# Select a random N elements from List<T> in C#

I need a quick algorithm to select a random 5 elements from a generic list. For example, I'd like to get a random 5 elements from a List.

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By Random, do you mean Inclusive or Exclusive? IOW, can the same element be picked more than once? (truly random) Or once an element is picked, should it be no longer pickable from the available pool? –  Pretzel Mar 18 '10 at 20:47

Iterate through and for each element make the probability of selection = (number needed)/(number left)

So if you had 40 items, the first would have a 5/40 chance of being selected. If it is, the next has a 4/39 chance, otherwise it has a 5/39 chance. By the time you get to the end you will have your 5 items, and often you'll have all of them before that.

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I feel this is subtlely wrong. It seems like the back end of the list will get picked more often than the front end as the back end will see much larger probabilities. For example, if the first 35 numbers do not get picked, the last 5 numbers have to get picked. The first number will only ever see a 5/40 chance, but that last number will see 1/1 more often than 5/40 times. You will have to randomize the list first before you implement this algorithm. –  Ankur Goel Feb 22 '10 at 22:52
ok, I ran this algorithm 10 million times on a list of 40 elements, each with a 5/40 (.125) shot at getting selected, and then ran that simulation several times. It turns out that this is not evenly distributed. Elements 16 thru 22 get underselected (16 = .123, 17 = .124), while element 34 gets overselected (34 =.129). Elements 39 and 40 also get underselected but not by as much (39 = .1247, 40 = .1246) –  Ankur Goel Feb 22 '10 at 23:21
@Ankur: I don't believe that's statistically significant. I believe there is an inductive proof that this will provide an even distribution. –  recursive Feb 23 '10 at 20:03
I've repeated the same trial 100 million times, and in my trial the least chosen item was chosen less than 0.106% less frequently than the most frequently chosen item. –  recursive Feb 23 '10 at 21:04
@recursive: The proof is almost trivial. We know how to select K items out of K for any K and how to select 0 items out of N for any N. Assume we know a method to uniformly select K or K-1 items out of N-1 >= K; then we can select K items out of N by selecting the first item with probability K/N and then using the known method to select the still needed K or K-1 items out of the remaining N-1. –  Ilmari Karonen Mar 7 '12 at 19:03

Using linq:

``````YourList.OrderBy(x => rnd.Next()).Take(5)
``````
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+1 But if two elements gets the same number from rnd.Next() or similar then the first will be selected and the second will possibly not (if no more elements is needed). It is properly random enough depending on usage, though. –  Lasse Espeholt Jul 20 '10 at 9:37
I think the order by is O(n log(n)), so I would choose this solution if code simplicity is the main concern (i.e. with small lists). –  Guido García Jun 8 '11 at 18:44
But doesn't this enumerate and sort the whole list? Unless, by "quick", OP meant "easy", not "performant"... –  drzaus Jun 21 '13 at 20:28

This is actually a harder problem than it sounds like, mainly because many mathematically-correct solutions will fail to actually allow you to hit all the possibilities (more on this below).

First, here are some easy-to-implement, correct-if-you-have-a-truly-random-number generator:

(0) Kyle's answer, which is O(n).

(1) Generate a list of n pairs [(0, rand), (1, rand), (2, rand), ...], sort them by the second coordinate, and use the first k (for you, k=5) indices to get your random subset. I think this is easy to implement, although it is O(n log n) time.

(2) Init an empty list s = [] that will grow to be the indices of k random elements. Choose a number r in {0, 1, 2, ..., n-1} at random, r = rand % n, and add this to s. Next take r = rand % (n-1) and stick in s; add to r the # elements less than it in s to avoid collisions. Next take r = rand % (n-2), and do the same thing, etc. until you have k distinct elements in s. This has worst-case running time O(k^2). So for k << n, this can be faster. If you keep s sorted and track which contiguous intervals it has, you can implement it in O(k log k), but it's more work.

@Kyle - you're right, on second thought I agree with your answer. I hastily read it at first, and mistakenly thought you were indicating to sequentially choose each element with fixed probability k/n, which would have been wrong - but your adaptive approach appears correct to me. Sorry about that.

Ok, and now for the kicker: asymptotically (for fixed k, n growing), there are n^k/k! choices of k element subset out of n elements [this is an approximation of (n choose k)]. If n is large, and k is not very small, then these numbers are huge. The best cycle length you can hope for in any standard 32 bit random number generator is 2^32 = 256^4. So if we have a list of 1000 elements, and we want to choose 5 at random, there's no way a standard random number generator will hit all the possibilities. However, as long as you're ok with a choice that works fine for smaller sets, and always "looks" random, then these algorithms should be ok.

