Unit 2: Basic Section - a population example

Written by Ines

Monday, 16 February 2009 08:46

The text introduces the idea of using differential equations for calculating population. Of course, population is measured in whole numbers therefore a function would not be continuous, but instead of using the population size as independent variable, we use time, since $\small t \in \mathbb{R}$ .

Also, the input-output principle is mentioned, which relates the chosen variables:

accumulation = input - output.

The example in Section 1.1 ends with the logistic equation $\small \frac{\text{d}P}{\text{d}t} = kP (1 - \frac{P}{M})$ .

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