#P120E. Put Knight!
Put Knight!
No submission language available for this problem.
Description
Petya and Gena play a very interesting game "Put a Knight!" on a chessboard n × n in size. In this game they take turns to put chess pieces called "knights" on the board so that no two knights could threat each other. A knight located in square (r, c) can threat squares (r - 1, c + 2), (r - 1, c - 2), (r + 1, c + 2), (r + 1, c - 2), (r - 2, c + 1), (r - 2, c - 1), (r + 2, c + 1) and (r + 2, c - 1) (some of the squares may be located outside the chessboard). The player who can't put a new knight during his move loses. Determine which player wins considering that both players play optimally well and Petya starts.
The first line contains integer T (1 ≤ T ≤ 100) — the number of boards, for which you should determine the winning player. Next T lines contain T integers ni (1 ≤ ni ≤ 10000) — the sizes of the chessboards.
For each ni × ni board print on a single line "0" if Petya wins considering both players play optimally well. Otherwise, print "1".
Input
The first line contains integer T (1 ≤ T ≤ 100) — the number of boards, for which you should determine the winning player. Next T lines contain T integers ni (1 ≤ ni ≤ 10000) — the sizes of the chessboards.
Output
For each ni × ni board print on a single line "0" if Petya wins considering both players play optimally well. Otherwise, print "1".
Samples
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