# Evenly Choosing 'X' items from 'Y' Collections of 'Z' Size

I'm creating a display interface of lets say 'products'. For this example lets say the display will show at max 4 products. There are a variable number of sources that the products can came from. The number of sources will never be larger than the number of products to display (at most 4 sources for this example). Each source contains 1 or more products. The goal is to evenly distribute the number of products displayed across the sources.

The logic for 4 products would be handled as follows.

• If there is 1 source, then 4 items will be selected from that source. (4x1)
• If there are 4 sources, then 1 item will be selected from each source. (1x1+1x1+1x1+1x1)
• If there are 2 sources, then 2 items will be selected from each source (2x1+2x1), unless one source only has 1 product, then it will follow as (1x1+3x1)
• If there are 3 sources, then 1 item will be selected from 2 sources and 2 items will be selected from 1 source (2x1+1x1+1x1)

Before I start looping to output products, I have a collection of sources and the count of items in each source.

My question is:

What is the simplest way to loop through each source and output the appropriate amount of products?

Keep in mind that each source may only have 1 product, so it is possible that 4 products cannot be selected.

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Here is simple Python code to select the products.

It works by looping over the sources and adding one product at a time.

This should result in a fair distribution between the sources.

The code could be made much more efficient if you find it is too slow.

``````Z=[1,10,10]       # Number of products available for each source
Y=len(Z)          # Number of sources
X=4               # number of products to output
B=[0]*Y           # Number of products to select for each source

a=0               # Next source to try and take a product from
while sum(B)<min(sum(Z),X):
a=(a+1)%Y     # Change to a different source for the next product
if B[a]<Z[a]: # Check that this source still has products left
B[a]+=1   # Note that we have taken a product from source a

print B
``````

In this example it prints

``````[1, 2, 1]
``````

to signify taking 1 product from the first source, 2 from the second, and 1 from the third.

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Here's a program sample written in C#, which outputs as a proof the sources identified by ID, the number of products available in each source and the selected products (with the source ID attached to each of them):

``````using System.Linq;
using System.Collections.Generic;
using System;

namespace ConsoleApplication1
{
class Product
{
public int Ordinal { get; set; }
public Source Source { get; set; }
public Product(int ordinal)
{
Ordinal = ordinal;
}
}
class Source : List<Product>
{
public int Id { get { return this.GetHashCode(); } }
public int AvailableProducts { get { return this.Count; } }
public Source(int availableProducts)
{
for (int i = 0; i < availableProducts; i++)
{
var p = new Product(i);
p.Source = this;
}
}
}

class Sources : List<Source>
{
}

class Program
{
static void Main(string[] args)
{
var sources = new Sources();
var productsToBeSelected = 4;
var sourceNumber = Math.Min(productsToBeSelected, 4);
var maxProductsPerSource = 5;

for (int i = 0; i < sourceNumber; i++)
{
var source = new Source((new Random(i + Int32.Parse(DateTime.Now.Ticks.ToString().Substring(DateTime.Now.Ticks.ToString().Length - 6)))).Next(maxProductsPerSource));
}

var candidateProducts=new List<Product>();

var selectedProducts = candidateProducts.OrderBy(i => i.Ordinal).Take(productsToBeSelected);

foreach (var item in sources)
{
Console.WriteLine("Source ID: {0}, {1} products",item.Id, item.Count);
}

foreach (var item in selectedProducts)
{
Console.WriteLine("Product ordinal: {0} from source {1}", item.Ordinal , item.Source.Id);
}
}
}
}
``````
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