• HDU NPY and arithmetic progression(BestCoder Round #22)


    Problem Description:
    NPY is learning arithmetic progression in his math class. In mathematics, an arithmetic progression (AP) is a sequence of numbers such that the difference between the consecutive terms is constant.(from wikipedia)
    He thinks it's easy to understand,and he found a challenging problem from his talented math teacher:
    You're given four integers, a1,a2,a3,a4, which are the numbers of 1,2,3,4 you have.Can you divide these numbers into some Arithmetic Progressions,whose lengths are equal to or greater than 3?(i.e.The number of AP can be one)
    Attention: You must use every number exactly once.
    Can you solve this problem?
     
    Input:
    The first line contains a integer T — the number of test cases (1T100000).
    The next T lines,each contains 4 integers a1,a2,a3,a4(0a1,a2,a3,a4109).
     
    Output:
    For each test case,print "Yes"(without quotes) if the numbers can be divided properly,otherwise print "No"(without quotes).
     
    Sample Input:
    3
    1 2 2 1
    1 0 0 0
    3 0 0 0
     
    Sample Output:
    Yes
    No
    Yes
     
    Hint:
    In the first case,the numbers can be divided into {1,2,3} and {2,3,4}. In the second case,the numbers can't be divided properly. In the third case,the numbers can be divided into {1,1,1}.
     
    题意:给出a,b,c,d,代表数字1,2,3,4的个数,现在要判断这些数字完全能否组成等差数列(每个数字要用完),因为只有1,2,3,4这四个数,所以等差数列只有1,1,1;  2,2,2;  3,3,3;  4,4,4;  1,2,3;  2,3,4;  1,2,3,4。
    #include<stdio.h>
    #include<string.h>
    #include<queue>
    #include<math.h>
    #include<stdlib.h>
    #include<algorithm>
    using namespace std;
    
    const int N=1e6+10;
    const int INF=0x3f3f3f3f;
    const int MOD=1e9+7;
    
    typedef long long LL;
    
    int Judge(int a, int b, int c, int d)
    {
        if ((a >= 3 || a == 0) && (b >= 3 || b == 0) && (c >= 3 || c == 0) && (d >= 3 || d == 0))
            return 1; ///如果有三个一样的数就可以组成一个等差数列了;当所有数都被用完时,肯定可以被分的完全
    
        if (a >= 1 && b >= 1 && c >= 1 && d >= 1)
        {
            if (Judge(a-1, b-1, c-1, d-1)) ///组成1,2,3,4的等差数列
                return 1;
        }
    
        if (b >= 1 && c >= 1 && d >= 1)
        {
            if (Judge(a, b-1, c-1, d-1)) ///组成2,3,4的等差数列
                return 1;
        }
    
        if (a >= 1 && b >= 1 && c >= 1)
        {
            if (Judge(a-1, b-1, c-1, d)) ///组成1,2,3的等差数列
                return 1;
        }
    
        return 0;
    }
    int main ()
    {
        int T, i, ans, a[10];
    
        scanf("%d", &T);
    
        while (T--)
        {
            for (i = 0; i < 4; i++)
                scanf("%d", &a[i]);
    
            ans = Judge(a[0], a[1], a[2], a[3]);
    
            if (ans == 1) printf("Yes
    ");
            else printf("No
    ");
        }
    
        return 0;
    }
  • 相关阅读:
    微分中值定理和泰勒展开
    Burnside引理与Polya定理
    递推关系和母函数
    cogs 1361. 树 线段树
    cogs 247. 售票系统 线段树
    cogs 176. [USACO Feb07] 奶牛聚会 dijkstra
    cogs 1672. [SPOJ 375] 难存的情缘 树链剖分套线段树 易错! 全博客园最长最详细的题解
    cogs 886. [USACO 4.2] 完美的牛栏 二分图 匈牙利算法
    cogs 1254. 最难的任务 Dijkstra + 重边处理
    cogs 364. [HDU 1548] 奇怪的电梯 Dijkstra
  • 原文地址:https://www.cnblogs.com/syhandll/p/4950289.html
Copyright © 2020-2023  润新知