We are given $m$ balls and $n$ bins, with $m\gg n$. Each bin has the same capacity integer value $c$, i.e. it can contain at most $c$ balls (we assume that $c$ is an even integer). In a sequential fashion, at each time step, one ball is placed into one bin selected independently and uniformly at random from the set of ***non-full*** bins remained (i.e. the ones containing less than $c$ balls). 

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**Question**: Given an integer $n'\in [n]$, what is the *minimum* number of balls that it is necessary to place into bins in such a way that the expected number of bins containing more than $\frac{c}{2}$ balls is equal to at least $n'$?

What if $n'=1$?