Addendum: After writing this, I realized that it's tricky to implement idea (2) correctly, so I wanted to clarify this answer. To get O(k log k) time, you need an array-like structure that supports O(log m) searches and inserts - a balanced binary tree can do this. Using such a structure to build up an array called s, here is some pseudopython:

``````# Returns a container s with k distinct random numbers from {0, 1, ..., n-1}
def ChooseRandomSubset(n, k):
for i in range(k):
r = UniformRandom(0, n-i)                 # May be 0, must be < n-i
q = s.FirstIndexSuchThat( s[q] - q > r )  # This is the search.
s.InsertInOrder(q ? r + q : r + len(s))   # Inserts right before q.
return s
``````

I suggest running through a few sample cases to see how this efficiently implements the above English explanation.

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for (1) you can shuffle a list faster than sorting is, for (2) you will be biasing your distribution by using % –  jk. Jan 27 '10 at 13:39
you are not getting enough credit for this awesome answer –  Korijn Mar 25 '13 at 8:59
Given the objection you raised about the cycle length of a rng, is there any way we can construct an algorithm that will choose all sets with equal probability? –  Jonah Jul 11 '13 at 17:19

I think the selected answer is correct and pretty sweet. I implemented it differently though, as I also wanted the result in random order.

``````    static IEnumerable<SomeType> PickSomeInRandomOrder<SomeType>(
IEnumerable<SomeType> someTypes,
int maxCount)
{
Random random = new Random(DateTime.Now.Millisecond);

Dictionary<double, SomeType> randomSortTable = new Dictionary<double,SomeType>();

foreach(SomeType someType in someTypes)
randomSortTable[random.NextDouble()] = someType;

return randomSortTable.OrderBy(KVP => KVP.Key).Take(maxCount).Select(KVP => KVP.Value);
}
``````
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AWESOME! Really helped me out! –  Armstrongest Mar 25 '09 at 23:45
Do you have any reason not to use new Random() which is based on Environment.TickCount vs. DateTime.Now.Millisecond? –  Lasse Espeholt Jul 20 '10 at 9:28
No, just wasn't aware that default existed. –  Frank Schwieterman Jul 20 '10 at 15:37
An inprovement of the randomSortTable: randomSortTable = someTypes.ToDictionary(x => random.NextDouble(), y => y); Saves the foreach loop. –  Keltex Aug 12 '10 at 17:01
OK a year late but... Doesn't this pan out to @ersin's rather shorter answer, and won't it fail if you get a repeated random number (Where Ersin's will have a bias towards the first item of a repeated pair) –  Andiih Sep 8 '11 at 9:53

From Dragons in the Algorithm, an interpretation in C#:

``````int k = 10; // items to select
var items = new List<int>(new[] { 1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12 });
var selected = new List<int>();
var needed = k;
var available = items.Count;
var rand = new Random();
while (selected.Count < k) {
if( rand.NextDouble() < needed / available ) {
needed--;
}
available--;
}
``````

This algorithm will select unique indicies of the items list.

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Only get enough item in the list, but not get randomly. –  culithay Mar 1 '12 at 7:47

I just ran into this problem, and some more google searching brought me to the problem of randomly shuffling a list: http://en.wikipedia.org/wiki/Fisher-Yates_shuffle

To completely randomly shuffle your list (in place) you do this:

To shuffle an array a of n elements (indices 0..n-1):

``````  for i from n − 1 downto 1 do
j ← random integer with 0 ≤ j ≤ i
exchange a[j] and a[i]
``````

If you only need the first 5 elements, then instead of running i all the way from n-1 to 1, you only need to run it to n-5 (ie: n-5)

Lets say you need k items,

This becomes:

``````  for (i = n − 1; i >= n-k; i--)
{
j = random integer with 0 ≤ j ≤ i
exchange a[j] and a[i]
}
``````

Each item that is selected is swapped toward the end of the array, so the k elements selected are the last k elements of the array.

This takes time O(k), where k is the number of randomly selected elements you need.

Further, if you don't want to modify your initial list, you can write down all your swaps in a temporary list, reverse that list, and apply them again, thus performing the inverse set of swaps and returning you your initial list without changing the O(k) running time.

