a very simple proof of the formula is using generating function for counting
On Sat, Oct 10, 2009 at 3:08 PM, Prunthaban Kanthakumar <
pruntha...@gmail.com> wrote:
> I just noticed that in your problem the balls are 'similar'.
> Then the solution is a simple composition and the answer is {n-1, k-
I just noticed that in your problem the balls are 'similar'.
Then the solution is a simple composition and the answer is {n-1, k-1} where
{n,k} stands for binomial coefficient.
I will give a proof sometime later if needed.
On Sat, Oct 10, 2009 at 11:22 AM, vicky wrote:
>
> i didn't get anything
i didn't get anything plz elaborate
On Oct 10, 10:44 am, Prunthaban Kanthakumar
wrote:
> Sterling numbers of second kind.
>
>
>
> On Sat, Oct 10, 2009 at 10:41 AM, vicky wrote:
>
> > example:
> > n=10,k=10
> > ans:1
> > n=30,k=7
> > ans:
> > 475020
> > On Oct 10, 9:51 am, vicky wrote:
> > > u
Sterling numbers of second kind.
On Sat, Oct 10, 2009 at 10:41 AM, vicky wrote:
>
> example:
> n=10,k=10
> ans:1
> n=30,k=7
> ans:
> 475020
> On Oct 10, 9:51 am, vicky wrote:
> > u have to color n similar balls with k diff. colors , such that every
> > color must be used atleast once find the n
example:
n=10,k=10
ans:1
n=30,k=7
ans:
475020
On Oct 10, 9:51 am, vicky wrote:
> u have to color n similar balls with k diff. colors , such that every
> color must be used atleast once find the no. of ways
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