Cows
Time Limit: 2000MS |
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Memory Limit: 65536K |
Total Submissions: 8063 |
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Accepted: 3651 |
Description
Your friend to the south was interested in building fences and turning plowshares into swords. In order to help with his overseas adventure, they is forced to the save money on buying fence posts by using trees as fence Posts wherever possible. Given the locations of some trees, you be to help farmers a try to create the largest pasture this is possible. Not all the trees would need to be used.
However, because you'll oversee the construction of the pasture yourself, all the farmers want to know are how many cows They can put in the pasture. It is the well known, a cow needs at least square metres of pasture to survive.
Input
The first line of input contains a single integer, n (1≤ n ≤10000), containing the number of trees tha T grow on the available land. The next n lines contain the integer coordinates of each tree given as the integers x and y Sep Arated by one space (Where-1000≤x, y≤1000). The integer coordinates correlate exactly to distance in metres (e.g., the distance between coordinate (ten;) and (11; 1 1) is one metre).
Output
You is to output a single integer value and the number of cows that can survive in the largest field you can construct using The available trees.
Sample Input
40 00 10175) 075 101
Sample Output
151
Test instructions: In a forest to raise cattle, each cow needs 50 square meters of space, ask you how many cows can be raised?
Puzzle: Convex bag Area/50
#include <iostream>#include<cstdio>#include<cstring>#include<math.h>#include<algorithm>#include<stdlib.h>using namespacestd;Const intN =10005;Const DoubleEPS = 1e-8;structPoint {intx, y;} P[n],stack[n];intN;intCross (Point A,point b,point c) {return(a.x-c.x) * (B.Y-C.Y)-(A.Y-C.Y) * (b.x-c.x);}DoubleGetarea (Point a,point b,point c) {returnCross (A,B,C)/2.0;}DoubleDis (point a,point b) {returnsqrt ((Double) ((a.x-b.x) * (a.x-b.x) + (A.Y-B.Y) * (a.y-B.Y))) ;}intCMP (point A,point b) {if(Cross (a,b,p[0]) >0)return 1; if(Cross (a,b,p[0])==0&&dis (b,p[0])-dis (a,p[0]) >eps)return 1; return 0;}intGraham () {intk=0; for(intI=1; i<n;i++){ if(p[i].y<p[k].y| | (P[I].Y==P[K].Y) && (p[i].x<p[k].x)) k=i; } Swap (p[0],p[k]); Sort (P+1, p+n,cmp); inttop =2; stack[0] = p[0]; stack[1] = p[1]; stack[2] = p[2]; for(intI=3; i<n;i++){ while(top>=1&&cross (p[i],stack[top],stack[top-1]) >=0) top--; stack[++top] =P[i]; } DoubleArea =0; for(intI=1; i<top;i++) { area+=getarea (stack[i],stack[i+1],stack[0]);///this is called P. WA a few times . } returnFloor (area/ -);}intMain () { while(SCANF ("%d", &n)! =EOF) { for(intI=0; i<n;i++) {scanf ("%d%d",&p[i].x,&p[i].y); } if(n==1|| n==2) {printf ("0\n"); Continue; } intAns =Graham (); printf ("%d\n", ans); } return 0;}
POJ 3348 (convex bag area)