给定一个偶数 $n$。请构造一个由 $n$ 个二进制位组成的二进制数 $a = \overline{a_1 a_2 \dots a_n}$,使得该数能被 $n$ 整除,且对于 $i = 1, 2, \dots, n$,所有数 $\overline{a_1 a_2 \dots a_i}$(即 $a$ 的二进制前缀)模 $n$ 的余数各不相同。
输入仅一行,包含一个整数 $n$ ($2 \le n \le 1000$,$n$ 为偶数)。
输出所求的 $n$ 位二进制数 $\overline{a_1 a_2 \dots a_n}$。不允许有前导零。如果存在多个可能的答案,输出其中任意一个即可。题目保证在这些约束条件下至少存在一个解。
2
10
4
1100
The discussion section is only for posting: General Discussions (problem-solving strategies, alternative approaches), and Off-topic conversations.
This is NOT for reporting issues! If you want to report bugs or errors, please use the Issues section below.
If you find any issues with the problem (statement, scoring, time/memory limits, test cases, etc.), you may submit an issue here. A problem moderator will review your issue.
Guidelines: