Intro%20to%20Exponential%20Functions - PowerPoint PPT Presentation

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Intro%20to%20Exponential%20Functions

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Intro to Exponential Functions Contrast Linear Functions Change at a constant rate Rate of change (slope) is a constant Exponential Functions Change at a changing ... – PowerPoint PPT presentation

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Title: Intro%20to%20Exponential%20Functions


1
Intro to Exponential Functions
2
Contrast
View differences using spreadsheet
LinearFunctions Change at a constant rate Rate of change (slope) is a constant
ExponentialFunctions Change at a changing rate Change at a constant percent rate
3
Contrast
  • Suppose you have a choice of two different jobs
    at graduation
  • Start at 30,000 with a 6 per year increase
  • Start at 40,000 with 1200 per year raise
  • Which should you choose?
  • One is linear growth
  • One is exponential growth

4
Which Job?
Year Option A Option B
1 30,000 40,000
2 31,800 41,200
3 33,708 42,400
4 35,730 43,600
5 37,874 44,800
6 40,147 46,000
7 42,556 47,200
8 45,109 48,400
9 47,815 49,600
10 50,684 50,800
11 53,725 52,000
12 56,949 53,200
13 60,366 54,400
14 63,988 55,600
  • How do we get each nextvalue for Option A?
  • When is Option A better?
  • When is Option B better?
  • Rate of increase a constant 1200
  • Rate of increase changing
  • Percent of increase is a constant
  • Ratio of successive years is 1.06

5
Example
  • Consider a savings account with compounded yearly
    income
  • You have 100 in the account
  • You receive 5 annual interest

At end of year Amount of interest earned New balance in account
1 100 0.05 5.00 105.00
2 105 0.05 5.25 110.25
3 110.25 0.05 5.51 115.76
4    
5    
View completed table
6
Compounded Interest
  • Completed table

7
Compounded Interest
  • Table of results from calculator
  • Set y screen y1(x)1001.05x
  • Choose Table (Diamond Y)
  • Graph of results

8
Exponential Modeling
  • Population growth often modeled by exponential
    function
  • Half life of radioactive materials modeled by
    exponential function

9
Growth Factor
  • Recall formula new balance old balance 0.05
    old balance
  • Another way of writing the formula new balance
    1.05 old balance
  • Why equivalent?
  • Growth factor 1 interest rate as a fraction

10
Decreasing Exponentials
  • Consider a medication
  • Patient takes 100 mg
  • Once it is taken, body filters medication out
    over period of time
  • Suppose it removes 15 of what is present in the
    blood stream every hour

At end of hour Amount remaining
1 100 0.15 100 85
2 85 0.15 85 72.25
3
4
5
Fill in the rest of the table
What is the growth factor?
11
Decreasing Exponentials
  • Completed chart
  • Graph

Growth Factor 0.85 Note when growth factor lt
1, exponential is a decreasing function
12
Solving Exponential Equations Graphically
  • For our medication example when does the amount
    of medication amount to less than 5 mg
  • Graph the functionfor 0 lt t lt 25
  • Use the graph todetermine when

13
General Formula
  • All exponential functions have the general
    format
  • Where
  • A initial value
  • B growth factor
  • t number of time periods

14
Typical Exponential Graphs
  • When B gt 1
  • When B lt 1

View results of Bgt1, Blt1 with spreadsheet
15
Assignment
  • Lesson 3.1A
  • Page 112
  • Exercises1 23 odd
  • Lesson 3.1B
  • Pg 113
  • Exercises25 37 odd
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