The Frog's Games
Time Limit: 2000/1000 MS (Java/Others) Memory Limit: 65768/65768 K (Java/Others)
Total Submission(s): 3050 Accepted Submission(s): 1505
Problem Description
The annual Games in frogs' kingdom started again. The most famous game is the Ironfrog Triathlon. One test in the Ironfrog Triathlon is jumping. This project requires the frog athletes to jump over the river. The width of the river is L (1<= L <= 1000000000). There are n (0<= n <= 500000) stones lined up in a straight line from one side to the other side of the river. The frogs can only jump through the river, but they can land on the stones. If they fall into the river, they
are out. The frogs was asked to jump at most m (1<= m <= n+1) times. Now the frogs want to know if they want to jump across the river, at least what ability should they have. (That is the frog's longest jump distance).
are out. The frogs was asked to jump at most m (1<= m <= n+1) times. Now the frogs want to know if they want to jump across the river, at least what ability should they have. (That is the frog's longest jump distance).
Input
The input contains several cases. The first line of each case contains three positive integer L, n, and m.
Then n lines follow. Each stands for the distance from the starting banks to the nth stone, two stone appear in one place is impossible.
Then n lines follow. Each stands for the distance from the starting banks to the nth stone, two stone appear in one place is impossible.
Output
For each case, output a integer standing for the frog's ability at least they should have.
Sample Input
6 1 2
2
25
3 3
11
2
18
Sample Output
4
11
Source
1 /* 2 题意:L, n , m 分别代表河的长度,n个石头,最多能跳m次。 3 求在满足跳的步数的前提下,到达河对岸的最小步伐。 4 两个二分比较容易理解。 5 第一个二分,[ 0, L ]; 6 第二个二分用来在当前步伐下能不能在规定步数内 7 走到对岸时的,寻找下一个位置。(下限值). 8 二分写得很挫。 9 10 */ 11 12 #include<iostream> 13 #include<stdio.h> 14 #include<cstring> 15 #include<cstdlib> 16 #include<algorithm> 17 using namespace std; 18 19 int L,n,m; 20 int a[500003]; 21 22 int EF(int l,int r,int num) 23 { 24 int mid; 25 while(l<r) 26 { 27 mid=(l+r+1)/2; 28 if( a[mid]>num) 29 r=mid-1; 30 else if( a[mid]<num) 31 l=mid; 32 else if( a[mid]==num) 33 return mid; 34 } 35 return r; 36 } 37 int query(int length,int l,int r) 38 { 39 int num=0,cur=1,x=0; 40 while( ++num<=m&&a[cur]<L) 41 { 42 cur=EF(cur,n+1,a[x]+length); 43 x=cur; 44 } 45 return a[cur]; 46 } 47 int main() 48 { 49 int i,l,r,mid; 50 while(scanf("%d%d%d",&L,&n,&m)>0) 51 { 52 for(i=1;i<=n;i++) 53 scanf("%d",&a[i]); 54 a[n+1]=L;a[0]=0; 55 l=0;r=L; 56 sort(a+1,a+1+n); 57 while(l<r) 58 { 59 mid=(l+r)/2; 60 if( query(mid,1,n+1)>=L ) 61 r=mid; 62 else l=mid+1; 63 } 64 printf("%d ",r); 65 } 66 return 0; 67 }