# Minium set of numbers that sum to least K

Given a list of n objects, write a function that outputs the minimum set of numbers that sum to at least K. FOLLOW UP: can you beat O(n ln n)?

The minimum set will be a set with 1 element. Don't we just have to traverse the array and find an element i.e. >= K.

Otherwise for O(nlgn), I understand we have to first sort the array and then we can find pair or triplets which sum >=k. What if we don't find such a combination and have to go for bigger sets won't this problem be same as N sum problem?

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is this homework ? –  Pavan Yalamanchili Jan 21 '13 at 2:02
@Pavan..No it isn't ..It's an interview question..unfortunately I'm not getting "interview" tag anymore so couldn't tag it. –  user1071840 Jan 21 '13 at 2:23

Here's a linear algorithm that uses linear-time median finding as a subroutine:

``````Findsum(A, K) {
Let n be the length of A.
Let M be the median element of A, found in linear time.
Let L be the elements of A less than M.
Let U be the elements of A greater than M.
Let E be the elements of A equal to M.
If the sum of the elements in U is at least K,
Return Findsum(U, K).
Else, if the sum of the elements in U and E is at least K,
Return U together with enough elements of E that the sum is at least K.
Else,
Return Findsum(L, K - sum(U) - sum(E)).
}
``````

Each recursive call is done on a list at most half the size of A and all other steps take at most linear time, so this algorithm takes linear time overall.

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Are you sure that's a linear algorithm? –  xpda Jan 21 '13 at 2:58
Yes. You get a recurrence that looks like T(n) <= T(n/2) + c*n, which gives you the bound T(n) <= 2*c*n. –  tmyklebu Jan 21 '13 at 3:06
You get the job! –  xpda Jan 21 '13 at 3:22
Nice, but didn't you mean M instead of A[i] in the definitions of L, U, and E? –  Gene Jan 21 '13 at 3:40
@Gene: Yeah, thanks. –  tmyklebu Jan 21 '13 at 3:47