Suppose a population of 160 crickets doubles in size every month. The function gives the population after x months. How many crickets will there be after 2 years? (1 point) Responses 2,684,354,560 crickets 2,684,354,560 crickets 640 crickets 640 crickets 7,680 crickets 7,680 crickets 655,360 crickets 655,360 crickets
After 2 years, there are 24 months.
Given that the population doubles every month, we can use the formula P = P0 * (2^x), where P is the final population, P0 is the initial population, and x is the number of months.
In this case, P0 = 160 (initial population), x = 24 (number of months), and we need to find P (final population).
Plugging in these values into the formula, we get P = 160 * (2^24) = 2,684,354,560 crickets.
Therefore, the correct answer is 2,684,354,560 crickets.