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I'm practicing recursion using Java and I've hit a problem. I'm trying to make a method which I'm calling "groups" which takes a number of people and how many groups there are and returns the number of different combinations there are of people and groups. Also, the ordering of people in the groups does not matter, nor does the ordering of the groups.

The code I have so far is:

public long groups(int n, int k) {
    if(k==1) return 1;
    if(k==n) return 1;
    else return groups(n-1, k) + groups(n-1, k-1);
}

However it returns the wrong values. The first two lines are the base cases, which say if there is 1 group, then there is only one way to split the people up, makes sense. The other is when there are just as many people as there are groups, in which case theres only one way to split them up, one person into each group. The last statement is where I think I'm having problems, I would think that each time it does a recursive call, one person has to be taken out (n is the number of people, so n-1) and that person can ether join a group (k) or make their own group (k-1).

I'm just having a little trouble figuring out how recursion works and could use a little help. Thanks!

These are the values I'm expecting:

groups(2,1) = 1
groups(2,2) = 1
groups(3,2) = 3
groups(4,2) = 7
groups(4,3) = 6
groups(5,3) = 25
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Please can you give examples of expected and received answers? –  Oliver Charlesworth Nov 7 '10 at 0:19
    
What values are output versus what do you expect? –  Woot4Moo Nov 7 '10 at 0:20
    
groups(2,1) = 1 groups(2,2) = 1 groups(3,2) = 3 groups(4,2) = 7 groups(4,3) = 6 groups(5,3) = 25 –  InBetween Nov 7 '10 at 0:21
    
adam please put that in the actual question please :) –  Woot4Moo Nov 7 '10 at 0:21
    
Alrighty, done. :) –  InBetween Nov 7 '10 at 0:23

2 Answers 2

up vote 4 down vote accepted

There is something missing in the implementation of that part

... and that person can ether join a group (k) ...

I think the person can join 'k' groups, so the code must be

    public long groups(int n, int k) {
        if(k==1) return 1;
        if(k==n) return 1;
        else return k * groups(n-1, k) + groups(n-1, k-1);
    }

(was missing multiplication by k)

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Ah!!! Thats exactly what I'm missing. Thanks much! –  InBetween Nov 7 '10 at 0:43
    
Oh and I would give you a vote up, but apparently I can't until I have 15 reputation. Sorry! :( –  InBetween Nov 7 '10 at 0:45
    
no problems, I liked the algorithm to solve the assignment and thanks for accepting the answer (got some reputation for that) –  Carlos Heuberger Nov 7 '10 at 0:49

There's a much easier (faster) way to compute combinations -- that's the binomial coefficient. While I can understand that your teacher may want you write a recursive function this way to become familiar with recursion, you can use this formula as a check.

In your case, you're reporting the wrong expected values here. What you want is

groups(2,1) = 2
groups(2,2) = 1
groups(3,2) = 3
groups(4,2) = 6
groups(4,3) = 4
groups(5,3) = 10

and the code you've posted is correct if the values above are what it's supposed to return.

(If not, perhaps you can better clarify the problem by explaining more clearly how the problem you're solving differs from the binomial coefficient.)

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Well my assignment says "Given n students, return how many ways you can divide them into k groups." And then gives the values above in my question. –  InBetween Nov 7 '10 at 0:36
    
Also, when I run the code above I get: "groups(2,1): 1 groups(2,2): 1 groups(3,2): 2 groups(4,2): 3 groups(4,3): 3 groups(5,4): 4 groups(5,3): 6" Which aren't the same as the values you gave. –  InBetween Nov 7 '10 at 0:37
    
@Adam: OK there was a little detail that I didn't notice until after I posted: To get the values I gave, the base case if(k==1) return 1; would have to change to if(k==0) return 1. –  Ken Bloom Nov 7 '10 at 2:22

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