1-4, 7, 8, 10, 12, 14-17, 20, 30, 31, 32, 36, 41, 42 P. 391-395: 4, 6-8, 10-14, 33, 39, 40 Challenge Problems.

Assignment P : 1-4, 7, 8, 10, 12, 14-17, 20, 30, 31, 32, 36, 41, 42 P : 4, 6-8, 10-14, 33, 39, 40 Challenge Problems.
7.1-7.3 2/1/13 This PowerPoint will assist you with the packet.

/1/13 This PowerPoint will assist you with the packet.
Copyright © Cengage Learning. All rights reserved. Rational Expressions and Equations; Ratio and Proportion 6.

Copyright © Cengage Learning. All rights reserved. Rational Expressions and Equations; Ratio and Proportion 6.
Course: Applied Geo. Aim: Similar Triangles Aim: What is special about similar triangles? Do Now: In the diagram at right  PQR ~  STU. Name the pairs.

Course: Applied Geo. Aim: Similar Triangles Aim: What is special about similar triangles? Do Now: In the diagram at right  PQR ~  STU. Name the pairs.
Aim: How can we review similar triangle proofs? HW: Worksheet Do Now: Solve the following problem: The length of the sides of a triangle are 9, 15, and.

Aim: How can we review similar triangle proofs? HW: Worksheet Do Now: Solve the following problem: The length of the sides of a triangle are 9, 15, and.
Section 4.2 Congruence and Triangles. Two figures are congruent if they have exactly the same size and shape.

Section 4.2 Congruence and Triangles. Two figures are congruent if they have exactly the same size and shape.
1 2 pt 3 pt 4 pt 5 pt 1 pt 2 pt 3 pt 4 pt 5 pt 1 pt 2 pt 3 pt 4 pt 5 pt 1 pt 2 pt 3 pt 4 pt 5 pt 1 pt 2 pt 3 pt 4 pt 5 pt 1 pt Ratios/ Proportions Similar.

1 2 pt 3 pt 4 pt 5 pt 1 pt 2 pt 3 pt 4 pt 5 pt 1 pt 2 pt 3 pt 4 pt 5 pt 1 pt 2 pt 3 pt 4 pt 5 pt 1 pt 2 pt 3 pt 4 pt 5 pt 1 pt Ratios/ Proportions Similar.
Section 7.3 Similar Triangles.

Section 7.3 Similar Triangles.

Similar presentations

Ads by Google