Stack Overflow is a community of 4.7 million programmers, just like you, helping each other.

Join them; it only takes a minute:

Sign up
Join the Stack Overflow community to:
  1. Ask programming questions
  2. Answer and help your peers
  3. Get recognized for your expertise

Possible Duplicate:
Algorithm to find which numbers from a list of size n sum to another number

What is a good algorithm for deciding whether a passed in amount can be built additively from a set of numbers. In my case, I am determining whether a certain currency amount (such as $40) can be met by adding up some combination of a set of bills (such as $5, $10 and $20 bills). That is a simple example, but the algorithm needs to work for the generic case where the bill set can differ over time (due to running out of a bill) or due to bill denominations differing by currency. The problem would apply to a foreign exchange teller at an airport.

So $50 can be met with a set of ($20 and $30), but cannot be met with a set of ($20 and $40).

In addition. If the amount cannot be met with the bill denominations available, how do you determine the closest amounts above and below which can be met?

share|improve this question

marked as duplicate by Josh Mein, Kev Sep 15 '12 at 0:22

This question has been asked before and already has an answer. If those answers do not fully address your question, please ask a new question.

You know - You asked this exact same question twice now.

share|improve this answer
It's not the exact same question. The previous question asked for a non-recursive algorithm for which no good answer was provided. This question removed the non-recursive constraint in order to, hopefully, get some better answers. – Stimy Sep 16 '08 at 18:03

Sum = 100
Bills = (40,30,20,10)

Number of 40's = 100 / 40 = 2 Remainder = 100 % 40 = 20

Number of 30's = 20 / 30 = 0 Remainder = 20 % 30 = 20

Number of 20's = 20 / 20 = 1 Remainder = 20 % 20 = 0

As soon as remainder = 0 you can stop.

If you run out of bills then you can't make it up and need to go to the second part which is how close can you get. This is a minimization problem that can be solved with Linear algebra methods (I'm a little rusty on that)

share|improve this answer
The algorithm as stated does not work for a case such as sum = 60 bills =(40,30). – Stimy Sep 15 '08 at 21:32
Good catch, That'll show me for trying to write code without properly testing. :) – Jason Punyon Sep 17 '08 at 15:55

This seems closely related to the Subset Sum Problem, which is NP-Complete in general.

share|improve this answer

Start with the largest bills and work down. With each denomination, start with the largest number of those bills and work down. You might need fewer of a large denomination because you need multiple smaller ones to hit a value on the head.

share|improve this answer

Not the answer you're looking for? Browse other questions tagged or ask your own question.