Download Exponential Growth and Decay: Solving Application Problems and more Exercises Algebra in PDF only on Docsity! Chapter 9: Solving Application Problems Objectives: Exponential growth/growth models Using logarithms to solve Steps for Solving Application Problems: 1. Read, throw out nonsense numbers 2. Assign a variable (What is it asking for?) 3. Write an equation 4. Solve the equation 5. Check, does it make sense? Exponential Growth Models An exponential equation or exponential function is of the form y = a x or f(x) = a x , where a > 0, a ≠ 1. Exponential Growth or Decay Formula: 1,0,)( aaaPtP kt P0 represents the original amount present, P(t) represents the amount present after t years, and a and k are constants. When a > 1, P(t) increases. (Growth) When 0 < a < 1, P(t) decreases. (Decay) Ex: a = 2 Ex: a = ½ Ex: The exponential graph below models the U.S. cellular telephone subscribership, )(tP , in thousands, for t years 1989 through 2008. The formula ttP )257.1(500,3)( models this growth. a. Use the formula to calculate the number of subscribers in 1989. b. Use the formula to calculate the year it will be when the number of subscribers reaches 500,000 thousand. Docsity.com You try: 1. The exponential graph below models the percentage of surface sunlight, f(x), that reaches a depth of x feet beneath the surface of the ocean. The formula models this decay. a. Use the formula to calculate the percentage of surface sunlight intensity at a depth of 20 feet. b. Use the formula to calculate the depth needed to only have 1% of surface sunlight intensity. Natural Exponential Growth or Decay Formula: ktePtP )( Ex: The exponential graph below models the risk of having a car accident, R(x) (as a percentage), with respect to a person’s blood alcohol concentration, x. The formula xexR 77.126)( models this growth. a. Use the formula to calculate the percent of risk of getting into a car accident for a person that has a blood alcohol concentration around 0.05. b. Use the formula to calculate the blood alcohol concentration necessary to have a 100% risk of getting into a car accident. xxf )975.0(20)( Docsity.com 2. Plutonium-239, a radioactive material used in most nuclear reactors, decays exponentially. If there are originally 16 grams of plutonium-239, then the amount of plutonium-239, P(t), remaining after t years is modeled by the formula ktetP 16)( , where k < 0, since the amount of plutonium decreases as time goes on. a. If approximately 3.995 grams of plutonium-239 remain after 50,000 years, find the decay rate, k. And, state the function that models this case. b. How much plutonium will remain after 50 years? c. How long will it take to have only 2 grams remain? Docsity.com 3. Carbon-14, found in all living organisms, decays exponentially when the organism dies. If there are originally 16 grams of carbon-14, then the amount of carbon-14, P(t), remaining after t years is modeled by the formula ktetP 16)( , where k < 0, since the amount of carbon decreases as time goes on. a. If approximately 8 grams of carbon-14 remain after 5,730 years, find the decay rate, k. And, state the function that models this case. b. How much carbon-14 will remain after 50 years? c. How long will it take to have only 2 grams remain? Docsity.com