I have the following question out of a book. I even have the solution from solutions manual that I cannot really follow either, so I thought I would ask here to see if someone could dumb it down for me.
Let $Y_!, Y_2, ..., Y_n$ denote a random sample from a Poisson distribution with parameter $\lambda$. Show by conditioning that $\sum_{i=1}^{n}Y_i$ is sufficient for $\lambda$
So that is the question. From the solution I can see that they are using the conditional probability, but from the chapter that this question is from you are taught that you show sufficiency by using the likelihood. So what does it mean by "show by conditioning"? What does the act of conditioning do in this instance? Why would we use conditioning instead of likelihood? Also, just how would you do this question?