During: The Pythagorean Theorem and Its converse

Similar documents
5-7 The Pythagorean Theorem

Block 2 ~ The Pythagorean Theorem Self-Assessment. Progress (shade this in) Name Per. Track your understanding. Lesson #

1 Math 116 Supplemental Textbook (Pythagorean Theorem)

Chapter 7 Sect. 2. A pythagorean triple is a set of three nonzero whole numbers a, b, and c, that satisfy the equation a 2 + b 2 = c 2.

Find the geometric mean between 9 and 13. Find the geometric mean between

15 x. Substitute. Multiply. Add. Find the positive square root.

Pythagoras theorem (8 9)

Classwork 8.1. Perform the indicated operation and simplify each as much as possible. 1) 24 2) ) 54w y 11) wy 6) 5 9.

Unit 4-Review. Part 1- Triangle Theorems and Rules

Geometry Warm Up Right Triangles Day 8 Date

Using the distance formula Using formulas to solve unknowns. Pythagorean Theorem. Finding Legs of Right Triangles

8-2 The Pythagorean Theorem and Its Converse. Find x. 27. SOLUTION: The triangle with the side lengths 9, 12, and x form a right triangle.

8-2 Trigonometric Ratios

NOTES: Chapter 11. Radicals & Radical Equations. Algebra 1B COLYER Fall Student Name:

Vocabulary. Term Page Definition Clarifying Example altitude of a triangle. centroid of a triangle. circumcenter of a triangle. circumscribed circle

8-6. Square Roots and Cube Roots. Vocabulary. Areas of Squares and Powers as Squares. Activity 1. Lesson

Name Date Period Notes Formal Geometry Chapter 8 Right Triangles and Trigonometry 8.1 Geometric Mean. A. Definitions: 1.

Algebra 1B. Unit 9. Algebraic Roots and Radicals. Student Reading Guide. and. Practice Problems

Skills Practice Skills Practice for Lesson 3.1

Chapter 8 Test Wednesday 3/28

Name Score Period Date. m = 2. Find the geometric mean of the two numbers. Copy and complete the statement.

Geometry Review- Chapter Find e, and express your answer in simplest radical form.

Determine whether the given lengths can be side lengths of a right triangle. 1. 6, 7, , 15, , 4, 5

Accelerated Math 7 Second Semester Final Practice Test

Chapter 5: Properties and Attributes of Triangles Review Packet

Assignment 1 and 2: Complete practice worksheet: Simplifying Radicals and check your answers

Radicals and connections to geometry

Part II) Practice Problems

How can you find decimal approximations of square roots that are not rational? ACTIVITY: Approximating Square Roots

The Theorem of Pythagoras

Section 9.2 Objective: Students will be able to define and work with irrational numbers.

Geometry Right Triangles and Trigonometry

The Pythagorean Theorem & Special Right Triangles

8 Right Triangle Trigonometry

Math 302 Module 6. Department of Mathematics College of the Redwoods. June 17, 2011

To construct the roof of a house, an architect must determine the measures of the support beams of the roof.

Geometry Final Review. Chapter 1. Name: Per: Vocab. Example Problems

Trigonometric ratios:

Lesson 11-5: Trigonometric Ratios

Basic Trigonometry. Trigonometry deals with the relations between the sides and angles of triangles.

Math Number 842 Professor R. Roybal MATH History of Mathematics 24th October, Project 1 - Proofs

Unit 2 Review. Short Answer 1. Find the value of x. Express your answer in simplest radical form.

Pythagorean Theorem With Two Points Kuta

Radicals and Pythagorean Theorem Date: Per:

Squares and Square Roots. The Pythagorean Theorem. Similar Figures and Indirect Measurement

8th Grade. Slide 1 / 145. Slide 2 / 145. Slide 3 / 145. Pythagorean Theorem, Distance & Midpoint. Table of Contents

ALGEBRA I AND GEOMETRY SUMMER ASSIGNMENT

PRACTICE PROBLEMS CH 8 and Proofs

Senior Math Summer Packet. A. f (x) = x B. f (x) = 2 x. C. f (x) = x 2 D. f (x) = sin x

Geometry Unit 7 - Notes Right Triangles and Trigonometry

1. Which of the following segment lengths could be used to form a right triangle? A. 15, 36, 39 B. 3, 4, 7 C. 21, 45, 51 D.