Finally, for the real stickler, if (n == k), you should stop at 1, not n-k, as the randomly chosen integer will always be 0.

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``````public static List<T> GetRandomElements<T>(this IEnumerable<T> list, int elementsCount)
{
return list.OrderBy(arg => Guid.NewGuid()).Take(elementsCount).ToList();
}
``````
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You can use this but the ordering will happen on client side

`````` .AsEnumerable().OrderBy(n => Guid.NewGuid()).Take(5);
``````
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Agreed. It might not be the best performing or the most random, but for the vast majority of people this will be good enough. –  Richiban Feb 6 at 17:45

The simple solution I use (probably not good for large lists): Copy the list into temporary list, then in loop randomly select Item from temp list and put it in selected items list while removing it form temp list (so it can't be reselected).

Example:

``````List<Object> temp = OriginalList.ToList();
List<Object> selectedItems = new List<Object>();
Random rnd = new Random();
Object o;
int i = 0;
while (i < NumberOfSelectedItems)
{
o = temp[rnd.Next(temp.Count)];
temp.Remove(o);
i++;
}
``````
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Very nice source code. Thank you. –  culithay Mar 1 '12 at 8:37

Was thinking about comment by @JohnShedletsky on the accepted answer regarding (paraphrase):

you should be able to to this in O(subset.Length), rather than O(originalList.Length)

Basically, you should be able to generate `subset` random indices and then pluck them from the original list.

## The Method

``````public static class EnumerableExtensions {

public static Random randomizer = new Random(); // you'd ideally be able to replace this with whatever makes you comfortable

public static IEnumerable<T> GetRandom<T>(this IEnumerable<T> list, int numItems) {
return (list as T[] ?? list.ToArray()).GetRandom(numItems);

// because ReSharper whined about duplicate enumeration...
/*
*/
}

// just because the parentheses were getting confusing
public static IEnumerable<T> GetRandom<T>(this T[] list, int numItems) {
var items = new HashSet<T>(); // don't want to add the same item twice; otherwise use a list
while (numItems > 0 )
// if we successfully added it, move on

return items;
}

// and because it's really fun; note -- you may get repetition
public static IEnumerable<T> PluckRandomly<T>(this IEnumerable<T> list) {
while( true )
yield return list.ElementAt(randomizer.Next(list.Count()));
}

}
``````

If you wanted to be even more efficient, you would probably use a `HashSet` of the indices, not the actual list elements (in case you've got complex types or expensive comparisons);

## The Unit Test

And to make sure we don't have any collisions, etc.

``````[TestClass]
public class RandomizingTests : UnitTestBase {
[TestMethod]
public void GetRandomFromList() {
this.testGetRandomFromList((list, num) => list.GetRandom(num));
}

[TestMethod]
public void PluckRandomly() {
this.testGetRandomFromList((list, num) => list.PluckRandomly().Take(num), requireDistinct:false);
}

private void testGetRandomFromList(Func<IEnumerable<int>, int, IEnumerable<int>> methodToGetRandomItems, int numToTake = 10, int repetitions = 100000, bool requireDistinct = true) {
var items = Enumerable.Range(0, 100);
IEnumerable<int> randomItems = null;

while( repetitions-- > 0 ) {
randomItems = methodToGetRandomItems(items, numToTake);
Assert.AreEqual(numToTake, randomItems.Count(),
"Did not get expected number of items {0}; failed at {1} repetition--", numToTake, repetitions);
if(requireDistinct) Assert.AreEqual(numToTake, randomItems.Distinct().Count(),
"Collisions (non-unique values) found, failed at {0} repetition--", repetitions);
Assert.IsTrue(randomItems.All(o => items.Contains(o)),
"Some unknown values found; failed at {0} repetition--", repetitions);
}
}
}
``````
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why not something like this:

`````` Dim ar As New ArrayList
Dim numToGet As Integer = 5
'hard code just to test

Dim randomListOfProductIds As New ArrayList

Dim toAdd As String = ""
For i = 0 To numToGet - 1
toAdd = ar(CInt((ar.Count - 1) * Rnd()))

'remove from id list

Next
'sorry i'm lazy and have to write vb at work :( and didn't feel like converting to c#
``````
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It is a lot harder than one would think. See the great Article "Shuffling" from Jeff.

I did write a very short article on that subject including C# code:
Return random subset of N elements of a given array

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Selecting N random items from a group shouldn't have anything to do with order! Randomness is about unpredictability and not about shuffling positions in a group. All the answers that deal with some kinda ordering is bound to be less efficient than the ones that do not. Since efficiency is the key here, I will post something that doesn't change the order of items too much.

1) If you need true random values which means there is no restriction on which elements to choose from (ie, once chosen item can be reselected):

