#4 Piecewise Functions.

Slides:

Advertisements

Similar presentations

Warm – up Toya is training for a triathlon and wants to bike and run on the same day. She has less than 3 hours to spend on her workouts. What inequality.

Advertisements

Calculations In Everyday Contexts.

Calculations In Everyday Contexts.. Wage Rises Example 1. (a) The new annual wage. (b) The new monthly wage. Solution (a)The new annual wage = old wage.

1. 2. Warm-Up Domain Range INQ:______________ INT:______________

Copyright © 2010 Pearson Education, Inc. All rights reserved Sec Linear Inequalities in One Variable.

Creating Piecewise Functions from Real World Scenarios – Day 3

Algebra1 Writing Functions

Warm-up Jim makes $5.75 an hour. Each week, 26% of his total pay is deducted for taxes. Write an expression for the amount Jim has after taxes. 5.75h -

LearnZillion Notes: --This is your hook. Start with a question to draw the student in. We want that student saying, “huh, how do you do X?” Try to be specific.

Algebra 1 Unit 2 Review. Mrs. Fox wants to take her children to Hartford Stage to see a play. Tickets cost $55 per person, there is a handling fee of.

Financial Algebra © Cengage/South-Western Slide ELECTRONIC UTILITIES Compute the cost of cell phone calls, text messaging, Internet service, and.

1) Suppose that the function: f(x) = 3 x + 14 represents the cost to rent x video games from a local store. Jack has $ 19 in his wallet. How much more.

Shopping for a Cellular Plan Using Systems of Equations.

System of Equations WORD PROBLEMS Name Apr 11, Problem Solving Steps 1.What are you trying to find? 2.What do you know? Given in the problem? From.

1 Pre-Algebra Order of Operations Day 2. 2 What Are You Learning? I CAN evaluate word problems using the order of operations.

Let’s Play a Game…. Pull out a piece of paper (rip it in half) Write down a Number (any number you want) Call it x ( x = ____ ) Now Pick Another Number.

Algebra1 Writing Functions

Problem: Nathan pays $68 for his favorite x-box game. Each month he has to pay $3 to clean the game since he plays it so much. If he doesn’t pay for cleaning.

EXAMPLE 4 Find a unit rate A car travels 110 miles in 2 hours. Find the unit rate. 110 miles 2 hours = 1 hour 55 miles 2 hours miles 2 = The unit.

Check it out! 1.3.1: Creating and Graphing Linear Equations in Two Variables 1.

Piecewise & Greatest Integer Functions

Do Now: 1/28/13 James earns a daily salary of $115, plus a monthly bonus of $100. Alan is paid according to the equation y = 110x +125, where y is the.

Piecewise Functions Objective: Students will be able to graph, write and evaluate piecewise functions.

1 What you will learn today 1. How to evaluate piecewise functions 2. How to graph piecewise functions 3. How to determine piecewise functions from a graph.

CHAPTER 10 REVIEW.

2.6 Special Functions Warm-up (IN) Learning Objective: to write and graph piecewise and absolute value functions and to apply them to real world situations.

Mini-Lesson MA.912.A.3.5 Solve linear equations and inequalities

5-Minute Check 1 Use elimination using addition to find the solution Bell Ringer 3-17 (4 minutes ) 1. In order to use elimination with addition, what do.

JEOPARDY Functions Equations Formulas Explicit Formulas

EXAMPLE 1 Translate verbal phrases into expressions Verbal Phrase Expression a. 4 less than the quantity 6 times a number n b. 3 times the sum of 7 and.

Manvel H S World Champions CBA Review Algebra 1 A: B: #1 Which graph does NOT represent a function? C: D:

Write a recursive routine that describes each sequence. Find the 7 th term. 1.7, 4, 1, −2, … 2.9, 17, 25, 33, … 3. Warm-Up

Lesson 9 – Special Functions Math 2 Honors - Santowski.

2.7 Piecewise Functions p. 114 Up to now, we’ve been looking at functions represented by a single equation. In real life, however, functions are represented.

Unit 4 Test Review Chapter 6 Packet Lessons 1-8 Chapter 8 Book Lesson 6.

Writing Equations for Piecewise Functions and Word Problems Chapter 2

Chapter 2 – Linear Equations and Functions 2.2 – Linear Functions and Function Notation.

BELLWORK TN READY Review: 1Bellwork per day 1Homework question per day Due every FRIDAY.

WOW!!! We’re Making GREAT Progress!!. Evaluate the expression 4 2 –

Unit 1: Linear Functions and Inequalities Day 3: Writing Equations of Lines.

Warm up. Up to now, we’ve been looking at functions represented by a single equation. In real life, however, functions are represented by a combination.

