# KornShell to generate the number of combinations of k objects from a set with n objects

Could anyone help to get code using KornShell (ksh) to generate the number of combinations of k objects from a set with n objects is n C k? For example, the combinations of {1,2,3,4} taken k=2 at a time are {1,2}, {1,3}, {1,4}, {2,3}, {2,4}, {3,4}, for a total of 6 = 4 / [(2)(4-2) ] subsets.

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Why ksh? Unix shells are not very good at these kinds of computations. – Ned Nowotny Jan 9 '14 at 5:48
is it the number of combination (so a statistic evaluation) or all the generated combination that you want ? – NeronLeVelu Jan 9 '14 at 12:11
What do the  symbols represent in this question? – javaPlease42 Jan 11 '14 at 23:43
@javaPlease I guess they render as ... something on some platforms, but like (I guess) you, I just see empty squares on my iPhone. – tripleee Jan 12 '14 at 8:40

@Ned Nowotny is right, sh is not the right place to be doing this

that said, here's the recursive form:

``````> function cr { integer n=\$1 k=\$2; if ((k==1)); then print \$n; elif ((k==n)); then print 1; else print \$((\$(cr \$((n-1)) \$((k-1))) + \$((\$(cr \$((n-1)) \$k))))); fi; }
> cr 4 2
6
>
``````

and here's the faster factorial form:

``````> function fact { integer x=\$1 f=1; while ((x>0)) do : \$((f*=x--)); done; print \$f; }
> function cf { integer n=\$1 k=\$2; print \$((\$(fact \$n)/(\$(fact \$k)*\$(fact \$((\$n-\$k)))))); }
> cf 4 2
6
>
``````
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I guess you mean `\$(cr ...)` not `\$(c ...)` in the recursive form? – tripleee Jan 11 '14 at 20:31
d'oh, yet. fixed – Aaron Davies Jan 12 '14 at 0:56