Math 51 3.6 – Introduction to Functions 1. Let’s look at a graph of fuel prices (in $ per liter) over time… 2.

Slides:

Advertisements

Similar presentations

Functions and Relations.

Advertisements

Relations Functions Definition: Definition:

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).

Function: Definition A function is a correspondence from a first set, called the domain, to a second set, called the range, such that each element in the.

EXAMPLE 4 Graph a translated square root function Graph y = –2 x – Then state the domain and range. SOLUTION STEP 1 Sketch the graph of y = –2 x.

Graph 8 a. Graph b. Domain _________ c. Range __________

Math – Getting Information from the Graph of a Function 1.

Functions Definition A function from a set S to a set T is a rule that assigns to each element of S a unique element of T. We write f : S → T. Let S =

Graphing Piecewise Functions

Functions A function is a relationship between two sets: the domain (input) and the range (output) DomainRange Input Output This.

9/9/2015 Math SL1 - Santowski 1 9/9/2015 Math SL1 - Santowski 1 T The Inverse Function.

Relations and Functions Another Foundational Concept Copyright © 2014 – Curt Hill.

1 MATH 1101 Introduction to Mathematical Modeling.

Chapter 1 A Beginning Library of Elementary Functions

Functions and their Operations Integrated Math 4 Mrs. Tyrpak.

Functions. Warm Up Solve each equation. 1.2x – 6 = x = X + 29 = x – 5 – 4x = 17 x = 14 x = - 7 x = -15 x = 11.

STROUD Worked examples and exercises are in the text PROGRAMME F10 (6 th Ed) FUNCTIONS (revised 29 Jan 14 – J.A.B)

Relations & Functions An Introduction for Algebra Students.

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

Math – Graphs of Functions 1. Graph of a function: the graph of all the function’s ordered pairs 2.

2.2 Square Root of a Function Square Root of the Linear Function

Write a function rule for a graph EXAMPLE 3 Write a rule for the function represented by the graph. Identify the domain and the range of the function.

Function Tables and Graphs. Function A function is when each input (x-value) corresponds to exactly one output (y- value) In other words, when you substitute.

Tell Me Everything You Can About The Graph Below.

©2007 by S – Squared, Inc. All Rights Reserved. Description:  b is the base  b > 0 (positive number)  b ≠ 1  a ≠ 0  x is the exponent  x is the.

Math – Exponential Functions

6/12/2016HL1 Math - Santowski1 Lesson 10 – Inverses & Inverse Functions IBHL1 Math - Santowski 6/12/20161.

Algebra 2 Foundations, pg 64  Students will be able to graph relations and identify functions. Focus Question What are relations and when is a relation.

Section 7.6 Functions Math in Our World. Learning Objectives  Identify functions.  Write functions in function notation.  Evaluate functions.  Find.

Graphing Trigonometric Functions

Finding domain and range

Input/Output tables.

Functions & Relations.

Do Now: Can you input all real numbers into the x variable in the following functions? If not what numbers can x not take on?

2-1 Relations and Functions

4-3 Functions A relation is a function provided there is exactly one output for each input. It is NOT a function if one input has more than one output.

Here is the graph of a function

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

Chapter 7 Functions and Graphs.

2.2 Square Root of a Function Square Root of the Linear Function

The domain is the set of inputs: 10, 12, 13,

Day 16: Domain and Range..

Functions Introduction.

It’s a beautiful day, don’t let it get away.

1.6 Relations and Functions

Section 1.1 Functions and Change

Function Rules and Tables.

Warm Up Given y = –x² – x + 2 and the x-value, find the y-value in each… 1. x = –3, y = ____ 2. x = 0, y = ____ 3. x = 1, y = ____ –4 – −3 2 –

1.1- Relations and Functions

4-3 Functions A relation is a function provided there is exactly one output for each input. It is NOT a function if one input has more than one output.

Functions Rules and Tables.

7.1 – Functions of Several Variables

Introduction to Functions

What is the number whose area is 16 unit square?

Introduction to Functions

1. Make a table for y = 2x + 3 with domain 0, 3, 6, and 9.

Identifying Functions

Alegebra 2A Function Lesson 1 Objective: Relations, and Functions.

Objective: To graph square root functions

Relation (a set of ordered pairs)

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

Functions and Relations

Chapter 2 Functions, Equations, and Graphs

Functions What is a function? What are the different ways to represent a function?

Unit 3: Functions Topics: Function vs. Relation

Presentation transcript:

Math – Introduction to Functions 1

Let’s look at a graph of fuel prices (in $ per liter) over time… 2

One way to read this graph is by thinking about inputs and outputs. If you input the year 2000, the output is $0.60 per liter. If you input the year 2012, the output is $1.41 per liter. Notice that each input (year) gives you only one output (pump price). This is an example of a function. 3

In general, a function relates each input to only one output. Outputs can be observed (as in the pump price above), or they can be generated. 4

For example, suppose you give me any real number, and I square that number. So, give me a 5, and I square it to get 25. Give me a 7, and I square it to get 49. I’m a function, because each input corresponds with one output! Here’s how to write it down mathematically: 5

6

7

8

9

10

11

12

13

14

15

16

17

18

The ________ of a function is the set of all possible _________. The _______ of a function is the set of all possible _________. 19

The ________ of a function is the set of all possible _________. The _______ of a function is the set of all possible _________. 20 domain

The ________ of a function is the set of all possible _________. The _______ of a function is the set of all possible _________. 21 inputs domain

The ________ of a function is the set of all possible _________. The _______ of a function is the set of all possible _________. 22 inputs domain range

The ________ of a function is the set of all possible _________. The _______ of a function is the set of all possible _________. 23 inputs outputs domain range

24 Here is the same function represented in different ways. The domain of the above function is _________. The range of the above function is _________.

25 Here is the same function represented in different ways. The domain of the above function is _________. The range of the above function is _________.

26 Here is the same function represented in different ways. The domain of the above function is _________. The range of the above function is _________.