Chapter 6: Systems of Equations and Inequalities

Chapter 3 Non-Linear Functions and Applications Section 3.3.

Functions. Function Notation f(x) is a fancy way of saying ____. Why use function notation?

2 step equations word problems

PIECEWISE FUNCTIONS. What You Should Learn: ① I can graph any piecewise function. ① I can evaluate piecewise functions from multiple representations.

My Contract is Up… Who has the best deal? Graphing Linear Equations.

Warm Up (Nov. 30) ***Complete on handout to turn in Friday*** 1. Hana already knew 2 appetizer recipes before starting culinary school, and she will learn.

EOC Review Word Problems.

§ 3.2 Solving Application Problems. Angel, Elementary Algebra, 7ed 2 Problem Solving 1.Understand the problem. Identify the quantity or quantities you.

Systems of Equations Whiteboard Practice **Get whiteboard, sock, & marker.** By PresenterMedia.comPresenterMedia.com.

Objectives Identify independent and dependent variables.

Financial Algebra © Cengage/South-Western Slide 1 PREPARE A BUDGET 10-1Utility Expenses 10-2Electronic Utilities 10-3Charting a Budget 10-4Cash Flow and.

Review for Test. Question #1  Jillian can spend at most $135 at the movies. She wants to buy 3 boxes of popcorn and 2 boxes of candy to share with her.

Topic 3 – Linear Functions, Equations, and Inequalities Class 5 – Point-Slope Form Mr. Solórzano – Algebra 1.

Introduction A piecewise function is a function that is defined by two or more expressions on separate portions of the domain. Piecewise functions are.

Linear Piecewise-defined functions unit 1 day 15

Objective: Review piecewise functions.

10.2 A Electronic Utilities

Sprint Relays Mid-unit 3 review.

College Algebra Chapter 1 Equations and Inequalities

Piecewise Functions.

Section 4.7 Forming Functions from Verbal Descriptions

Piecewise Functions Unit 1 Day 8.

1. > < ≥ ≤ Signs of Inequality Term Definition Example

Real World Situations.

Opening Questions Evaluate the function for the indicated values: f(x) = 3x – 2 1) f(2) 2) f(0) 3) f(-2) Graph the two linear equations on the.

Advanced Financial Algebra

Presentation transcript:

#4 Piecewise Functions

What You Should Learn: I can graph any piecewise function. I can evaluate piecewise functions from multiple representations. I can distinguish between inclusive and exclusive points. I can write a piecewise function from multiple representations.

Graphing & Evaluating Piecewise Functions – Day 1 Today’s objective: I can graph any piecewise function. I can evaluate piecewise functions from multiple representations. I can distinguish between inclusive and exclusive points.

Definition of Piecewise Root word is Piece.

Piecewise Functions: Graphically Piecewise Functions are Pieces of different functions graphed together on the same coordinate plane. Each of these Pieces is defined on a different domain. (x intervals) Graphs are not continuous.

Examples of Piecewise Functions: Graphically

Piecewise Functions: Algebraically When functions are defined by more than one equation, they are called piece-wise defined functions. Each equation is a different Piece.

Examples of Piecewise Functions: Graphically

For the following function a) Find f(-1), f(1), f(3). b) Find the domain. c) Sketch the graph.

For the following function

b) Find the domain. -2 -1 1 Domain of f(x): [-2, ∞) Graph each separate domain in the appropriate color. Combine all together to get the Domain of f(x). -2 -1 1 Domain of f(x): [-2, ∞)

c) Graph Use colors when graphing.

c) Graph Use colors when graphing.

Creating Piecewise Equations – Day 2 Today’s objective: I can write a piecewise function from multiple representations. (From a Graph)

Example 1: Write the function for each graph.

Example 2: Write the function for each graph.

Example 3: Write the function for each graph. Add arrows to the ends of these two functions.

Example 5: Write the function for each graph. Add arrows to the ends of these two functions.

Creating Piecewise Functions from Real World Scenarios – Day 3 Today’s objective: I can write a piecewise function from multiple representations. (From a Real World Scenario)

4-Step Problem Solving Process: STEP 1: Understand the problem: a) Read the entire problem. b) Can you restate the problem?

4-Step Problem Solving Process: STEP 2: Devise a Plan: a) Highlight any given information. b) Eliminate any unnecessary info. c) Define the variable using the unknown info. d) Relate the given info to the unknown info with a formula or equation.

4-Step Problem Solving Process: STEP 3: Execute the Plan: a) Model the problem with the equation. b) Solve the equation for the unknown. c) Be sure to label the units.

4-Step Problem Solving Process: STEP 4: Check Your Work: a) Check the solution in the original equation. b) Does your answer make sense in the context of the problem?

