# How to divide an integer n <= 12 to an array of 12 elements so that I could divide this array to as equal as possbile periods

I'm trying to divide an integer N <= 12, which is a number of work days, to 12 months, so that if I divide 12 months into periods of 1, 2, 3, 4 or 6 months, the number of days in these periods should be as equal as possible.

For example:

If N = 6, the array should look like this :

`1 0 1 0 1 0 1 0 1 0 1 0` or `0 1 0 1 0 1 0 1 0 1 0`

N = 4

`1 0 0 1 0 0 1 0 0 1 0 0`

N = 3

`1 0 0 1 0 0 1 0 0 0 0 0`

N = 2

`1 0 0 0 0 0 1 0 0 0 0 0`

edit:

what I mean by "as equal as possible" is that when I divide this array into periods, the number of work days in these periods shouldn't differ by more than 1.

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What do you mean by "as equal as possible": the length of the intervals should differ by no more that 1, or as many as possible are the same length, or something else? –  huon-dbaupp Oct 22 '12 at 20:21
Can `N` go beyond 12? what about prime number values like 5? –  Ankush Oct 22 '12 at 20:24
@Ankush 1 <= N <= 12, any number in this interval. –  Marijus Oct 22 '12 at 20:25
and what about N = 5? How will you divide this? –  Ankush Oct 22 '12 at 20:26
isn't N = 3 wrong? It should be 1 0 0 0 1 0 0 0 1 0 0 0 ?? –  Ankush Oct 22 '12 at 20:55

EDIT -- Improved for the general case, assumed you were only asking for 1,2,3,4,6 as in question!

What you want is to modulate N by a given period. (My terminology is likely entirely wrong :D Should probably go read up on my high school physics again!)

Have some Ruby..

``````def spread_it(n)
d = 12.0 / n
(0..11).map do |index|
(12.0 - (index % d) > 11.0) ? '1' : '0'
end
end

(1..12).each do |n|
end
``````

Output is:

``````N=1 - ["1", "0", "0", "0", "0", "0", "0", "0", "0", "0", "0", "0"]
N=2 - ["1", "0", "0", "0", "0", "0", "1", "0", "0", "0", "0", "0"]
N=3 - ["1", "0", "0", "0", "1", "0", "0", "0", "1", "0", "0", "0"]
N=4 - ["1", "0", "0", "1", "0", "0", "1", "0", "0", "1", "0", "0"]
N=5 - ["1", "0", "0", "1", "0", "1", "0", "0", "1", "0", "1", "0"]
N=6 - ["1", "0", "1", "0", "1", "0", "1", "0", "1", "0", "1", "0"]
N=7 - ["1", "0", "1", "0", "1", "0", "1", "1", "0", "1", "0", "1"]
N=8 - ["1", "0", "1", "1", "0", "1", "1", "0", "1", "1", "0", "1"]
N=9 - ["1", "0", "1", "1", "1", "0", "1", "1", "1", "0", "1", "1"]
N=10 - ["1", "0", "1", "1", "1", "1", "1", "0", "1", "1", "1", "1"]
N=11 - ["1", "0", "1", "1", "1", "1", "1", "1", "1", "1", "1", "1"]
N=12 - ["1", "1", "1", "1", "1", "1", "1", "1", "1", "1", "1", "1"]
``````

Better now? :)

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What about `N=5,7,8,...,11`? –  huon-dbaupp Oct 22 '12 at 20:38
updated, thanks :) –  Kei Oct 22 '12 at 21:23
@Kevin hey, could you please explain what d = 12.0 / n is ? And how does this (12.0 - (index % d) > 11.0) line work ? –  Marijus Nov 8 '12 at 18:07
@Kevin ? Could you please explain ? This is very important ! –  Marijus Nov 13 '12 at 16:46
Hey! sure. d is the interval length, it's the average length of each chunk if you need n pieces. `(12 - (index % d) > 11.0)` is specific arithmetic which assumes there are 12 months. Sorry, I wrote it really late at night but it should be simplified to `(index % d < 1) ? '1' : '0'` which is basically just checking to see if the index is a multiple (within limits, e.g. 3 % 2.4 = 0.6 which is basically 'close enough to being a multiple' for this purpose) of the interval length, then return a `'1'`, else `'0'`. The 0th index is always true aslong as 0 < n <= 12 at least.. –  Kei Nov 14 '12 at 9:42

