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I know the algorithm to solve the coin change problem for infinite number of denominations but is there any algorithm for finite number of denominations using DP? Any help would be appreciated. Thanks.

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Perhaps you can tell us which "coin change problem" you're talking about. There are several different ones when I google it. – Keith Randall Sep 21 '12 at 18:43
the coin change problem is that there are some coins such as 1, 2, 3, 5 etc. And there are infinite number of them. And i have to make 20 with these coins, and I have to take as minimum as possible. But the problem I am talking about has finite number of coins. – eddard.stark Sep 21 '12 at 18:45
if you use only the base (1,2,3,5) you could implement a greedy algorithm (more efficient) as this base is canonical – Kwariz Sep 21 '12 at 18:56
up vote 5 down vote accepted

Yes. Modify the initial algorithm such that, when it's about to add a coin that would exceed the number of available coins of that denomination, it doesn't, instead. Then it will only print the valid combos.

Another, more simple way is: run the algorithm without bounds, then filter the output based on what combinations are invalid. Thinking of it this way makes it really obvious that the problem is indeed solvable.

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