Example 1: Create a Piecewise Function You go to Wal-Mart to buy some candy. You decide to buy snickers because they have a special deal on snickers. A bag of snickers costs $3.45, but if you buy 4 or more bags, they only cost $3.00per bag. Create a piecewise function to represent the cost of the bags of snickers.

Solution: Example 1 b = number of bags of snickers C(b) = Cost of all bags of snickers purchased $3.45 = cost of a bag if less than 4 bags are purchased $3.00 = cost of a bag if 4 or more bags are purchased.

Example 2: Create a Piecewise Function The Mad Hatter is ordering cups from Teacups, Limited, for his tea party. The Teacups, Limited catalog prices cups according to the number of cups ordered. For orders of 20 or fewer cups, the price is $1.40 per cup plus $12 shipping and handling on the order. For orders of more than 20 cups, the price is $1.10 per cup plus $15 shipping and handling. Create a function to describe the price of cups.

Example 2: Create a Piecewise Function b) How much will it cost the Mad Hatter to order 16 cups? c) If the Mad Hatter wants to spend at most $45, what is the maximum number of cups he can order?

Solution: Example 2 c = the number of cups ordered P(c) = the price of all cups ordered $1.40 cost of each cup if 20 or less are ordered $12.00 shipping if 20 or less are ordered $1.10 cost of each cup if more than 20 are ordered $15.00 shipping if more than 20 are ordered b) $34.40 c) 27 cups

Example 3: Create a Piecewise Function Every month your cell phone plan costs $75 and gives you unlimited talk, 500 text messages, and no data plan. It costs $0.10 per text message sent in excess of the 500 that you are originally allotted. a) Write a piecewise function to determine the amount of your cell phone bill. b) How much will it cost you if you send 750 text messages?

Solution: Example 3 $75 = monthly cost of cell phone bill $0.10 = cost of each text in excess of the plan’s allotted 500. t = number of text messages sent T-500 = number of texts in excess of 500 allotted C(t) = Cost of your cell phone bill b) $100

Example 4: Create a Piecewise Function A construction worker earns $17 per hour for the first 40 hours of work and $25.50 per hour for work in excess of 40 hours. Create a function to represent the amount of her paycheck. b) One week she earned $896.75. How much overtime did she work?

Solution: Example 4 $17 = hourly pay: hours up to 40. $25.50 = hourly pay; hours in excess of 40 h = # of hours worked h-40 =# hours worked in excess of 40 P(h) = total amount of paycheck b) 8.5 overtime hours

Example 5: Create a Piecewise Function Southeast Electric charges $0.09 per kilowatt-hour for the first 200 kWh. The company charges $0.11 per kilowatt-hour for all electrical usage in excess of 200 kWh. a) Create a function to model this scenario. b) How many kilowatt-hours were used if a monthly electric bill was $57.06?

Solution: Example 5 h = # kilowatt-hours C(h) = Cost of total kilowatt-hours b) 555.09 Kwh

YOU TRY: On Your Whiteboard! Ex. 1: A city parking lot uses the following rules to calculate parking fees: A flat rate of $5.00 for any amount of time up to and including the first hour. A flat rate of $12.50 for any amount of time over 1 hour and up to and including 2 hours. A flat rate of $13 plus $3 per hour for each hour after 2 hours. Create a piecewise function to model the parking fees.

YOU TRY: On Your Whiteboard! Ex. 2: Your job pays you $8.50 an hour for a normal 40 hour work week. If you work over 40 hours then you get paid overtime, at time and half (1.5 times your normal rate) for anything over 40 hours, but you are not allowed to work more than 20 overtime hours. Create a function that models this scenario. How much would your paycheck be if you worked 45 hours?

YOU TRY: On Your Whiteboard! Ex. 3: Every month your cell phone plan costs $230 and gives you unlimited talk, text messages, and 2GB of data. Extra data for each month is $15 per GB you go over your allotted 2GB. a)Write a piecewise function to represent this situation.

YOU TRY: On Your Whiteboard! Ex. 4: You are teaching tomorrow with an activity and you want to use candy to motivate your students. You go to Fred’s Food Club and they have a special going on for blow pops. For 2 or less bags it cost $4.35 for each bag, but if you buy more than 2 bags you get the special price of $3.25 per bag. a) Write a piecewise function to represent this situation.

YOU TRY: On Your Whiteboard! Ex. 5: Greenville Utilities charges a basic customer charge of $10.99 and $0.1260 per kWh for 400kWh or less. If you go over 400kWh you will then pay $0.1151 per kWh for all kWh in excess of the original 400KWh. a) Write a piecewise function to represent this situation.