hdu 4932 Miaomiao's Geometry(暴力枚舉)
Miaomiao's Geometry
Time Limit: 2000/1000 MS (Java/Others) Memory Limit:
65536/65536 K (Java/Others)
Problem Description
There are N point on X-axis . Miaomiao would like to cover them ALL by using segments with same length.
There are 2 limits:
1.A point is convered if there is a segments T , the point is the left end or the right end of T.
2.The length of the intersection of any two segments equals zero.
For example , point 2 is convered by [2 , 4] and not convered by [1 , 3]. [1 , 2] and [2 , 3] are legal segments , [1 , 2] and [3 , 4] are legal segments , but [1 , 3] and [2 , 4] are not (the length of intersection doesn't equals zero), [1 , 3] and [3 , 4]
are not(not the same length).
Miaomiao wants to maximum the length of segements , please tell her the maximum length of segments.
For your information , the point can't coincidently at the same position.
Input
There are several test cases.
There is a number T ( T <= 50 ) on the first line which shows the number of test cases.
For each test cases , there is a number N ( 3 <= N <= 50 ) on the first line.
On the second line , there are N integers Ai (-1e9 <= Ai <= 1e9) shows the position of each point.
Output
For each test cases , output a real number shows the answser. Please output three digit after the decimal point.
Sample Input
3
3
1 2 3
3
1 2 4
4
1 9 100 10
Sample Output
1.000
2.000
8.000
HintFor the first sample , a legal answer is [1,2] [2,3] so the length is 1.
For the second sample , a legal answer is [-1,1] [2,4] so the answer is 2.
For the thired sample , a legal answer is [-7,1] , [1,9] , [10,18] , [100,108] so the answer is 8.
題意:給出n個點,找出一些等長的線段覆蓋這些點,這些點只能作為線段的端點,而且任意兩條線段的相交長度不能大於0.求滿足條件的線段的最大長度。
分析:通過分析可以得出,最終結果是相鄰兩點之間的長度,或者相鄰兩點之間長度的一半。因為最多只有50個點,100個長度,所以只需枚舉這些長度,求出一個滿足條件的最長線段即可。
#include
#include
#include
using namespace std;
int main()
{
double b[120], c[60];
int flag[60];
int n, i, j, T;
scanf("%d",&T);
while(T--)
{
scanf("%d",&n);
for(i = 0; i < n; i++)
scanf("%lf",&c[i]);
sort(c, c+n);
int m = 0;
for(i = 1; i < n; i++)
{
b[m++] = c[i] - c[i-1];
b[m++] = (c[i] - c[i-1]) / 2;
}
sort(b, b+m);
double ans;
for(i = m - 1; i >= 0; i--)
{
memset(flag, 0, sizeof(flag));
flag[0] = 1;
double tmp = b[i];
for(j = 1; j < n - 1; j++)
{
if(c[j] - tmp < c[j-1] && c[j] + tmp > c[j+1]) //往左往右都不行
break;
if(c[j] - tmp >= c[j-1])
{
if(flag[j-1] == 2) // 前一個往右
{
if(c[j] - c[j-1] == tmp) flag[j] = 1; //兩個點作為線段的兩個端點
else if(c[j] - c[j-1] >= 2 * tmp) flag[j] = 1; //一個往左,一個往右
else if(c[j] + tmp <= c[j+1]) flag[j] = 2; //只能往右
else break;
}
else flag[j] = 1;
}
else if(c[j] + tmp <= c[j+1])
flag[j] = 2;
}
if(j == n - 1)
{
ans = tmp;
break;
}
}
printf("%.3lf\n", double(ans));
}
return 0;
}
