# How to trace Knapsack pr0blem using greedy algorithm?

The question is how to trace a Knapsack problem with greedy algorithm using the following information?

P=[10,7,12,13,6,20]
W=[3,2,4,3,13,8]
M=15
n=6

I'd appreciate it if some one could help me understand this or point me to the right direction.

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What are P, W, M and n? What does it mean to 'trace a Knapsack problem'? –  user97370 Dec 18 '11 at 16:56
I mean step by step, perform the algorithm and check the outputs. –  Hamed Momeni Dec 18 '11 at 17:06
Also P is price of the items, W is the weights of them, M is the maximum amount the knapsack can contain. and n is the number of items. –  Hamed Momeni Dec 18 '11 at 17:08
And which item will the greedy algorithm choose first? Do you have some code? –  user97370 Dec 18 '11 at 17:16

Well, if it's 'fractional knapsack' (i.e. you can take fractions of the items) then it's easy:

The items are (as price, weight pairs) [(10, 3), (7, 2), (12, 4), (13, 3), (6, 13), (20, 8)]

Intuitively, you'll want to get an item first which will provide more price with less weight. So, let's sort the items by their price to weight ratio:

[(13, 3), (7, 2), (10, 3), (12, 4), (20, 8), (6, 13)]

Now, until you run out of capacity or an item, take the most valuable item as much as you can.

0. cap = 15, price = 0
1. Take (13, 3): cap = 12, price = 13
2. Take (7, 2): cap = 10, price = 20
3. Take (10, 3): cap = 7, price = 30
4. Take (12, 4): cap = 3, price = 42
5. Take (20, 8): cap = 0, price = 49.5
[in this step, you have capacity to take 3 units, so take 3 units of the 5th item, the price of which is 3*20/8]

If you cannot take fractional items, then such a greedy approach may not give you the optimal solution.

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#include<iostream>
#include<time.h>
using namespace std;
int r;
int* sort(int list[],int n)
{

int temp;
bool swap =true;
int i;
while(swap)
{
for(i=0;i<n-1;i++)
{
for(int j=i+1;j<n;j++)

{
if(list[i]>list[j])
{
temp=list[j];
list[j]=list[i];
list[i]=temp;
swap= true;
}else
{
swap= false;
}

}
}
}
return (list);

}
int* knapsack(int list[],int k)
{
const int n=6;
int c=0;

int ks[n];
int sum=0;
int u;
for(int i=0;i<n;i++)
{
sum=sum+list[i];
if(sum<=k)
{
u=list[i];
ks[i]=u;
list[i]=i+1;
c++;
//cout<<"Index number in sorted list : "<<i+1<<" "<<endl;
}
}

r=c;
return (list);

}

int main()
{
double difference1,difference2;
clock_t start,end;
const int m=5;
int list[m]={8,6,7,4,9};
cout<<"Your list of sizes of parcel : ";
for(int i=0;i<m;i++)
{
cout<<list[i]<<" ";
}
cout<<endl<<endl;

start = clock();

int* x=sort(list,m);  //call to sorting function to sort the list in increasing size order.

end = clock();
difference1=((start-end)/CLOCKS_PER_SEC);

cout<<"Sorted list of sizes of parcel : ";
for (int j = 0; j <m; j++)
{cout<<x[j]<<" ";}

cout<<endl<<endl;
111
int k=24;   //Size of sack

start = clock();

int* g= knapsack(list,k); //call to knapsack function

end = clock();
difference2=((start-end)/CLOCKS_PER_SEC);

cout<<"Indexes taken from sorted list : ";
for(int l=0;l<r;l++)
{
cout<<g[l]<<" ";
}
cout<<endl<<endl;
cout<<"Time elapsed : "<<(difference1+difference2)<<endl<<endl;

}
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In the first step, that is, 1. Take (13, 3): cap = 12, price = 15, since 3 items are added, so the price will be 13*3=39... It proceeds in the same manner. When 2 more are added then 7*2=14 is added. So the cost in step 2 will be 39+14=53.

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