# Number of ways to partition a number in Python

I have defined a recursive function that takes a number, `n`, and returns a `list` of lists of the numbers that sum to that number (partitions):

``````def P(n):
# base case of recursion: zero is the sum of the empty list
if n == 0:
yield []
return

for p in P(n-1):
p.append(1)
yield p
p.pop()
if p and (len(p) < 2 or p[-2] > p[-1]):
p[-1] += 1
yield p
``````

I was wondering how to make the function return the number of partitions for number `n`.

For example, `P(6)` would return `10`.

-

If you look at the "Partition function formulas" section of the Partiton (number theory) page on Wikipedia, you'll see that there isn't a simple way to find the partition number.

``````sum(1 for _ in P(6))
``````

or, slightly simpler but memory hogging for large numbers

``````len(list(P(6)))
``````

Also note if you want to be able to save the values returned by `P`, you should be `yield`ing `p[:]` not `p` -- you want to make a copy, not yield the same list (which you change) over and over. You can see why if you do `list(P(6))` -- it returns a list of the same empty list repeated over and over.

-

Here's an example in Java for computing your desired result.

``````/**
* Returns the number of ways the number n can be partitioned
* into sums of positive integers larger than k.
* @param k
* @param n
* @return
*/
public static long partition(long k, long n){
long sum = 0;
if(k > n) return 0;
if(k == n) return 1;
sum += partition(k+1, n) + partition(k, n-k);
return sum;
}
``````
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-1 as the OP asked for `python`. So even if the answer may be good, it is on the wrong place. –  bmu Sep 27 '12 at 10:45