# I need help solving a problem on codechef

Statement

Consider a string of length N consisting only of lowercase alphabets a-z. Let `s[i]` be the character at the i-th position in the string (1-based). The string is a K-string if there are EXACTLY K values of i (`1 <= i < N`) such that `s[i+1]<s[i]` (we assume `'a'<'b'<'c'<...<'z'`). Given K, find the shortest K-string. If there are multiple solutions, find the lexicographically earliest K-string.

Input

The first line contains the number of test cases T (1<= T <= 100). Each test case contains an integer K (≤ 100). Output

Output

T lines, one for each test case, containing the required string. Use only lower-case letters a-z.

What i cant understand is the case of 27 to 100. I can simply use char array to compute the the problem This isnt the whole algo. I am still trying......

``````#include<iostream>
using namespace std;
int main()
{
char s[]={'0','a','b','c','d','e','f','g','h','i','j','k','l','m','n','o','p','q','r','s','t','u','v','w','x','y','z'};
int k;
cin>>k;
for(int i=k;i>=1;i--)
{
//cout<<s[i+1]<<">"<<s[i];
if(s[i+1]>s[i])
cout<<s[i];

}
system("pause");
return 0;
}
``````
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such that s[i+1]....what is the end of the sentence ? –  Loïc Février Sep 24 '10 at 15:36
s[i+1]<s[i] is the end –  Ronzii Sep 24 '10 at 15:38

Shortest then lexicographically earliest.

So the solutions will be :

• ba : K = 1, length = 2
• cba : K = 2, length = 3
• dbca : : K = 3, length = 4
• zyx....a : K = 25, length = 26
• bazyx....a : K = 26, length = 28
• bcazyx....a : K = 27, length = 29
• ....
-

For 26, you can do:

a, b, ... z, a, b

But I think the optimal solution is:

a, b, a, b, ... z

In general, I think you need to do a 'small' run first, then all the full runs.

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The solution need to be as short as possible and then if there is multiple solutions of same length, choose the first one in lexicographic order. –  Loïc Février Sep 24 '10 at 15:58
You've in fact considered "s[i+1] > s[i]" but the problem was "s[i+1]<s[i]". –  Loïc Février Sep 24 '10 at 16:05
My bad, the idea still applies and inverting the ramps gives the correct solution... –  Ssancho Sep 24 '10 at 16:20
Indeed, try to correct your post ;) –  Loïc Février Sep 24 '10 at 16:48