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第一题,http://community.topcoder.com/stat?c=problem_statement&pm=13462&rd=16076
模拟就可以了。
#include <vector> #include <algorithm> using namespace std; class Target { public: vector <string> draw(int n) { vector<string> result(n, string(n, ‘ ‘)); int x = 0; int y = 0; while (n >= 1) { for (int i = 0; i < n; i++) { result[x + i][y] = ‘#‘; result[x][y + i] = ‘#‘; result[x + n - 1][y + i] = ‘#‘; result[x + i][y + n - 1] = ‘#‘; } x += 2; y += 2; n -= 4; } return result; } };
第二题,想了很久。最后发现用三角形的A+B>=C,一个一个推,可以推出N条边所组成的多边形(开口)的距离范围。http://apps.topcoder.com/wiki/display/tc/SRM+633#Jumping
有详细的图示。
#include <vector> #include <algorithm> #include <string> #include <algorithm> using namespace std; class Jumping { public: string ableToGet(int x, int y, vector <int> jumpLengths) { double d = sqrt(1.0 * x * x + 1.0 * y * y); sort(jumpLengths.begin(), jumpLengths.end()); double low = jumpLengths[0]; double high = jumpLengths[0]; for (int i = 1; i < jumpLengths.size(); i++) { low = max(0.0, jumpLengths[i] - high); high = high + jumpLengths[i]; } if (d >= low && d <= high) { return "Able"; } else { return "not able"; } } };
第三题,没做。后来看题解,就是用LCD和GCD的限制,得到x*y,然后穷举搜索。用DFS。
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原文地址:http://www.cnblogs.com/lautsie/p/4246557.html