A22510.Cow Digit Game S
普及+/提高
通过率:0%
时间限制:1.00s
内存限制:128MB
题目描述
Bessie is playing a number game against Farmer John, and she wants you to help her achieve victory.
Game i starts with an integer N_i (1 <= N_i <= 1,000,000). Bessie goes first, and then the two players alternate turns. On each turn, a player can subtract either the largest digit or the smallest non-zero digit from the current number to obtain a new number. For example, from 3014 we may subtract either 1 or 4 to obtain either 3013 or 3010, respectively. The game continues until the number becomes 0, at which point the last player to have taken a turn is the winner.
Bessie and FJ play G (1 <= G <= 100) games. Determine, for each game, whether Bessie or FJ will win, assuming that both play perfectly (that is, on each turn, if the current player has a move that will guarantee his or her win, he or she will take it).
Consider a sample game where N_i = 13. Bessie goes first and takes 3, leaving 10. FJ is forced to take 1, leaving 9. Bessie takes the remainder and wins the game.
贝茜和约翰在玩一个数字游戏.贝茜需要你帮助她.
游戏一共进行了G(1≤G≤100)场.第i场游戏开始于一个正整数Ni(l≤Ni≤1,000,000).游
戏规则是这样的:双方轮流操作,将当前的数字减去一个数,这个数可以是当前数字的最大数码,也可以是最小的非0数码.比如当前的数是3014,操作者可以减去1变成3013,也可以减去4变成3010.若干次操作之后,这个数字会变成0.这时候不能再操作的一方为输家. 贝茜总是先开始操作.如果贝茜和约翰都足够聪明,执行最好的策略.请你计算最后的赢家.
比如,一场游戏开始于13.贝茜将13减去3变成10.约翰只能将10减去1变成9.贝茜再将9减去9变成0.最后贝茜赢.
输入格式
* Line 1: A single integer: G
* Lines 2..G+1: Line i+1 contains the single integer: N_i
输出格式
* Lines 1..G: Line i contains 'YES' if Bessie can win game i, and 'NO' otherwise.
输入输出样例
输入#1
2 9 10
输出#1
YES NO
说明/提示
For the first game, Bessie simply takes the number 9 and wins. For the second game, Bessie must take 1 (since she cannot take 0), and then FJ can win by taking 9.