Table of Contents Applications of Exponential Functions - Growth & Decay There are many applications of exponential functions in the areas of growth and.

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Table of Contents Applications of Exponential Functions - Growth & Decay There are many applications of exponential functions in the areas of growth and decay. Growth ModelDecay Model

Table of Contents Applications of Exponential Functions - Growth & Decay Example 1: Consider the model representing the amount of decay of carbon-14, where... t = time in years A 0 = initial amount of carbon-14 A(t) = amount of carbon-14 after t years Assume that a bone originally had 20 grams of carbon-14 present. How many grams will be present 1000 years later?

Table of Contents Applications of Exponential Functions - Growth & Decay Letting A 0 = 20 and t = 1000 yields or approximately grams of carbon-14 remaining.

Table of Contents Applications of Exponential Functions - Growth & Decay Example 2: Consider the model t = time in weeks N(t) = is the number of people who have the flu in a certain state t weeks after the initial outbreak. where... Find the following: a) the number of people ill with the flu when the epidemic began. b) the number of people ill with the flu after 3 weeks. c) the total number of people with the flu at the end of the epidemic.

Table of Contents Applications of Exponential Functions - Growth & Decay a) Letting t = 0 represent the beginning of the epidemic, there were approximately 150 people ill with the flu initially. The most efficient way to answer the questions would be to use the TABLE feature on a graphing calculator. Type in the formula into y1, set TBLSET to 0, 1, auto, and then go to TABLE. 

Table of Contents Applications of Exponential Functions - Growth & Decay c) To find the total number of people with the flu at the end of the epidemic, consider what value N(t) is approaching as the value of t increases. Scrolling down in the table yields...  b) A value of t = 3 represents the number of people ill after 3 weeks, or approximately 30,128 people. which suggests 60,000 people. 

Table of Contents Applications of Exponential Functions - Growth & Decay