Similarity in Right Triangles

Slides:

Advertisements

Similar presentations

8-1 Similarity in Right Triangles

Advertisements

Critical Thinking Skill: Demonstrate Understanding of Concepts

Chapter 15 Roots and Radicals.

Geometric Mean Theorem I

7.1 Geometric Mean.  Find the geometric mean between two numbers  Solve problems involving relationships between parts of right triangles and the altitude.

CHAPTER 8: RIGHT TRIANGLES

Roots and Radicals.

Chapter 7 Jeopardy Game By:Kyle, Yash, and Brahvan.

Chapter 8 Roots and Radicals.

Similar Right Triangles

Similar Right Triangles 1. When we use a mirror to view the top of something…….

7.4 Similarity in Right Triangles

Section 7.4 Similarity in Right Triangles. Geometric Mean The positive number of x such that ═

9.3 Altitude-On-Hypotenuse Theorems Objective: After studying this section, you will be able to identify the relationships between the parts of a right.

A B C D Lesson 9.3. AB D C A D C B D A C B Three similar triangles: small, medium and large. Altitude CD drawn to hyp. of △ ABC Three similar triangles.

7.4 Similarity in Right Triangles In this lesson we will learn the relationship between different parts of a right triangle that has an altitude drawn.

Section 8-1 Similarity in Right Triangles. Geometric Mean If a, b, and x are positive numbers and Then x is the geometric mean. x and x are the means.

Geometry 8.1 Right Triangles.

7.4 Similarity in Right Triangles

Chapter 7.4.  The altitude is the Geometric Mean of the Segments of the Hypotenuse.

8.4: Similarity in Right Triangles Objectives: Students will be able to… Find the geometric mean between 2 numbers Find and use relationships between similar.

9.3 Altitude-On-Hypotenuse Theorems (a.k.a Geometry Mean)

Right Triangles and Trigonometry Chapter Geometric Mean  Geometric mean: Ex: Find the geometric mean between 5 and 45 Ex: Find the geometric mean.

Warm Up Week 7. Section 9.1 Day 1 I will solve problems involving similar right triangles. Right Triangle – Altitude to Hypotenuse If the altitude.

Similar Right Triangle Theorems Theorem 8.17 – If the altitude is drawn to the hypotenuse if a right triangle, then the two triangles formed are similar.

Chapter 8 Lesson 4 Objective: To find and use relationships in similar right triangles.

To find the geometric mean between 2 numbers

Unit 6 - Right Triangles Radical sign aa Radicand Index b Simplifying Radicals 11/12/2015 Algebra Review.

7.3 Use Similar Right Triangles

Warm Up 1.Name a chord 2.What term describes

GEOMETRY HELP Find the geometric mean of 3 and 12. x 2 = 36 Cross-Product Property x = 6 x = 36 Find the positive square root. The geometric mean of 3.

Use Similar Right Triangles

Warm-up On a blank piece of paper compute the following perfect squares.. xx2x ……

Pythagorean Theorem Advanced Geometry Trigonometry Lesson 1.

Similar Right triangles Section 8.1. Geometric Mean The geometric mean of two numbers a and b is the positive number such that a / x = x / b, or:

Splash Screen Unit 6 Exponents and Radicals. Splash Screen Essential Question: How do you simplify radical expressions?

9.3 Altitude-On-Hypotenuse Theorems (a.k.a Geometry Mean)

Warm-up: Simplify 1) 1) 2) 2) 3) 3). A C B D 9.1 – Exploring Right Triangles Theorem 9.1 – If an altitude is drawn to the hypotenuse of a right triangle,

NOTES GEOMETRIC MEAN / SIMILARITY IN RIGHT TRIANGLES I can use relationships in similar right triangles.

9.1 Similar Right Triangles Geometry. Objectives  Solve problems involving similar right triangles formed by the altitude drawn to the hypotenuse of.

7.4 Notes Similarity in Right Triangles. Warm-up:

Chapter 9: Right Triangles and Trigonometry Lesson 9.1: Similar Right Triangles.

Section 7-4 Similarity in Right Triangles. Hands-On Activity Take a piece of paper and cut out a right triangle. Use the edge of the paper for the right.

Lesson 7.3 Using Similar Right Triangles Students need scissors, rulers, and note cards. Today, we are going to… …use geometric mean to solve problems.

Key Learning  Solve problems involving similar right triangles formed by the altitude drawn to the hypotenuse of a right triangle.  Use a geometric mean.

9.1 Similar Right Triangles Geometry Mrs. Blanco.

Pythagorean Theorem and Special Right Triangles

9.1 Similar Right Triangles

Algebra 1 Section 9.2 Simplify radical expressions

Geometric Mean 7.1.

Right Triangles and Trigonometry

5.3 Properties of Right Triangles

8-1 Vocabulary Geometric mean.

8-1: Similarity in Right Triangles

9.1 Similar Right Triangles

Chapter 7.3 Notes: Use Similar Right Triangles

Properties of Radicals

9.3 Warmup Find the value of x and y

9.3 Altitude-On-Hypotenuse Theorems

Lesson 50 Geometric Mean.

Altitudes–On- Hypotenuse Theorem

Similar Right Triangles

Chapter 8 Section 1 Recall the rules for simplifying radicals:

Similarity in Right Triangles

8.1 Geometric Mean The geometric mean between two numbers is the positive square root of their product. Another way to look at it… The geometric mean is.

Using Similar Right Triangles

Similar Right Triangles

Right Triangles with an altitude drawn.

Section 8.1 – 8.2 Geometric Mean Pythagorean Theorem

Presentation transcript:

Similarity in Right Triangles Lesson 8.1 Pre-AP Geometry

Lesson Focus Right triangles have many interesting properties. This lesson begins with a study of the properties of right triangles. Algebraic skills with radicals are reviewed and are used throughout the chapter.

Simplifying Radicals Product Rule for Radicals For any nonnegative numbers a and b and any natural number index n, Quotient Rule for Radicals For any natural number index n and any real numbers a and b (b  0) where and are real numbers,

Simplifying Radicals Radical expressions are written in simplest terms when: The index is as small as possible The radicand contains no factor (other than 1) which is the nth power of an integer or polynomial. The radicand contains no fractions. No radicals appear in the denominator.

Simplifying Radicals Example 1: Example 2: Example 3: Example 4:

Geometric Mean If a, b, and x are positive numbers with , then x is the geometric mean between a and b. This implies that .

Geometric Mean Example 5: Find the geometric mean of 4 and 9. Example 6: Find the geometric mean of 3 and 48.

Important To be successful in this chapter, you should spend the time to memorize the following theorem and corollaries. It is very important to your success in this chapter to remember these rules and know how use them.

Right Triangle Similarity Theorem If the altitude is drawn to the hypotenuse of a right triangle, then the two triangles formed are similar to the original triangle and to each other. ACB  ADC  CDB

Corollary 1 When the altitude is drawn to the hypotenuse of a right triangle, the length of the altitude is the geometric mean between the segments of the hypotenuse.

Corollary 2 When the altitude is drawn to the hypotenuse of a right triangle, each leg is the geometric mean between the hypotenuse and the segment of the hypotenuse that is adjacent to that leg.

Similarity in Right Triangles Example 7: If BD = 16 and AD = 9, find CD, AB, CB, and AC.

Similarity in Right Triangles Example 8: If BD = 4 and CD = 2, find AD, AB, CB, and AC.

Problem Set 8.1A, p.288: # 2 - 38 (even) Written Exercises Problem Set 8.1A, p.288: # 2 - 38 (even)

Written Exercises Problem Set 8.1B, Handout 8-1