Problem description |
A graph consists of a set of vertices and edges between pairs of vertices. Two vertices are connected if there is a path (subset of edges) leading from one vertex to another, and a connected component is a maximal subset of vertices that are all connected to each other. A graph consists of one or more connected components. A tree is a connected component without cycles, but it can also be characterized in other ways. For example, a tree consisting of n vertices has exactly n-1 edges. Also, there is a unique path connecting any pair of vertices in a tree. Given a graph, report the number of connected components that are also trees. |
Input |
The input consists of a number of cases. Each case starts with two non-negative integers n and m, satisfying n ≤ 500 and m ≤ n(n-1)/2. This is followed by m lines, each containing two integers specifying the two distinct vertices connected by an edge. No edge will be specified twice (or given again in a different order). The vertices are labelled 1 to n. The end of input is indicated by a line containing n = m = 0. |
Output |
For each case, print one of the following lines depending on how many different connected components are trees (T > 1 below): Case x: A forest of T trees. Case x: There is one tree. Case x: No trees. x is the case number (starting from 1). |
Sample Input |
6 3 1 2 2 3 3 4 6 5 1 2 2 3 3 4 4 5 5 6 6 6 1 2 2 3 1 3 4 5 5 6 6 4 0 0 |
Sample Output |
Case 1: A forest of 3 trees. Case 2: There is one tree. Case 3: No trees. #include<stdio.h> int fath[505],cycl[505],k,n; void setfirst() { k=n; for(int i=1;i<=n;i++) { fath[i]=i; cycl[i]=0; } } int find_fath(int x) { if(x!=fath[x]) fath[x]=find_fath(fath[x]); return fath[x]; } void setTree(int a,int b) { a=find_fath(a); b=find_fath(b); if(cycl[b]&&cycl[a]) return ; k--; if(a!=b) { if(cycl[a]) fath[b]=a; else fath[a]=b; } else cycl[a]=1; } int main() { int a,b,m,t=1; while(scanf("%d%d",&n,&m)>0&&m+n!=0) { setfirst(); while(m--) { scanf("%d%d",&a,&b); setTree(a,b); } printf("Case %d: ",t++); if(k>1)printf("A forest of %d trees. ",k); if(k==1)printf("There is one tree. "); if(k==0)printf("No trees. "); } } |