Modeling Constant Rate of Growth (Rate of Decay) What is the difference between and An exponential function in x is a function that can be written in the.

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Modeling Constant Rate of Growth (Rate of Decay) What is the difference between and An exponential function in x is a function that can be written in the form where a is non-zero and b > 0 and b ≠ 1. The constant a is called the initial value and b is the base. Note where the variable x is Two cases: b > 1 and 0 < b < 1 Modeling San Jose’s Population Using your grapher to solve for t The exponential function y = e x

Modeling Constant Rate of Growth The population of a city grows at an annual rate of 5%. If the initial population is 10,000, find an equation that models the population as a function of time t in years Do you see a pattern? Time tPopulation P 010, , × 10,000 = 10,50010,000(1+0.05) 210, × 10,500 = 11,02510,000(1+0.05)² 311, × 11,025 = 11,57610,000(1+0.05)³

Modeling Constant Rate of Decay The half life of a radioactive substance is 22 days. If the initial amount is 100 grams find an equation that models the amount remaining as a function of time in days Do you see a pattern? Time tAmount = 100 × (1/2)100(1/2) 4425 = 100 × (1/2) × (1/2)100(1/2)² = 100 × (1/2) × (1/2) × (1/2)100(1/2)³

Modeling Constant Rate of Growth/Decay The population of a city grows at an annual rate of 5%. If the initial population is 10,000, find an exponential equation that models the population as a function of time t in years Answer: You invest $5000 at 10% interest compounded annually. Find an exponential equation that models the amount of money as a function time t in years. Answer: The half life of a radioactive substance is 22 days. If the initial amount is 100 grams find an equation that models the amount remaining as a function of time in days Answer:

Graphs of Note “Landmark” Points

If b is positive and not equal to 1, there is a unique function called the exponential function with base b defined by Properties of Exponential Functions – the exponential function 1.Is defined, continuous and positive for all x 2.The x-axis is a horizontal asymptote (no vertical asymptotes) 3.The y-intercept is (0, 1); there is no x-intercept 4.If b > 1, and if b < 1, and 5. If b > 1, is increasing if b < 1, is decreasing

Modeling San Jose’s Population Using the table giving San Jose’s population for 2000 and 2007 find a exponential model and determine when the population will hit 1 million Let P(t) be the population t years from YearPopulation , ,899

The Natural Base e Using your calculator evaluate the expression For What do you observe? The natural base e is the limit whose value is approximately And is the natural exponential function!