Firstly I want to put big disclaimer here. This particular problem is a smaller part of my homework. Since even after discussion with my fellow classmates we are not sure how to handle it we decided to post a question here.
Basically we are supposed to simulate spreading of disease.
Every day every infected person will pick random number of people (possible infected candidates) with Poisson distribution where parameter is 5. Everyone of those selected people (=possible infected candidates) will be infected with probability of 1/2 and at the end of the day the infection takes effect. Next day this particular infected person will be also spreading infection and will again pick random number of people (another possible infected candidates) with Poisson distribution where parameter is again 5. Number of possibly infected candidates and event static whether person will be infected or not are both independent on each other.
Let's suppose on the first day there is only one infected person. We should simulate disease spreading for one week. And how many infected persons there will be at the end of 8th day.
Now finally to my question.
Confusing part for me is how are we suppose to determine the number of randomly picked people which represent possible infected candidates since we don't know how many people is there? I assume that with higher number of people the disease should spread faster? I also think that this number of randomly picked possible candidates should be somehow determined by given parameter and also by Poisson distribution itself but I am struggling how to make these things "work" together.