# Creating a new random list from a source list

I am using VB.net 2012 and am wanting to do the following in code:

I have a list of media items that is of length x.
Each item in the list has a duration of y.
I am wanting to create a new random list that has a total duration of z, and the items can only appear once in this new list.

What is the best way to do this? I am not sure if this qualifies as a 'rucksack problem.' Either way, may I please have some help to achieve this, either with pseudo code or actual vb.net code?

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Pseudocode:

``````1. Object Song: properties Name, Duration
2. mlstLibrary = List(Of Song) ... fill mlstLibrary
3. user enters desired playlist duration intPlaylistDuration
4. make a copy of mlstLibrary called mlstLibraryWorking
5. Dim intPlaylistDurationWorking As Integer = 0
6. Dim lstPlaylist As New List(Of Song) ' This is the output playlist
7. Do While mlstLibraryWorking.Count > 0
7a.  Go through mlstLibraryWorking and remove all items that have .Duration > (intPlaylistDuration - intPlaylistDurationWorking)
7b1.  Pick random Song from mlstLibraryWorking
7b2.  Add selected Song to mlstPlaylist
7b3.  intPlaylistDurationWorking += selected Song.Duration
7b4.  Remove selected Song from mlstLibraryWorking
8. Loop
``````
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EDITED: Had the wrong sign (< instead of >) at step 7a. Obviously, you should remove all songs that have a duration greater than the remaining amount of playlist time. –  SSS Dec 4 '12 at 23:44

I might be misunderstanding you, but it seems you have list `l` of pairs `(item,x)` and you want to find a subset of `l` (let it be `l'`) such that `sum(l'.e.item) == z`.

Unfortunately - you are describing the Subset Sum Problem, which is NP-Complete, so there is no known polynomial solution for it.

If the list is fairly small you can use brute force (check all possibility). There is also DP solution that runs in pseudo-polynomial time if the numbers are all integers.
Some alternatives are approximation algorithms or heuristics - such as Genetic Algorithms.

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The numbers are all positive integers. However, I do not want the sum to be 0... I am wanting the sum to be z that is a positive integer. Can the DP solution be used for this situation? –  Garry Dec 4 '12 at 6:19
@user1843680 Though the vlassic subset sum is looking for sum 0, you.can get the variation by adding a "dummy" element too the list with value=-z. It is easy to see that the solution for the original is the same for the sum 0 problem with exception of the extra element. –  amit Dec 4 '12 at 6:34