programming-examples/c++/Numerical_Problems/C++ Program to Solve the Fractional Knapsack Problem.cpp
2019-11-18 14:44:36 +01:00

78 lines
3.3 KiB
C++

/*This is a C++ Program to solve fractional knapsack. The knapsack problem or rucksack problem is a problem in combinatorial optimization: Given a set of items, each with a mass and a value, determine the number of each item to include in a collection so that the total weight is less than or equal to a given limit and the total value is as large as possible. It derives its name from the problem faced by someone who is constrained by a fixed-size knapsack and must fill it with the most valuable items.*/
/* program to implement fractional knapsack problem using greedy programming */
#include<iostream>
using namespace std;
int main()
{
int array[2][100], n, w, i, curw, used[100], maxi = -1, totalprofit = 0;
//input number of objects
cout << "Enter number of objects: ";
cin >> n;
//input max weight of knapsack
cout << "Enter the weight of the knapsack: ";
cin >> w;
/* Array's first row is to store weights
second row is to store profits */
for (i = 0; i < n; i++)
{
cin >> array[0][i] >> array[1][i];
}
for (i = 0; i < n; i++)
{
used[i] = 0;
}
curw = w;
//loop until knapsack is full
while (curw >= 0)
{
maxi = -1;
//loop to find max profit object
for (i = 0; i < n; i++)
{
if ((used[i] == 0) && ((maxi == -1) || (((float) array[1][i]
/ (float) array[0][i]) > ((float) array[1][maxi]
/ (float) array[0][maxi]))))
{
maxi = i;
}
}
used[maxi] = 1;
//decrease current wight
curw -= array[0][maxi];
//increase total profit
totalprofit += array[1][maxi];
if (curw >= 0)
{
cout << "\nAdded object " << maxi + 1 << " Weight: "
<< array[0][maxi] << " Profit: " << array[1][maxi]
<< " completely in the bag, Space left: " << curw;
}
else
{
cout << "\nAdded object " << maxi + 1 << " Weight: "
<< (array[0][maxi] + curw) << " Profit: "
<< (array[1][maxi] / array[0][maxi]) * (array[0][maxi]
+ curw) << " partially in the bag, Space left: 0"
<< " Weight added is: " << curw + array[0][maxi];
totalprofit -= array[1][maxi];
totalprofit += ((array[1][maxi] / array[0][maxi]) * (array[0][maxi]
+ curw));
}
}
//print total worth of objects filled in knapsack
cout << "\nBags filled with objects worth: " << totalprofit;
return 0;
}
/*
Enter number of objects: 3
Enter the weight of the knapsack: 50
10 60
20 100
30 120
Added object 1 Weight: 10 Profit: 60 completely in the bag, Space left: 40
Added object 2 Weight: 20 Profit: 100 completely in the bag, Space left: 20
Added object 3 Weight: 20 Profit: 80 partially in the bag, Space left: 0 Weight added is: 20
Bags filled with objects worth: 240