#include<iostream> #include<cstring> #include<cstdio> #include<string> #include<algorithm> #include<vector> #include<map> using namespace std; #define maxn (1<<5)+5 #define inf 0x3f3f3f3f int fa[maxn]; void inital(){ for(int i=0;i<maxn;i++){ fa[i]=i; } } int finds(int x){ if(fa[x]==x)return fa[x]; else return fa[x]=finds(fa[x]); } bool unit(int x,int y){ int a=finds(x); int b=finds(y); if(a==b)return false; else{ fa[a]=b; } return true; } int main() { int u,v; //freopen("in.txt","r",stdin); while(~scanf("%d%d",&u,&v)){ int sum=0; inital(); unit(u,v); while(~scanf("%d",&u)!=EOF&&u!=-1){ scanf("%d",&v); if(unit(u,v)==0)sum++; } printf("%d\n",sum); } }
3644 X-Plosives A secret service developed a new kind of explosive that attain its volatile property only when a specific association of products occurs. Each product is a mix of two different simple compounds, to which we call a binding pair. If N > 2, then mixing N different binding pairs containing N simple compounds creates a powerful explosive. For example, the binding pairs A+B, B+C, A+C (three pairs, three compounds) result in an explosive, while A+B, B+C, A+D (three pairs, four compounds) does not. You are not a secret agent but only a guy in a delivery agency with one dangerous problem: receive binding pairs in sequential order and place them in a cargo ship. However, you must avoid placing in the same room an explosive association. So, after placing a set of pairs, if you receive one pair that might produce an explosion with some of the pairs already in stock, you must refuse it, otherwise, you must accept it. An example. Lets assume you receive the following sequence: A+B, G+B, D+F, A+E, E+G, F+H. You would accept the first four pairs but then refuse E+G since it would be possible to make the following explosive with the previous pairs: A+B, G+B, A+E, E+G (4 pairs with 4 simple compounds). Finally, you would accept the last pair, F+H. Compute the number of refusals given a sequence of binding pairs. Input The input will contain several test cases, each of them as described below. Consecutive test cases are separated by a single blank line. Instead of letters we will use integers to represent compounds. The input contains several lines. Each line (except the last) consists of two integers (each integer lies between 0 and 105) separated by a single space, representing a binding pair. Each test case ends in a line with the number ‘-1’. You may assume that no repeated binding pairs appears in the input. Output For each test case, the output must follow the description below. A single line with the number of refusals. Sample Input 1 2 3 4 3 5 3 1 2 3 4 1 2 6 6 5 -1 Sample Output 3
实际上就是并查集判环,判断总共有多少个环,也可以用dfs实现
原文地址:http://blog.csdn.net/u013497977/article/details/44003223