题目大意:给你长度为n的一对整数a[],b[](注意是一对的),根据式子可以得到:∑a[ i ] /
∑b[ i ],现在给你整数k,你可以从n个中剔除k对,问剩下的根据式子能得到的最大值是多少,答案*100并且四舍五入精确到个位。
题目分析:
很清晰的01分数规划,设Q(L) = ∑a[ i ] - L *
∑b[ i ]。则Q(L) < 0时能得到更优解,Q(L) > 0时不能得到最优解,Q(L) = 0时是解。
用二分就Q(L) < 0的时候修改下界,Q(L) > 0的时候修改上界。注意精度问题即可。
二分代码如下:
#include <cmath>
#include <cstdio>
#include <cstring>
#include <algorithm>
using namespace std ;
#define REP( i , n ) for ( int i = 0 ; i < n ; ++ i )
#define REPF( i , a , b ) for ( int i = a ; i <= b ; ++ i )
#define REPV( i , a , b ) for ( int i = a ; i >= b ; -- i )
#define clear( a , x ) memset ( a , x , sizeof a )
const int MAXN = 1005 ;
const double INF = 1e18 ;
const double eps = 1e-6 ;
int a[MAXN] , b[MAXN] ;
double c[MAXN] ;
int n , k ;
double solve ( double r ) {
REP ( i , n )
c[i] = a[i] - r * b[i] ;
sort ( c , c + n ) ;
double ans = 0 ;
REPF ( i , k , n - 1 )
ans += c[i] ;
return ans ;
}
void work () {
while ( ~scanf ( "%d%d" , &n , &k ) && ( n || k ) ) {
REP ( i , n )
scanf ( "%d" , &a[i] ) ;
REP ( i , n )
scanf ( "%d" , &b[i] ) ;
double l = 0 , r = INF , m ;
while ( fabs ( r - l ) > eps ) {
double m = ( l + r ) / 2 ;
if ( solve ( m ) >= eps )
l = m ;
else
r = m ;
}
printf ( "%d\n" , ( int ) ( 100 * l + 0.5 ) ) ;
}
}
int main () {
work () ;
return 0 ;
}
然后是迭代的代码:
#include <cmath>
#include <cstdio>
#include <cstring>
#include <algorithm>
using namespace std ;
#define REP( i , n ) for ( int i = 0 ; i < n ; ++ i )
#define REPF( i , a , b ) for ( int i = a ; i <= b ; ++ i )
#define REPV( i , a , b ) for ( int i = a ; i >= b ; -- i )
#define clear( a , x ) memset ( a , x , sizeof a )
const int MAXN = 1005 ;
const double INF = 1e18 ;
const double eps = 1e-5 ;
struct Node {
int a , b ;
double c ;
bool operator < ( const Node &t ) const {
return c > t.c ;
}
} ;
Node node[MAXN] ;
int n , k ;
double solve ( double r ) {
REP ( i , n )
node[i].c = node[i].a - r * node[i].b ;
sort ( node , node + n ) ;
double A = 0 , B = 0 ;
REP ( i , n - k )
A += node[i].a , B += node[i].b ;
return A / B ;
}
void work () {
while ( ~scanf ( "%d%d" , &n , &k ) && ( n || k ) ) {
REP ( i , n )
scanf ( "%d" , &node[i].a ) ;
REP ( i , n )
scanf ( "%d" , &node[i].b ) ;
double res = 0 , tmp ;
while ( 1 ) {
tmp = solve ( res ) ;
if ( fabs ( res - tmp ) <= eps )
break ;
res = tmp ;
}
printf ( "%.0f\n" , 100 * res ) ;
}
}
int main () {
work () ;
return 0 ;
}