# 'Tangent function' presentation slideshows

## Chapter 4 Graphs of the Circular Functions

Chapter 4 Graphs of the Circular Functions. Section 4.1 Graphs of the Sine and Cosine Functions. Periodic Functions Many things in daily life repeat with a predictable pattern, such has weather, tides, and hours of daylight.

By fernando
(290 views)

## 13.3 Evaluating Trigonometric Functions

13.3 Evaluating Trigonometric Functions. Evaluating Trigonometric Functions Given a Point. Let ( 3 , – 4 ) be a point on the terminal side of an angle in standard position. Evaluate the six trigonometric functions of . 0. 0. 0. r = x 2 + y 2. = 3 2 + ( – 4 ) 2. = 25. r.

By bin
(182 views)

## Sullivan Algebra and Trigonometry: Section 6.7 Graphs of Tangent, Cotangent, Cosecant, and Secant Functions

Sullivan Algebra and Trigonometry: Section 6.7 Graphs of Tangent, Cotangent, Cosecant, and Secant Functions. Objectives of this Section Graph Transformations of the Tangent and Cotangent Functions Graph Transformations of the Cosecant and Secant Functions. The Graph of y = tan x. y. x.

By margarita
(2 views)

## Vector Analysis

Vector Analysis. A Mathematical Approach. V. V y. . V x. Vector Components. Soh Cah Toa. Measure all angles from nearest X axis. A. B. (-,+). (+,+). E. (-,-). (+,-). C. D. Vector Analysis. Make a rough sketch of all vectors from a common origin.

By libitha
(277 views)

## Opp

Sine Graph. We already know that. (x,y). Sin θ o =. r . r . Hyp. y. y. Using the unity circle we can re-define Sin θ o as. Opp. θ o. Opp. Hyp. x. Adj. Sin θ o =. The Sin e function is a circular function. We will now graph the Sine function. Since unity circle

By tahlia
(126 views)

## Precalculus Lesson

Precalculus Lesson. 4.6 . Check: p. 326 [Evens] # 12-18, 32-36, 50-54. Warm-up. Graph 2 full periods. Answers. On other sheet. Objective:. Graph sine cosine and tangent functions, and their reciprocals. 4.6 Digital Lesson.

By urbano
(126 views)

## CHAPTER 3-1

CHAPTER 3-1. Two Dimensional Motion VECTORS. 3-1 Describing Motion. Motion involves the introduction of a variety of quantities used to describe the physical world. Ex. distance, displacement, speed, velocity, acceleration, force, mass, momentum, energy, work, power, etc.

By fai
(119 views)

## Trigonometric Functions and the Unit Circle

Trigonometric Functions and the Unit Circle. source: SPSU.edu. Lesson Plan. 1. Unit circle 4. Trigonometric function #3 – tangent a. definition/features a. definition b. illustration b. examples c. implications

By nasnan
(544 views)

## Chapter 14 Day 9

Chapter 14 Day 9. Graphing Tan, Cot, Sec, Csc. Graphing Tangent. tanx. What is the amplitude of the tangent function? What is the period of the tangent function? What is the domain of the tangent function? What is the range of the tangent function?. Graphing Tangent. cotx.

By ziarre
(75 views)

## Chapter 14 Day 9

Chapter 14 Day 9. Graphing Tan, Cot, Sec, Csc. Graphing Tangent. tanx. What is the amplitude of the tangent function? What is the period of the tangent function? What is the domain of the tangent function? What is the range of the tangent function?. Graphing Tangent. cotx.

By tori
(90 views)

## Ricky Pedersen Cooking up maths ideas since 2005

Ricky Pedersen Cooking up maths ideas since 2005. Wobbly Pasta. Linking the unit circle with Trigonometric functions. 3 types of functions looked at in year 11 Sine Cosine Tangent How many of us show students that sin cos and tan are more than just buttons on a calculator?.

By eliza
(103 views)

## Graphs of the Sine, Cosine, & Tangent Functions

Graphs of the Sine, Cosine, & Tangent Functions. 7.1. Objectives: Graph the sine, cosine, & tangent functions. State all the values in the domain of a basic trigonometric function that correspond to a given value of the range. Graph the transformations of sine, cosine, & tangent functions.

By fionn
(327 views)

## Chapter 3: Two Dimensional Motion

Chapter 3: Two Dimensional Motion . Section 1: Vectors. scalar – a quantity with a magnitude, but no direction. Speed is an example of a scalar. vector - a quantity with both a magnitude and direction. Velocity & acceleration are vectors. Vectors are drawn with arrows on diagrams.

By bedros
(226 views)

## Honors Algebra 2

Honors Algebra 2. Solving Right Triangle Problems. Answers to 6 Trig. Functions. Assignment Quiz.

By viveka
(124 views)

## Drill

Drill. Convert 105 degrees to radians Convert 5 π /9 to radians What is the range of the equation y = 2 + 4cos3x?. 7 π /12 100 degrees [-2, 6]. Derivatives of Trigonometric Functions. Lesson 3.5. Objectives. Students will be able to

By qabil
(152 views)

## How to Use This Presentation

How to Use This Presentation. To View the presentation as a slideshow with effects select “View” on the menu bar and click on “Slide Show.” To advance through the presentation, click the right-arrow key or the space bar.

(96 views)

## Ch. 5 Trigonometric Functions of Real Numbers

Ch. 5 Trigonometric Functions of Real Numbers. Melanie Kulesz Katie Lariviere Austin Witt. The Unit Circle. x 2 + y 2 = 1. The circle of radius 1 centered at the origin in the xy -plane . Proving points on the unit circle. Use equation: x2 + y2 = 1 See Example. See example

By ellard
(98 views)

## Section 7.7

Section 7.7. Graphs of Tangent, Cotangent, Cosecant, and Secant Functions. GRAPHS OF TANGENT. Recall that the period of tangent is π . The graph of y = tan x has vertical asymptotes at. The period of y = tan ω x is π / ω . PROPERTIES OF THE TANGENT FUNCTION.

By brant
(140 views)

## Graphs of Tangent and Cotangent Functions

Graphs of Tangent and Cotangent Functions. Plan for the Day. Review Homework Graphing Tangent and Cotangent Homework. Key Steps in Graphing Sine and Cosine. Identify the key points of your basic graph Find the new period (2 π / b ) Find the new beginning ( bx - c = 0)

By bobby
(146 views)

## By William Wilson, Matt Smith, Zack LaMantia, Caitlyn Carter

How Tall Is It!!!. By William Wilson, Matt Smith, Zack LaMantia, Caitlyn Carter. William’s 25° Δ Height = 5 feet Base = 30 feet Pace = 2 feet. Tan x= opposite adjacent Tan25= x feet 30 feet 30 (tan 25) = x 13.99 feet ≈ x 13.99 feet + 5 feet = 18.99 feet.

By joelle
(157 views)

View Tangent function PowerPoint (PPT) presentations online in SlideServe. SlideServe has a very huge collection of Tangent function PowerPoint presentations. You can view or download Tangent function presentations for your school assignment or business presentation. Browse for the presentations on every topic that you want.