I am interested in the knappsack problem and I want to solve it with a branch and bound algorithm.

I know that the upper bound can be calculated by sorting the items 1..n descending by value/weight ratio, finding the break item s (the first item that does not fit completely in the knapsack) and calculating the following:

(C is the capacity of the Knappsack,w(j) the weight of item j)

(Calculating the fraction of s that still fits in the knappsack)

(Sum up all values from the first s-1 items and add a fraction of the value of s)

However, what I don't understand is why we can round down the second part of the third equation still holding our upper bound.

I hope that someone would give me a hint, an explanation or some literature reference explaining that.