Warm-Up: March 18, 2013

1. Warm-Up: March 18, 2013 • Solve for P(t):

2. Homework Questions?

3. Population Growth Section 6.5

4. Exponential Population Growth Model • Many populations grow at a rate proportional to the size of the population. • where k is the relative growth rate. • The resulting exponential growth model is • We usually use t=0 as the first year of our model

5. Example 1 • Springfield has a current population of 36000 and is growing at a relative rate of 2.3%. • Write a differential equation for the population. • Find a formula for the population P(t). • Superimpose the graph of the population function on a slope field for the differential equation.

6. Logistic Population Growth Model • Populations cannot increase forever. • Environmental factors often limit the population to some maximum value, M, called the carrying capacity. • The logistic growth model is found from the following logistic differential equation:

7. Example 2 • Find k and the carrying capacity for the population represented by

8. Logistic Growth Model • The solution to • Is given by • Where A is a constant found using the given initial condition

9. Assignment • Read Section 6.5 (pages 342-346) • Page 347 Exercises #1-15 odd • Read Section 6.6 (pages 350-355)