The input to this problem is a set of n gems. Each gem has a value in $ and is either a ruby or an emerald. Let the sum of the values of the gems be L. The problem is to determine if it is possible to partition of the gems into two parts P and Q, such that each part has the same value, the number of rubies in P is equal to the number of rubies in Q, and the number of emeralds in P is equal to the number of emeralds in Q. Note that a partition means that every gem must be in exactly one of P or Q. You algorithm should run in time polynomial in n + L.
This is the problem.I suppose to solve it using dynamic programming but i simply can't do it.I think i understand dynamic programming at a basic level, but this problem got so frustrating.
How could i approach this?