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Published byVerawati Setiawan Modified over 6 years ago
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Clicker Question 1 What is the general solution to the DE dy / dx = x(1+ y2)? A. y = arctan(x2 / 2) + C B. y = arctan(x2 / 2 + C) C. y = tan(x2 / 2) + C D. y = tan(x2 / 2 + C) E. y = sec(x2 / 2) + C
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Clicker Question 2 What is the specific solution of the DE dy / dt = 4y2 for which y = 1 when t = 1? A. y = e4t + 1 – e4 B. y = 1 / (5 – 4t) C. y = 1 / (4t – 3) D. y = -1 / 4t + 5/4 E. y = 1 / 4t + 3/4
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Application of DE’s: Population Growth (10/21/13)
Let P be the size of a population and let t be time. For example, if the population grows at a rate proportional to its size, this say that it satisfies the DE: dP / dt = k P , k being the relative growth rate. This is separable, and we know the general solution is P = A e kt where A is the starting population. This is, naturally, called exponential growth.
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The Logistic Model of Growth
Many populations may grow exponentially at first, but eventually that growth rate slows as capacity (space, food, etc.) is reached. That is, as time passes, k will approach 0. If the maximum capacity of the population is denoted M, a simple expression which approaches 0 as P approaches M is – P / M .
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The Logistic DE Thus a DE which would model this “exponential growth at first but slowing of the growth rate as P approaches its maximum capacity” would be
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Example Suppose a population growing by the logistic model has a maximum capacity of 1000 and displays an initial growth rate of 8%. Look at an Euler’s Method approximate solution assuming an initial population of 2. Can we explicitly solve this DE? Is it separable?
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Assignment for Wednesday
Do the problems handed out in class. These are not to hand in. Read Section 9.4 through page 610.
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