Question

A bacteria population is 10,000. It triples each day.

Write a function for the bacteria �(�)f\left(d\right)f(d) where �dd , is the number of days.

Answer 1

The bacteria population growth function given the initial population of 10,000 and tripling each day is f(d) = 10,000 × 3^d.

Step-by-step explanation:

The student is asking for a function that represents the growth of a bacteria population that triples each day, starting with a population of 10,000.

To write this function, we will use an exponential growth model.

The general form of this model is f(d) = P × r^d, where P is the initial population, r is the rate of growth, and d is the number of days.

For our specific example, the initial population is 10,000, and the rate of growth is a tripling each day, so r is 3. The function will, therefore, be:

f(d) = 10,000 × 3^d

This function f(d) will give us the population of the bacteria after d days.