``````public static List<T> GetTrueRandom<T>(this IList<T> source, int count,
bool throwArgumentOutOfRangeException = true)
{
if (throwArgumentOutOfRangeException && count > source.Count)
throw new ArgumentOutOfRangeException();

var randoms = new List<T>(count);
return randoms;
}
``````

If you set the exception flag off, then you can choose random items any number of times.

If you have { 1, 2, 3, 4 }, then it can give { 1, 4, 4 }, { 1, 4, 3 } etc for 3 items or even { 1, 4, 3, 2, 4 } for 5 items!

This should be pretty fast, as it has nothing to check.

2) If you need individual members from the group with no repetition, then I would rely on a dictionary (as many have pointed out already).

``````public static List<T> GetDistinctRandom<T>(this IList<T> source, int count)
{
if (count > source.Count)
throw new ArgumentOutOfRangeException();

if (count == source.Count)
return new List<T>(source);

var sourceDict = source.ToIndexedDictionary();

if (count > source.Count / 2)
{
while (sourceDict.Count > count)
sourceDict.Remove(source.GetRandomIndex());

return sourceDict.Select(kvp => kvp.Value).ToList();
}

var randomDict = new Dictionary<int, T>(count);
while (randomDict.Count < count)
{
int key = source.GetRandomIndex();
if (!randomDict.ContainsKey(key))
}

return randomDict.Select(kvp => kvp.Value).ToList();
}
``````

The code is a bit lengthier than other dictionary approaches here because I'm not only adding, but also removing from list, so its kinda two loops. You can see here that I have not reordered anything at all when `count` becomes equal to `source.Count`. That's because I believe randomness should be in the returned set as a whole. I mean if you want 5 random items from `1, 2, 3, 4, 5`, it shouldn't matter if its `1, 3, 4, 2, 5` or `1, 2, 3, 4, 5`, but if you need 4 items from the same set, then it should unpredictably yield in `1, 2, 3, 4`, `1, 3, 5, 2`, `2, 3, 5, 4` etc. Secondly, when the count of random items to be returned is more than half of the original group, then its easier to remove `source.Count - count` items from the group than adding `count` items. For performance reasons I have used `source` instead of `sourceDict` to get then random index in the remove method.

So if you have { 1, 2, 3, 4 }, this can end up in { 1, 2, 3 }, { 3, 4, 1 } etc for 3 items.

3) If you need truly distinct random values from your group by taking into account the duplicates in the original group, then you may use the same approach as above, but a `HashSet` will be lighter than a dictionary.

``````public static List<T> GetTrueDistinctRandom<T>(this IList<T> source, int count,
bool throwArgumentOutOfRangeException = true)
{
if (count > source.Count)
throw new ArgumentOutOfRangeException();

var set = new HashSet<T>(source);

if (throwArgumentOutOfRangeException && count > set.Count)
throw new ArgumentOutOfRangeException();

List<T> list = hash.ToList();

if (count >= set.Count)
return list;

if (count > set.Count / 2)
{
while (set.Count > count)
set.Remove(list.GetRandom());

return set.ToList();
}

var randoms = new HashSet<T>();
return randoms.ToList();
}
``````

The `randoms` variable is made a `HashSet` to avoid duplicates being added in the rarest of rarest cases where `Random.Next` can yield the same value, especially when input list is small.

So { 1, 2, 2, 4 } => 3 random items => { 1, 2, 4 } and never { 1, 2, 2}

{ 1, 2, 2, 4 } => 4 random items => exception!! or { 1, 2, 4 } depending on the flag set.

Some of the extension methods I have used:

``````static Random rnd = new Random();
public static int GetRandomIndex<T>(this ICollection<T> source)
{
return rnd.Next(source.Count);
}

public static T GetRandom<T>(this IList<T> source)
{
return source[source.GetRandomIndex()];
}

static void AddRandomly<T>(this ICollection<T> toCol, IList<T> fromList, int count)
{
while (toCol.Count < count)
}

public static Dictionary<int, T> ToIndexedDictionary<T>(this IEnumerable<T> lst)
{
return lst.ToIndexedDictionary(t => t);
}

public static Dictionary<int, T> ToIndexedDictionary<S, T>(this IEnumerable<S> lst,
Func<S, T> valueSelector)
{
int index = -1;
return lst.ToDictionary(t => ++index, valueSelector);
}
``````

If its all about performance with tens of 1000s of items in the list having to be iterated 10000 times, then you may want to have faster random class than `System.Random`, but I don't think that's a big deal considering the latter most probably is never a bottleneck, its quite fast enough..

Edit: If you need to re-arrange order of returned items as well, then there's nothing that can beat dhakim's Fisher-Yates approach - short, sweet and simple..

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Based on Kyle's answer, here's my c# implementation.

``````/// <summary>
/// Picks random selection of available game ID's
/// </summary>
private static List<int> GetRandomGameIDs(int count)
{
var totalGameIDs = gameIDs.Count();
if (count > totalGameIDs) count = totalGameIDs;

var rnd = new Random();
var leftToPick = count;
var itemsLeft = totalGameIDs;
var arrPickIndex = 0;
var returnIDs = new List<int>();
while (leftToPick > 0)
{
if (rnd.Next(0, itemsLeft) < leftToPick)
{
leftToPick--;
}
arrPickIndex++;
itemsLeft--;
}

return returnIDs ;
}
``````
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This is the best I could come up with on a first cut:

``````public List<String> getRandomItemsFromList(int returnCount, List<String> list)
{
List<String> returnList = new List<String>();
Dictionary<int, int> randoms = new Dictionary<int, int>();

while (randoms.Count != returnCount)
{
//generate new random between one and total list count
int randomInt = new Random().Next(list.Count);

// store this in dictionary to ensure uniqueness
try
{
}
catch (ArgumentException aex)
{
Console.Write(aex.Message);
} //we can assume this element exists in the dictonary already

//check for randoms length and then iterate through the original list
//adding items we select via random to the return list
if (randoms.Count == returnCount)
{
foreach (int key in randoms.Keys)

break; //break out of _while_ loop
}
}

return returnList;
}
``````

Using a list of randoms within a range of 1 - total list count and then simply pulling those items in the list seemed to be the best way, but using the Dictionary to ensure uniqueness is something I'm still mulling over.

Also note I used a string list, replace as needed.

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I recently did this on my project using an idea similar to Tyler's point 1.
I was loading a bunch of questions and selecting five at random. Sorting was achieved using an IComparer.
aAll questions were loaded in the a QuestionSorter list, which was then sorted using the List's Sort function and the first k elements where selected.

``````    private class QuestionSorter : IComparable<QuestionSorter>
{
public double SortingKey
{
get;
set;
}

public Question QuestionObject
{
get;
set;
}

public QuestionSorter(Question q)
{
this.SortingKey = RandomNumberGenerator.RandomDouble;
this.QuestionObject = q;
}

public int CompareTo(QuestionSorter other)
{
if (this.SortingKey < other.SortingKey)
{
return -1;
}
else if (this.SortingKey > other.SortingKey)
{
return 1;
}
else
{
return 0;
}
}
}
``````

Usage:

``````	List<QuestionSorter> unsortedQuestions = new List<QuestionSorter>();

unsortedQuestions.Sort(unsortedQuestions as IComparer<QuestionSorter>);

// select the first k elements
``````
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Here's my approach (full text here http://krkadev.blogspot.com/2010/08/random-numbers-without-repetition.html ).

It should run in O(K) instead of O(N), where K is the number of wanted elements and N is the size of the list to choose from:

``````public <T> List<T> take(List<T> source, int k) {
int n = source.size();
if (k > n) {
throw new IllegalStateException(
"Can not take " + k +
" elements from a list with " + n +
" elements");
}
List<T> result = new ArrayList<T>(k);
Map<Integer,Integer> used = new HashMap<Integer,Integer>();
int metric = 0;
for (int i = 0; i < k; i++) {
int off = random.nextInt(n - i);
while (true) {
metric++;
Integer redirect = used.put(off, n - i - 1);
if (redirect == null) {
break;
}
off = redirect;
}
}
assert metric <= 2*k;
return result;
}
``````
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This isn't as elegant or efficient as the accepted solution, but it's quick to write up. First, permute the array randomly, then select the first K elements. In python,

``````import numpy

N = 20
K = 5

idx = np.arange(N)
numpy.random.shuffle(idx)

print idx[:K]
``````
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