Triangular Pastures
Description
Like everyone, cows enjoy variety. Their current fancy is new shapes for pastures. The old rectangular shapes are out of favor; new geometries are the favorite.
I. M. Hei, the lead cow pasture architect, is in charge of creating a triangular pasture surrounded by nice white fence rails. She is supplied with N (3 <= N <= 40) fence segments (each of integer length Li (1 <= Li <= 40) and must arrange them into a triangular pasture with the largest grazing area. Ms. Hei must use all the rails to create three sides of non-zero length.
Help Ms. Hei convince the rest of the herd that plenty of grazing land will be available.Calculate the largest area that may be enclosed with a supplied set of fence segments.
I. M. Hei, the lead cow pasture architect, is in charge of creating a triangular pasture surrounded by nice white fence rails. She is supplied with N (3 <= N <= 40) fence segments (each of integer length Li (1 <= Li <= 40) and must arrange them into a triangular pasture with the largest grazing area. Ms. Hei must use all the rails to create three sides of non-zero length.
Help Ms. Hei convince the rest of the herd that plenty of grazing land will be available.Calculate the largest area that may be enclosed with a supplied set of fence segments.
Input
* Line 1: A single integer N
* Lines 2..N+1: N lines, each with a single integer representing one fence segment's length. The lengths are not necessarily unique.
* Lines 2..N+1: N lines, each with a single integer representing one fence segment's length. The lengths are not necessarily unique.
Output
A single line with the integer that is the truncated integer representation of the largest possible enclosed area multiplied by 100. Output -1 if no triangle of positive area may be constructed.
Sample Input
5 1 1 3 3 4
Sample Output
692
Hint
[which is 100x the area of an equilateral triangle with side length 4]
题意:要构成三角形的牧场,当构成一个时,在接下来的变长再继续构,得到最大的面积,先得到所有可能的情况,在进行背包——海伦公式 p=(a+b+c)/2;S = sqrt(p*(p-a)*(p-b)*(p-c));貌似这道题看作边长越大面积越大...背包问题就是一种从最大开始数的情况.
#include<cstdio> #include<cstring> #include<cmath> #include<iostream> using namespace std; int dp[1000][1000]; int main(){ int n,res = 0,mx = -1; int a[50]; scanf("%d",&n); for(int i = 1; i <= n; i++){ scanf("%d", &a[i]); res+=a[i];} int half = res>>1; memset(dp,0,sizeof(dp)); dp[0][0] = 1; for(int i = 1; i <= n;i++) for(int j = half; j >=0;j--) for(int k = j; k >= 0; k--) if(j >= a[i]&&dp[j-a[i]][k]||k>=a[i]&&dp[j][k-a[i]])//得到可能性的边 dp[j][k] = 1; for(int i = half;i >= 1;i--){ for(int j = i;j >= 1;j--){ if(dp[i][j]){ int k = res - i - j; if(i+j>k && i+k>j&& k+j>i){ double p = 1.0*(j+k+i)/2; int S = (int)(sqrt(p*(p-i)*(p-j)*(p-k))*100); if(S>mx) mx = S; } } } } printf("%d",mx); return 0; }
