Population Growth Mystery Unraveled!

How does a population grow according to an exponential growth model?

Choose the correct formula:

a) p = 220 * e^(0.253n)

b) p = 220 * e^(0.235n)

c) p = 220 * e^(0.025n)

d) p = 220 * e^(0.0025n)

The Correct Formula for Exponential Growth Model

The correct formula is p = 220 * e^(0.253n)

An exponential growth model is a mathematical formula that describes the growth of a population exponentially over time. In this case, the initial population is 220, and after one year, the population grows to 276.

The formula for the exponential growth model is given by:

p = 220 * e^(0.253n)

Where p represents the population and n represents the number of years. By substituting the given values, we can calculate the correct formula. In this case, the population grows at a rate of 0.253 per year, leading to a final population of 276 after one year.

Understanding exponential growth is crucial in various fields such as biology, economics, and population studies. It helps predict population trends and plan for the future. By mastering the correct formula, you can unlock the secrets of population growth mysteries!

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