# algorithm to find minimum number of coins for coin change?

I want to know what is the least complexity in big O of an algorithm which finds out a coin change ...i.e. the best approach that gives you change of every possible amount while you are given with a coin set where a coin may have any whole number value...I need the minimum number of coins(Optimality factor)

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Do you have any code that you are currently working with? –  Trickfire Jul 3 '12 at 20:13
Sounds like homework. Usually homework questions here get the best response when the question shows some effort at arriving at a solution. –  hatchet Jul 3 '12 at 20:15
My instinct says O(n) for an n sized coin set. I have code, I'm just waiting to see if you have done anything for yourself. –  Trickfire Jul 3 '12 at 20:26
As far as I know ,the solution exists only via dynamic programming whose complexity is O(2^n) which is exponential.I am searching for something better,in fact I have made an algorithm who does it in O(n^3) which under testing..wondering if someone else has a better solution –  Wakko Jul 4 '12 at 2:12
@Trickfire you were right that will give me a coin change but not the change having the minimum number of coins-perhaps it was my mistake I couldn't explain my problem –  Wakko Jul 4 '12 at 10:12

``````take in array of coins.
sort by value. AND reverse it.
for{int i=coinArray.length-1; i>=0; i--] {
coinArray[i].number = Math.floor(change / coinArray[i].value)
change = change % coinArray[i]
if(change == 0)
return
}
``````

Coin object needs to have a value (how much it's worth) and a number (number of this coin included in the change, which should default to zero). Could also have a name if you want.

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Actually the approach you followed seems greedy and it might not work in some cases –  Wakko Jul 4 '12 at 2:15
im just a greedy person –  TMP Jul 4 '12 at 5:53
Here is your array of sorted coins-3-10-12-17-31 and I want a change for 30.Your code fails if you apply it to this situation. Moral:Greed is curse –  Wakko Jul 4 '12 at 10:21
@WesleyKhan: If your monetary system doesn't hold together then no algorithm is going to be able to solve it. You may as well have asked for change for 4. Perhaps a more interesting flaw would have been the assumption that coins are whole numbers. We've certainly had 1/2 unit coins in the past... –  forsvarir Jul 4 '12 at 14:42
sorry i forgot to write that it needs to be from largest to smallest. that way it will work –  TMP Jul 4 '12 at 15:37