@AlmaDo We have the following Knapsack problem (it is like subset sum problem) :
Show that the Knapsack problem (Given a sequence of integers S=i1, i2, ... , in and an integer k, is there a subsequence of S that sums to exactly k?) is NP-complete, using the exact cover problem.
I have shown that the problem is in NP.
Now I have to reduce the exact cover problem to the Knapsack problem.
The exact cover problem is : Given a family of setsb S1,S2, ... , Sn does there exist a set cover consisting of a subfamily of pairwise disjoint sets?