You pack object 1 into a box. For i = 2,...,n object i is put in the first box in which it still fits. If all the the boxes are full, you open a new box.
The maximum that fits into a box is 1. Build for random n an input sequence s1,...,sn on which the output of GREEDY deviates largely from the optimal solution (which is #boxes/2).
Provide a lower bound for the approximation ratio of your input.
I searched 50+ pages on google and still couldn't find an answer please help me if you are familiar with bin-packing. THANKS