Copyright © 2015, 2011, 2008 Pearson Education, Inc. Chapter 8, Unit B, Slide 1 Exponential Astonishment 8

Copyright © 2015, 2011, 2008 Pearson Education, Inc. Chapter 8, Unit B, Slide 2 Unit 8B Doubling Time and Half-Life

Copyright © 2015, 2011, 2008 Pearson Education, Inc. Chapter 8, Unit B, Slide 3 Doubling and Halving Times The time required for each doubling in exponential growth is called doubling time. The time required for each halving in exponential decay is called halving time.

Copyright © 2015, 2011, 2008 Pearson Education, Inc. Chapter 8, Unit B, Slide 4 After a time t, an exponentially growing quantity with a doubling time of T double increases in size by a factor of. The new value of the growing quantity is related to its initial value (at t = 0) by New value = initial value × 2 t/T double Doubling Time

Copyright © 2015, 2011, 2008 Pearson Education, Inc. Chapter 8, Unit B, Slide 5 Example Compound interest (Unit 4B) produces exponential growth because an interest-bearing account grows by the same percentage each year. Suppose your bank account has a doubling time of 13 years. By what factor does your balance increase in 50 years? Solution The doubling time is T double = 13 years, so after t = 50 years your balance increases by a factor of 2 t/Tdouble = 2 50 yr/13 yr = ≈ For example, if you start with a balance of $1000, in 50 years it will grow to $1000 × = $14,382.

Copyright © 2015, 2011, 2008 Pearson Education, Inc. Chapter 8, Unit B, Slide 6 Approximate Double Time Formula (The Rule of 70) For a quantity growing exponentially at a rate of P% per time period, the doubling time is approximately This approximation works best for small growth rates and breaks down for growth rates over about 15%.

Copyright © 2015, 2011, 2008 Pearson Education, Inc. Chapter 8, Unit B, Slide 7 Example World population doubled in the 40 years from 1960 to What was the average percentage growth rate during this period? Contrast this growth rate with the 2012 growth rate of 1.1% per year. Solution We answer the question by solving the approximate doubling time formula for P. Multiplying both sides of the formula by P and dividing both sides by T double, we have

Copyright © 2015, 2011, 2008 Pearson Education, Inc. Chapter 8, Unit B, Slide 8 Example (cont) Substituting T double = 40 years, we find The average population growth rate between 1960 and 2000 was about P% = 1.75% per year. This is significantly higher (by 0.65 percentage point) than the 2012 growth rate of 1.1% per year.

Copyright © 2015, 2011, 2008 Pearson Education, Inc. Chapter 8, Unit B, Slide 9 After a time t, an exponentially decaying quantity with a half-life time of T half decreases in size by a factor of. The new value of the decaying quantity is related to its initial value (at t = 0) by New value = initial value x (1/2) t/T half Exponential Decay and Half-Life

Copyright © 2015, 2011, 2008 Pearson Education, Inc. Chapter 8, Unit B, Slide 10 Example Radioactive carbon-14 has a half-life of about 5700 years. It collects in organisms only while they are alive. Once they are dead, it only decays. What fraction of the carbon-14 in an animal bone still remains 1000 years after the animal has died?

Copyright © 2015, 2011, 2008 Pearson Education, Inc. Chapter 8, Unit B, Slide 11 Example (cont) Solution The half-life is T half = 5700 years, so the fraction of the initial amount remaining after t = 1000 years is For example, if the bone originally contained 1 kilogram of carbon-14, the amount remaining after 1000 years is approximately kilogram.

Copyright © 2015, 2011, 2008 Pearson Education, Inc. Chapter 8, Unit B, Slide 12 Example Suppose that 100 pounds of Pu-239 is deposited at a nuclear waste site. How much of it will still be present in 100,000 years? Solution The half-life of Pu-239 is T half = 24,000 years. Given an initial amount of 100 pounds, the amount remaining after t = 100,000 years is About 5.6 pounds of the original 100 pounds of Pu-239 will still be present in 100,000 years.

Copyright © 2015, 2011, 2008 Pearson Education, Inc. Chapter 8, Unit B, Slide 13 For a quantity decaying exponentially at a rate of P% per time period, the half-life is approximately This approximation works best for small decay rates and breaks down for decay rates over about 15%. The Approximate Half-Life Formula

Copyright © 2015, 2011, 2008 Pearson Education, Inc. Chapter 8, Unit B, Slide 14 Example Suppose that inflation causes the value of the Russian ruble to fall at a rate of 12% per year (relative to the dollar). At this rate, approximately how long does it take for the ruble to lose half its value? Solution We can use the approximate half-life formula because the decay rate is less than 15%. The 12% decay rate means we set P = 12/yr. The ruble loses half its value (against the dollar) in 6 yr.

Copyright © 2015, 2011, 2008 Pearson Education, Inc. Chapter 8, Unit B, Slide 15 Exact Doubling Time and Half-Life Formulas For more precise work, use the exact formulas. These use the fractional growth rate, r = P/100. For an exponentially growing quantity with a fractional grow rate r, the doubling time is For a exponentially decaying quantity, in which the fractional decay rate r is negative (r < 0), the half-life is

Copyright © 2015, 2011, 2008 Pearson Education, Inc. Chapter 8, Unit B, Slide 16 Example A population of rats is growing at a rate of 80% per month. Find the exact doubling time for this growth rate and compare it to the doubling time found with the approximate doubling time formula. Solution The growth rate of 80% per month means P = 80/mo or r = 0.8/mo. The doubling time is or about 1.2 mo.