# Variation of the cutting stock issue

While researching this problem I found this wikipedia page which seems to describe it but is over my head. I also found a couple SO questions but they were either slightly different or didn't give enough info.

Given an inventory of sizes such as:

6' 5"

10' 4"

4' 4"

9' 2"

If a customer wants a quantity of 5 at a length of 2' 1" each. What algorithm could solve the best way to cut the inventory to what the customer wants and leave the least waste.

For example, I think the optimal answer for the question above would be to cut 3 pieces out of the 6' 5" and 2 pieces out of the 4' 4".

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i'm sorry mike, I don't quite understand the question. Can you provide more context to the problem? –  Kristian Mar 30 '12 at 19:36
This is a variant of the knapsack problem, and is basically NP-complete. There's no 'better' solution other than brute force 'try every variant'. –  Marc B Mar 30 '12 at 19:37
@Marc: "NP-Complete" does not mean "there is no better approach than brute force," as evidenced by the list of solutions given in the wiki article he linked.. –  BlueRaja - Danny Pflughoeft Mar 30 '12 at 19:52
I'm not sure I understand your question. What do you mean by "least waste" ? Is there any criterion for how small a piece should be to qualify as waste ?? ( eg : If i cut a 2.1" from the 10.4", does the remaining 8.3" qualify as waster ?? ) –  arya Mar 31 '12 at 5:21
This isn't a variant - this is the cutting stock problem. If the explanation on the Wikipedia page is over your head, explain which bit you don't understand and we'll attempt to enlighten you - but without knowing that, I don't think anyone here is going to do a better job of explaining than the Wikipedia page does. –  Nick Johnson Mar 31 '12 at 10:32
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