code forces 979C
Kuro is living in a country called Uberland, consisting of nn towns, numbered from 11 to nn, and n−1n−1 bidirectional roads connecting these towns. It is possible to reach each town from any other. Each road connects two towns aa and bb. Kuro loves walking and he is planning to take a walking marathon, in which he will choose a pair of towns (u,v)(u,v) (u≠vu≠v) and walk from uuusing the shortest path to vv (note that (u,v)(u,v) is considered to be different from (v,u)(v,u)).
Oddly, there are 2 special towns in Uberland named Flowrisa (denoted with the index xx) and Beetopia (denoted with the index yy). Flowrisa is a town where there are many strong-scent flowers, and Beetopia is another town where many bees live. In particular, Kuro will avoid any pair of towns (u,v)(u,v) if on the path from uu to vv, he reaches Beetopia after he reached Flowrisa, since the bees will be attracted with the flower smell on Kuro’s body and sting him.
Kuro wants to know how many pair of city (u,v)(u,v) he can take as his route. Since he’s not really bright, he asked you to help him with this problem.
The first line contains three integers nn, xx and yy (1≤n≤3⋅105,1≤x,y≤n1≤n≤3⋅105,1≤x,y≤n, x≠yx≠y) - the number of towns, index of the town Flowrisa and index of the town Beetopia, respectively.
n−1n−1 lines follow, each line contains two integers aa and bb (1≤a,b≤n1≤a,b≤n, a≠ba≠b), describes a road connecting two towns aa and bb.
It is guaranteed that from each town, we can reach every other town in the city using the given roads. That is, the given map of towns and roads is a tree.
A single integer resembles the number of pair of towns (u,v)(u,v) that Kuro can use as his walking route.
3 1 3
1 2
2 3
5
3 1 3
1 2
1 3
4
On the first example, Kuro can choose these pairs:
- (1,2)(1,2): his route would be 1→21→2,
- (2,3)(2,3): his route would be 2→32→3,
- (3,2)(3,2): his route would be 3→23→2,
- (2,1)(2,1): his route would be 2→12→1,
- (3,1)(3,1): his route would be 3→2→13→2→1.
Kuro can't choose pair (1,3)(1,3) since his walking route would be 1→2→31→2→3, in which Kuro visits town 11 (Flowrisa) and then visits town 33 (Beetopia), which is not allowed (note that pair (3,1)(3,1) is still allowed because although Kuro visited Flowrisa and Beetopia, he did not visit them in that order).
On the second example, Kuro can choose the following pairs:
- (1,2)(1,2): his route would be 1→21→2,
- (2,1)(2,1): his route would be 2→12→1,
- (3,2)(3,2): his route would be 3→1→23→1→2,
- (3,1)(3,1): his route would be 3→13→1.
#include<cmath> #include<queue> #include<cstdio> #include<string.h> #include<iostream> #include<algorithm> #include<vector> using namespace std; const int INF=0x3f3f3f3f; const int N=3e5+10; vector<int> g[N]; int num[N]; int par[N]; int n,x,y; int dfs(int u,int fa){ par[u]=fa; int cnt=0; for(int v:g[u]){ if(v!=fa){ cnt+=dfs(v,u); } } return num[u]=cnt+1; } int main() { scanf("%d%d%d",&n,&x,&y); for(int i=0;i<n-1;i++){ int u,v; scanf("%d%d",&u,&v); g[u].push_back(v); g[v].push_back(u); } dfs(x,-1); long long ans=0; int m=y; while(par[m] !=x){ m=par[m]; } ans=(long long )n*(n-1); ans-=(long long )num[y]*(n-num[m]); printf("%lld\n",ans); return 0; }