Скачать презентацию Modeling Exponential Functions Warm-Up Write as a Скачать презентацию Modeling Exponential Functions Warm-Up Write as a

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Modeling Exponential Functions Modeling Exponential Functions

Warm-Up Write as a decimal. 1) 8% 2) 2. 4% 3) 0. 01% Evaluate. Warm-Up Write as a decimal. 1) 8% 2) 2. 4% 3) 0. 01% Evaluate. 4) 36 5) (34)(43) 6) (24)(23)

Exponential Model • The basic form of any exponential model is Where a = Exponential Model • The basic form of any exponential model is Where a = initial amount b = multiplier

Modeling Bacteria Growth Time (hr) 0 Population 25 1 2 3 4 5 6 Modeling Bacteria Growth Time (hr) 0 Population 25 1 2 3 4 5 6 50 100 200 400 800 1600 Write an algebraic expression that represents the population of bacteria after n hours. The expression is called an exponential expression because the exponent, n is a variable and the base, 2, is a fixed number. The base of an exponential expression is commonly referred to as the multiplier.

Example 1 Find the multiplier for each rate of exponential growth or decay. a) Example 1 Find the multiplier for each rate of exponential growth or decay. a) 9% growth 100% + 9% = 109% = 1. 09 b) 0. 08% growth 100% + 0. 08% = 100. 08% = 1. 0008 c) 2% decay 100% - 2% = 98% = 0. 98 d) 8. 2% decay 100% - 8. 2% = 91. 8% = 0. 918

Example 2 Suppose that you invested $1000 in a company’s stock at the end Example 2 Suppose that you invested $1000 in a company’s stock at the end of 1999 and that the value of the stock increased at a rate of about 15% per year. Predict the value of the stock, to the nearest cent, at the end of the years 2004 and 2009. Since the value of the stock is increasing at a rate of 15%, the multiplier will be 115%, or 1. 15 = $2011. 36 = $4045. 56

Example 3 Suppose that you buy a car for $15, 000 and that its Example 3 Suppose that you buy a car for $15, 000 and that its value decreases at a rate of about 8% per year. Predict the value of the car after 4 years and after 7 years. Since the value of the car is decreasing at a rate of 8%, the multiplier will be 92%, or 0. 92 = $10, 745. 89 = $8, 367. 70

Practice A vitamin is eliminated from the bloodstream at a rate of about 20% Practice A vitamin is eliminated from the bloodstream at a rate of about 20% per hour. The vitamin reaches a peak level in the bloodstream of 300 mg. Predict the amount, to the nearest tenth of a milligram, of the vitamin remaining 2 hours after the peak level and 7 hours after the peak level.

Compound Interest The total amount of an investment, A, earning compound interest is where Compound Interest The total amount of an investment, A, earning compound interest is where P is the principal, r is the annual interest rate, n is the number of times interest is compounded per year, and t is the time in years.

Example 1 Find the final amount of a $500 investment after 8 years at Example 1 Find the final amount of a $500 investment after 8 years at 7% interest compounded annually, quarterly, and monthly. compounded annually: = $859. 09 compounded quarterly: = $871. 11 compounded monthly: = $873. 91

Practice Find the final amount of a $2200 investment at 9% interest compounded monthly Practice Find the final amount of a $2200 investment at 9% interest compounded monthly for 3 years.

Assignment • Pg. 430, 431 #14 -32 even, 44, 45, 46 Assignment • Pg. 430, 431 #14 -32 even, 44, 45, 46