SFM Productions Presents: Another saga in your continuing Pre-Calculus experience! 1.9Inverse Functions.

Slides:

Advertisements

Similar presentations

Function f Function f-1 Ch. 9.4 Inverse Functions

Advertisements

6.2 One-to-One Functions; Inverse Functions

Inverse Functions. Objectives  Students will be able to find inverse functions and verify that two functions are inverse functions of each other.  Students.

Inverse Functions Section 1.8.

Operations on Functions Composite Function:Combining a function within another function. Written as follows: Operations Notation: Sum: Difference: Product:

1.4c Inverse Relations and Inverse Functions

Precalculus 1.7 INVERSE FUNCTIONS.

Inverses of Trigonometric Functions. The Sine Function Graph Domain: Range: All Reals -1≤y≤1 The Sine graph is a function (one output for each input).

4.7 Inverse Trig Functions

4.1 Inverses Mon March 23 Do Now Solve for Y 1) 2)

One-to One Functions Inverse Functions

Sullivan PreCalculus Section 4.2 Inverse Functions

Algebra 2: Section 7.4 Inverse Functions.

Inverse Functions Graph Square/Cube Root Functions Objectives: 1.To find the inverse of a function 2.To graph inverse functions 3.To graph square and cube.

INVERSE FUNCTIONS.  Prove that and are inverses of each other  Complete warm up individually and then compare to a neighbor END IN MIND.

College Algebra Acosta/Karwowski. Chapter 5 Inverse functions and Applications.

Section 8.2 Inverse Functions

Inverses Algebraically 2 Objectives I can find the inverse of a relation algebraically.

Slide Copyright © 2009 Pearson Education, Inc.

Composite Functions Inverse Functions

Today in Pre-Calculus Go over homework questions Notes: Inverse functions Homework.

Q Exponential functions f (x) = a x are one-to-one functions. Q (from section 3.7) This means they each have an inverse function. Q We denote the inverse.

Sullivan Algebra and Trigonometry: Section 7.1 The Inverse Sine, Cosine, and Tangent Functions Objectives of this Section Find the Exact Value of the Inverse.

Goal: Find and use inverses of linear and nonlinear functions.

Section 5.2 One-to-One Functions; Inverse Functions.

Warm-upWarm-up Determine and the domain of each Section 4.2 One-to-One and Inverse Functions.

Math – What is a Function? 1. 2 input output function.

Inverse Trig Functions Objective: Evaluate the Inverse Trig Functions.

Inverse Functions Section 7.4.

How do we verify and find inverses of functions?

1.8 Inverse functions My domain is your range No! My range is your domain.

Finding the Inverse.  If f(a) = b, then a function g(x) is an inverse of f if g(b) = a.  The inverse of f(x) is typically noted f -1 (x), which is read.

Inverse functions Calculus Inverse functions Switch x and y coordinates Switch domains and ranges Undo each other. Not all functions have an inverse,

7.8 Inverse Functions and Relations Horizontal line Test.

Do Now: Find f(g(x)) and g(f(x)). f(x) = x + 4, g(x) = x f(x) = x + 4, g(x) = x

One-to-one and Inverse Functions. Copyright © by Houghton Mifflin Company, Inc. All rights reserved. 2 Review: A is any set of ordered pairs. A function.

One-to-one and Inverse Functions 2015/16 Digital Lesson.

Section 2.6 Inverse Functions. Definition: Inverse The inverse of an invertible function f is the function f (read “f inverse”) where the ordered pairs.

SFM Productions Presents: Another saga in your continuing Pre-Calculus experience! 4.6 Graphs of other Trigonometric Functions.

Inverse Functions Objective: To find and identify inverse functions.

Algebra 2 June 18, 2016 Goals:   Identify functions in coordinate, table, or graph form   Determine domain and range of given functions.

Quadratic and Square Root Inverse Relationships with Restrictions

Objectives: To find inverse functions graphically & algebraically.

Section Inverse Functions

Chapter 6: Radical functions and rational exponents

College Algebra Chapter 4 Exponential and Logarithmic Functions

Notes Over 2.1 Function {- 3, - 1, 1, 2 } { 0, 2, 5 }

Sullivan Algebra and Trigonometry: Section 8.1

The Inverse Sine, Cosine, and Tangent Functions

Sullivan Algebra and Trigonometry: Section 6.1

Composition of Functions And Inverse Functions.

Relations for functions.

One-to-One Functions;

Objectives The student will be able to:

Sec. 2.7 Inverse Functions.

Section 4.1 Inverse Functions.

Relations and Functions

1.6 Inverse Functions.

Objectives The student will be able to:

Combinations of Functions

Inverse Functions A function and its inverse function can be described as the "DO" and the "UNDO" functions. A function takes a starting value, performs.

1.6 Inverse Functions.

Packet #12 Composite, One-to-one, and Inverse Functions

Objectives The student will be able to:

Functions and Relations

Bell Ringer How can you determine inverse functions…

The Inverse Sine, Cosine, and Tangent Functions

Equations & Graphing Algebra 1, Unit 3, Lesson 5.

Presentation transcript:

SFM Productions Presents: Another saga in your continuing Pre-Calculus experience! 1.9Inverse Functions

Homework for section 1.9 P , 31, 33, 43-49, 53, 55, 57, 61, 81, 83, 87-91, 99

A function is a set of ordered pairs:(x,y) (input, output) (domain, range) How would you go backwards? How would you go in the other direction?

Range x yx y DomainRangeDomain Range

By interchanging the x and y coordinates, you can form the inverse function for any function you have … If you know points of a certain function, you can easily create it’s inverse just by switching the x value to the y coordinate, and switching the y value to the x coordinate.. (3,5)(3,5)(5,3)(5,3) (4,8)(4,8)(8,4)(8,4) and so on …

One way to see if things are inverses of each other is to take their composition …

Let’s try a couple … are these inverses? what about these?

Taking the composition was one way of determining if two things are inverses of each other … GRAPHING is another way.

Is the yellow curve a function??? By definition: A function can only have an inverse if the inverse is itself a function … By placing a restriction on a function, you can make it: ONE-TO-ONE

But why stop here?? There is even ONE more way to tell if two things are inverses of each other. (It’s also a way to algebraically PROVE that things are inverses without having to graph.)

Example:

Lets prove it via composition. You will have to know how to do this for the test …

Go! Do!