The average length of each interval is `12/N` (in mathematical terms, not integer division). To enforce the differ-by-one rule, the only options are `ceil(12/N)` ("long") and `floor(12/N)` ("short"). The number of each required is `12 % N` and `N - (12 % N)`. i.e. in Python

``````def allocate_intervals(N):
short = 12 // N # integer division
long = short + 1

# lists of [1,0, ..., 0] lists
short_intervals = [[1] + [0] * (short - 1)] * (N - (12 % N))
long_intervals =  [[1] + [0] * (long - 1)] * (12 % N)

# concatenate to get [1, 0, ..., 1, 0, ...]
return sum(short_intervals + long_intervals, [])
``````

The above code creates the appropriate number of each interval and then concatenates.

(This method is fully general, one can replace the `12`s by any positive integer.)

A slightly different implementation of the above in C/C++ etc.

``````// array is [0, 0, ..., 0] with 12 elements. It is modified in-place.
void allocate_intervals(int N, int array[12]) {
// length of each interval
int len_short = 12 / N, len_long = len_short + 1;

// number of each interval
int num_long = 12 % N, num_short = N - num_long;

int step = 0;
for (int i = 0; i < num_long; i++) {
array[step] = 1;
step += len_long;
}
for (int i = 0; i < num_short; i++) {
array[step] = 1;
step += len_short;
}
}
``````
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Could you perhaps rewrite your code in pseudo-code or C++ or even comment all steps you do here, because I have very hard time understanding this code as I don't really know python. Thank you a lot anyway. –  Marijus Oct 22 '12 at 22:12
@Marijus, done. –  huon-dbaupp Oct 23 '12 at 11:12
whats the difference between short and long intervals ? –  Marijus Oct 23 '12 at 21:39
One is longer than the other. –  huon-dbaupp Oct 24 '12 at 6:57
could you explain how do you know the number of these intervals length and numbers of both intervals required ? –  Marijus Nov 7 '12 at 15:53

If all what are you having is an array of 12 elements, then you can use brute-force recursive backtracking:

``````Arr = [ ] // holds best solution
tempArr = [ ] // temproray

function rec( i, n )
if n == 0
return
if i == Arr.length
checkBest(Arr, tempArr) // copies tempArr to Arr if it is better solution
return
tempArr[i] = 1
rec(i + 1, n - 1)
tempArr[i] = 0
rec(i + 1, n)
``````

Usage: rec(0, 1234)

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The idea is `int n = 12 / N` gives the period.

Updated code. This will work for all cases from 1 to 12. Cases beyond 6 use symmetry property to avoid continuous 1's

``````public int[] Splitter(int N, int max) // max = 12 for above problem.
{
if (max < 1 || N < 1 || N > max)
{
throw new ArgumentException();
}

if (N != max && N > max / 2)
{
return Splitter(max - N, max).Select(s => s == 1 ? 0 : 1).ToArray();
}

int[] a = new int[max];
int n = max / N;
int count = 0;

for (int i = 0; i < max; i++)
{
if (i % n == 0 && count < N)
{
a[i] = 1;
count++;
}
else
{
a[i] = 0;
}
}

return a;
}
``````

old code:

``````int n = 12 / N;
for(int i = 0; i < 12; i++)
{
if (i % n == 0)
{
a[i] = 1;
}
else
{
a[i] = 0;
}
}
``````
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This doesn't work. The lengths of the intervals can differ by more than 1. –  huon-dbaupp Oct 22 '12 at 20:32
@dbaupp - Seems to me like it works. Do you have an example where it doesn't work? –  mbeckish Oct 22 '12 at 20:37
@mbeckish, 5, 7, 8, ..., 11. –  huon-dbaupp Oct 22 '12 at 20:39
@Ankush - You just need to modify this to stop adding 1's after N is reached. –  mbeckish Oct 22 '12 at 20:41
@mbeckish, still doesn't work. The last interval is too long. –  huon-dbaupp Oct 22 '12 at 20:42
``````def alloc(N, length=12):

result = zeros(length) # preinitialise an array with zeros

short_gap = length // N # where // is integer division
long_gap = short_gap + 1

change_over_index = (N - (length % N)) * (length // N)

result[0:change_over_index:short_gap] = 1
result[change_over_index:length:long_gap] = 1
# above two lines of code is called slicing. arr[x:y:z] = 1 means:
# set all indexes from x to y by increments of z to be 1... eg.
# for (int i = x; i < y; i += z) arr[i] = 1;

return result
``````
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