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

Slides:

Advertisements

Similar presentations

SOH CAH TOA Ally Coonradt & Darrin Davis. SOH CAH TOA Used to solve right triangles S- sine C- cosine T- tangent O- opposite; opposite from the angle.

Advertisements

1 7.2 Right Triangle Trigonometry In this section, we will study the following topics: Evaluating trig functions of acute angles using right triangles.

Trigonometry Review of Pythagorean Theorem Sine, Cosine, & Tangent Functions Laws of Cosines & Sines.

Geometry Chapter 8.  We are familiar with the Pythagorean Theorem:

60º 5 ? 45º 8 ? Recall: How do we find “?”. 65º 5 ? What about this one?

TRIGONOMETRY Find trigonometric ratios using right triangles Solve problems using trigonometric ratios Sextant.

The Pythagorean Theorem. The Right Triangle A right triangle is a triangle that contains one right angle. A right angle is 90 o Right Angle.

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

 In a right triangle, the square of the length of the hypotenuse is equal to the sum of the squares of the lengths of the legs  a 2 + b 2 = c 2 a, leg.

Trigonometry. Basic Ratios Find the missing Law of Sines Law of Cosines Special right triangles

Slide The Pythagorean Theorem and the Distance Formula  Special Right Triangles  Converse of the Pythagorean Theorem  The Distance Formula: An.

Pythagoras Theorem a2 + b2 = c2

MA.912.T.2.1 CHAPTER 9: RIGHT TRIANGLES AND TRIGONOMETRY.

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.

Similarity in Right Triangles

Triangles and Lines – Special Right Triangles There are two special right triangles : 30 – 60 – 90 degree right triangle 45 – 45 – 90 degree right triangle.

TRIGONOMETRIC RATIOS Chapter 9.5. New Vocabulary  Trigonometric Ratio: The ratio of the lengths of two sides or a right triangle.  The three basic trigonometric.

Things to remember: Formula: a 2 +b 2 =c 2 Pythagorean Theorem is used to find lengths of the sides of a right triangle Side across from the right angle.

Right Triangles & Trigonometry OBJECTIVES: Using Geometric mean Pythagorean Theorem 45°- 45°- 90° and 30°-60°-90° rt. Δ’s trig in solving Δ’s.

CHAPTER 8 By: Fiona Coupe, Dani Frese, and Ale Dumenigo.

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.

$100 $200 $300 $400 $500 $200 $300 $400 $500 Geometric mean Pythagorean Thm. Special Right Triangles Law of Sines and Cosines Trigonometry Angles of.

7.3 Use Similar Right Triangles

Chapter 7 – Right Triangles and Trigonometry

Chapters 7 & 8 Trigonometry! The study of triangles.

Special Right Triangles Trigonometric Ratios Pythagorean Theorem Q: $100 Q: $200 Q: $300 Q: $400.

Review of Trig Ratios 1. Review Triangle Key Terms A right triangle is any triangle with a right angle The longest and diagonal side is the hypotenuse.

14 Chapter Area, Pythagorean Theorem, and Volume

Geometry Chapter 7 By Nolan Nguyen and Ethan Stroh.

Right Triangle Geometry “for physics students”. Right Triangles Right triangles are triangles in which one of the interior angles is 90 otrianglesangles.

Isosceles and Equilateral Triangles

Trigonometry Chapter 7. Review of right triangle relationships  Right triangles have very specific relationships.  We have learned about the Pythagorean.

Special Right Triangles Definition and use. The Triangle Definition  There are many right angle triangles. Today we are most interested in right.

Trigonometry Chapters Theorem.

CHAPTER EIGHT Alec Rodriguez Jack Wells Chris “the Bottman” Bott.

List all properties you remember about triangles, especially the trig ratios.

Lesson 9.9 Introduction To Trigonometry Objective: After studying this section, you will be able to understand three basic trigonometric relationships.

Notes Chapter 8.3 Trigonometry  A trigonometric ratio is a ratio of the side lengths of a right triangle.  The trigonometric ratios are:  Sine: opposite.

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

Trigonometry in Rightangled Triangles Module 8. Trigonometry  A method of calculating the length of a side Or size of an angle  Calculator required.

– Use Trig with Right Triangles Unit IV Day 2.

7.1 Geometric Mean 7.2 Pythagorean Theorem 7.3 Special Right Triangles 7.4 Trigonometry 7.5 Angles of Elevation & Depression 7.6 Law of Sines 7.7 Law of.

Topic 8 Goals and common core standards Ms. Helgeson

April 21, 2017 The Law of Sines Topic List for Test

Right Triangles and Trigonometry

Unit 3: Right Triangles and Trigonometry

Warm Up(You need a Calculator!!!!!)

Trigonometric Functions

Lesson 9.9 Introduction To Trigonometry

7.4 - The Primary Trigonometric Ratios

7.1 Apply the Pythagorean Theorem

CHAPTER 8 Right Triangles.

X = 3 y = 6 r = 3 y = 20.

Discovering Special Triangles

Class Greeting.

Similar Right Triangles: Geometric Mean

Pythagorean Theorem a²+ b²=c².

Right Triangles and Trigonometry

Lesson: Introduction to Trigonometry - Sine, Cosine, & Tangent

Right Triangles Unit 4 Vocabulary.

Similar Right Triangles

Unit 3: Right Triangle Trigonometry

Warmup 1. Draw and label a right triangle.

14 Chapter Area, Pythagorean Theorem, and Volume

Copyright © Cengage Learning. All rights reserved.

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.

Right Triangles with an altitude drawn.

7.3 Special Right Triangles

Presentation transcript:

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

Special Right Triangles Pythagorean Theorem Sine + Cosine Geometric Mean Theorems

Which of these are a Pythagorean triples? A)3,4,5 B)6,8,9 C)13,14,16

A

The legs of a right triangle are 14 in. And 17 in. long. How long is the hypotenuse?

√ 485

If the hypotenuse of a right triangle is 20 in. long, and one leg is 17 in. long. How long is the other leg? Write answer in simplified radical form. 20 in 17 in

√111

The lengths of the legs of an isosceles triangle are both 20 in and the base is 24 in. What is the area of the triangle? 20 in 24 in

192 in 2

Find x. Write value in simplified radical form x 50

x=10 √8

Find x. WRITE ANSWER IN SIMPLIFIED RADICAL FORM 13 x

13√ 2

12√3 Find x. WRITE ANSWER IN SIMPLIFIED RADICAL FORM x

6√6

x Find BC if… a)x=2√3 and m A=45 b)x=2√2 and m A=60 Write answer in simplified radical form! A B C

a)√6 b)√2

If an equilateral triangle has a side length of 20 in, find the height of the triangle. 20 in

10√3

A B C D 60 ft 60 30√3 What is the length of CB?

20√3

Find x 23 x 6

15.4

ABC is a right triangle with the side opposite angle A is 6 and angle A is 36 degrees. Find the hypotenuse.

10

What is the saying to remember sine, cosine, and tangent.

SOH CAH TOA

If the opposite side from angle A is 8 and the measure of angle a is 43 degrees, find the adjacent side.

8.6

Find x 7 13 x

X=31.1

A B C If CD =5 and AD=4, what does BD=? D

BD=25/4

If CB=4 and AB=3, find BD A B C D

BD=16/3

AC=23, AB=4, find AD A D B C

AD= 529/4

Name all Similar Triangles B C D A 30˚

Triangle ACB~Triangle ABD~ Triangle BCD

Explain Why the Proportions of the Geometric Mean Theorems Work

The Altitude forms 3 similar triangles.