Final answer:
To find the average rate of change, initial value, and population at a specific time for the given population of rabbits, we can use the provided function. We can also determine when the population will reach a certain value.
Step-by-step explanation:
To create a graph of the function, we need to plot various points on the graph. We can choose different values of t within the given domain and calculate the corresponding values of R(t). For example, when t = 0, we have R(0) = 100(2(0)/5) = 0. When t = 1, we have R(1) = 100(2(1)/5) = 40. Using this method, we can find points to plot on the graph.
(a) To find ΔR on [1,2], we substitute the values of t into the function. R(1) = 40 and R(2) = 100(2(2)/5) = 80. ΔR is the difference between these values: ΔR = R(2) - R(1) = 80 - 40 = 40.
(b) To find R(0), we substitute t = 0 into the function: R(0) = 100(2(0)/5) = 0.
(c) To find R(10), we substitute t = 10 into the function: R(10) = 100(2(10)/5) = 400.
(d) To find when the population will be 500 rabbits, we set R(t) equal to 500 and solve for t. 500 = 100(2t/5). Dividing both sides by 100 gives us 5 = 2t/5. Multiply both sides by 5 gives us 25 = 2t. Dividing both sides by 2 gives us t = 12.5 months.