poj 3517 And Then There Was One(约瑟夫问题)【模板】
2017-08-08 20:34
501 查看
Let’s play a stone removing game.
Initially, n stones are arranged on a circle and numbered 1, …, n clockwise (Figure 1). You are also given two numbers k and m. From this state, remove stones one by one following the rules explained below, until only
one remains. In step 1, remove stone m. In step 2, locate the k-th next stone clockwise from m and remove it. In subsequent steps, start from the slot of the stone removed in the last step, make khops clockwise on the remaining
stones and remove the one you reach. In other words, skip (k − 1) remaining stones clockwise and remove the next one. Repeat this until only one stone is left and answer its number. For example, the answer for the case n= 8, k =
5, m = 3 is 1, as shown in Figure 1.
Figure 1: An example game
Initial state: Eight stones are arranged on a circle.
Step 1: Stone 3 is removed since m = 3.
Step 2: You start from the slot that was occupied by stone 3. You skip four stones 4, 5, 6 and 7 (since k = 5), and remove the next one, which is 8.
Step 3: You skip stones 1, 2, 4 and 5, and thus remove 6. Note that you only count stones that are still on the circle and ignore those already removed. Stone 3 is ignored in this case.
Steps 4–7: You continue until only one stone is left. Notice that in later steps when only a few stones remain, the same stone may be skipped multiple times. For example, stones 1 and 4 are skipped
twice in step 7.
Final State: Finally, only one stone, 1, is on the circle. This is the final state, so the answer is 1.
Input
The input consists of multiple datasets each of which is formatted as follows.
n k m
The last dataset is followed by a line containing three zeros. Numbers in a line are separated by a single space. A dataset satisfies the following conditions.
2 ≤ n ≤ 10000, 1 ≤ k ≤ 10000, 1 ≤ m ≤ n
The number of datasets is less than 100.
Output
For each dataset, output a line containing the stone number left in the final state. No extra characters such as spaces should appear in the output.
Sample Input
Sample Output
【题解】
著名的约瑟夫环问题,比较简单,见代码:
#include<iostream>
#include<algorithm>
#include<cstdio>
#include<cstring>
using namespace std;
const int N=10005;
int m,n,a
;
int k,ans,sum,w;
int main()
{
while(~scanf("%d%d%d",&n,&k,&m),n+m+k)
{
for(int i=1;i<=n;++i)
a[i-1]=i;
a[m-1]=0;
for(int i=m-1;i<n-1;i++)
{
a[i]=a[i+1];
}
n--;
int x=m-1;
while(n!=1)
{
x=(x+k-1)%n;
for(int i=x;i<n-1;++i)
a[i]=a[i+1];
n--;
}
printf("%d\n",a[0]);
}
return 0;
}
Initially, n stones are arranged on a circle and numbered 1, …, n clockwise (Figure 1). You are also given two numbers k and m. From this state, remove stones one by one following the rules explained below, until only
one remains. In step 1, remove stone m. In step 2, locate the k-th next stone clockwise from m and remove it. In subsequent steps, start from the slot of the stone removed in the last step, make khops clockwise on the remaining
stones and remove the one you reach. In other words, skip (k − 1) remaining stones clockwise and remove the next one. Repeat this until only one stone is left and answer its number. For example, the answer for the case n= 8, k =
5, m = 3 is 1, as shown in Figure 1.
Initial state | Step 1 | Step 2 | Step 3 | Step 4 |
Step 5 | Step 6 | Step 7 | Final state |
Initial state: Eight stones are arranged on a circle.
Step 1: Stone 3 is removed since m = 3.
Step 2: You start from the slot that was occupied by stone 3. You skip four stones 4, 5, 6 and 7 (since k = 5), and remove the next one, which is 8.
Step 3: You skip stones 1, 2, 4 and 5, and thus remove 6. Note that you only count stones that are still on the circle and ignore those already removed. Stone 3 is ignored in this case.
Steps 4–7: You continue until only one stone is left. Notice that in later steps when only a few stones remain, the same stone may be skipped multiple times. For example, stones 1 and 4 are skipped
twice in step 7.
Final State: Finally, only one stone, 1, is on the circle. This is the final state, so the answer is 1.
Input
The input consists of multiple datasets each of which is formatted as follows.
n k m
The last dataset is followed by a line containing three zeros. Numbers in a line are separated by a single space. A dataset satisfies the following conditions.
2 ≤ n ≤ 10000, 1 ≤ k ≤ 10000, 1 ≤ m ≤ n
The number of datasets is less than 100.
Output
For each dataset, output a line containing the stone number left in the final state. No extra characters such as spaces should appear in the output.
Sample Input
8 5 3 100 9999 98 10000 10000 10000 0 0 0
Sample Output
1 93 2019
【题解】
著名的约瑟夫环问题,比较简单,见代码:
#include<iostream>
#include<algorithm>
#include<cstdio>
#include<cstring>
using namespace std;
const int N=10005;
int m,n,a
;
int k,ans,sum,w;
int main()
{
while(~scanf("%d%d%d",&n,&k,&m),n+m+k)
{
for(int i=1;i<=n;++i)
a[i-1]=i;
a[m-1]=0;
for(int i=m-1;i<n-1;i++)
{
a[i]=a[i+1];
}
n--;
int x=m-1;
while(n!=1)
{
x=(x+k-1)%n;
for(int i=x;i<n-1;++i)
a[i]=a[i+1];
n--;
}
printf("%d\n",a[0]);
}
return 0;
}
内容来自用户分享和网络整理,不保证内容的准确性,如有侵权内容,可联系管理员处理 
相关文章推荐
- POJ 3517 And Then There Was One (递推,约瑟夫问题变形)
- poj 3517 And Then There Was One 约瑟夫问题
- 【原】 POJ 3517 And Then There Was One Joseph问题 解题报告
- Poj 3517 And Then There Was One Joseph核心问题
- 3517 And Then There Was One 约瑟夫问题
- POJ题目3517 And Then There Was One(约瑟夫,公式)
- UVALive3882-And Then There Was One-约瑟夫问题-递推
- POJ 3517 And Then There Was One(约瑟夫环)
- POJ 3157 And Then There Was One【约瑟夫变形】
- POJ-3517-And Then There Was One
- Poj 3517 And Then There Was One(约瑟夫环变形)
- LA 3882 And Then There Was One[约瑟夫问题的变形]
- POJ 3517 And Then There Was One(约瑟夫环-递推or模拟)
- UVA 1394 POJ 3517 And Then There Was One (双向循环链表和递推)
- POJ 3517 And Then There Was One
- POJ 3517 And Then There Was One
- UVA 1394 And Then There Was One / Gym 101415A And Then There Was One / UVAlive 3882 And Then There Was One / POJ 3517 And Then There Was One / Aizu 1275 And Then There Was One (动态规划,思维题)
- POJ 3517 And Then There Was One 约瑟夫环
- UVA 1394/POJ 3517 And Then There Was One
- 约瑟夫问题变形 And Then There was One, LA 3882 递推 动态规划