Section 8.2 Vector Angles

4. Solve for x: 5. Use the FOIL pattern to multiply (4x 2)(x + 3). 6. Simplify using exponent rules: (6x 3 )(2x) 3

Geometry Final Exam Review

Name That Triangle! Classifying Triangles on the Coordinate Plane. LESSON 5.1 Assignment

Name: Test 1 Preview Math 306 September 21, 2011 Pythagoras and Number Sets

Pre-Algebra Chapter 3 Exponents and Roots

Geometry Cumulative Review

Name: Period: Geometry Unit 5: Trigonometry Homework. x a = 4, b= a = 7, b = a = 6, c = a = 3, b = 7

Pythagorean Theorem Cheat Sheet

LT 2.1 Study Guide and Intervention Classifying Triangles

For all questions, E is NOTA, which denotes that none of the above is correct. All diagrams are not drawn to scale. All angles are in degrees.

So, PQ is about 3.32 units long Arcs and Chords. ALGEBRA Find the value of x.

Chapter 13: Trigonometry Unit 1

: SINE, COSINE, & TANGENT RATIOS

Chapter. Triangles. Copyright Cengage Learning. All rights reserved.

4. Find the areas contained in the shapes. 7. Find the areas contained in the shapes.

Show all work for full credit. Do NOT use trig to solve special right triangle problems (half credit).

Exploring The Pythagorean Theorem

Chapter 8: Right Triangles Topic 5: Mean Proportions & Altitude Rules

Let be an acute angle. Use a calculator to approximate the measure of to the nearest tenth of a degree.

Squares on a Triangle

Chapter 4 Trigonometric Functions

Inside Out. Triangle Sum, Exterior Angle, and Exterior Angle Inequality Theorems. Lesson 3.1 Assignment

Honors Geometry Qtr 2 Practice from Chapters 5-8

Assignment. Get Radical or (Be) 2! Radicals and the Pythagorean Theorem. Simplify the radical expression. 45x 3 y 7

Geometry Midterm Review 18-19

Section 5.1. Perimeter and Area

8.6 Inverse Trigonometric Ratios

Geometry. of Right Triangles. Pythagorean Theorem. Pythagorean Theorem. Angles of Elevation and Depression Law of Sines and Law of Cosines

MULTIPLE CHOICE. Choose the one alternative that best completes the statement or answers the question.

12-1 Trigonometric Functions in Right Triangles. Find the values of the six trigonometric functions for angle θ.

Big Ideas: determine an approximate value of a radical expression using a variety of methods. REVIEW Radicals

9.3. Practice C For use with pages Tell whether the triangle is a right triangle.

The Pythagorean Theorem

Note-Taking Guides. How to use these documents for success

G.1.f.: I can evaluate expressions and solve equations containing nth roots or rational exponents. IMPORTANT VOCABULARY. Pythagorean Theorem

Square Root Functions 10.1

Additional Exercises 10.1 Form I Solving Quadratic Equations by the Square Root Property

Lesson 4.1 (Part 1): Roots & Pythagorean Theorem

Precalculus Summer Assignment 2015

Name Date Trigonometry of the Right Triangle Class Work Unless otherwise directed, leave answers as reduced fractions or round to the nearest tenth.

2014 Summer Review for Students Entering Algebra 2. TI-84 Plus Graphing Calculator is required for this course.

Indicate the answer choice that best completes the statement or answers the question.

A. leg B. hipponamoose C. hypotenuse D. Big Guy. A. congruent B. complementary C. supplementary D. cute little things

Applying the Pythagorean Theorem

Name: Geometry & Intermediate Algebra Summer Assignment

Trigonometry of the Right Triangle Class Work

LESSON 11 PRACTICE PROBLEMS

Name: Class: Date: c. WZ XY and XW YZ. b. WZ ZY and XW YZ. d. WN NZ and YN NX

Transcription:

Before: November 1st As a warm-up, let's do the Challenge Problems from the 5.1-5.4 Quiz Yesterday 1. In Triangle ABC, centroid D is on median AM. AD = x - 3 and DM = 3x - 6. Find AM. 2. In Triangle ABC, centroid D is on median AM. AD = x - 3 and DM = 2x - 6. Find AM. Oct 30 9:08 PM During: The Pythagorean Theorem and Its converse Learning Target: To use the Pythagorean Theorem and its converse. 1

