Farmer John has been informed of the location of a fugitive cow and wants to catch her immediately. He starts at a point N (0 ≤ N ≤ 100,000) on a number line and the cow is at a point K (0 ≤ K ≤ 100,000) on the same number line. Farmer John has two modes of transportation: walking and teleporting.
* Walking: FJ can move from any point X to the points X - 1 or X + 1 in a single minute * Teleporting: FJ can move from any point X to the point 2 × X in a single minute.
If the cow, unaware of its pursuit, does not move at all, how long does it take for Farmer John to retrieve it?
Input
Line 1: Two space-separated integers: N and K
Output
Line 1: The least amount of time, in minutes, it takes for Farmer John to catch the fugitive cow.
Sample Input
5 17
Sample Output
4
Hint
The fastest way for Farmer John to reach the fugitive cow is to move along the following path: 5-10-9-18-17, which takes 4 minutes.
一道bfs,开始考虑模拟,后来发现条件很多要考虑的东西太多了,就用了bfs
然后就是想界限问题,开始觉得要尽量小,后来看了别人代码再看数据觉得直接用题目中的数据做界限可以出结果
接着是各种调bug,其实方法一开始就写对了,但因为中间一两行代码的错误和没有发现导致不停的错
唉~今天的第二次了,第一次调了半个多小时,第二次直接调了一个半小时
#include<iostream> #include<cstdio> #include<queue> #include<cstring> #include<cmath> using namespace std; #define maxn 100010 int n,k,vis[maxn]; struct node{ int x,step; }; void bfs(){ node p; p.x = n,p.step = 0; vis[n] = 1; queue<node> q; q.push(p); while(!q.empty()){ node tmp = q.front(); q.pop(); if(tmp.x == k){ cout << tmp.step << endl; return; } for(int i=0;i<3;i++){ int xx; if(i == 0){ xx = tmp.x + 1; } else if(i == 1){ xx = tmp.x - 1; } else xx = tmp.x * 2; if(xx < 0 || xx > maxn){ continue; } if(!vis[xx]){ vis[xx] = 1;//注意vis数组 node tp;//这里新建一个结构体对象,不要在原来的tmp上加减!!! 在这里调了一个半小时!!! tp.x = xx; tp.step = tmp.step + 1; q.push(tp); } } } } int main(){ while(cin >> n >> k){ memset(vis,0,sizeof(vis)); if(n<k){ bfs(); } else{ cout << n - k << endl; } } return 0; }