# Binomial sub arrays

I have an A array with n length. I want to take all possible k (0

for example, if i have A's length is five:

``````[1,2,3,4,5]
``````

and if k = 3, algorithm must give me B array.

``````[1,2,3    ]
[1,2,  4  ]
[1,2,    5]
[1,  3,4  ]
[1,  3,  5]
[1,    4,5]
[  2,3,4  ]
[  2,3,  5]
[  2,  4,5]
[    3,4,5]
``````

Length of B would be equal to `n!/k!(n-k)!` ('!' means factorial, Newtons method)

I'm using javascript, so in my tags i included it, but it's just algorithm, not necessary written in javascript.

-
– Marty McVry Apr 5 '13 at 10:49
Good link .. +1 – Prasath K Apr 5 '13 at 11:01
Possible duplicate - stackoverflow.com/questions/5752002/… – ChrisF Apr 5 '13 at 12:21

Below is the copy-paste from one of my projects. Don't know if it still works ;)

``````var choose = function choose_func(elems, len) {
var result = [];
for (var i=0; i<elems.length; i++) {
if (len == 1) {
result.push([elems[i]]);
} else {
var remainingItems = choose_func(elems.slice(i+1, elems.length), len - 1);
for (var j=0; j<remainingItems.length; j++)
result.push([elems[i]].concat(remainingItems[j]));
}
}
return result;
};

var result = choose([1,2,3,4,5], 3)

/*result  = [[1,2,3],[1,2,4],[1,2,5],[1,3,4],[1,3,5],
[1,4,5],[2,3,4],[2,3,5],[2,4,5],[3,4,5]] */
``````
-
@Downvoter: Care to exlplain? – SuperSaiyan Apr 5 '13 at 11:37
not even fast method, but i have no big data, so it's quite enough for me. thanks – user474470 Apr 5 '13 at 14:22

You could do this via a filter method.

In your example you want to receive all permutations of an array, taking a specific number of elements of that array.

You can easily do that in an iterative manner. Start by taking all permutations of `n - 1` elements of an array:

``````// return all (n - 1) element permutations of an array
var permutations = function(arr) {
return arr.reduce(function(re, value, i) {
// add an array for each element in the original array
return re.concat([arr.filter(function(v, index) {
// drop each element with the same index
return index !== i
})])
}, [])
}
``````

Now `permutations([1,2,3])` would return `[[1,2], [1,3], [2,3]]` That's always a disjoint set suppose you're having only unique values in the source array.

To receive all 3-element arrays of a 5-element array, you would first calculate the list of 4-element arrays and transform each of them to a 3-element array.

``````permutations([1,2,3,4]).map(permutations)
=> [[1,2,3] => [[[1,2], [1,3], [2,3]]
,[1,2,4]    ,[[1,2], [1,4], [2,4]]
,[1,3,4]    ,[[1,3], [1,4], [3,4]]
,[2,3,4]    ,[[2,3], [2,4], [3,4]]
]           ]
``````

Obviously the problem here is that there are doubles. That can be solved by dropping all non-unique values.

``````var unique = function(arr) {
var s = arr.map(function(v) { return "" + v })
return arr.filter(function(v, i) { return s.indexOf("" + v) == i })
}
``````

Packing it all into one function could be done like this:

``````var permutationsWithLength = function(arr, length) {
var re = [arr]
for (var i = arr.length; i >= length; i--) {
re = re.reduce(function(tmp, perms) {
return unique(temp.concat(permutations(perms)))
}, [])
}
return re
}
``````

I admit that this may not be the fastest approach, especially regarding the `unique` function, but it's a very generic one and will work for the problem you described even with larger arrays.

Hope it helps ;)

-