There is an important relationship in right triangles called the Pythagorean Theorem. This theorem is named for Pythagoras, a Greek mathematician who lived in the 500s B.C. We now know that the Babylonians, Egyptians, and Chinese were aware of this relationship before its discovery by Pythagoras. Theorem 8 1 2

Common Pythagorean triples: 3, 4, 5 5, 12, 13 8, 15, 17 7, 24, 25 Problem 1: Finding the Length of the Hypotenuse I Do What is the length of the hypotenuse of triangle ABC? Do the side lengths of triangle ABC form a Pythagorean triple? Explain. 3

Problem 1: Finding the Length of the Hypotenuse We Do The legs of a right triangle have lengths 10 and 24. What is the length of the hypotenuse? Do the side lengths in part (a) form a Pythagorean triple? Problem 1: Finding the Length of the Hypotenuse You Do What is the length of the hypotenuse of triangle LMN? Do the side lengths of triangle LMN form a Pythagorean triple? Explain. 4

Problem 2: Finding the Length of a Leg I Do What is the value of x? Express your answer in simplest radical form. Problem 2: Finding the Length of a Leg We Do The hypotenuse of a right triangle has length 12. One leg has length 6. What is the length of the other leg? Express your answer in simplest radical form. 5

Problem 2: Finding the Length of a Leg You Do What is the value of x? Express your answer in simplest radical form. Problem 3: Finding Distance I Do Dog agility courses often contain a seesaw obstacle, as shown below. To the nearest inch, how far above the ground are the dog s paws when the seesaw is parallel to the ground? 6

Problem 3: Finding Distance We Do The size of a computer monitor is the length of its diagonal. You want to buy a 19-in. monitor that has a height of 11 in. What is the width of the monitor? Round to the nearest tenth of an inch. Problem 3: Finding Distance You Do Jamal leans a 12-ft-long ladder against the side of a house. The base of the ladder is 4 ft. from the house. To the nearest tenth of a foot, how high on the house does the ladder reach? 7

You can use the Converse of the Pythagorean Theorem to determine whether a triangle is a right triangle. Theorem 8 2 Converse of the Pythagorean Theorem If Then... If the sum of the squares of the lengths of two sides of a triangle is equal to the square of the length of the third side, then the triangle is a right triangle. Triangle ABC is a right triangle. Problem 4: Identifying a Right Triangle I Do A triangle has side lengths 85, 84, and 13. Is the triangle a right triangle? Explain. 8

Problem 4: Identifying a Right Triangle We Do A triangle has side lengths 16, 48, and 50. Is the triangle a right triangle? Explain. Once you know which length represents the hypotenuse, does it matter which length you substitute for a and which length you substitute for b? Explain. Problem 4: Identifying a Right Triangle You Do A triangle has side lengths 12.5, 30, and 32.5. Is the triangle a right triangle? Explain. 9

Theorem 8 3 If Then If the square of the length of the longest side of a triangle is greater than the sum of the squares of the lengths of the other two sides, then the triangle is obtuse. Triangle ABC is obtuse Theorem 8 4 If Then If the square of the length of the longest side of a triangle is less than the sum of the squares of the lengths of the other two sides, then the triangle is acute. Triangle ABC is acute Problem 5: Classifying a Triangle I Do A triangle has side lengths 6, 11, and 14. Is it acute, obtuse, or right? 10

Problem 5: Classifying a Triangle We Do Is a triangle with side lengths 7, 8, and 9 acute, obtuse, or right? Problem 5: Classifying a Triangle You Do A triangle has side lengths 4, 9, and 12. Is it acute, obtuse, or right? Explain. 11

After: Lesson Check What is the value of x in simplest radical form? After: Lesson Check Describe the conditions that a set of three numbers must meet in order to form a Pythagorean triple. A triangle has side lengths 16, 34, and 30. Your friend says it is not a right triangle. Look at your friend s work and describe the error. 12

Homework: Page 495, #7 21 odd, #22, #24 32 all Nov 2 8:58 AM 13

2024 © sciencedocbox.com Privacy Policy | Terms of Service | Feedback