A population of snakes has a geometric growth rate of 1.04 and an initial population size of 250. What will be the size of the population 10 years from now ?
To find out the size of the population 10 years from now, we can use the formula for geometric growth:
Population size = Initial population size * (Geometric growth rate)^(Number of time periods)
Using the provided information, the initial population size is 250 and the geometric growth rate is 1.04. We want to find the population size after 10 years, so the number of time periods is 10.
Substituting these values into the formula, we get:
Population size = 250 * (1.04)^10
Calculating this expression:
Population size = 250 * 1.48835
Population size ≈ 372.09
Therefore, the size of the snake population 10 years from now will be approximately 372 individuals.