kn - 1) results in the following sequence:
ak, ak+1,..., an-1, a0, a1,..., ak-1.
How many of the n cyclic shifts satisfy the condition that the sum of the first
i numbers is greater than or equal to zero for all i with
1in?
| Non-negative Partial Sums |
You are given a sequence of n numbers
a0,..., an-1.
A cyclic shift by k positions (
0kn - 1) results in the following sequence:
ak, ak+1,..., an-1, a0, a1,..., ak-1.
How many of the n cyclic shifts satisfy the condition that the sum of the first
i numbers is greater than or equal to zero for all i with
1in?
Each test case consists of two lines.
The first contains the number n (
1n106), the number of integers in the sequence.
The second contains n integers
a0,..., an-1 (
-1000ai1000) representing the sequence of numbers.
The input will finish with a line containing 0.
For each test case, print one line with the number of cyclic shifts of the given sequence which satisfy the condition stated above.
3 2 2 1 3 -1 1 1 1 -1 0
3 2 0