The Balance
| Time Limit: 5000MS | Memory Limit: 65536K |
| Total Submissions: 2378 | Accepted: 1041 |
Description
Ms. Iyo Kiffa-Australis has a balance and only two kinds of weights to measure a dose of medicine. For example, to measure 200mg of aspirin using 300mg weights and 700mg weights, she can put one 700mg weight on the side of the medicine and three 300mg weights on the opposite side (Figure 1). Although she could put four 300mg weights on the medicine side and two 700mg weights on the other (Figure 2), she would not choose this solution because it is less convenient to use more weights.
You are asked to help her by calculating how many weights are required.
Input
The input is a sequence of datasets. A dataset is a line containing three positive integers a, b, and d separated by a space. The following relations hold: a != b, a <= 10000, b <= 10000, and d <= 50000. You may assume that it is possible to measure d mg using a combination of a mg and b mg weights. In other words, you need not consider "no solution" cases.
The end of the input is indicated by a line containing three zeros separated by a space. It is not a dataset.
Output
The output should be composed of lines, each corresponding to an input dataset (a, b, d). An output line should contain two nonnegative integers x and y separated by a space. They should satisfy the following three conditions.
- You can measure dmg using x many amg weights and y many bmg weights.
- The total number of weights (x + y) is the smallest among those pairs of nonnegative integers satisfying the previous condition.
- The total mass of weights (ax + by) is the smallest among those pairs of nonnegative integers satisfying the previous two conditions.
No extra characters (e.g. extra spaces) should appear in the output.
Sample Input
700 300 200
500 200 300
500 200 500
275 110 330
275 110 385
648 375 4002
3 1 10000
0 0 0 Sample Output
1 3
1 1
1 0
0 3
1 1
49 74
3333 1 Source
Japan 2004
//砝码称重问题!在之前转的博客中对本题的分析已经十分清楚了。不过不知道原文博主代码哪里有bug,我是在极值点附近两个点还有自身比较就AC了的,而不用在附近5个点比较,单调函数显然只要再极值加自身三个点就能确定极值了!
#include<stdio.h>
#include<math.h>
#include<algorithm>
#include<limits.h>
using namespace std;
int extend_gcd(int a,int b,int &x0,int &y0,int &d)
{
if(b==0)
{
x0=1,y0=0;
return a;
}
d=extend_gcd(b,a%b,x0,y0,d);
int t=x0;
x0=y0;
y0=t-a/b*y0;
return d;
}
int main()
{
int a,b,c,d;
while(scanf("%d%d%d",&a,&b,&c),a|b|c)
{
int x0,y0,d,i,flag=0;
if(a<b)
{
flag=1;
swap(a,b);
}
d=extend_gcd(a,b,x0,y0,d);
x0=x0*(c/d);
y0=y0*(c/d);
int t=y0/(a/d),minans=INT_MAX,u,v;
for(i=t-1;i<=t+1;i++)
{
int x=x0+b/d*i;
int y=y0-a/d*i;
if(abs(x)+abs(y)<minans)
{
minans=abs(x)+abs(y);
u=abs(x);
v=abs(y);
}
}
if(flag)
printf("%d %d\n",v,u);
else
printf("%d %d\n",u,v);
}
return 0;
}
![捉 虫 历 险 记[图]](data:image/gif;base64,R0lGODlhAQABAIAAAP///wAAACwAAAAAAQABAAACAkQBADs=)